j. - users.uoa.grusers.uoa.gr/~nchilak/vivlio/parts/04 c.pdf · step-by-step tabular method of cal...
TRANSCRIPT
cabinet projection, epµaptmo) rrpo~OA i] · [ rrA.ayia Ka-ru 3Qo rrpo~oA. i] J.
cable, TEXN., KaA.cill>tov. flexible cable, &iSKaµrcw v KaA.roowv. freely hanging cable, eA.eu0epooc;
x:p&µciµ &vov x:aA.rootov. parabolic cable, rcapapoA.tKov x:a
A.rootov.
cable television, TEX., KUAffiOLaKi] 'IT]ACO\jli.a· [ 't1lACO\jlta KOL vonKfj<; Kepaiac;j.
cadastral map, XAPT., Kniµa-roXUP"C1K [ K'IT]µa-roA.oy1Koc; xup'IT]<;j.
cadastral survey, Kniµa-royp<icpT]mc;· [K•TJ~ta-roA.oytKi] Xffipoypa<pTJmc;}.
~adastre, lC'IT]~ta'tOAOYLOV.
CAL, AOrIEM., KUA ( = cruvoµt-A.taKi] aA.ye~ptKi] yM.'>crcra).
calculable, unoA.oyicrt~toc;,oc;,ov.
calculate, unoA.oyil;;ffi.
~alculated risk, npoµf.Af.'IT]µl':v11 [£crKeµµi':v11] Ii La Kt vl>Uvwcrtc;.
-calculated value, MA0., urroA.oytcr9etcra nµ11.
Calculating, U7tOAOytcrnK6<;, 1) ,0V.
calculating machine, U7tOAOytcrnKij µT]xavi]· [orroA.oyicr-rpta}.
calculating prodigy, cipt8µoµvi]~1ffiv.
102
c
calculating punch, Aorn::M., urroA.oytcrnKo<; 1>1a-rp11-ri]c;.
electronic calculating punch, i)A.&x:-1:pov1x:oc; urcoA.oyicr"CtKoc; Ota'tp!]'ti}c;.
calculation, MA0., urroA.oytcr~16c;. approximative calculation, rcpocr&y
y1crµ1x:oc; urcoA.oytcrµ6c;. engineering calculations, µ11xavo-
1:&Xv1x:oi urcoA.oytcrµoi. fixed point calculation, MA0., urco
A.oyicrµoc; (ot' ap10µ11nx:i'jc;) rcayiac; urcocrnyµi'jc;.
floating point calculation, MA0. UTCOAOYlO'µOc; (ot' apt0µT]'t LKi'jc;) KlVll: •Tic; unocrnyµi'jc;.
matrix calculation, ).LT]'tp&taKoc; urcoA.oy1crµ6c;.
mental calculation, vo&p6c; [ C:mo j.LVTjj.tT]c;j U1'COAOytcrµ6c;.
semigraphic method of calculation l'Jµtypa(jltKT] µ€0ofoc; UTCOAOytcrµOi'.1' { i): µ1ypaqi1Ki] U1tOAOYlO'LlKi] µ€000oc;j.
step-by-step tabular method of calculation, Priµa'ttcrnKi] mvax:o9&nKiJ µteoooc;.
calculator, I, unoA.oytcr-ri]c; ( = 6 unoA.oyil;;ffiv). 2, J\OrI~M., unoA.oyicr-ri]c;· [uno'koyicr-rpta j ( = urroA.oytcrnKOV µT]XUVT]~ta). 3, apt9µoµvi]µffiv.
card-program calculator, ocA. •aptonpoypaµµ 1Koc; U1'COAOYlO''tfjc;.
desk calculator, ercnparc€~toc; [ 1poPl11:<'>c;} urcoA.oytcr'tiK
electronic calculator, 1]A.cK'tpovtK6c; urcoA.oytcr"Ci)<; .
network calculator, otK'tUOOµanKoc; urcoA.oytcr"Ci) c;.
calculatory, unoA.oy1crnK6<;, i],6v.
culculatory science
calculatory science, U7tOAOytcrnKij trr~a-ri] ~t TJ.
calculus, MA0., A.oytcrµ6c;. absolute calculus, an6A.ut0c; A.oy1-
uµ6c;. barycentric calculus, PapUKEVLptx:6c;
A.oyicrµ6c;. differential calculus, 01a1pop1x:oc; A.o
y1crµ6c;. directional calculus, oteuOuvnx:oc;
A.oy1crµ6c;· {/..oytcrµoc; "CcOV ot1m0UVO· µtvrov µqdloov· A.oy1cr1-1oc; wu rx:p6.crcrµav].
elements of calculus, O''tOtXEia A.oy1crµou.
exponential calculus, eK0cnKoc; A.oy1crµ6c;.
exterior differential calculus, t~oo't&p1x:oc; ota1pop1x:oc; A.oy1cr1-16c;.
fluxionary calculus, = calculus of fluxions.
functional calculus, cruvap•11cr1ax:oc; A.oy1crµ6c;.
fundamental theorem of the integral calculus, 0q1eA.1c0occ; 0erop11µa 1:01) 6A.ox:A.11pronx:ol:i A.oy1crµo u.
Grassmann's calculus, ypacrcrµavv1av6c; A.oy1crµ6c;· [A.oy1cr1-1<'>c; wu rx:pl'.tcrcrµav J.
imaginary calculus, A.oy1cr1-16c; 'tcOV lpUV'tU(J'tlKcOV upt9µoov.
infinitesimal calculus, U7tEtpocrnx:6c; A.oy1cr1-16c;.
integral calculus, 6A.ox:A.11pronx:oc; A.oy1crµ6c;.
lower predicate calculus, KU'tcO'tcpoc; [ npoow't6.~wc;} KU'tT]YOPT]'tt Koc; A.oy1crµ6c;.
matrix calculus, µT]'tp&taK<'>c; A.oy1-uµ6c;.
operational calculus, npa~coA.oy1-x:6c; A.oy1crµ6c;· [A.oyicrµoc; 'toov (ut..yePpix:oov) rtp6.~EOOV ].
predicate calculus, KU'tT]YOPT]'ttKoc; A.oy1crµ6c;.
propositional calculus, AOr., npo-1:a<:nax:6c; A.oy1crµ6c;.
Ricci calculus, ptKKtavoc; A.oy1-crµ6c;· [A.oy1crµoc; wu Pli:crt].
calculus of residues
sentential calculus, AOr., 1ppacrnx:6c; A.oytcrµ6c;.
tensor calculus, •avucrµanKoc; A.oy1crµ6 c;.
variational calculus, µ&'taf..A.ax:nx:oc; A.oy1crµ6c;.
calculus of chance, A.oytcrµo<; -r1ii; 'IUX 11 p6n1-roc;.
calculus of enlargement, A.oytcrµoc; 'IWV 7tUpf.K'tUCTf.ffiV.
calculus of extension, A.oy tcrµoc; -rfjc; Ertf.K'IUCJf.ffi<;" {brnKrnnK<'><; A.oytcrµ6r,j.
calculus of finite differences, A.oytcr~toc; -r&v nrnepacr~ti':vffiv omcpop&v.
calculus of fluxions, A.oy1cr~1oc; -r&v l>tacpopf.nKO'Iij'IffiV.
calculus of forms, A.oytcrµoc; -rrov ~topcp&v.
calculus of functions, A.oytcrµor, -rrov cruvap'Iij CTf.ffiV.
calculus of imaginaries, A.oytcrµoc; 'tWV cpa.vrncrnK&v cipt9~t&v.
calculus of limits, A.oytcrµoi; 'IWV 6ptffiV.
calculus of matrices, A.oytcrµor, -r&v ~LT]'IpetffiV.
calculus of operations, A.oytcrµoc; -r&v aA. yepptK&v rrp<il;e<J.W.
calculus of probabilities, A.oytcrµoi; 'IWV m9avo-rij'IffiV.
calculus of propositions, A.oytcrµoc; 'IWV 7tpO'IUCJf.())V" [ rrporncrmKoi; A.oy tcr~t6r,j.
calculus of reasoning, l>taA.oytanKO(, A.oytcrµor, ( wu Aei'.[}vl'Iiou ).
calculus of residues, f.oytcrµoi; 'IWV lCU'IUAOt7tffiV.
103
calculus of the quaternion
calculus of the quaternion, A.oytcrµoc; twv trncrapimv.
calculus of variations, A.oytcrµoc; twv ~t£taUaywv· [ µ£taHaKttK6c; A.oytcrµ6c;].
first necessary condition (in calculus of variations), 11:pcim1 avayKaia cruv0i]Kil (rou A.oytcrµou ·rcov ~lEmA./,ay&v).
fundamental lemma of the calculus of variations, 0EµEA.Liii8E<; /.fiµµa wu A.oytcrµou -riiiv ~tsmA.A.ayiiiv.
isoperimetric problem (in the calculus of variations), icrom;p1µE'tPtK6v np6J3A.riµa (wu A.oy1crµou -riiiv µnaA.A.ay&v).
multiple-integral problems (in the calculus of variations), npoJ3A.i]~tam noA.A.anA.iiiv 61..oKA.npwµaw>v (wu A.oytcrµou -r&v µnal..A.ayiiiv).
variable end-point problems (in calculus of variations), npoJ3A.i]µa-ra µEmJ3A.1p:ou aKpaiou crnµEiou (wu A.oywµou -r&v µEmU.ay&v) .
Calemes, J\01., rccip£X,£ ( = µv1wov1K6c; t0rroc; mu tEWptoaxl]µovoc; cruUoym~t0D).
calendar year, 1iµEpoA.oytaK6v [ rcoAtnKOV J £me;.
caliber, TEXN., 8ta~tttp11µa.
calibrate, I, 8taKptPwvm· [o taµ£tp&}. 2, pa8µovoµw.
calibrated sensitivity, Pa8µovoµ11-µtv11 [oiaKp1pwµtv11} £tmw811-cria (opycivou).
calibration, 1, otaKpipwmc;· ['fnaµ'Etp11mc;}. 2, Pa8~tov6µ11mc;.
call number, K),1itcipt8~toc; ( = a, X,llj)UKtll ptCHLKOV KAllO"Effi;· p, icA 1FtK6c; cipt8~t6c;).
call word, J\Orn:M., KA 11r6A£~ov· {Af..~tc; KAllO"Effi<;}.
calling, imciyy£/,µa"[ arromo/.. l] /.
104
candle
calling sequence, J\OlILM,, KAl]-ttKil UKOAou8ia (tvrnM'iv).
Callippic, rnUirrrc£t0c;,oc;,ov (=mu · KaUircrrou).
Callippic cycle, KaUircrr£toV KOKAl]µcr [ KUAAlTCTC£t0c; TCEpioooc;}.
Callippic period, KaUircrr£t0c; n:£pio8oc;.
Callippus (of Cyzicus), Ka/..A.trcn:oc; (6 Ku/;tKl]V6c;) ( = f'U11v ucrtpov6µoc; Kai µa811µattK6c;' rc£pi t6 350 n:.X.).
calorescence, 8£pµt8mµ6c;.
calorie, I, <DYL., 8£pµic;. 2, MAITHT., 8£pµic;· [ KaA.opi}.
small calorie, µLKpa 0Epµi,<;.
calorific value, 8£pµt8tK6t11c;· [0£p-µt8tKil nµ lj}.
calutron, <DYL., KaAutp6v11.
cam, MHX., <DYL., EKK£Vtpov.
camber (of an airfoil), AEPO~ .• Kaµrc0/..mmc; (uEpornµfjc;).
Camenes, = Calemes.
canal surface, 8tauA.tKlJ £m<pav£ta.
cancel, 1, aKUp&. 2, MA0., t~a-/,£i<pm· [ arra/..d<pm].
to be cancel(l)ed out, MA0., i";~aA.Eicpoµm· [avmpouµm].
cancellation, 1, aK0pwmc;. 2, MA0., arcciAEL\!ftc;· {£~ciA£L\!ftc;}.
cancellation law, MA0., v6µoc; tfjc; arcaA£t\!f£mc;.
candela, P.aµrccic;· {Kavtf.Aa} (= µovac; <pffit£l vfjc; EVTU0"£(l)c;).
candle, Kl] piov ( = µovuc; <pmt£tvfjc; EVtUG£(l)c;).
foot candle, 11:080Ki]ptov.
candfe power
international candle, 8tE0vf:<; KT]ptov.
candle power, Kl]ptoMvamc; ( = tcrxuc; Tl Mvaatc; de; Kl]pia).
canon, voµoKcivrov.
canonical, 1, voµoxavovtK6c;,l],6v. 2, MA0., 8rnµtK6c;, l],6v ( = rcou arcot£A£L Kav6va Tl 0rnµ6v).
canonical binary forms, 0i::crµtKai OUUbtKai µop<pai.
canonical correlation, 0£crµtKil crucrxtncrtc;.
canonical equations of dynamics, 0rnµtKai [0£µ£A.taKai} €~tcrfficr£tc; tfjc; 8uvaµtKfjc;.
canonical form, 0i::crµtKTj µop<p11. classical canonical form, KA.acrmKi]
0tcrµtKi] µopcpi]. Jacobi canonical form, iaKroJ31avi]
0i:crµtKi] µopcpi]· {0tcrµtKi] ~wpcpi] wu rtaK6µm].
Smith's canonical form, crµt0tavi] 0i:crµtKi] µopcpi]· [0rnµtKi] µopcpi] wu Lµi0].
canonical form of a matrix, 0£crµtKTj µop<plj µl]tpEiou· [0rn~nxlj µl]tpEtaKTj µop<p11).
canonical matrix, 0£crµtKOV µl]tpEiov.
canonical representation of a space curve, 8£crµtKlJ clVUTCUpcicrtaatc; xropaiac; Ka~LTCOA 1ic;.
canonical transformation, 0£crµtx6c; µ£tacrx11µancrµ6c;.
canonical types of conformal maps, MA0., 8rnµn;oi t0rcot (twv) cruµµ6p<pmv £ixovtcrµwv.
canonical types of multiply connected maps, MA0., 0i::crµtxoi t0rrot
Cantor's paradox
t&v rcoA./,arcA.wc; cruvarctwv dxovwµwv.
canonical variable, 0rnµtKTj [0£µ£AtaKit} µ£taPA.11tl].
canonical variables in mechanics, 8rnµtrni [0£µ£A-tami} µEtaPA.11-tai rfjc; µllxavtKfjc;.
cantilever, rcpopoA.wx6c;,l],ov ( = TOD rcpop6A.ou).
cantilever, MHXT., rcp6poA.oc;. bending of a cantilever, Kaµljlt<;
(wu) npoJ36A.ou.
cantilever beam, rrpopoA-taKTj [ rrp6-poA.oc;] 8oK6c;.
vertical cantilever beam, KU'taK6-pucpo<; npoJ3oA.taKi] 8oK6<;· {KamK6pucpo<; 11:p6J30A.rn;] 8oK6i;.
cantilever deflection, MHXT., rcpopoA.taKlJ c'rn6Kaµw1c;.
cantilever rod, MHXT., rcpopoA.taKlJ [ rcp6poA.oc;] pcip8oc;.
Cantor (Georg F. L. -), (rcropytoc;) Kcivrnp ( = pmcroy£pµavoc; µa-811µanK6c;· 1845 - 1918).
Cantor (Moritz-), (M6pttc;) Kcivrnp ( = y£pµav6c; µa811µanK6i;· 1829 - 1920).
Cantor discontinuum, Kavt0ptav6v ucruv£X,f:c;· [ aauv£xo8oµit mu· Kcivrnp].
Cantor set, Kavrnpwvov cr0voA.ov· [ auvoA.ov tOD Kcivrnp}.
Cantor set of frontier points, Kavrnptavov cr0voA.ov µdopimv cr11-~t£irov· { GllVOAOV µ£0opimV O"l]µ£imv TOD Kavrnp].
Cantor ternary set, Kavtop1av6v tpta8tK6v cr0voA.ov.
Cantor's paradox, Kavrnptavov rca~
105
Cantor's theorem
pcioosov· { rmpcioosov toll Kcivtop].
Cantor"s theorem, KUVT.Opwvov ei:wpq~m· {9i:ropqµa r.ou Kcivrnp j (rrEpi TOU µi] arra.pt9~LT}TOU T.OU crnvqouc;).
Cantorian, Ka.vr.opta.v6c; ,1i ,ov ( = r.ou Kcivrnp).
Cantorian aggregate, Kavr.opta.vov cruva9powµa.. (LYN.: Cantorian set).
Cantorian set, KUVT.Opta.v6v auvoA.ov.
capabilities of building materials, iKa.v6r.qr.i:c; [ouvar.6r.qw:,] r.&v <>oµtKWV UAlKWV.
capacitability, MA0., xwpqrnouvar.6r.T}c;.
Choquet capacitability theorem, 0Ecbp1iµa tfjc; X,Cllp:]to8UVUtOTllt0; mu :EoKE' /croKenav6v 0Ecbpqµaj .
capacitable, MA0., xwp1ir.oouvar.6c;,T],6v.
capacitance, HAEK., 1, xwpqr.6r.ric;· f xrop11nK6T.T}<;j. 2, = capacitive resistance.
input capacitance, dcro81K1i x.ropqt6i:q c; · [xropqi:6r11c; dcrq>opiic;}.
capacitive, 6v.
HAEK., XWPT}r.tK6<;,T],
capacitive reactance, HAEK., xroprin Ki] a val) pacnt KOTY]c;.
capacity, I, iKa.v6nic;. 2, <DYL, N AYT., XWPT}T.LKOT.11 <;.
allowable bearing Capacity, E1tlTPE· ;c•iJ 'fOPllTLKi] {btttpE1tTll t8pacrnKi]] tKUVOtqc; .
bearing capacity, q>opqnKi] [t8pacrnKiJ] iKav6tqc;· [ q>opqTLKOTT]\;' t-8pacrnK6tric;].
106
capital gains
carrying capacity, q>opnKij 1Kav6-Tl1\;' { q>OpttKOtll \; }.
channel capacity, Kavv1Ki] [81au/...1Ki]] x.ropqnK6i:ric;.
circuit capacity, l\OrIIM., KuK/...roµanKiJ X,CllpqnKOTllt; .
damping capacity (of a structure), MHXT., aitocrPccrnKTi tKUV6t11c; [iKav6i:ric; aitocrPfoEroc;] (mu q>opt roc;) .
electrostatic capacity, Hl\EK., iiAEKtpocrtattKi] x.rop11nK6tqc;.
load-carrying capacity, q>OfJTLKi] iKav6t1v;- [iKCLVOTll\; (j)Optiou].
memory capacity, µv1iµ1Ki] x.roprin-K6tric;· [µv1iµ1Ki] iKav6r11 c;}. ·
resistance capacity (to s hocks), MHXT., iKUVOTll\; avncrtcicrEooc; (Elc; i:a itA.11yµara).
specific inductive capacity, Hl\EK., d8tKi] eitayroytKll XCllPT]TLKOTll\; (8111-AEKTPLKOU) ' [ crtaOepci 8t11A.EKTPtK6t11-1:0c;].
storage capacity, aito0qKEUTLKi] X,CllPllTLKOTll\;' [aito0qKEuttKi] iKav6n1c;J.
thermal capacity, 0EpµtKi] x.ropqnK6n1c; .
ultimate capacity (of a structure), tEA.tKi] [ ucrtcit11 / (jlOPll'rtKi] {KUVOTT]\; (mu 801-niµam c;)· { ucrtcitll (j)OpqttKO· i:ric; (mu q>operoc;)j.
unit capacity, HAEK., µova8taia x.ropqnKOTJK { µovcic; XCllPTJT~K6tq-1:0c;}.
capillarity, <l>YI., r.ptx,oi:tOtKOTT}<;" [ r.p1xoi:1Mr.11c;].
constant of capillarity, tPLXOEt8tKi] crta0Epci· [ crtaOepci tfjc; 'tPLXOEt86i:11-mc;].
capillary wave, <l>YI., r.ptxoi:tOLKOV KUµa.
capital, OIK., KE<pciA.a.wv. working capital, EpyacrtOV KE(jlcl·
A.mov· [ KEq>ciA.mov Kt vf]creroc;].
capital coefficient, OIK., KE<pa.A.ataKO<; cruvr.i::A.i:crnlc;.
capital gains, OIK., KE<pa.A.a.ta.Kl) &rrtKEpbELU.
capital market
capital market, OIK., 'KE<pa.A.atayopci.
capital stock, OIK., ~LETOXtKOV KE<p6.A.a.wv· [ f.r.atptKov KE<pciA.atov].
capsule, 1, IIYP., <pucriyyT}. 2, MAI:T., Kcllj/U.
recovery capsule, avaKtT]ttKi] Kcilj!U.
Caratheodory (Constantin -),(Krovcrr.avr.lvo<;) Ka.paecooropfi<; ( = f.A.A. 11 voyi:pµa.vo<; µa.e11 µa.nK6c;· 1873 - 1950).
axioms of Caratheodory, KapaOw-8wptKa a~tffiµam· { a~tcbµata tOU Kapa0w8ropfjj (t1ic; 0Epµo8uvaµtKfjc; Kai i:fjc; Ei8tKfic; Oeropiac; i:fjc; crx.EnK6-i:rimc;).
Osgood-Caratheodory theorem for conformal maps, 0Ecbpqµa "OcryKouvtKapaOw8ropfj 8tci 1:0uc; cruµi.top(j)ouc; ELKOVtcrµouc;.
Caratheodory measure, Ka.paecol>roptKov µ€r.pov· [ µ€r.pov Kapa.ewl>ropfi].
Caratheodory outer measure, es<ilr.i:pov KapaeworoptKOV ~LET.POV.
Caratheodory test fot measurability, rnpa.eworoptKl) pacra.voc; r.fic; µi:r.p 11 r.6r.1110c; · [paaa.voc; µi:r.p11-r.6r.11 me; r.ou Ka.paewl>ropfi ].
card, MHXT. MA0., 8i:A.r.6.p1ov· [Kapr.tA.a· Kapr.aj.
aspect card, AOrIIM., 0eroptK6v 8EA. tciptov.
business card, eitayyEA.µattKOV EmcrKEittf]ptOV.
control card, AOrI~M., 8EA.tciptov EA.tyx.ou.
deck of cards, I, 8Ecrµic; nm yvtox.cipi:wv· [i:pciitouA.a].2, Aorn:M., 8ecrµic; 8EA. i:apirov· [ itaKE'tO KapteA.Ec;].
edge-notched card, AOrI:EM., aKp6crxicrmv 8EA. tciptov.
card jam
edge-punched card, AOrI:EM., aKp6rµ111:0v 8EA.tciptov.
eighty-column card, 6y8011Kov-tacri:11A.ov 8EA.tciptov.
indicator card, MHXT. MA0., 8uvaµo8EtKttK6v 8eA.tciptov· [8uvaµo-8EtKttK6v 8EA.tiov }.
master card, l\OrI:EM., itprompxtK6v {Kup1GJ8Ec;] 8EA.tciptov.
matrix multiplication by means of punched cards, µqtpEtaK6c; noA.A.anA.acrtacrµoc; µfoqi 8tatpijtrov 8EA. i:apirov.
microfilm card, µ1KpotmvtaK6v 8EA.tciptov.
ninety-column card, evEVT]KOVt<ir crtriA.ov 8EA.tciptov.
peek-a-boo card, AOrIIM., 8taitA.EKnK6v 8eA.tapwv.
punch card system, 8EA.taptoi:p11-nK6v cr0crtT]µa· { cr\JcrtT]µa 8tatpi)crEOO\; 8EA. rnpirov].
punched card, 81cii:p11wv 8EA. i:ciptov. transfer card, Aorn:M., µei:aPiPa
crnKov 8EA.tapwv. transfer of control card, AOrI:EM.,
8EA. tapwv µEtaPtPcicrEroc; E"-Eyx.ou· [ µEi:a~l~a :mKov 8EA.tcipwv ].
transition card, Aorn:M., µEtaPanK6v [ µEtaPtPacrnK6v] 8EA. i;ciptov.
uniterm card, AOrIIM., µovrovuµtaKOV 8EA. tciptov.
use of punch(ed) card systems in computers, A.oytcrµT]ttKi] x.p11cr1µ0-itoi11cr1c; 'tWV 8eA.taptotP11'tlKWV crucrtqµcitrov.
card feed, AOrIEM., 1, oi:A.r.a.pto-06r.T}crtc;. 2, 8i:A. r.a.ptor.po<pooonKl) crucrKcui] · [ l>i:A. r.apt006r.11c;].
card field, Aorn:M., oi:A. r.a.pta.Kov ni:oiov.
card image, AOrn:M., oi:A.r.a.pta.Kov dl>roA.ov.
card jam, AOrIEM., oi:A.r.a.pta.Ki) eµ7tA.OKll' { crr.piµroyµa. TWV OcA• r.a.pirov J.
107
card-programmed
card-programmed, AOI'U:M., ot:A.mptonpoypaµµtK6<;, T] ,6v· [oi;A.wpionpoypa~1µancr8t:i<;,t:foa, f,y}.
card-programmed calculator, oi;A. taptonpoypa~tµtKo<; U7tOAOYtcrt1l<;·
card punch, AOI'ILM., ~t:A.taptotpT]tf]<;· {ot:A.taptotpT]nKil crucrKcufj).
card punch unit, AOI'ILM., ot:A.·raptotpT]nKil crucrKwfj.
card read(er), AOI'ILM., oi;A.rnpiavayvmcrtT]<;" [oi;A. ta ptoyvfficrtT]<;}.
card reader unit. AOrILM., ot:A.tapiavayvrocrnKil crucrKwfj.
card reproducer, AOrILM., ot:A.taptaKo<; UVttypa<pT]tll<; ( = UVaJtapayroyo<; tp11wu oi;A. tapiou ).
card stacker, AOI'ILM, ot:A.taptocrropt:tacrrf]<;· { crK<i<pT]}. (LYN.: hopper).
card-to-tape converter, oi;A. taptotat VtaKO<; µt:tarpt:7ttll<; ( = µEtatp07tcU<; ocA. taptaK&v crtotxcirov cl<; tatVtUKU).
Cardan (Jerome-), ('fapffivuµo<;) Kapvtav ( = ltaA.6<; <pUcrtKo<;· 1501 - 1576).
Cardan Joint, KapoavtKO<; [ cip8proto<;] cruvowµo<;.
Cardan' s formula, iCapoavtKOV oiatunroµa'{tuno<; wu Kapvt<iv}.
Cardan's formula for the roots of a cubic, KapoavtKov owtunroµa [KapOaVtKO<; tU7tO<;] ct.>pfot:ro<; t&v ptl;&v tfl<; tpttoPa8µiou.
Cardan' s rule, KapaoavtKo<; Kavffiv· [ Kavffiv tou Kapvtciv}.
108
cardinality of a set
Cardan' s solution of the cubic, KapoavtKil £niA.ucrt<; tfj<; tpttoPa8µiou esicrfficrt:ro<;· [ KapoavtKll E7tlAUcrt<; tfl<; tpttOcrtfl<;}.
Cardanic, KapoavtK6<;,T],ov ( = tou Kapvt<iv).
cardanic suspension, KapOaVtKll aVUptT]crt<;' [ uv<ipn1crt<; tOU KapVtav ].
Cardano (Geronimo - ), = (Jerome) Cardan.
cardinal, KUpto<; [ an6A.uw<;] cipt8-µ6<;.
transfinite cardinal, um:pm:pacrµtvoc; KUptoc; ap10µ6c;.
cardinal number' KUpto<; [ an6A.ut0<;} ap18µ6<;.
cardinal number of a set, ouvaµtKO<; apt8µo<; [ouvaµt<;} wu cruv6-A.ou. (LYN.: power of a set; potency of a set).
cardinal number of all countably infinite sets, ouvaµtKo<; cipt8µ6i; [ouvaµt<;} tfl<; 6A.6tT]t0<; t&v &.nap18~11it&<; andprov cruv6A.rov.
cardinal numeral, KUptov [ an6A.uwv j apt8µT]ttKOV.
cardinal points, (ru tfocrapa) Kupta cr11µci:a (wu 6pit;ovw<;).
cardinality, MA0., xupt6tT]<; [ouvaµ1K6t11<;· ouva~n<;}.
finite cardinality, :rrrnepacr>tEVTJ Kllp16-r1K { :rrrnepacrµ t vq ouvaµ1K6-rqc;}.
set of infinite cardinality, cruvoA.ov a:rreipou ouvaµtKO'!ll'!O<;' { cruvoA.ov a:rreipou Kllpt6-rqwc;· Cim:tpov cruvoA.ov j.
cardinality of a set, MA0., KUpt6-tT]<; [ouvaµtK6tT]<;] (wu) cruv6-A.ou· [ouvaµti; wu cruv6A.ou ] .
cardioid
cardioid, MA0., Kapotot:toi:<;'[rnpOtot:to~<;· Kapoiot:toili; xaµnuA.11J. ·
cardioid projection, 1capotot:1oil<; npopoA.~.
Carnot (Sadi -·), (Laoi) Kapvo ( = yaA.A.o<; <pUCl"lKO<;' 1796 - 1832).
Carnot cycle, 0EPMOL'.i., xapvonavov xuKA.T]µa· {KuxA.o<; tou Kapv6}.
Carnot efficiency, Kapvonavil £moonK6tT]<; ' {£moonK6tT]<; tOU Ka.pv6}. (LYN.: thermodynamic efficiency).
carrier, 1, <pop6<;. 2, <l>YL., <pop6-xuµa· [cpopov xuµa· cptpov xuµa).
pulse carrier, :rraA.µtK6v cpop6Kuµa· [:rraA.µtK6v cpop6v KU>taJ.
subcarrier, u:rrocpop6v KU>ta' {urrocpop6KUµa].
carrier frequency, <popo<; [ <popoxuµanxil] cruxv6t11i;· [ cruxv6tT]<; cpopou xu~tato<;] .
carrier wave, <popov [ cptpov] xu~1a· [ <pop6Kuµa}.
Carroll (Lewis -), (Atoui:<;) KappoA.A. ( = ~/WOcOVUµov tOU fiyyA.ou KA 11 pt Kou Charles L. Dodgson, cruyypa<pfo><; t&v «Alice in Wonderland>>, cc'H 'AA.iK11 crtilv 'Ovi;1poxc0palJ, Kai «Through the Looking GlasslJ, ccllicrro ano tOV Ka8pE7ttT]l), µt:tasu 7t0Afl&v fiA.A.rov µa811µanKoA.oyoi:i;XVtK&v epyrov).
carry, MA0., AOI'ILM., 1, xpatT]crt<; ( = ~tt:ta<popa xpawuµtvou). 2, crfl~ta xpatf]crt:ro<;· [ crflµa µt:ta<popfi<; xpawuµ t vou].
Cartan geometry
cascaded carry, Aorn:M., KA.1-µaKocre1paia Kpcnqmc;.
complete carry, AOrIIM., tv-reA.1]<; Kpa'!qcrt<;.
end-around carry, AOrIIM. , a:rroKUKA.ronKi] Kpa-rqcrtc;.
high-speed carry, AOrIIM., -raXUKpa-rqcr1c;· [ -raxicr-r11 Kpa-rqmc;].
partial carry, AOrIIM., µeptKi] Kpa-rqcrt<;.
standing on nines carry, = highspeed carry.
carry a number (in adding), MA0., xpat& to xpawuµi;vov (Kata tilv np6cr8wt v).
carry out, 01t:s6.yor [01i;vi;py&}.
carry time, AOI'ILM., x:p6vo<; xpatf]crt:ro<;· { XPOVO<; µt:ta<popfi<; KpatOUµEVOU}.
carry two, plus seven, equal nine, Mo to Kpawuµt:vov, cruv E7tt6., foov £vvfo.
carrying capacity, I, <l>YL., MHX.,. <popnK6tT]<; ( = a, <popnKil iKav6tT]<;" p, w<p£A.tµov <poptiov). 2, NAYT. , xrop11mc6tTJ<;.
load-carrying capacity, cpopnKi] iKav6-rqc;· {iKav6n1c; cpoptiou].
carry-over factor, MA0., pt:ta<pt:pto<; fxp11m~1ono11'!cr1~10<;] nap<iyu>V.
Cartan (Henri Paul - ), ('EvpiKo<; IlauA.o<;) Kaprav ( = y6.A.A.o<; µa-8riµanK6<; · y. 1904).
Cartan (Elie Joseph -),('HA.fa<; 'Iroa~<p) Kaprav ( = y6.A.A.o<; ~ta8T]µcmK6<;· 1869 - 1951).
Cartan form, Kapravtavil µopcpfi· [ µopcpil i:ou Ka pr av}.
associated Cartan form, cruvacpi]c; Kapmviavi] µopcpi].
Cartan geometry, KO.ptavtavil yi;ro-
109
Cartesian
µi:tpia· [ yi:roµstpia mu Kapt<iv].
Cartesian, Kapti:cnav6i;, Tj,ov · ( = mu Pi:v{; NtEK<ipt).
Cartesian components, Kaptscrtavai cruvtcrt&crm.
rectangular (Cartesian) components, 6p9oycbvtot (Kapi:Ecrtavai) cruvtcrnilcrm.
Cartesian coordinates, Kaprncrta vai cruvti:tanu~vat.
rectangular Cartesian coordinates, 6p9oyrovtot Kapi:Ecrtavai cruvrEtayµ{;vat.
Cartesian coordinates of a point in space, Kaprncrtavai cruvtstay~tsvm mwi:iou tou xmpou.
Cartesian coordinates of a point in the plane, Kapti:crtava.i cruv• ti:myµsvm crriµdou mu £mrr8-8ou.
Cartesian curve, Kapti:crwvij KaµnuA. ri · [Kaµn0A.ri tOU KaptEcriou].
Cartesian cyclide, Kaptscrtav11 KuKAt8Tji;· [ KUKA.toi]i; tou Kaptrniou].
Cartesian equation, Kaptscrtav11 {;~icrrocni;.
Cartesian grid, Kaptscrtavij £crxcipa.
Cartesian ovals, Kapti:crtavai cbostoi:ii;· [ Kaprrntava cboi:to fj · cbostofj tou Kaptrniou].
Cartesian parabola, K<tptscrtavij napa~oA. ij.
Cartesian product, Kaptscrmvov ytv6µsvov.
Cartesian space, Kapti:crtavoi; x&poi;.
110
case
Cartesian vortex, KaptEcrtavij oivri · [Kapti:cnavoi; crtp6~tA.oi;].
theory of Cartesian vortexes, 9Ecopia i:wv 8tvwv wu Kapi:Ecriou.
Cartesius (Renatus -), Psviitoi; Kaptscrtoi;, 8. Descartes.
cartographic, xaptoypa<jltK6i;,i),6v.
cartographic projection, xaptoypa.;. <ptKTj npo~oA.iJ.
cartography, xaptoypacpia.
cartoon, 1, ysA.otoypacpriµa ( ~ xpo~ voypa<ptKTj i'] noA.t ttKTj ysA.oto-ypacpia: KptttKo i'] .cratuptKO crKitcrn). 2, Kroµffioriµa (=KtvriµatoypacptKov i'.pyov µf: UVU\j/UXa av9pronoµop<ptKU ft UAATJyoptKU yi:A.otoypacpijµata).
animated cartoon, KCOµciJ81iµa• { UVU\jlUXOV KOJµcb81iµaj.
cascade, HAEK., KA.tµaKocri:tpu· [ KAtµaKffiTTJ a0v8ccrti;}.
cascade control, AOrIIM., KAtµaKocri:tpaioi; i'.A.i:rxoi;.
cascade of n identical symmetric quadripoles, KAtµaKOCTEtpu v aptSµou taurnr0rrrov cruµµi:tptKffiv tEtpan6A.rov.
cascade shower, MA0., KatapaKttcrµ6i;.
cascade shower problem, MA0., (to) np6~A.riµa mu KatapaKncrµou.
cascaded carry, AOrI~M., KA.tµaKocrstpaia Kparricrti;· [ KAtµaKocri:tpaia µi:m<popi (tol>) Kparnuµsvou].
case, nspinrrocni;. ambiguous case, aµcpiA.oyo~ [8tcpo
pouµ{;v11] nEpiincocrti;.
case of translation
degenerate case, EKq>uA.tcrµ{;v11 nEpini:cocrti;.
equianharmonic case, icravapµovtKi] 7tEpt7t't'COO"t<;.
irreducible case, avuycoyoi; [ µi] avayroytµoi;] nEpintcocrti;.
lemniscatic case, A.1iµvtcrKtKi] 7tEpi-7ttfficrti;.
pseudo-lemniscatic case, \jlEU80A.11-µvtcrKtKi] 7tEPl7t't'COO"t<;.
special cases of the general resisting force, Ei8tKai m:ptntrocrEt<; (tfii;) yEvtKfi<; 8uvuµEcoi; avnm:ucrEOJ<;.
static case, crtattKi] nEpintcocrti;. stiffness factor for the static case,
napuycov 8ucrKaµ\jliai; 8ta ti]v crm-nKi]v 7tEPL7t't'COO"tV.
case of translation and rotation, MHX., ni:pimrocrti; µsm98cri:roi; Kai crtpocpi'ji;' [ ni:pimrocrti; ~tE
taKt v11 cri:roi;].
cash, 1, µstprita. 2, taµEiov.
cash register, taµstaKTJ µrixa.vij· [mµEiov].
cassette, TEXN., Kicrtri· [Kacrcrst-. ta}.
Cassini, Kacrcri vt · [Kacrcn vi] ( = f:nffivuµov i raA,oyaUrov µa011 ~tattK&v Kai acrtpov6µrov, {;~ cbv: 1, Giovanni Domenico Cassini, 'Iroavvrii; ~oµsvtKoi; Kacrcrivt, 1625-1712· 2, Jacques Cassini, 'I<iKro~oi; Kacrcr[ vt, ft Kacrcrtvi, 1677 - 1756· Kai 3, Cesar Fran~ois Cassini, Kaicrap <l>pavcrouu Kacrcrtvi, 1714 -1784).
ovals of Cassini, =Cassinian ovals.
Cassinian, Kacrcrtvtav6i;,Tj,ov (=mu Kacrcrivt i'] Kacrcnvi).
Cassinian ellipse, Kacrcrt vta vi] i'.A.AEt\jfti; '[ilA.A.Et ljlti; tou Kacrcrtvi).
category
Cassinian ovals, Kacrcrtvtavai mo" st8Eii;'[ cboi:tofj mu Kacrcrtvi).
Castigliano (Carlo Alberto-), (KupoA,oi; , AA.~sptoi;) KacrttAtUVO ( = l.mAhi; µrixavotsxv1ii;- 1847 -1884).
Castigliano's theorem (in the theory of structures), KacrnA.tavov 0i:ffi~ Pll µa [0i:ffipri µa tou KacrnA.tu~ VO j (Ota tTJV 9i:ropiav t&V cpopsrov).
casting off, ano8taA.oyiJ '[ ano8taA.i:yµa,j.
casting out nines, MA0., µ80o8oi; (ano~o/..,fji;) wu f:vvfo (<hi; ~acravoi; tol> noA.A.a.nA.acnacrµou ft tf\i; 8tatpfoi:roi;).
casual, cruµntroµanK6i;, iJ,6v· [ anp6-omoi;,oi;,ov· rnxa.ioi;,a,ov].
catacaustic curve, OITT., KataKaucrttKTJ Kaµn0A. TJ.
catacaustic surface, OITT., KarmmucrnKTj f:mcpavi:ta.
categorical judgment, AOr., KULTJyoptKTJ Kptcrti;.
categorical language, MA0., KUtTJyoptKTj yA.&crcra.
categorical proposition, AOr., KatriyoptKTJ np6tacrti;.
categorical syllogism, AOr., KatTJyoptK<'>i; cruA.A.oytcrµ6i;.
categoricity, KatriyoptKOtTJi;.
category, Katriyopia. comma category, Katqyopia K6µ
µawi;· [KoµµanKi] KU't'l]yopia]. differentiable category, 8tacpopicrt
µoi; KU't'T"\YOpia. theory of categories and functors,
9Ecopia i:wv KaTqyoptwv Kai cruvapµui:cov.
111
category theorem
category theorem, 0i::c.Op11µa (ni::pi) i:fjc; KUTl']yopiac;.
Baire's category theorem, Bmpi:tavov ni;pi KUTTlYOp[a<; 0Eci>p11µa· [0Eci>PT\µU Ti']<; KUTT]yopia<; wu Mnaip ].
Banach's category theorem, Bavaxiavov TtEpi KUTT]yOpia<; 0Eci>p1iµa· [0eci>p1iµa Ti']<; KaTqyopia<; wu MmivaK}.
category of sets, 1mi:11yopia cruv6-A.rov.
catenary, aA.ucroi::tOi]c;" [ aA.ucroi::tl>l)c; Kaµm'.JA.11].
common catenary, Kotvii uA.ucroEtor,<;.
elliptic catenary, £AAEl1tTtK1l UAUcrOElOii<;.
hyperbolic catenary, unepBoA.tKii UAUcrOELOii<;.
parabolic catenary, napaBoA.tKii uA.ucroELOii<;.
catenoid, aA.ucroi::totc;· [ aA.ucroi::tl>l)c; Err.t<p U VE ta j.
cathode, <PY1:., Ka06owv· {K6.0ol>oc;].
cathode follower, AOr!1:M., JCa0oOtK6v [Ki::voA.uxvtaK6v} aKoA.ouOl']~La.
cathode-ray tube, JCa000tK11 l.uxvia.
cathode rays, <PY1:., JCa0oOtKai UKi:Ivi::c; .
cathodic, <PY1:., Ka0oOtK6c;,i],6v.
cattle problem, MA0., (i:6) Poi::tK6v [(i:o) P6i::tov} np6PA.11~m (mu 'Apxtµ~oouc;).
Cauchy (Augustin Louis -), (Auyoucri:i.voc; AouooPiKoc;) Krocru ( = y6.AA.oc; ~w.011µanJC6c;· J 789 -1857).
Cauchy completeness, Krocri::tavl) £vi:EA.i::ta· [ £vi:tA.i:: ta mu Krocru } .
112
Cauchy's form
Cauchy curve, Krocri::tavl) Kaµnt'.JA.11· [ Kaµnt'.JA. 11 mu Krocru].
Cauchy distribution, Krocri::tavl) Kai:avoµi] 1 KU'l:UVO~Lij TOU K wcru].
Cauchy-Euler integrodifferential equation, 6A.oKA.11pronKoOta<poptKll t~ icrrocrtc; Krocru-" OuA.i::p.
Cauchy frequency function, Krocri::tavl) CTUXVOTLKll <JUVUpTl]<Jtc;· ( crUVUpTl]<rtc; cruxv6i:11mc; mu Krocru].
Cauchy-Hadamard theorem, 0i::c.OP11µa Krocru-'Avi:aµcip.
Cauchy-Kowalesky theorem, 0i::c.Op11µa Krocru-KopaMcpcrKt.
Cauchy-Kowalesky theory, 0i::ropia Kwcru-KopaA.t cpcrKt.
Cauchy number, Krocri::tavoc; apt-0µ6c;· [apt0µ6c; (mu) Krocru].
Cauchy-Riemann (first order partial differential) equations, ( nprom-rci~t0t ~t i:: ptKai OtacpoptKai) £~tcr6cri::tc; Krocru-Piµav.
Cauchy sequence, Krocri;tavl) aKoA.ou0ia· [ aKoA.ou0ia -rou Krocru}.
Cauchy's condensation test for convergence, JCrocri;tavl) nuKvronKij pacravoc; cruyKA.icri::roc;· f Pcicravoc; nuJCvfficri::roc; Ota crt'.JyKA.tcrt v mu Krocru}.
Cauchy's condition for convergence of series, Krocri::tavl) cruv0i]Kll [cruv0~Kl'] mu Krocru} Ota (-ri]v) crt'.JyKA.tcrtv m:tpfic;.
Cauchy's condition for convergence of an infinite series, Krocri::tav11 cruv0~K11 cruyKA.icri::roc; chi::ipou cri::tpfic;.
Cauchy's form (of the remainder
l
Cauchy's inequality
for Taylor' s theorem), Krocri::tavl) µopcpl) [ µopcpl) Kwcru} (mu cruµnA.ripwµanKOU opou mu 0i::cop1wamc; mu TaiUA.op).
Cauchy's inequality, KWcrctavi] avtcr6i:11c;· [ avtcr6n1c; mu Kwcru}.
Cauchy' s integral formula, KWcri::tavov 6A.oKA.11pwnK6v Otai:unwµa· [ -rurr.oc; 6A.oKA.l]pc.O~tamc; mu Kwcru}.
Cauchy's integral test for convergence (of an infinite series), Krocri;tavl) 6A.oKATJPffiTLK1l Pcicravoc; cruyKA.i.cri::wc; (i:fjc; anEipou cri::tpfic;)· [ 6A.oKA.TJ pronKij pacmvoc; -rou Krocru Ota n1v crt'.JyKA.tcrtv arr.i;ipou crEtpfic;j.
Cauchy's integral theorem, Kwcri::tavov 6A.oKATJPffiHKOV 0i::ffip1wa· {0i::6p11 µa ni::pi 6A.oKA. TJ pffiµamc; mu Krocru}.
Cauchy's mean value formula, KWcri::tav6v l>tai:urr.roµa ~Lfol]c; nµfjc;· [ -rurr.oc; ~tfo11c; n~tfic; mu Kwcru}.
Cauchy's method of residues, Kwcri::tavi] µt0oooc; KaraA.oirr.wv· [ µ80oooc; "TWV KUTUAOL1t(J)V mu Kwcru}.
Cauchy' s radical test for convergence, Krocri::tavl) ptstKi] P6.cravoc; cruyKAicri::wc;· [ ptstKl) P6.cravoc; cruyKA.icri::wc; -rou Kwcru}.
Cauchy's ratio test, Kwcri::tavl) Pcicravoc; UVUAOyiac;· { K(J)<JEtUVij UVU/,oytKij pu.cravoc;· avaA.oytK1l P6.cravoc; mu Kwcru}.
Cauchy's theorem, Krocri::tav6v 0i::6-p11µa"[0i::c.Op11µa mu Kwcru}.
Carnlieri's method
causal structure, AOr., ainwl>ric; l>oµi] · [ ainffil>ric; Otcip0pwcrtc;}.
causality, AOr,, MA0 .. , aln6-r11c;. law of causality, v6µo<; Tij<; ain6-
Tll't0<;.
linear causality, ypaµµtKii ain6-TT]<; .
principle of causality, apxii Ti']<; aiTLOTlFO<;.
cause, 1tpOKUAciJ" ( ;r;po':,i::vw}. agent causing the motion, napuyrov
TtpOKUAWV l µ£crov TtJ)OKC!t.scrav J Ti]V KLVllcrtV.
cause, ai'.rwv· [airia}. antisymmetric cause, MHX., avn
cru>t~tcTptK6v ahtov.
chance cause, !:TAT., Tux11p6v [ cruvTuXtaKOV} ainov.
symmetric cause, MHX., cruµµETptK6v ahtov.
caused to (accelerate), npoKA. ri0Eic;, i::foa,ev Eic; (err.ti:axuvcrtv)· [rr.po~i::v~crac;,cracra,crav (ri']v £mi:cixuvcrtv)}.
causes and effects, AOr., <PIA., aIi:ta Kai ainai:ci .
causes of earthquakes, aYna i:wv cri::tcrµ&v· [cri::tcr~nKa a'ina].
caustic curve, OilT. , KaucrnK~ KaµnuA. l].
caustic surface, OilT. , KaucrnKij £rr.tcpcivi::ta.
cavalier projection, EKi:aO tKi] npoPoA.i]· [nA.ayia Kara 45° npopoA.i] · £Krao11v npopoA.i]}.
Cavalieri (Bonaventura -), (Mrr.ovaPi::vmupa) KaPaA.tept ( = iraMc; yi::wµti:p11c;· l 598 - 1647).
Cavalieri's method of indivisibles, KaPaA.ti::ptav11 ~180oooc;· [ µt0o-
113
Cavalieri's theorem
00<; 'rWV ao1atpEW>V mu Kaj3a'A1£p1}.
Cavalieri' s theorem, KapaA.u:pmvov 0Effipriµa: [0Effipriµa mu Kapa'A1£p1}.
cavitation, MHXT., crnriA.a.ifficrt<;.
cavity, 1, KotM•rii;· [Koi'Affiµa}. 2, Y ~PO~., (6µoppotaKov) KoiA.Ulµa.
(Riabouchinsky's) characterization of cavities by an extremum problem, (pmBoucnvcrKtavoc;) xapaKtT)ptcrµoc; tillv (6µoppotaKillv) KotA.roµcmov 81' tcrxatmKou npoBA.iJµm:oc; .
Caylean, KUlDAEtaVo<;,l],ov ( = mu Kaili/... TJ).
Caylean, MA0., Kati.iA.i>tav~"[Kmi.i'AEtavi] Kaµm)A.TJJ.
Caylean curve, Kati.iA.i>wvi] KaµnuATJ.
Cayley (Arthur-), ("Ap0oup) Kaiu'Ari ( = fiyy'Ao<; µa0T]µCmK6<;· 1821 - 1895).
Cayley-Hamilton theorem, 01>ffip11-µa Kaili.A,11-Xciµ1A.mv.
Cayley numbers, KUlUAElUVOi apt0-µoi · [ apt0~toi mu KaiuA. TJ).
Cayley's sextic, Kmi.iA.1>tav11 EKmcr1l]· [f.Kmcr•i] mu Kaiu/cTJ].
Cech (Eduard - ), ('Eooucipooi;) Tcri:tc ( = wi>xocrA.oPciKo<; µa0riµanK6<;· 1893 - 1960).
Cech cohomology, Tcri>xiavi] cruvoµoA.oy1K6tTJ<;. [ cruvoµoA.oytK6-'ll<; mu Tcr£Kj.
Stone-Cech compactification, cruµnayirocrtc; Lt6ouv-TcrtK.
ceiling, opo<pl] . [ mpcivt}.
114
celestial point
ceiling level, MHX., crtci0~LTJ opo<pfji;.
ceiling of a floor, opocpi] mu op6-<pOU.
Celarent, AOr., i;ypmyE ( = µv11-~wv1Ki] A.£s1<; •ptmcrxl]µovo<; cruUoy1crµou).
celestial axis, oupcivto<; c'iSUlV.
celestial coordinates, oupciv1m [ oupavoypacp1Kai] cruvtEtayµ£vm.
celestial equator, oupcivto<; tcrT]µEptVO<;.
celestial equator system of coordinates, = equatorial system of coordinates
celestial horizon, oupcivto<; OPlSffiV.
celestial latitude, oupcivtov [ oupavoypacptKOV J n:A.cim<;.
celestial longitude, oupciv10v [ oupavoypa<ptKOV J µfjKoi;.
celestial mechanics, oupavia. [ ovpavto<;} µTJxa.v1Kl].
celestial meridian, oupcivto<; µrnT]~lpptv6i;.
celestial navigation, oupavia l oupcivtoi;} va.unA.ia.
celestial point, oupcivwv crriµi>t:ov · [ crriµEiov mu oupa.vou}.
altitude of a celestial point, uwoc; crT)µeiou rnu oupavou.
coaltitude of a celestial point, cruµnA.T) proµanKov U\lfOc; {~EVt0ia U1tOO"tacnc;j crT)µEiOU WU OUpUVOU.
codeclination of a celestial point, cruµnA.i)proµa cinoKA.icri;roc; crT)µEiou rnu oupavou.
colatitude of a celestial point, cruµnA.T)proµanKov nA.arnc; [ no'A.1Ki] cin6-cr•acric;] crT)µEiou rnu oupavou.
declination of a celestial point, a-
celestial pole
n6KAtcrtc; miµeiou rnu oupavou· {an6KA.tcrtc; Ucrttpoc;j.
celestial pole, oupcivwi; n6A.o<;· [ n6-A.rn; mu oupa.vou }.
celestial sphere, oupa.via l oupcivto<;] mpal'pa.· [Ti crcpa.l'pa. mu oupavou}.
cell, 1, Kunapov. 2, HAEK., crtotXEfov. 3, MA0., Kutwpov. 4, AOrIIM., Kunapov· {KU\j/EATJ" KU\j/EAi<;}.
binary Cell, OUUOtKi] KUljletcll" {ouaOlKOV Kutrnpov].
closed n-cell, KA.i::t<nov vuKunapov.
four-cell system, <Etpacrrnixdrotov crucri:T)µa.
fuel cell, KaucrtµtKov m:oixi::Iov. n-cell VUKUtTUpov· [ vuotacrmrnv KU't
•apov]. n-dimensional cell, vuotacr•arnv KU't
•apov. open n-cell, uvotKtov vuKunapov.
photoelectric cell, cprowriA.cK'rptKOV Kunapov· [ cpror:oKunapov].
photovoltaic cell, cprowBoA. ta"iKov Kunapov.
solar cell, 1iA.taK6v Kunapov.
Celsius (Anders-), ("Ani>pi;) I£A.cnou<; ( = CTOUTJ 00<; acrtpOYOµo<;· 1701 - 1744).
degree of Celsius, Ba0µ6c; Ki;A.criou· [Ki;A.crtavoc; Ba0µ6;} .
Celsius temperature scale, KEA.cna.v11 [lrnmvta.Pci8µ10<;] 01>pµoµE•p1Kij KAlµa.s .
cement, cnµ£vmv· [ T<nµ£vm · KOvia. ].
water-cement ratio, uva/,oyia uoa-•oc;-Koviac;.
censor, A,oyoKpivffi.
censor, A,oyoKpn~i;.
censorship, A,oyoKptcrfa..
center of a geodesic
center, KEYtpov. earthquake center, cri;tcrµtKOV Ktv
•pov· [Ktvi:pov r:ou cri;icrµou] .
equation of the center, ALTP., EKKEV'rpoc; t~icrrocnc;.
guiding center, MArN., 6811Yi::nK6v Ktvi:pov.
homothetic center, MA0., 6µo0i::nKov Ktvtpov· [ Ktvtpov 6µ0100ccriac;].
mass center, MHX., Ktvtpov •fie; µa~ric;.
radical center, ptstKov Ktvtpov. ray center, uKnVtKov Ktvi:pov·
· [ Ktvi:pov npoBoA.fic;}. shear center, MHX., Ktvtpov ota
•µi)cri;roi;. theory of the shear center, 0i::ropia
WU Ktvtpou oiai:µi)cri;roc;. vertical translation of the mass
center, MHX., KUTUK6pucpoi; µi;t6.0i;cnc; wu Ktvtpou •fie; µa~T)c;.
center circle, MA0., tniKEVtpoc; KUKAO<;.
chain of center circles, aA.ucnc; tm· Ktvi:prov KuKA.rov· [ K'A.1cpcpop81avl) Ci/..ucrti;}.
center line, = central axis.
center line of a surface of revolution, KEV'rptKi] ypa.µµi] 'rl"j<; tK nEptcrtpocpfj<; tm<pa.vda.<;.
center of a circle, KEVtpov (mu) KUKAOU.
center of a complete quadrangle, KEVtpov mu n:A.l]pou<; 'rEtpa.KOpu<pou.
center of a curve, K£npov (•fj<;) rnµnuA. TJ<;.
center of a flat pencil, KEVTpov mu tmn1>01Kou oi>crµl]µami; .
center of a geodesic circle on a surface, K£npov yi>Ulomcrta.KOU KuKA.ou tm<pa.vsia<;.
115
center of a quadric
center of a quadric surface, KEvrpov 8EurEpocnfjc; bn<pavEiac;.
center of a ray of a congruency, KEVrpov aKiivoc; mu a~tl']v.:iuc;.
center of a regular polygon, KEV'tpov (mu) KClVOVlKOU 7toA.uyci>vou.
center of a sheaf, KEVTpov (nic; £rcm';v1pou) 8Eaµi8oc;.
center of a sphere, Kevrpov (rfjc;) a<paipac;.
center of a surface, KEVrpov £m<pavi;f o,c;.
center of an element of a ruled surface, KEVrpov rou arotxEiou { KEVTpov T1ic; xapayfjc;) £U0ElOyEvouc; £m<pavi;iac;.
center of an involution, Kevrpov ( Tfjc;) tvcA. i~Ecoc;.
center of area, KEVTpov (~uit;11c;) i:m<pavEiac;.
center of attraction, KEV'tpov (rfjc;) f.A~Ecoc;.
center of buoyancy, KEVTpov (Tfjc;) UVTWO'ECOc;.
center of collineation, KEVTpov 'tOU auyypaµµwµou.
center of curvature of a plane curve, Kf:vrpov KaµrcuA.6n1rnc; £rcrnt-8ou rnµrcuA.11c; .
center of curvature of a space curve (at a point), KEvrpov Ka~muA.6-n1rnc; xcopaiac; KaµrcuA.11c; (de; n a11µcfov).
center of figure, MA0., KEvrpov (mu) axl']µatoc;.
center of force, <l>YL., KEVTpov 'tfjc; 8uvci~tEcoc;.
116
center of percussion
curvilinear motion about '· a center of force , KaµrtuA.6ypaµµoi; · 'KtVT]cm; m:pi 'tO KEV'tpov •fii; ouvaµi;roi; .
center of geodesic curvature, KEV'tpov yi;co8atataKfjc; KaµrcuA.6-'tT}Toc;.
center of gravity, ct>Yr., · KEVTpov 'tOU Pcipouc;.
center of gravity of a mass, KEVTpov (mu) ~cipouc; µtac; ~tcit;11c;.
center of gyration, MHX., xtvrpov (Tfjc;) yupo8poµfjc;.
center of homology, KEvrpov 6µ0-A.oytK6r111oc;.
center of homothety, KEVTpov 6-µow0wio,c;.
center of inertia, KEVrpov µ<it;11c;· {KEVTpov abpavEiac;j.
~enter of inversion, KEVrpov (rfjc;) avnarpo<pfjc;. ·
center of mass, KEVTpov rfjc; µcit;ric;· {KEV'tpOV ~tci1:;11c;).
center of mass of a system of particles, KEVrpov ~tcit; 11c; auarl']µaroc; acoµaticov.
center of mean distance, KEVTpov µforic; UTCOO'TclO'ECOc;.
center of moments, MHX., Ci~cov [Kf:vrpov] r&v porc&v.
center of motion, KEVTpov rfjc; lClV~O'ECOc;.
center of normal curvature of a surface, KEVTpOV op0o0f:tou KaµTCUAOTTJTOc; bn<pavciac;.
center of oscillation, KEVrpov taA.av'tcOaEcoc;.
center of percussion, KEVrpov £mKpo0accoc;.
center of perspective
center of perspective, MA0., KEV'tpov rcpoorrnKfjc;.
center of perspectivity, KEVrpov tfjc; rcpoorrttK6tT} me;.
center of population, rTAT., rcA.11-euaµtaKov KEVTpov· [ KEVTpov re A. 110uaµou).
center of pressure, KEVTpov mf:crEcoc;.
travel of the center of pressure, µEracr-racni; [ot60eucrti;} rnii tcf:v-rpou -r~i; mfoi;roi; .
center of pressure of a surface submerged in a liquid, KEVrpov rctfoEwc; £m<pavslac; £v 1Cata80-a£t £v16c; uypoii.
center of principal curvature of a surface at a point, KEVTpov (tfjc;) rcpWTEUOUO'T]c; KCl~LTCUAOtT}tOc; µtac; ETCl<pClV£iac; de; Tl O'T]~lEloV.
center of projection, KEVTpov rcpopoA. fjc;.
center of rotation, J, MA0., KEVtpov 7tEpw1po<p1ic;. 2, MHX., Kf:vrpov arpo<pfjc;.
instantaneous center of rotation, atcaptaTov tctv-rpov (rtEpt)crrpocpfji;.
center of similarity, KEVrpov 6µ016-tT]rnc;· [ KEVTpov 6µ01ci>acwc;}.
center of similitude (of two configurations), KEVTpov 6µ0tci>aEcoc; [ KEVTj)OV rfjc; 6~10100wiac;] (Mo O'XT}µO,TtO"µrov).
center of stiffness, MHX., KEV1pov bUO'KClµ\jftai;.
center of symmetry, KEVrpov . au~t~LETpio,c;.
center of the elastic rotation .of a system, MHX. , KEvrpov f,A,aanKfji; arpo<pfji; auar~µatoi; .
centesimal minute
center of the ellipse, KEVTpov rfji; £Uci\j/£roi; .
center of the elliptical cylinder, lCEVTpov toii tAA.ctrcTtKOU KU~ A.iv8pou.
line of centers of the elliptical cylinder, ypaµ~l1'1 -roov tctv-rpoov wii tA,AEt1t'ttKoii KuA.lvopou.
center of the hyperbolic cylinder, KEVTpov rou OrcEp~oA.tKou KU-A.iv8pou. ·
line of centers of the hyperbolic cylinder, ypaµµi] -roov Kf:vrprov wu urtEp~oA. 1tcoii KuA.lvopou.
center of thrust, MHX., KEVTpov rfji; <DcrEroi;. (:EYN.: thrust axis).
center of traverse, BAHT., Kf:vrpov 0Eptaµou· [ Kf:vrpov 0EptanKfjc; O'Tpo<pfjc;j.
center of twist, Kf:vrpov (rfji;) aua1pE1j1Eroi; .
center of vision, IIPOOIIT., orcnKov Ktvrpov.
center of wing (section), AEPO~., lCEVTpOV (toµfji;) mtpuyoi;.
aerodynamic center of wing (section), ui;poouvaµuc6v Kf:vrpov (wµfji;) rt":f:puyoi;.
centered rarefaction wave, KEVtpro-0£v KUµa apatcOO'ECO<;.
centerline (of a building), MHX., lCEVTptKi'] ypaµ~lll { U~(J)V auµµ£1piai;j (mu Knpiou).
centesimal, f:JCo,1ocrnaToc;,a,ov.
centesimal measure of an angle, f:Katoana1:ov µtrpov yroviai;· {EKU'tOO'TlULoV O'UO'tT}µa µETp~asroc; yrovt&v J.
centesimal minute, EKaroanaTov (rcp&rnv) A.rn16v.
117
centesimal second
centesimal second, ioKatocrnafov osu1spov Arnt6v.
centesimal system of measuring angles, EKUTOcrnal'.ov crucrniµa µstpi]crscoi; ycovt&v.
centigrade, l:KaTOvta~a8µtoi;,a,ov· [{:xavrnta~a8µoi;,oi;,ov}.
centigrade temperature scale, sKatovtaPa8µoi; 8spµoµnptKi] KAiµas· {8spµoµstp1Ki] KA.Iµas toD Ks/vcriou}.
centigrade thermometer, £Karnvtapa8µov 8spµ6µstpov.
centigram, harncrt6ypa~tµov.
centile, ITAT., EKUtl]~t6ptov· {l:Katocrtl]~16ptov}.
centiliter, harnm6Anpov.
centimeter, £Kcnocrt6µst pov. cubic centimeter, KuPtKOV f:Karncrt6-
µEtpov. square centimeter, tEtpayrovtKov
EKarncrt6µ0tpov.
centimeter-gram-second system, crucrniµa syo· [ crucrniµa EKUTOcrtoµEtpou-ypaµµapiou-owtspoAbnou]. (IYN.: cgs system).
centipoise,, l:Karncrrn~aptov.
centrad, tKatocrrnKti vtov ( = sKatocrtov TOD aKnviou).
central, I, KEvtptK6i;,i],ov. 2, £rriKEVtpoi;,oi;,ov.
central angle, £rriKEVtpoi; ycovia.
central angle in a circle, £rriKsv1poi; ycovia KUKAou.
central axis (of a system of localized vectors), KEVtptKoi; USffiV (crucrtijµatoi; EmtomcrµEV(!)V avucrµatcov).
118
central symmetry
central conics, KEVtptKai KCOVtKai (rnµai).
central death rate, ITAT., nvtptKi] 8Vl]crtµOtl']i;.
central ellipsoid, <l>YI., £rrinvtpov £Urnvos10Ei;.
central limit, ITAT., KEVtptKov 6-ptov.
central limit theorem, ITAT., 8sropl]µa nspi KEVTplKOD 6piou.
central map, MA0., KEVtptKoi; EiKovtcrµ6i;.
central of a group, KEVtptKTJ [KsvtptKov CTUVOf.OV CTTOlXElCOV j µtai; 6µaooi;.
central plane of a ruling on a ruled surface, KEvtptKov bdrrsoov ( tfji;) xapayfji; (µtai;) su8stoysvoDi; £m<pavsiai;.
central point of a ruling on a ruled surface, KEVtptKOV crriµEl:ov ( 1fji;) :xapayfji; ( tfji;) su-8stoysvoDi; £m<pavdai;.
central processing unit, AOrIIM., KEVtptKi] µstaycoytKi] crucrKwi]· [ Kl>ptov nAaicrtov µsrnyroyfjr:J (EYN.: main frame).
central projection, KsvtptKi] rrpo~oA.i].
central quadric, MA0., KEVTptKi} owtspocr1i].
central quadric surface, nv1ptKi} OEUtcpocrn) sm<pavsta.
central subalgebra, KEVtptKll foroaA, ys~pa.
central surface, nvtplKTJ bn<pcivsta.
central symmetry, KEvtplKTJ cruµµstpia.
central tendency
central tendency, ITAT., KEVtptKi} sm<popa.
. measures of central tendency, µt-1pa KevtptKi'\<; i;mqJopil<;.
central vanishing point, KEvtptKOV crl]µdov <puyfji;.
centralize, cruyKsvtp& ( = cruyKsv. tprovro \mo Kotvov i:A-syxov).
centralized data processing, AOrIEM., cruyKEVtptKll { cruyKEV-1f){.()ttKi]j CTtOlXEtoAoytKi] ~lEtayroyi].
centrally applied load, MHX., KEV'TptK&i; £cpripµocr~lEVOV <pop1iov.
centrifugal, cpuy6nvtpoi;,oi;,ov.
centrifugal acceleration, <puy6KEV'Tpoi; bnruxuvmi;.
centrifugal force, cpuy6nnpoi; ouvaµti;.
outwardly directed centrifugal force, rrpo<; ta 1:1;,ro otw0ovoµ€vTJ qJOyoKEVtpO<; ouvaµ1<;.
resultant centrifugal forces, crov1-cr1uµi:vm qJOYOKEV'tPOl oovaµEt<;.
centrifugal moment of inertia, <puy6KEVtpoi; ponij aopavdai;.
centripetal, KEVtpoµ6A.oi;,oi;,ov.
centripetal acceleration, KEv1poµ6-A-oi; £m1axuvmi;.
' centripetal component of accelera
tion, KEVtpoµ6A-oi; ouvicrt&cra "Ti'ji; £mraxuvcrsroi; .
centripetal force, KEVtpoµ6A.oi; 80-vaµti;.
centrobaric, K£v1po~aptK6i;;i] ,6v.
centrobaric method, MA0., KEV:rpo~aptKi] µEeoooi; .
centrode, MA0., KINHM., KEV't"poosia.
Cesare
body centrode, crroµanKi] ici:v1pooi:ia.
space centrode, xropaia KEVtpoosia .
centroid, MHX., nvtpostoEi;· [KEV-rpov µai;,rii;}.
centroid of a configuration, KEVtposto£i; (yswµETplKOD) CJXT}µUncr~lOD .
centroid of a solid, KEVtpoi::to£i; OtEpEOD.
centroid of mass of an area, KEVtposto£i; [ KEVtpov µcit;, rii;J xropiou bn<pavdai;.
centroidal axis, KEVTpOEtoili; aS,rov.
centroidal coordinates, KEV'Tpouodi; OUVtEWyµEVat.
centrosymmetric determinant, KEV'TpocruµµstptKi] 6pil;,ouoa.
ceramic engineering, KspaµsunKil [KspaptKi]j µl]XUVO'TEXVlCl.
ceratoid cusp, Kcparni::ioi]i; uvaKaµm1.
Cerenkov (Pavel Alekseevicb -), (IlaDA.oi; 'AA.Ests~ni;) TcrspEvKocp ( = p&croi; <pUCTtK6i;· y.1904).
Cerenkov counter, µi::"TprJ1i]i; [ <p(J)patili;] TOD TcrEpEvKo<p"{KEpEVKo~iavoi; µstpl]ti]i;}.
Cerenkov radiation, KEP£VKo~iav1) aKnvo~oAia· {aKnvo~oAia wu TospEVKO<p ].
certain, ~E~atoi;,a,ov· [ oiyoupoi;, TJ, o].
certitude, ~s~m6trii;. principle of moral certitude, upxiJ
ti'\<; i]OtKi'\<; Ps~m6tT]to~.
Cesare, AOr., i:ypa\j!E ( = µvriµoVtKoi; tl>noi; ow1spoaxiJ~tovoi; ouUoytcrµoD).
119
Cesaro (Ernesto-)
Cesaro (Ernesto - ), ('Epvfo1oc;) Tm:sapo ( = haA.oc; µa9riµanK6c;· 1859 - 1906).
Cesaro convergence, Katcrapmvi] cruyKA.wtc;• { cruyKA.tmc; 'WU Tm:sapo }.
Cesaro summability, Katcraptavi] a9potm~t6TT]c;· { a9potmµ6TT]c; wu Tm:sapo].
Cesaro summable series, Katcraptavi] a9poicrtµoc; Ci£tp6; { a9poiCilµoc; Kani Tcrcsapo crctpa}.
Cesaro's sum, Katcraptavov a9potCiµa· {aHpow~ia KaTa Tcrcsapo}.
Cesaro's summation formula, Katcraptavov a.epotcrnKov otaTunwµa. { TU7toc; a9poim;mc; KUT<l Tm:sapo}.
cetane number, <DYL, K£1avtKoc; apt9~t6c; · { apt8~toc; ava<pA.EKTlKOTT]TOc;j.
cgs system, an6A.urnv ~lETptKOV cruCiTTjµa· { crucr1ri~ia trnrncrrnµt1pou-ypa~t~iapiou- OEUTEpoA.tnrnu· crucr11J µa cyo}.
chad, AOrn:::M., arc61priµa (oi;A.T<ipiou, xapnou, KTA..).
chadded, AOrU:::M., 6M1p1Jrnc;, oc;,ov.
chadded paper tape, 6A.6TpTJrnc; XUPTOTatVLU.
chadless, AOrIIM., avarr6TpTJrnc;, oc;,ov· [l;cv6Tp11rn:;,oc;,ov }.
chadless paper tape, UVUTCOT/)T]TO<.; · fixv6TpT]rnc;] xaprnrnt via.
chadless punching, AOrIIM., avarr6TpTJrnc; flxv61p11rnc;} otcnprimc;.
120
chain of matrices
chain, MHX., MA0., clA.umc;. analytic chain, c'tvaA.u1:1Kii .iiA.ucru;. boundary of the chain, cruvopov tfi<;
aA.Um;roc;. Clifford's chain, KAHJ><popomvr, ii-
A.umc;· [ iiA.umc; i:ou KA.i<p<popvt]. closed chain, KAEtcri:r, iiA.uinc;. complex chain, µtyaotKii iiA.ucrtc;. compound chain, cruv0ci:oi; aA.ucrti;. endless chain, atEpµancri:o<; [c'ttf.p-
µrov} iiA.umc;. e-chain, = epsilon chain. epsilon chain, EllftA.ov iiA.umc;· [iiA.u-
mc; tOU E/. ' . Gunter's chain, youv0Eptavi] iiA.u
mc;· { UAUO"!C, toU rKGJVtEp j. Markov's chains, µapKoBtavai &.
A.ilcrEtc;· [aA.UcrEtc; mu MapKciJQ>}. perfectly flexible hanging chain, tE
A.Eiroc; Eu1<aµrri:oc; Kpi:µacri:r, iiA.umc;. r-dimensional chain [ r-chain), pro-
016.cri:atoc; c'iA.ucric;· [ c'iA.umc; toov p litacrtcmErov j.
simple chain, cirr/,fj c'iA.ucrtc;. · surveyor's chain, xropoµnptK:i] c'iA.u
cric;· { UAUO"lC, toU rK&VtEp } . .
chain discounts, OIK., l, .aA.ucrIDrni 7tpOE(,ocpA.i]Ci£l<.;. 2, aA.UCiffiTUt ucpatpfoctc;. ("LYN.: discount series).
chain of a complex, MA0., cruµn/,syµanKi] c'.iA.umc;· [ c'.iA.ucrtc; cruµnA.f.yµarnc;j.
chain of center circles, MA0., c'.iA.umc; -rwv £rctKtv-rpwv KUKA.ow· [ KA.tcpcpopotavi] c'.iA.uatc;· c'.iA.ucrtc; mu KA.icpcpopvT }.
chain of events, IT AT., c'.iA.umc; cruµpavTmv.
chances of chains of events, cruvi:ux iat [cruµrrrwcrEtc,} 6.A.UcrErov cruµBcivrrov.
chain of matrices, MA0., c'.iA.ucrtc; ~l1FP£iwv.
adj:tcent matrices (of a ·chain of
chain of pulses
matrices), impaKdµEva µrp:pi;ta (uA.UcrEooc; µT]tpdwv).
product of a chain of matrices, ytv6µEvov aA.UcrEro<; µrp:pEirov.
chain of pulses, MHX., c'.iA.ucrtc; rcaA.µwv.
damped chain of pulses, 0.rrocrBtcr•ii [ arrocrBEvvuµtv11 J c'iA.umc; rraA.µ&v.
chain of simplexes, MA0., ~t0von:A.cyµanKi] c'.iA.ucrtc;· { c'.iA.umc; µovbnA.cyµaTmv }.
chain reaction, <l>YL, uA.ucrwi:i] { 6.A.ucrtOWTi]} avi:iopamc;.
chain rule, MA0., aA.UCiffiTOc; KUvc:Ov.
chain rule for derivatives, aA.ucrwToc; Kavffiv -rwv napayc:Oywv.
chain rule for ordinary differentiation, aA.uCiffiTO<.; K<J.VWV i:fjc; crnvi]Souc; otacpopicrcmc;.
chain rule for partial differentiation, aA.UuffiTO<.; KUVWV Ti'jc; ~u;ptKfl<.; owcpopicr£mc;.
chained events, Z:T AT., af..ucrmi:a cruµPcivrn.
chainette, = catenary.
chairman, n:pc:O-ri;opoc; ( = np6i;opoc; tnnponfjc;, croµpouAiou, KTA.).
challenger, AOrn:M., n:poKA1FiJc;. (~:::YN.: interrogator-res pon-sor ).
chamber, J' eaA.aµoc;· { a'teoocra}. 2, TEXN., 9at..Ctµ11· {8aA.aµoc;J. 3, <l>YL, 0aA.aµoc;.
anechoic chamber, av11xrotK6<; 06.A.aµoc;.
bubble chamber, <pucraA.ti5o06.A.aµoi;. . combustion chamber, cpA.oyo06.A.a
µoi;· [OaA.uµo c; KuilcrEroc,]. cloud chamber, VEcpo0ciA.aµoc;. liquid chamber, uypo06.A.uµoc;.
change
chamber pressure, DYPAYA., 9aA.aµtKi] 7tl£Cit<.;.
chamber volume, DYPAYA, 9aA.aµtKoc; oyKoc;.
chance, 1, TUXTJP6c;,a,6v. 2, cruvTDXtaK6c;,i],6v ( = EK TUXTJS fJ cro µni:c:Ocri;wc;) .
chance, 1, TDXTJPOTTJc; (= TucpA.i] TU'X,11). 2, cruvrnxia· { cruµnmmc;].
by chance, tUXll p&c; ( = EK ·rn<(>A. i\c; i:ux11c,· Ka16. •UXTJ).
calculus of chance, A.oyicrµoc; i:fic; TUXll p61T]TOC,.
games of chance, i:ux11pci rraiyvtu. laws of chance, v6µoi i:fjc; 1ux11p6-
111rnc,. permissible chances, i:mi:prn6µEVat
cruvi:uxim. theory of chance, Oi:ropia i:fjc; i:u
Xll p6t1ito<;.
chance cause, TUXllPOV { crovi:oxtaKov] a'lnov.
set of chance causes, cruvoA.ov i:ux11-XllPWV [ cruvoA.ov cruvrux1aK&v} airirov.
chance move, -ruxripa { cruvrnxtaK11} Kiv11crtc;.
chance variable, rnx11pa { cruvrnxta.Ki]} µErn~A.11-ri] .
chances of chains of events, cruv-ruxim { cruµrc-r c:Oanc;} aA.ucri;mv cruµ~av-rwv.
change, 1, <DYI., MA0., aUayi]· { µErn~oA.1) }. 2, MHX., aUayi]· { aUoiwmc;}.
adiabatic change, aotuPanKi] µETapoA.r,.
instantaneous change, &xaptaia aA.A.ayr, .
instantaneous rate of change, 0.Kapiaiu Oianµi] aA.A.uyfjc;.
isothermal change, icr60Epµoc; µEtaBoA.r,.
121
change dump
mathematics of change, µa911µanKa T'~c; aUay~c;.
permanent change, MHXT., l;µµovoc; aA.A.oiro<rn;.
rate of change of a function at a point, 8ianµi; &A.A.ayfjc; ~nae; cruvapT11crEroc; Elc; Tl O'l']µELOV .
step change, PriµaTtKTi [ µovoP1wanK1i] aA.f..ayi;.
time rate of change, XPOVtKTi 8taTtµTi T~c; aUayfjc;.
change dump, Aorn::M., arrocrwpwcrtc; [ &.rrsK-rurrrocrtc;] A.6ycp U.A.A.ayfjc;.
change in a variable, uUay1) de; µsraPA.riel'Jv· [ aA.A.ayiJ eflc; µsrnPA.11efic;J.
chance in frequency, aA.A.ay1) cruxv6n1wc;.
change in slope (of the cross-section), aA.A.ayiJ V£U()£(J)c; [ aA.A.ayiJ KA.lcri:roc;] (TDc; otam~nic;).
change of [change in] momentum, MHX., aUayl'] htsrapoA.l']j nic; puµric;.
change of base, &.Uayij Pcicri:roc;.
change of base in logarithms, aA.A.ayiJ A.oyapt8µtKfjc; Pcicrsroc;· [&.A.A.ayij (efjc;) Pcicrsroc; (ewv) A.oyapi8µrov].
change of coordinates, &.A.A.ayij cruvesrayµ€vrov.
change of geometry, MHXT., &.A.A.ayij ysroµseptK6n1wc;.
change of independent variable in a derivative (in differentiation), aUayiJ efjc; avssapef]wu ~ti:raPA.TJefjc; µ1iic; rrapaywyou (Kaea eTJV Ota<p6ptcrtV).
change of position, aUayiJ 8fosroc;.
122
char·acter
change of variable in differentiation, aAA.ayiJ µsrnPA.rinic; Kaia ; n)v Ota<pOplO"lV. . ' I
1: ;-change of variable in integration,
&.A.A.ayi] ~tsraP A.TJeDc; Kaea -r1)v 61...od~procrtv. ·
change of variables, &.Uayl'] · e&v µsrnp), lFWV.
cyclic change of variables, KUKAtaKTi {KUKAtKti} aUayii (i:rov) ~tEi:aPA.11-i:rov. ·
changing degrees to radians, ~ts-ra-rporrl'] µotpwv i:ic; aKeivta.
changing signs of the roots of an algebraic equation, &.Uay1) e&v crriµf.irov e&v ptl,;wv aA.yspptKfjc; f.stcrfficrsroc;.
channel, 1, = frequency channel. 2, oiau),oc;. 3, PA~., AOrn::M., Kcivvri· [oiauA.oc;].
frequency channel, 8iauA.oc; [ K6.vv11] <TUXVOTll1:WV.
radio channel, paotoK6.vv11.
channel capacity, OtaUAtKiJ . .( KaVVlKTJ} X(JJPllttKO'tTJc;.
channel reliability, oiauA.tKiJ [ KavVtKijj A.i:tmupncrla.
Chapman (Sydney - ), o::uvwsri) Tmirrµav ( = ayyA.oc; <pUcrtKoµa-0riµanK6c;· 1888 - 1970).
Chapman-Kolmogorov equation, £-sicrrocrtc; Tcrcirrµav-KolvµoyK6-pro<p.
Chapman region, ecrarrµavuiviJ rrspwxrr [ ni:pwxiJ mu Tcrcirrµav].
character, 1, xapaKel']p ( = ypciµ~ta, \j/l'j<piov, i1 cruµpolvov). •2, xapaniJ p· { xapaKel'J ptcrnKOel'Jc;J.
binary coded character, 8ua8tKG>c; Kro8tKro9Eic; [ ouaot:rn:,roStKoc;] xapaKi:ftp.
character density
finite character, ltEit&pacrµi:vo c; xapaKi:ftp· { 1tE1tEpacrµEV11 XUPUKH]IJlO''tlKO'tll<;}.
group character, xapaKtiip [xapaKi:11ptcrnKot11c;J oµa8oc;.
illegal character, AOrLEM., itap<'t· 1:U1t0~ { U1tapa8EK't0<;} XUPUKtiip.
redundant character, AOrIIM., itl.&ovacrtoc; [ rcEptcrcroc;/ xapaKi:ftp.
character density, AOrn::M., rruKVOTl'Jc; xapaKTijprov· [ arro811-KEUTtKTJ TCUKVOtl'jc;j.
character group, MA0., 6µac; xapaKTTJptcrnK6-rri-roc;· {oµac; xapaKtijprovj.
character of a group, MA0., xa· pa.Ktl'] p { xapaK'tl'J ptcrnK6n1c;} 0· µ6.ooc;.
character of a set, xapaKn)p (mu) cruv6A.ou.
character reader, Aorn::M., xapaK'tTJpoyvfficr-rric; ( = &.vayvfficr-rric; xapaKtijprov).
character recognition, AOrn::M., 1. avayvffiptcrtc; xapaK'ti) prov. 2, ava.yvroptcrttKTJ xapUKeijproV.
character set, AOrn::M., cruvolvov xapUK'tijprov.
characteristic, XUpUKtl'j ptcrttK6c;, ij, 6v.
characteristic, 1, xa.paK'tTJ ptcrnK6v· [xapa.K-rl'JptcrnKov crmtxi:t.ov ]. 2, HAEK., xa.pa.K-r11p1crnK~.
dynamic characteristics, MHXT., 8uvaµtKU XUPUK'tllPtcr'tlKCt.
Euler [Euler-Poincare] characteris· tic, &uA.11pwvov xapaKtriptcrnKov· [ xa· paKi:riptcrnKov ·ouA.&p-IlouavKapi: j.
load settlement characteristics, xapaKtllptcrnK<i tyKa9icr&ro~ (wii) cpop-1iou· [xapaKtllPtcrnK<i 'ti'}~ cpopnKfjc; tyKa9icr&roc;].
method of characteristics, ~ti:9oooc; 'tOOV xapaKtqptcri:tKWV (<HOlXELWV).
characteristic functio!I
response characteristics, avntaK'tt· Ka xapaKtllPtcrnK<i.
salient common characteristic, t~txov {Kaiptovj KOtVOV xapaK'tllPlO''tl• KOV.
characteristic chain, xa.paK'tT]ptcretKTj iiA.ucrtc;.
characteristic class, xapaK'tl'jptcrnKTJ KA.<'tcrtc;.
characteristic curve, xapaK'tl'jptcrnKTJ KaµrruA.ri.
characteristic curves of a surface, xapUK'tl'jptcrnKUi Kaµrrulvat E7tt<pavda.c;.
characteristic determinant, xapaK'tl'j ptcrnKTj 6pil,;oucra.
characteristic directions (on a surface at a point), xapaK'tl'jpt<J'tlKUi otrn06vcri:tc; (srri E7ttcpa.vf.iac; de; n crT}µsiov).
characteristic element, xapa.nri pt-(jr;tl(OV crrntxi:Tov· {l.Otocrmt-xi:fov].
characteristic equation, XUPUK'tTJptcrttKTJ £sicrrocrtc;.
characteristic equation of a matrix, X:UpaK'tl'jptcrnKiJ SStO"(JJO"tc; (mu) µl'jepdou.
reduced characteristic equation of a matrix, av11yµEV1l XUPUK't'TjptcrnKil e~icrrocrtc; wii µritp &iou.
characteristic exhaust velocity, IlYPAYA., xapa.nriptcrnKl'] e<ixuvcrtc; EKPoA.fjc;· [ xa.pa.K'tl'jptcrnKTj -r<ixuvcrtc;}.
characteristic formula, x.a.pa.Ke11picrnK6v ota-rurrroµa· [xapaK'tTJ· ptcrnKoc; -rurroc;].
characteristic function, XUPUKtl'jpt<J''tlKTJ cruv<ip-rT}crtc;· [totomw<ip-rricrtc;}.
123
characteristic function of a matrix
characteristic function of a matrix, xapalCTY]ptcrnJCll GUVclp'!r]Gtc; (wu) µr]Tpsiou.
r educed characteristic function of a matrix, avnyµev11 xapaKtllPt<HtKi) cruvaptT]crn; taii µ11tpt:iou.
characteristic function of a set, xapaK'!llptcrnJCl'] cruvcip'!r]crtc; ('rou) cruv6A.ou.
characteristic function of a vacuum tube, xapaK'!Y] ptcrttlCl'] cruvcip'!l']Gt<; KcvoA.uxviac;.
characteristic function of two variables, xapalC'!Y] ptcrnJCi] cruvcip-1"1'] crtc; Mo µeta PA. Y]TWv.
characteristic geometry, xapaK'!ll-ptcrnJCij {yi>ruoamJCi]j yi>ru~tcTpia.
characteristic impedance of a quadripole, HA.EK., xapUIC'!r]ptcrnKi] rcapaJCru)cunK6TY]c; Tnparc6-A.ou.
characteristic Larmor radius, xapaKTY]ptcrnJCi] A.apµoptavl'] UKT[c;· fxapaJCn1ptcmKi] aJCtic; wu Acipµop}.
characteristic length, xapUK'!r]ptcrttKOV ~LfjKoc; .
characteristic line, xapalCTY]ptcrnKij ypaµ~ti].
characteristic manifold, MA0., xapaJCTY]ptcrnJCov rcoA.Urccun1a· [l-8torcoA.urcrnyµa].
characteristic matrix, xapaKTY]ptcrttKOV µr]Tpciov.
characteristic mode, I, xapaKTY]ptcrnKOV Tp6n:riµa. 2, = normal mode of vibration.
characteristic number of a matrix, XUpaKTY]ptcrttJCO<; Upt9µoc; { xa-
124
characteristic root
paKtf]ptcrttKll nµ11J µiFpEiou · [i8t0nµ11 µr]TpclOU].
characteristic numbers and functions in the study of integral equations, xapUK'!r]ptcrttJCOL Upt9µoi Kai xapaJCTY]ptcrrtJCai cruvapti]cri>tc; xpi']crtµot Sta Tijv µi>AETY]V '!WV 6A.oJCA.r]prunJC&v f;I; tcrfficri>ruv.
characteristic of a cubic, xapaKTY]ptcrnJCov Tfjc; Tpnopa9µiou.
characteristic of a matrix, xapaK'!Y] ptcrnKOV (wu) µr]Tpi>[ou.
Segre characteristic of a matrix,' crt:ypt:taVOV xapaKtT]ptcrttKOV (taii} µT]tp t: iou· [xapaKtT]PlO"'tlKOV ~tT]tpt:iou KUtci. :Et:yKpE).
characteristic of a one-parameter family of surfaces, xapaKtllptcrnJCOV [ 6ptaKi] ypaµµ11] '!WV
smcpavcuiw '!OU yevouc; Tfjc; µtfic; rcapaµ eTpou.
characteristic of a surface, x;apaK'!Y] ptcrnJCov f;mcpavi>[ac;.
characteristic of an envelope, xapaKTY]ptcrnKov rci>pipaUoucrric;.
characteristic of the logarithm of a number, xapUK'!JlptcrttKOY {aKEpUtoV µepo c;] (wu) A.oyap[-9µou evoc; apt9µou.
characteristic properties of the potential function, xapaKTY]ptcrnKai 18t6trirnc; Tfjc; 8uv11nKfjc; cruvapn1crcruc; .
characteristic radiation, <l'>YI:., xapaKTJ1ptcrnJC1) aKnvopoA.ia.
characteristic root of a matrix, xapaKTJlptcrnKij p[sa {A.av9ciVOUcra Pisa J µlFPcLOI)' [18tonµl'] µ1l'!Pciou ].
characteristic series
characteristic series (of a group), x;apaKTY] ptcrttK1l cri>tpa (~nfic;) 6µciooc;.
characteristic subgroup, xapaK'!Y]ptcrnKl'] UTCOOµcic;.
characteristic value, XUPUK'!JlptcrnKij . nµij· fxapaKTY]ptcrttKO<; Upt9µ6c;· l8tonµi]j.
characteristic value problems, rcpopA.iiµata xapaKTY]ptcrnKfjc; nµfjc;· [rcpopA.i]µata 18wnµfjc;}.
characteristic vector, xapaKtllPlcrnKOV avucrµa· {totcivucrµa}.
characteristic vector of a matrix, xapaK'!f] ptcrnKOV avucrµa ~LY]Tpstou· {lotcivucrµa µr]Tpdou].
characteristic velocity, 1, xapaK'!Y]-ptcrrncl'] Tcixuvcrtc; . 2, = characteristic exhaust velocity.
characteristics of a structure, xapaKTY] pt<HlKU '!OU 80µ11µawc;· [ xapanl'] p wu cpoperuc;. j
stiffness characteristics of a struc-ture, xapaKtT]picrttKU OUcrKaµ1viac; tOii cpopeooc;.
vibrational characteristics of a structure, KpaoacrµtKa xapaKtT]ptcrnKa [ Kpa8acrµtK6c; xapaKti) p} wii cpopeooc;.
characterization, xapaKTY]ptcrµ6c;.
characterization of cavities by an extremum problem, M HXT., MA0., xapaKnlPtcr~toc; Twv ( 6µoppoi:Kwv) JCotA.ruµciTruv 81' foxanaKou rcpopA.i]µawc;.
charge, J, BAEK., cpopTiov· [ cp6pncrtc;}. 2, OIK., pupoc;· f Pcipuvmc;· smpcipuvcrtc;}.
Coulomb's law for point-charges, KouA.oµPtav6c; itt: pi crqµt:wq>opticrt:oov v6µoc;· {v6µoc; tG>v crT]µt:wcpopticrt:oov toii KouA.6~t/.
Charlier check
density of charge, 7tUKVOtT]c; (t0ii) cpoptiou.
depreciation charges, OIK., <iitocrPt:crnKai tmpapuvcrt:tc;.
electrostatic unit of charge, l)A.t:KtpocrtanKi) cpopnKii µovac;· [µovac; i]A.t:KtpocrtanKoii cpoptiou}.
negative charge, apVT]ttKOV q>Optiov· f <ipvqnKi) cp6pncrtc;}.
point-charge, crnµEwcp6pncrtc;.
positive charge, 0EnK6v cpoptiov· [0mKi) cp6pncrtc;}.
space charge, HAEK., xoopai:ov q>Optiov· { q>Opt[OV XOOPOU }.
surface density of charge, f:mcpaVEtaKTi 1tUKVOt T] c; q>optiou.
surrender charge, A:E<l>. MA0., papoc; [tmpapuvcrtc;/ t~ayopac;.
unit charge, HAEK., µovaotaia cp6pnmc;· f µovac; cpopticrr:ooc;}.
volume density of charge, 6yKoµEtptKi) 7tUKVOtT]c; q>Optiou.
charge conjugation, MA0., <l>YI:., GllSU')'ffiCTt<; cpOp'!tOU' { cpopnKij sfryrucrtc;}.
charge-parity-time theorem, = CPT theorem.
Charles (Jacques A.C. -), ('IciKruPoc; 'AA.. K .) IapA. ( = yciUoc; µa911µanK6c;· 1746 - 1823).
Charles-Gay-Lussac law, = GayLussac law.
Charles's law, crapA.rntavoc; v6µo~· /v6µoc; wu IupA.j. (IYN.: GayLussac law).
Chartier (Carl Wilhelm Ludwig -), (KcipoA.oc; rou), teA.µoc; AouooPiJCOc;) IapA.tE ( = crou11Mc; acrTpov6~t0c;• 1826 - 1934)
Poisson-Charlier function , cruvapn1cr1c; nouacrcr6v-:EapA.te.
Chartier check, M A0., crapA.ti>ptavl'] sl;sA.cyl;tc;· {'f.A.cnoc; KUTU TOY I:apA.tf, J ( = ercaA. ii ewcrtc; UTCO-
125
chart
A.oyicrµou Ota -rfjc:; ' µc86oou rnu IapA.1£).
chart, 1, XAPTOf'P., xap11ic:;- {vaurnxapn1c:;J. 2, . IT AT. , xap16-ypaµ~1a· [xaprnypucp1wa· xapniµa]" 3, IET. 1 xu'prn.
alignment chart, MHXT., xapt6-ypaµfia cu0uypaµµim::coi;· [ voµ6ypaflµa].
astrographic chart, acrrpoypacptK6<; xcipt1ii;.
bathygraphic chart, paeuypmp1K6i; xcipt11i;.
break-even chart, lcrocpaptcrrtK6v xapt6ypaµµa· [ xapwypcicp1wa 1crocpaptcrµoii}.
buckling chart, /cuytcrµ6ypaµ>ta' [ !cu' ytcrµLKOV xapr6ypaµ>ta}.
.126
circle chart, = pie chart. cobweb chart, apaxv6ypaµ.ia· [a
paxvoi::toei; xapwypcicp1wa J. flow chart, MHXT. MA0., po6-
ypaµµa· [ pooypci<p11µa]. Gantt chart, yavtnavov xaptoypu
cpqµa · {otciypaµµa !OU rKcivt}. heliographic chart, i]/c1oypacp tK6i;
xcipt 11 i;. hydrographic chart, uopoypacptKO<;
xcipt1ii;. logical flow chart, /coytK6v po6-
ypaµµa.
Mercator's chart, µi::pKatoptKO<; xcipt1ii;- { xciptf1<; wu MepKcitopoi;}.
organization chart, 6pyav6ypaµ>ta· [ 6pyaVCO'tlKO<; xciptqi;}.
pie chart, ET AT., KUKA6ypa>tµa· [ KUKAoypcicp1wa].
preparation of buckling charts, MHXT., Katcicri:procrti; [ npoctot>Lacriaj /cuytcrµoypaµµcitrov.
process chart, AOrIEM., evi::py6-ypa>tµa.
scatter chart, crKc8acrµ6ypaµµa. time-series chart, OIK., xpov6ypa~t
µa · [xapt6ypaµµa xpovtKii<; Kamvoµfii;}.
topographical chart, wnoypacptK6i; xciptqi;.
check
chart, 1, xaptoypacpw. 2, xaprnvoµw ( = naptcrrw ota xaptoypa<p~µatoc:;).
charting, 1, xaptoypucp11mc:;. 2, MHXT., ITAT., xapn1crtc:; (= KU1UCJ1pWcrtc:; XUptoypa<p~µatoc:;). 3, imon'.mwcrtc:; (n'.x. nopdac:;).
flow charting, pooypucp11cr1i;.
chassis, TEXN., nfinia· [cracrcri}.
Chebychev, = Tchebycheff.
check, OIK., (iOtwnKi]) £mtayi].
check, 1, £~cHnw· [ WEKapw.· £na-A.118c0w j. 2, avaK67trw· [avaX at r i'C, m].
check, MA0., £1;£A.cyl;tc:;· [wcKupwµa] ( = i'.Acnoc:; tfjc:; aKptPEiac:;· E7taM1Elwmc:;).
arithmetic check, AOrIEM., apt0-µT)nKi] [ µa0qµattKii} E~EAEY~li;.
automatic check, AOrIEM., aut6-µawi; e~i:/ci::y~ti;.
built-in check, AOrIEM., µ11xav11-µattKi] [ aut6>tat0i;} E~EAEY~lC,.
Charlier check, MA0., e!ci::yxoc, {&~i:A.i::y~ti;} toii EapA.ti:.
dump check, AOrIEM., anocrcopeunKi] E~i:A.cy~tc;.
duplication check., J\OrIEM., avaom/cco'ttKii {otnA.fi} E~EAEY~lC,.
echo check, iixco·iKii t~i:/ci::y~tc;· [e~i:A.i::y~tc, axptPi::iac; µctaoocrccoc;J.
forbidden combination check, AOrIEM., e~i;A.i::y~tc, anayopcuoµi:vou cruvouacrµou.
hardware check, AOrIEM., t~i:A.cy~tc; crd11pocrKwfic;· [ aui:6µatoc; E~EAEY~lC,].
marginal check, 6ptaK1) t~f./ci::y~tc;· [ 6ptaKi] Pcicravoc;/.
mathematical check, AOrIEM., µa-0qµanKii E~BAEY~lC,.
modulo N check, &~eA.i::y~tc; Kata µ68wv N.
check bit
odd-even check, AOfU:M., e~f.A.cy~ti; icrottµiac;. (IYN.: parity check).
parity check, AOrIEM., &~f./ceyl;tc; icronµiai;.
program check, AOrIEM., npoypaµµtKii l#/,cy~tc;.
redundant check, J\OrIEM., 1tAf.ovacrtii [ ncptcrm)} . e~f./ccy~u;.
residue check, AOrIEM., unoAEt>lµanKii e~O .. i;y~ti;· [e~f.A.i;y~tc; (oui wu) KamA.oinou].
routine check, AOrIEM., crupµtKii [ npoypaµµtKii} e~i:/ccy~tc; .
selection check, AOrIEM., t~f.Af.Y~tc; (iKav6t11wc;) &mA.oyfii;.
sequence check, AOrIEM., e~i:A.cy~ti; (tile;) aKoA.ou0iai;.
summation check, Aorn:M ., a-0potcrnKii e~tA.ey~tc,· {e~f.A.ey~tc, (oui tfii;) a0poicrccoc;].
system check, AOrIEM., (ycvtKl)) &~i:A.i::y~ti; toii crucr•i]µawc; .
transfer check, AOrIEM., t~i:A.cy~tc; (tiic;) µci:aPtPcicrccoc;.
twin check, AOrIEM., oiouµoc; [ otnA.ii/ l~f.A.cy~tc;.
validity check, AOrIEM., e~i:A.cyl;ti; tiic; tyKup6tT]t0i;· [ll;f.A.eyl; tc, ti;c; KUp6tqtoi;}.
check bit, AOrIEM., ESEAEyKnKov OUO\jfl"J<pov· [ou6\jfl"J<pOV £1;t::A.£ySt::Wc:;j.
check indicator, AOrIEM., £/;t::A.t::yKnKoc:; £vociKqc:;· [£vociKn1c:; £/;t::A.i'.:yl;t::wc:;].
machine check indicator, tvoi::iKtT]C, ll;c/cf.yl;i::coc; µrixavfiµawc;.
overflow check indicator, tvoi::iKtf1C, i:l;i::A.i:yl;i::coc, uni::pxi::t/cicri::coc;.
read-write check indicator, evoEiK'tT]C, El;EAEY~ECO<; avayvoocrf.COC, fi 0.vaypacpfii;.
sign check indicator, tvodKtl]c; £l;i::/ctyl;ccoi; cruµP6A.ou.
check list, ESt::At::yK'ttKOc:; KU'l"UAOyoc:;. patterned check list, 8taµopcprot6c;
[unooi::tyµanKoi;] e~i::A.eyKnKoc, Katci/coyoi;.
chemi~ry
check number, AOrn:M., £~t::A.t::yKnK6<; apt8~t6c:;.
check on a solution of an equation, E~EAt::yl;tc:; {EltUA~ewcrtc:;}rijc:; £-7ttAUCJt::(!)c:; ~ttfic:; £/;tcrrocrt::roc:;.
check problem, AOrIIM., £1;t::A.t::yKnK6v np6pA.1iµa.
check register, AOLIEM., £1;t::/..t::yKnK6v µ111pwov.
check-sum, AOrn:M., £/;t::/.t::yK'ttKov Ci8potCJ~LU.
checking, £1;£/...t::yl; tc:;· [ wt::Kaptcrµa].
checking routine, AOrIIM., crupµl'j £/;t::A.i'.:yl;i:;roc:;.
sequence checking routine, crupµfi EttaA.Afi/cou e~cMy~i::coi;.
checkpoint, 1, miµt::fov £A.£nou. 2, Aorn:M., crri~tt::i'ov £1;i:;A.Eyst::wc:;.
chemical analysis, :X.lWtKl'j avaA.umc:;.
chemical engineer, Xll~LtKoc:; µ11xavo1£xv11c:;· [ :x.riµtKoc:; µrixavtK6c:;).
chemical engineering, x1unK1) µiix?-vort::xvia.
chemical equivalent, Xll~LtK6v icroMvaµov .
chemiluminescence, x11µmy/...tcrµ6c:;· [x1iµatyA.opoA.ia· x11µt::t0A.aµnuptcrµ6c:;j.
chemisorption, <l>YL. XHM., x11-µt::t0 p(p )6<p 11 me:;.
chemistry, x11µEia. analytical chemistry, avaA.unKi] xri
µEia .. engineering chemistry, µrixavoti::
xvtKii x11µEia. industrial chemistry, Pt0>LTJX<iVtKTJ
xriµi::ia.
127
Cherenkov
inorganic chemistry, av6pyavoi; x11-µEia.
organic chemistry, opyUVlKl'j XT)µEia.
physical chemistry, <pUmKox11µcio; {!Jcropl)nKl'j XliµEiaj.
Cherenkov = Cerenkov.
Chern (Shiing Shen-), (LitvyK LEV) Tcr!':pv ( = crivoaµi:ptKavos ~LU-911µanK6s· y. 1911).
Chern class of a bundle, xi:pvmvi] ornµtKi] KAacrtS" [ KAU<JtS 0£crµ11s (l.v&v) 10u Tcr£pv].
chi, xi· fx}.
chi square, xi 1£'tpciyrovov· [xi ctS 10 'TELpayrovov· X2}.
chi-square test, Pcicravos 'IOU xi 'TEcpciyrovov· [pacravos WU X2}.
chiliagon, x1A.tciyrovov.
Chinese binary code, AOrILM., crtVOOUUOtKOS KffiOtS.
Chinese remainder theorem, MAE>., mv1Kov ni:pi unoA.oinou ei:mp11 -µa.
choice, I, £mA.oyT] · {8tciA.cyµa }. 2, £KA.oyij.
axiom of choice, a~iroµa tmA.oyfii;· [a~iroµa rnu TrrEpµtA.o}.
finite axiom of choice, m;rrEparrµtvov a~iroµa tmA.oyfii;.
choice of coefficients, £mA.oyi] [ i;uxtpi:m £mA.oyfts} ('TffiV) <JUV1"£AEcr1ffiv.
suitable choice of coefficients, apµ6~ourra [ rrp6rr<popoi;] tmA.oyl'j rruv'tEAEG't&v.
choke, TEXN., cr1payyaA.1crci]s· [cr1payyaA.11· £µcppaK111s}.
choked flow, £µcppax9i:foa [ mpayyaA.tcr9i:foa} poi).
128
chord of contact
choking Mach number, crTpayyaA.tKOS µaxap19µos· [ cr1payyaA.1-Kos µax1avos cip19µ6s].
Cholesky method for solving equations, xoA.rnKiavi] µteooos £mA.Ucri:ros £s1crfficri:rov· [ µ£9o8os £mA.Ucri:ros £swfficri:rov mu TcroA.foKt j.
Choquet (Gustave - ), (f'oucrmuos) foK!': ( = yciUos µa911µanK6s).
Choquet capacitability theorem, 9i:ffip11~ta TftS xrop11108uva16111-10s 'IOU LOKE" [ cronnavov ei:mPllµa].
Choquet simplex, cronnavov µov6-nA.i:yµa · [ µov6nA-i:yµa 10u LoKt j.
chord, MAE>., xopoT]. aerodynamic chord, aEpoouvaµtKl'j
xopofi. limit of the ratio of an arc to its
chord, optov 'tOU A.6you 'tOU 'tO~ou rrp6i; •iJv xopoi]v rnu.
line of chords, EU0i::Ta •&v xopo&v. mean aerodynamic chord, µtm1
ai:;pOO\lVUµtKl'j XOPOll. scale of chords, MA0., KAlµa~
xopo&v. zero-lift chor.d, AEPO!l., xopol'j µri
oi:viaiai; UVWGEW<;.
chord of a circle, xopoi] KUKAOU. supplemental chords of a circle,
rraparrA.riproµanKai xop8ai (rnu) KuKA.ou.
chord of a conic, xopoi] KWVtKfts· { XOpOij KWVtKftS 10µfts}.
focal chords of conics, l;rrnaKai xopoai 'tWV K(J)VlKWV.
chord of a sphere, xop81) crcpaipa,s.
chord of contact with reference to a point outside of a circle, xopoi] £nacpfts ffis np6s n cr11µi:i'.ov EKTOS KUKAOU EUptcrK6µ£VOV.
Chow (Thomas R. -)
Chow (Thomas R. - ), (0roµfis P.) Tcrcio ( = crunpovos ci~tEptKUvos µae11~tanK6s).
Chow (Pao Liu - ), (IIao Atou) T crcio ( = crunpovos crt voaµEptKUVOS µa91iµanK6s) .
Chow (Ven Te-), (B!':v TE) Tcrcio ( = mvoaµEptKUVOS UOpoMyos · y. 1919).
Chow ring, MAE>., xoPtavos 8aKT0A.10s· [8aK10A.ws 10u Tcrcio].
Christoffel (Elwin Bruno-), CEA.outv Mnpouvo) Kpicrwcpcpi:A. ( = f:A.pi:,os ~me1iµanK6s· 1829 -1900).
covariant Riemann-Christoffel curvature tensor, GUVUf,AOl(J)TOV 'tO.VUGµa KaµrruA.6n1rni; Piµav-Kpirrrn<p<pi::A..
Schwarz-Christoffel formula (for mapping a half plane conformally onto a polygonal domain), OtaTurrroµa [•urroi;] LP<ip•i;-Kpirrrn<p<pi::A. (otu TOV GUµµop<pOV i::iKOVlGµOV i]µtrnl7tEOOU trri rroA.uyrovtKi]v m;pwxi]v).
Christoffel-Darboux formula, 01a'TU7troµa [ T0nos} Kpicrwcpcpi;A,Nmpµnou.
Christoffel symbols, xp1crcocpcpEA.tava cruµpoA.a· { cru~t~oA.a 10u KpicrwcpcpEA.}.
Euclidean Christoffel symbols, i::uK/,Eioi::ta XPLGW<p<pE/,iavu rruµpo/,a· [ XPLG'W<p<pi::AtaVU GU~.tPoA.a mu i:;\JKAElOdou xropou}.
Christoffel symbols of the first (or of the second) kind, XPl<JLO<pcpE)clUVU cruµpoA.a {cruµpo/,a KpimocpcpcA. j wu npffirnu (i1 8rn1£pou) d8ous.
chromaticity, WYL ., xpwµanK6-
'TllS· chromaticity diagram, x,pwµanK OV
circle
8tciypuµµa· {8tciypaµµa x.proµanK611110s].
chrominance, WYL., XPWµ6111s· [£yXPWµ6111sJ.
Church (Alonzo -), ('AA.6vso) Tcr£prs ( = ciµEptKavos µa911µan KOS cp1A.6crocpos · y. 1903)
Church' s theorem, ccrEprcrtavov esffip1wa"{8i;ffip1wa wu Tcr£p1s}.
cipher, cipt9~to)coyw ( = unotoyism fJ KarncrcpcDVW apt8µT]nKffi;).
cipher, MAE>., (ro) 0 (ffic; cruµpoA-ov wu µ118Ev6s)· [(ro) µ11-6£v· ~lllOEVtKOV j.
ciphered, 1, cipt9~tw16s,T],ov ( = nou XPllcrtµonotEI apap1Ka fJ aA.A.a ciptOµT]nKa cruµpoA.a WS 'l'llcpia). 2 ap18µ0A.oy1iµsvos,11,ov.
circle, KUKAOS.
Apollonian circle, arroA.A.rovtavoi; KU-KA.oi;· {KUKA.oi; mu 'ArroUrovioO}.
arc of a circle, 't6~ov mu KuKA.ou. area of a circle, !;µpaoov KuKA.ou.
argument in a circle, optrrµa EV•<¥> KuKf..(]J· [opLrrµa KuKA.ou}.
asymmetric circle, arruµµE'tpoi; KUKAO<;.
asymptotic circle, arruµm:rorn<; [a-Guµ1nronK6i;} KUKA.oi;.
auxiliary circle, Pori8rinK6i; KUKA.oi;. center circle, trriKEV'tpoi; KuKA.oi;. center of a circle, KEVTpov (mu) KU-
KA.Ou. chord of a circle, xopo1) (rnu) Ku
KA.ou. circumference of a circle, rri::pt<pE
pi::ta (mu) Kudou. circumscribed circle, rrEptyeypaµ
µtvoi; KuKA.oi;. coaxial circles, 6µoa~ovtKoi KU
KAOL. concentric circles, 6µ6Ki::v1poL Ku
KAOL.
129
circle
130
conformally transforming a near circle into a circle, ouµµopqioc; µi:taoxrwa<toµ6c; oxi:oov KUKA.ou de; KuKA.ov.
congruent arcs of a circle, lcr6µota {loaf <6~u KUKA.oo.
coordinates of a point O(J a circle, O\JV'tErayµtvm OT"]µELO\J 7tEPL(jlEpEiac; KUKAO\J.
cosine circle, crovqµttoVtK6c; KUKA.oc; ('tptyci>vou).
describe a circle, otaypciqlro KUKA.ov.
describing a circle, otaypaqii] (otayp6.qiricrtc;j KUKl..ou.
diameter of a circle, Otci~tErpoc; (rnil) KUKAO\J.
eccentric circles, EKKEV'tpot [tKKEV· 'tPLKOij KUKAOL.
embedded circle, tvaKr6c; [tvrErayµtvoc;] KUKA.oc;. · equation of a circle in space, £~[
orocrti;; KUKAOll ev 't(j'.> xoopcp. equation of a circle in the plane,
t~icrrooti;; KUKA.ou toil tm7ttoou· f t~iorocrii;; KUKA.ou tv tc\> tm7ttocpj.
escribed circle, 7tapi;yygypaµ~u:voi;; KUKAO<;.
family of circles, ytvoi;; KUKA.rov· [ oucr<riµa Kudoov }.
fundamental circle, MA0., 0e~LEA.trooqi;; K~KA.rn;;.
generating circle, yi;vvi]<oop [ rrapayrov J Ku doc;.
geodesic circle, yi:ooomcr taK6<; KUKA.oi;;.
great circle, ~Leyai;; KUKA.oi;; (crqiaipuc;)· [µeytcrtoi;; KUKA.oc;].
Hart circle, rEnM., KUKAO<; 'tOil XO.pt.
horary circle, = hour circle. hour circle (of a celestial point),
c.Optatoi;; KUKA.oc; (crT]~lelO\J tOU oupavo!l).
imaginary circle, qiavracrnK6c; KU· KAOc;.
inscribable in a circle, tyypciljltµoi;;, oi;;,ov de; K6KA.ov.
inscribed circle, tyyi;ypaµµtvoi;; KU· KAO<;.
isoperimetric property of circle, i-
cirCle
crom:ptµErptKi] i0t6rric; rnil KUK/,ou.
law of the circle, (6) v6µoi;; rn!l KUKAO\J.
major arc of a circle, µtya [ ~Lei~ov] 'tO~OV KUKAO\J.
major segment of a circle, ~1 ci~ov rµfjµa KUKA.ou.
measuring a circle, ~tetpT]crt <; (tou) KUKAOll.
meridian circle, ~t i:crriµ~ptv6i;; KUKA.oi;;.
minor arc of a circle, i:A.acrcrov t6-~ov KUKAOll.
minor segment of a circle, i:A.ucrcrov tµfi~ta KUKAO\J.
nine-point circle, tvvi:aoriµoc; KU· KA.oc;· I KUKA.oc; 'tcl'lv tvvta oriµi:ioov].
noncircular circle, µi] K\JKAtK6<; KUKA.rn;.
null circle, µT]OEVtK6c; KUKA.oc;.
oblique circle, DPOB., A.o~6i;; KUKA.oc;.
osculating circle, tyyfrmrni;; KUKA.oi;;. parallel circles, rrapa/..A.T]A.01 KU
KA.01. parametric equations of a circle, 7tU-
paµi:rptKai t~tcrrocri:ti;; (to!l) KUKA.Ou .
pedal circle, rroOT]nK6c; KUKA.oc;. pencil of circles, ofoµ11µa KUKAOOV. perimeter of a circle, m;p[~rnrpoi;;
tou KUKAO\J.
point-circle, crriµi: t6KUKA.oc;· [ crT]µi:1aK6<; KUKA.oc;j.
polar circle, rroA.tK6<; KUKA.oc;. pole of an arc of a circle on a
sphere, 7t6A.oi;; 't6~ou KUKA.ou crqiatp1-Kfj<; tmqiavi:iai;;.
primary circle, I. rrpooti:uoov KUKA.oi;;. 2, 7tpro<i:urov µEytcrrnc; KuKA.oi;;.
primary great circle, rrpoo'tcurov µtytcrrnc; KUKA.oc;.
Pythagorean circle, 7tllflay6p£t0<; KU KAO<;.
quadrature of a circle, rcrpayoov1-crµ6i;; tou KUKA.oil.
radical circle, p1~1K6<; KUKA.oc; (ouori]µato:;; KUKA.oov).
radius of a circle, UKtii;; (to!l) KUKf..ou.
circle about
ratio of the circumference (of a circle) to the diameter, A.Oyot;, <fie; 7tEPl(jlEpEiac; (KUK/,ou) 7tp6<; tllV OUiµi:tpov· [1t] .
rolling circle, KllAIOKllKA.oc;· [ KllAt6-µi:voi;; KUKA.oi;;].
sagitta of an arc of a circle, ~i::A.oi;; <6~ou KUKA.ou.
secant of a circle, <tµvoooa KUKAOll. secondary circle, I , owi:i;pi;urov KU
KA.oc;.2, OEU'tEpEurov µty1crt0c; KUKA.oi;;. secondary great circle, oi:uri:pi:urov
µty1moi;; KUKA.oi;;. sector of a circle, wµi:i>c; (rnil) KU
KA.ou· [K\JKlclKO<; TOµeui;; ] . short arc of a circle, µtKP6v [ i:A.acr
crov] <6~ov KUKAOll. small circle, µtKpoc; KUKA.oi;; (crqial
pac;). sphere circle, crqiatp6KuKA.oc;· [ crqiat
ptK6<;; KUKAOC,]. squaring a circle, 'tErpayoovtcrµ6i;;
'tO!l KUK/,ou. tangent of a circle, tqiarrrnµtvri (toil)
KUKA.cu. Taylor's circle, -rmu/,op1av6i;; KU·
KA.oc;· [ KUK/,oi;; <oil TaiuA.op]. uniform motion of a particle moving
on a circle, 6µm6µopqioi;; I icroraxiii;;] KlvT]cric; iJA.tKoil crriµi:iou trri rri:ptq>EpEiac; KUKl.ou.
unit circle, µovaomtoi;; KUKA.oc;· [ µovcic; KUKl.oo].
vertical circle, AITP., KaraK6poqioc; KUKA.oc;.
circle about a pair of points, xuxl.oc; m;pi si:uyoc; cniµi:irov.
circle at infinity, br' arri:tpov xuxl.oc;· [arri:tpoc; xudoc;].
circle chart, = pie chart.
circle circumscribed about a regular polygon, xuxl.oc; ni:pt yi:ypaµµtvoc; di; lCUVOVtlCOV 1t0-Myrovov.
circle circumscribed about a triangle, xoKA.oi; rr£pl'yi;ypa~1µsvoc; di; rpiyrovov.
circle of· latitude
circle diagram, KUKAtlCOV ouiypaµ~ia.
circle geometry, yi:roµi:rpia. mu KUKl.ou.
circle graph, 1, = pie chart. 2, KUKMypaµ~1a· [ KUKA.oypucp11µa ) .
circle inscribed in a regular polygon, KUKl.oi; £yyi;ypaµµsvoi; di; KavovtKov nol.uyrovov.
circle method, 0EQP.AP., µE0oooi; WU KUKAOU.
circle of altitude, ALTP., aA.µtKavrnpuroc; KUKl.oi;.
circle of Apollonius, = Apollonian circle.
circle of convergence, KUKl.oi; cruyKAicri:roi;.
circle of convergence of a power series (in the complex domain), KUKAOi; cruyKlvicri:roc; µtai; ouvaµudjc; <J£tpac; (£v 'tlJ FlYUOtKij m;piox lj) .
circle of curvature, · KUKl.oi; KaµrruMn1rni;.
circle of curvature of a plane curve, KUKl.oi; xaµrrul.6-r11-roi; £rrmsoou Kaµrru/v1ii;.
circle of curvature of a space curve, KUK/voe; Kaµnul.6r11wi; Kaµrruf.11c; TO\) XIDPOU.
circle of declination, ALTP., KUKl.oi; 'tWV UTI:OK!vicri;rov.
circle of equal probability, LTAT., KUKl.oi; icrT]i; m9av6-rriwi;· {KUKA.oc; nt9avou crcpa).µarni;).
circle of inertia, MHX., xuKA.oi; aopav£iai;.
circle of latitude, KUKl.oc; nl.arooc;.
131
circle of longitude
circle of longitude, KUKA.or; µi]KOur;.
circle of probable error, MA0., 1:TAT., KUKA.or; m0avou mp<iA.µawr;. (LYN.: circle of equal probability).
circle of similitude of two circles, KUKA.or; 6µouiJcri;wr; [KUKA.or; 6-~L0108scriar;} ouo KuKA.wv.
circle of the gorge, MAG., KUKA.or; TOU auxEviou· { KlJKAOC, TOU auxtvor;}.
circle of the sphere, l, Kudos ('rfjr;) crcpaipa:;. 2, AITP., KUKA.or; TfjC, OUpaVLOU crcpaipa:;.
circle of unit radius, KUKA.o:; ~1ovaow.iar; UKTivor;· {KUKA.or; UKTivor; l'.crrir; npor; Tijv µovaoa}.
circuit, 1, HA.EK., KUKA.wµa. 2,
132
MA0., KUKAWµa· {KUKAT]µa]. (LYN.: cycle). 3, omopoµi].
analog circuit, civaA.oytaK6v KUKA.mµa.
and circuit, AOrIIM., KUKA.wµa [0\Jpa} wu Kai.
bistable circuit, AOrIIM., otcrta-0ts KuKA.mµa.
clamping circuit, npocroi::nK6v f Pa-0ponpocroi::-t:tK6v j KUKA.mµa.
clipping circuit, m:ptKoitnKOV [Pa-0poni::ptKoitnK6v j KUKA.mµa.
closed oscillation circuit, KA.c1crr6v '!aA.avwuµi::vov [KA.E tcrT6v T:aA.avTwnKov j KUKA.w1-m.
coincidence circuit, cruµnrmcrtaKOV KUKA.mµa· [ KUKA.0>1-ta cruµnnilm:ws} .
Eccles-Jordan circuit, KUKA.wµa "EKKEA.s-1t6pvrnv.
electric circuit, 11/,i:::nptKov KUKA.wµa.
even circuit of a curve, MA0., apnov KUKA.wµa KaµnuA. fls·
flip· flop circuit, AOrIIM., enaµ<poTcptK6v KUKA.mµa.
four-wire circuit, Ti::rpacrup1-tawv {rnrp6.KA.mvov j KUKA.mµa.
circuital field
grid circuit, i:crxaptKOV KUKA.wµa· [ KUKA.w1-1a tcrxcipac,].
independent circuits, civi::~apTT]ra KuKA.roµma.
loop analysis of a circuit, M HXT. MA0., ppoxavaA.ucrti; [ KUKA.T]µaT1K1) ava;\.ucrti;} '!OU KUdroµaroi;.
magnetic circuit, µayvqnK6v KUKA.0>1-ta.
matri x representation of transistor circuits, µ1,-cpctaK11 civarcapacrracr1r; (r&v) µ.ETUO'TaTLKWV KUKA.WµU'tWV.
multivibrator cir;;uits, noA.•JKpaoacrµtKa KuKA.roµara.
open circuit, av61KT6v KUKA.co~ta.
open oscillation circuit, avotKTOV TaA.avrmnK6v KuKA.wµa.
or circuit, /\OrJIM., KUKA.0>1-ta [0upa} wu "H.
oscillation circuit, raA.avTronK6v [ rnA.avrouµi::vov} KUKA.roµa.
reconcilable circuits, cruµPtPacrT<l KuKA.roµarn.
reducible circuit, MA0., avayroy1-1-wv KUKA.roµa.
scaling circuit, ~UYTJTLKOV KUKA.wµa. (IYN.: scaler).
short-circuit, H/\EK., ~PUXUKUKA.roµa.
transistorized circuits, H/\EK., µf.T:acrranKEUµi:va KuKA.roµara . .
trunk circuit, ciprflpLaKOV· KUKA.roµa.
two-wire circuit, 01crupµarov [oiKA.rovov} KUKA.W°f.ta.
waist circuit, MA0., 6crq>U'(KOV KUK/,mµa.
circuit capacity, HA.EK., KudwµanKij XWPTJHKOTTJ<;.
circuit dropout, KUK/,o:i~tanK1i (moawA. ii.
circuit reliability, KuKA.w~tanKij AEtwupy11cria· / KUKAwµanKij Baa1µ6TTJSJ.
circuital, KUKAW~tanK6r;, i1 ,6v.
circuital field, KUKA.wµanKov 7tEoiov.
circuitry
circuitry, 1, KUKA.wµaTwcrtr;. 2, KU· JCA.wµanKi].
electric(al) circuitry, iJA.i::KT.ptKi] Ku· KA.roµanKi]' [KudroµawA.oyia].
i~tegrated circuitry, 6A.oKA.T]proti] KuKA.roµU't(J)O't<; .
circulant, MA0., KUKA.ocpopoucra· {KUKAtKTj 6pi'(,ouaa}.
circulant matrix, KUKA.ocpopouv [KUKA.ocpopT]nKov J µlFPEtoV.
circular, 1, KUKAtK6r;,i] ,6v. 2, AOr, ouiU TJAO<;,or;,ov.
circular arc, KUKAtKov T61;ov.
circular area, 1, KUKAtKTj ni;pwxiJ . 2, KUICA.tKOV eµpao6v· {eµpaoov KUKAOU}.
circular cone, KUKAtKor; Kwvor;. frustum of a right circular cone,
6p06s KUKA.tKO<; KoA.oupOs KWVOs.
lateral area of a right circular cone, ·napunA.gupov eµPaoov f t µpaoov napanA.gupou !mupavi::iai;j 6p0ou KuKA.tKOu KOOVOU.
right circular cone, 6p06; KuKA.tKO<; KWVO<;.
volume of a right circular cone, oyKO<; op0ou KUKA.tKOU KOOVOU.
circular conical surface, KUKAtKll KWVLKTj E7tl<j>clVElU.
circular constant, KUKALKTj arn8Epu ( = A.Oyor; nEptq>EpEiar; Kai lha~t£Tpou· n).
circular cosecant, KUKAtKll cruvTEµvouaa.
circular cosine, KUKAtKOV auvriµiTovov.
circular cotangent, KUKAtKTj cruvE<pumoµtvri.
circular cubic, KUKAtKTj KuBtKi]· [KUKAtKTj Tpnoari]}.
circular curve, KUKAtKTj KaµnuA. TJ.
circular motion
circular cylinder, KUKAtKor; KUAtV· opor;.
right circular Cylinder, op(loi; KU• KA.tKO<; KUA.t vopoi;.
similar right circular cylinders, O°f.lOlOL op0oi KuKA.tKOi KUA.tvopot.
circular cylindrical coordinates, KU· KAtKai KuAivoptKai [ KUKAOKU· /,1vop1Kai] auvTETan1£vm· [Ku/...1 VOptKUt CTUV1ETUyµ£Vat j.
circular dispersion, <l>YL., KUJCAtKT) omcrnopa· f KuKA.tKor; oiacrKEoacr~16r;J.
circular equal-area projection, KU· KAtKi] tcri;µpaotKTj [ lCUKAtKTj l.croouvaµor;} npopoA.i].
circular frequencies of free vibration, MHXT., KUKAtKai auxv6-TT]TEC, EAEU8EpOU Kpaoaaµou.
circular frequency, KUKAtKl) auXVOTTJS·
associated circular frequencies, cruvClQJEi<; KuKA.tKai cruxv6t1Fgi;.
undamped natural circular frequency, µi] anocrPi::vvuµevT] [napmi::tvoµeVTJ] QJUO'lKi] KuKA.tKTJ O'UXVO"CT]<;.
circular function, KUKAtKTj cruvap-' TT]O"lC, .
inverse circular functions, avtL· crtpOQJOt KUKA.tKai cruvapti]cri::ti;.
circular graph, KUKA.oypacp11µa'[ KUKAtKov ypacpriµa].
circular helix, KUKAtKi] ( crTEpEc't) s/,11;· {KuA.tvoptKTj sA.11;}.
circular integral, JCUKAtKOV 6A.oJCAijpwµa.
circular inversion, KUKAtKTj &.vncr1pocpi].
circular measure (of an angle)~ KUKAtKov µtrpov (ywviar;).
circular motion, KUKAtKll KtVT]crtr;.
133
circular number
uniform circular motion , 6µ016µopq>oc; /1croi:ax1ic;} KUK/,1Ki] Kivqcr1c;.
circular number, KlJKAlKOt; apt8-µ6i:;.
circular orbit, KlJKAtKll tpoxui.
circular orthomorphic projection, KlJKAtKi] 6p8oµopcptK1) rcpoPoAij.
circular part, KllKAtKov µEpoi:; · [ KlJKAtKov tµl'jµa] .
Napier's rules for circular parts, vem\pet01 Kav6vec; f Kav61·ec; mu Naimep j 01u i:u Kl!KAtKa i:µ1'iµai:a.
~ircular permutation, KlJKAtKi] µi::tatasti:; . (EYN.: cyclic permutation).
~ircular permutation of n different things (taken) n at a time, KllKAtKi] µETUtaSti:; v Otacp6pffiV UVttKEtpEV(l)V ava v.
circular point (of a surface), KlJKAtKov crriµcTov (imtcpavi::iai:;).
circular points at infinity, £re' am:tpov KlJKAtKa 0-l']~LEla. (IYN.: focoids).
circular polarization, KlJKAtK1) rc6-Afficrti:;.
circular reasoning, AOr., otciAAYJAOt; r KuKA-tKoi:;J ow.Aoywµoi:;· [ KlJKAtKOV £mxi::ipriµa}.
circular sailing, NA YT., KlJK~. tKi] [6p8oopoµlK1)} rcAEumi:; . (IYN.: great circle sailing).
circular scanning, PAMENT., KlJ-KAtKi] OtEpEllVllCTti:;.
circular secant, KlJKAtKi] TEµ voucra.
circular section, KlJKAtKll toµ1) .
circular shift, Aorn:M., KtJKAtKi] µi::tat6mcrti:;.
134
circulating storage
circular sine, KlJKAtKov ijµimvov. inverse circular s ine, uvi:icri:poq>ov
KIJKAIKOV i]µiwvov .
circular symmetric game, MA0., KlJKAtKOV crlJ~lpETplKOV rcaiyvtov.
circular tangent, KlJKAtKi] £cpa.rctoPEVrJ.
inverse circular tangent, avi:icri:poq>oc; KIJKAIKTJ eq>amoµevq.
circular triangle, KlJKAtKOV tpiyffivov.
circular velocity, KUKAtKi] tci:;i:uvmi:;.
circularity, I, MA0., KlJKAtKOtY]i:;. 2, AOr., ()w,U11Aia..
circularity of definition, AOL, Ota.AA Y]Aia. 6pwµou· f 6ptcrpoAOYlKll ota.UriAia.j.
circularly polarized sound wave, KlJKAtK&i:; TCETCOA(l)PEVOV llxlKOV KDµa..
circulate, KlJKAO<pop:il.
circulating, KlJKAO<pop11nK6i:;, 1),6v· [ KtJKAocpop&v,oucra.,ouv }.
circulating decimal, KlJKAocpopouv ' [ 7tEplOOlKOV} OEKUOLKOV.
circulating element, MA0., KlJKAOcpopouv [ 7tEpt00lKOV} crmtxi::rov· { KlJKAO<pOpr]TlKOV crmLJ:EloV }.
circulating equation, KlJKAocpopoucra. [ KlJKAO<pOpY]nKi]j £sicrfficrti:;.
circulating function, KlJKAocpopoDcra [ K.udocpopYJnKij} cruvapn1mi:;.
circulating register, AOIIIM., KllKAO<popouv [ KlJKAocpop11nK6v j µiitp&ov.
circulating storage, AOrIIM. , KU-
.circulation
K(l,ocpoptaKll [ KlJKAO<pOpY]ttKi] 1 UTC00ij KEllcrtt;.
circulation, 1, KlJKAO<popia.. 2, MA0., KUKA(l)crti:;.
circulation integral, MA0., KlJKAC:OttKov [ KlJKAocpop11nK6v j 6AoK~ytpffiµa."[ 6Aodi] pffiµa KlJKAcOcri::wi:;}.
circulatory decimal, = circulating decimal.
circumcenter (of a triangle), rci::piK&npov ( tpt ywvou) ( = KEVtpov tOU di:; tpiyffiVOV 7tEptyEypa.µµEVOlJ KUKAOlJ ).
circumcircle, 7tEpiKlJKAOt;" [ 7tEptyEypa.µµEVoi:; Kudoi:;}.
circumcone, ni::piKffivoi:;· [ rci::ptyEypa.µµEvoi:; K&voi:;}.
circumconic, ni::ptKffiVtK6i:;, ij,ov ( = mu 7tEptKWVOlJ ).
circumference, ni::pt<pEpEta. KUKA.ou· [ KlJKAO<pEpcw: rci::pt<pEpcta.}.
ratio of the circumference (of a circle) to the diameter, l..6yoc; i:fjc; nepupi:peiac; mu KuKl..ou npoc; i:i]v 81uµnpov· [n].
circumference of a sphere, rci::pt<pEpEta. crcpa.ipa.i:;.
circumferential, I, ni::pt<pEpEta.K6i:;, yt ,6v. 2, KlJKAO<pEpiji:; ,iji:;,Et;.
circumlunar, A1:TP., ni::ptcrEAY]Vta.K6i:;, i],6v· [ rci::ptcri::/, ij vwi:; ,a.,ov}.
circumscribed (about), ni::ptycypa.µµEvoi:;, ri,ov (di:;).
cone circumscribed about a pyramid, Kwvoc; nep1yeypaµµevoc; eic; nupaµi8a.
cylinder ci rcumscribed about a prism, xut..1vopoc; nep1yeypaµµ evoc; eic; npicrµa.
polygon circumscribed about a
city plan
circle, nol..uywvov ni:p1yeypaµ~u\.vov eic; KUKAOV.
pyramid circumscribed about a cone, nupa~tic; nep1 yeypaµ~1:';vq eii; KWVOV.
rad ius of a circle circumscribed a bout a regular polygon, aKi:ic; mil tic; KUVOVlKOV 1tOAuywvov m:pryi;ypaµµeVOU KUKAOU.
radius of a circle circumscribed about a triangle, aKi:ic; rnu de; i:piywvov niop1yeypaµµevou KuKl..ou.
circumscribed circle about a polygon, ni::ptycypaµµEvoi:; di:; noA.uywvov KUKAoi:;.
circumscribed cone, rci::ptycypa.µµEvoi:; K&voi:;.
circumscribed cylinder, ;i:cptycypa.µpEvoi:; KUAtVbpoi:;.
circumscribed polygon, rci::ptycypa.µµEvov noMyrovov.
circumscribed prism of a cylinder, ni::ptycypa.µ~ti:vov npicrµa. Kll-A.i v<>pou.
circumscribed pyramid, ni::ptyE-ypa.µ~LEVll rcupa.~tii:;.
circumscribed sphere of a polyhedron, ni::pt ycypa.µµEv11 crcpa1-pa. rcoAUEbpou· [ ni::ptycypaµµEvri di:; rcoMi::opov crcpa.i.pa}.
cissoid, KtcrcrOElOEt;" [ KtcrcrOElOllt;" Ktcrcroi::t<>i]i:; KUµrcUAlJj.
cissoid of Diodes, KtcrCTOElbijc; mu ~lOKAfoui:; .
citation, naparcoµrci] ( = na.pa0i::crti:; 11 µvcia. Xffipiou cruyypaµµatoi:;).
citation index, bctKTYJt; rca.pa.noµrc&v· [ rcapa.rc i::µrcnKoi:; ()i;[Ktili:;].
city plan, I, crxEowv rc6Acwi:;. 2, noA.coooµ t Kov cr:;i:Eowv.
J.35
city planning
city planning, 7tOAEOOOµi<r { 'Tf.OAEO· l>oµtKOS rr.pocrxeotacrµ6c;j.
city surveying, rr.0A.wypacp11atc;· { &.an Ki] xwpoypacp11atc;}.
civics, rr.oA.t LOA.oyia.
ci~il' engineer, rr.oA.tnKoc; ~111xavotsxv11c;"[ 'Tf.OAntKOt; µT]XaVtK6t;}.
civil engineering, 1roA.tnK1) µrixavotexvia.
civil law, NOM., ucrnKov oiKatov.
civil time, rr.oA.mK~ {8rr.icr11µoc;] . &pa . .
civil year, rr.oA.tnKOV ELOt;.
civilization, 8rnoA.mcrµ6c;· (Kat' uvnotacrLOA.ijv rr.po~ to culture,
. rr.?A.mcrµ6c;).
civilize, srnoA.ttisw.
ci.vilizing, EK7toAt ncrnK6c;, i] ,6v· { rr.oA.mcrnK6c;, i] ,6v )" (Kat' UVnOtaO"LOAijV rr.poc; to cultural, rr.oA.tna~nK6c;,i] , 6v).
Clairaut (Alexis Claude - ), (' A/,,,sstoc; KA.auotoc;) KA.atpcil ( = yaA.A:oc; µa0qµarnc6c;· 1713 - 1765).
Clairaufs differential equation, otacpoptKi] ssicrwatc; LOU KA.atpcil· {KA.atpwnavi] OtacpoptKlj ssicrw
. ate;] · Clairaufs theorem, K),mpwnavov
· 0e6JpTJ~ta· {0ewp qµa LOU K/,,,mpw ).
clamping circuit, HAEK., rr.pocroc:'!lKov /~a0porr.pocroenKov) Ku
, ~.A.w~ta. Clapeyron (Benedicte P.E. - ), (Be
vsotKLOS n. E.) KA.am;pov ( = y&.Uoc; . cpucrtKoµa0qµanK6c; · 1799 - 1864).
136
clas!i mark
Clapeyron equation, KA.arr.epovtavl} ssicrwatc;· {f,sicrwcrtc; LOU K?..:ttrr.e· p6vj.
Clarke (Colonel A. R. -), (Ltivrayµatapxric; A. P.) KA.Up!\ ( = ayy/,,,oc; µa011µanK6c;· 1828 - l9l4).
Clarke's ellipsoid, K:AapKtavoV' f,/,,,AWjfoetof:c;· {8Uct1JfoetM~ ' LOU KA.apK}. . 1,
class, 1, MAE>., = aggregate: 2, MAE>., K:Aaatc; . 3, (KoivwvtKiJ) tasic;. . , ..
characteristic class, xapmctl)ptcrnKi] KAUO'!(,.
cohomology class, KAucr1r; cruvo-µoA.oytK6trirnr; . ·
equivalence class, MA0., icl<.ucr1r; lcro8uvaµiar;· [lcro8uvaµ1K6trir;J.
Hardy class, xap8iavi] ii:Mcr1r;· [ ducrtr; mu Xupvw]. .. . '
modal class, MHXT., tp01tflnKi] KAUO'l(,. '
number-:::lass, ap10µ0KAUO'[a· {Ct· pt0~uKi] KA.6.atc,]. .
null class, µriBl:vtKi] KMcrt~.
reduction class, A.Or., avayroytKi] KAUO'l(," [ KAUO'l(, avayroyfjr;j . . '
residue class, MA0., Kat~l,.011toi; KA.ucr1r;· [ KA.ucr1r; Kata \.obwu j.
subclass, 01toKAacr[a· [u1tbKf...6:cr1r;].
class frequency, KA.aatKi] cr~xv6-tric;· [ cruxv6n1c; KA.6.crew;J.
class group, KA.acrtKi] 6µac;· [6µuc; Kkaaewc;]. :· .
class interval, KAaatKov 01acr111µa· [ouicrrriµa auxv6tqrn; K:A.aacw;].
class limits, daatKa optd: /,opta (LOfi) KlcacrtKou otacrnW<i-uo;j.
class mark, KAUatKOV cr~~ta ( ~ µgcronµi] (rnu) KAaatKOU otarrti]µa:o;).
class DU!llber
class ,number, K/,,,acrtKoc; apt0µ6c;· {apt0µoc; KMaewc;).
class of a bundle, MAE>., KA<icrt; .ofoµ11;.
· Chern class of a bundle, xepvtavi] 8i>qµ1Ki] KAUcrL<;· {KAU.crtr; 8tcrµ11r; (lvrov) wu Tatpvj .
class of a complex, MAE>., K/,,,acrtc; awm/,,,syµaLOc; .
class of a congruency, MAE>., KA<icri; crµi]vouc;.
class of a Galois field, KA<icrtc; ya/,,,otcrtavou rr.eoiou· { KA<iatc; rr.eo iou LOU I'Ka/coua).
class of a group, KM.ate; { crusuys; O"UVOAOV) 6~tci8oc;.
class of a plane algebraic curve, KAaatt; l':Jnrr.soou aA,yg~ptKllS Kaµrr.u/c11c;.
class of a twisted curve, K/,,,cwtc; crwerr.tfjc; Kaµrr.UATJS ·
class of an algebraic surface, KAO.ate; fJ.)., yg~ptKi'jt; smcpavdac;.
class of an equation, KA.acrtc; i':stawcreffi;.
class of Baire functions, KA.acrtc; ~atpetaVWV cruvapti]crswv· r KAUatc; cruvapti]crewv LOU Mrr.aip).
class ·of functions with respect to a group of operations, K/,,,6..crt; cruvapri]crewv we; rr.poc; 6µ6..oa µa011µanKwv rr.paserov.
class of sets, KA<iatc; cruv6/,,,wv. nonempty class of sets, µTJ KEVij
KAUCTL(, CTUVOAWV.
classii.:al algebra, KAUO"O"lKll a/cyg~pa.
classical axiomatics, AOr., KAacrcrtKT} UStWµanKij.
clear language
classical canonical form, KAacrcnKij 0£0"~LtKij µop<plj.
classical equations of mathematical physics, KlcacrmKai i':stcrwcretc; tfjc; ~ta011µanKfjc; cpuatKfjc;.
classical formulation of problems, K/,,,acrcrtKi] otaturr.wmc; rr.po~ATJ· µatffiV.
classical logic, KlcacrcrtKlj {rr.apa.ooti]) AOytKij.
classical matrix, KlcacrcrtKov µritpeiov.
simple classical matrix, un;\.ouv KAUO'CTLKOV ~lll'tPELOV. .
classical mechanics, vrn'trovewc; { KAUO"O"lK~} µllXUVtKT].
classification, ral;tv6µ11mc; .
classify, tal;tvo~t&.
Clausen's integral, KlcaucrevtaKov 6A.oK/cljpwµa· {6/coKATjpwµatou KMousev}.
Clausius (Rudolf - ), (Po06/c<poc;) KA<iouswuc; ( = yepµavo; <puatKoµa01iµarnc 6c;· 1822 - 1888).
Clausius-Clapeyron equation, ssicrwatc; KMouswuc;-K/,,,arr.ep6v.
Clausius' cycle, = Rankine cycle.
Clausius's postulate, Klco.ucrwumavov ah1iµa· [ ahiwa LOU K/,,,uouswuc;).
clear, MAE>., 8Krn0apisw.
clear, MAE>., f:vapy i]c;,i]c;,s;.
clear-air turbulence, aieptaKo; wp-~acrµ6;· { ai0ptaKo; wpayµ6c;).
clear language, AOrILM., avotK'tlt [ aa<p1);] ylcwaaa ( = cruvi]0ric; aKpumoyp<icpTJLOt;, UK(J)OtKffiLOt;, 11 µi] auvLO~ttKi] y/,,,waaa).
137
clearing
clearing, M A0., EKKU8ciptcrn;.
clearing of fractions, MA0., crn~1-IJITJ<pwµoi:; -r&v KA.a.cr~1ciw>v ( = EKKa8ciptcrti:; f] e~cif,E t\j/t<; -r&v ayvrocrnov -r&v rca.pavo~1acr1&v µtfii:; es tcrfficri::coi:;).
clearly resolved, evapy&; [ craqJ&<;} EiJKpt Vtv8cii:;,i::tcra,f:v.
clearness, evcipyi::ta.
cleverness, f.surcvciOa 1 i::ucpu'fa].
Clifford (William Kingdon - ), (fouA.tf:A.µoi:; KivyKwv) KA.icpqJopvr ( = iiyyA.oi:; ~ta8q~tanK6i:;· 1845-1879).
Bessel-Clifford function, crnvaptqmc; Mnfocri:A.-KA.[cpcpopvt.
Clifford algebra, KAtcpqJopotav1i iiA.yi::ppa· {iiA.yi:;ppa 10u KA.i<pcpopvr].
Clifford-Klein space, x&poi:; K/,iqJcpopvr-KA.cii:v· [ KAt<pcpopotavoi:; x&poi:;].
Clifford-Klein surface, em<pcivEta KA.icpcpopvr-KAciiv· [ KA.tcpcpopotavij ETCt<pUVEtO. j.
Clifford's chain, KAt<pqJopotaviJ ulcumi:;"[ uA.ucrti:; wu KA.i<pqJopvr ].
Clifford's space, KAt<pqJopotavoi:; x&poi:;· /x&poi:; -rou KA.i<pqJopv-rj.
Clifford's surface, ic/ct<pqJopowv1i £mqJcivi::ta"[em<pavi::ta wu KA.i<p<popv-r].
climb, AEP., iivoooi:;· [avcipami:;]. angle of climb, yrovia av68ou· [ ava-
13anKi] yroviaj. steepness of (an airplane) climb,
UltOtoµ6tqc; av6oou [a1totoµ6tqc; uavaf3acri:roc;} (mu ai:ponA.avou ).
clipper, HJ\EK., TCEptKOTCHJ<;"[ TCEptKOTCTtKOV KUKA.coµa· K6rcn1i:;].
138
closed circuit
clipping · circuit, HJ\EK., rci::ptico-rcnKov [pa8porci::pt0ptcrnK6v j KUKAWµa..
clock, 1, XPOVOµETpov· { 6JpoA.6yt0V -roixou· bmparrestov ropoA.6ytov]. 2, MA0., yvcoµ6vtov.
clock arithmetic, yvco~t0v taK1) [ xpovoµE1ptK1i] apt8,UTJTtlCiJ.
clock frequency, XPOVOµETptKl) O'U· xv6-r1ii:;.
clock pulse, XPOVOµETptlCO<; rraA.µ6i:;.
clock rate, MA0., xpovo~1ETptKTj otanµ11.
clockwise, oi::st6cr-rpo<poi:;,oi:;,ov ( = Kara -r1iv <popav r&v OEtKr&v wu ropoA.oyiou ).
acting clockwise, f; vi:py&v,oucra,ouv Kata ti]v cpopav t&v OELKt&V mu c.O· poA.oyiou· / i;vi:pyciiv,oucra,ouv Kata oi:-1;t6crtpocpov cpopav j.
in a clockwise sense, Kata ti]v cpopav tGJv OE! KtGJv tOU wpoA.oyiou· [ oE-1;tocrtp6cproc;· Kata OEl; t6crtpocpov cpopav}.
measured clockwise, µctpouµi:voc;, T],ov oi:!;tocrtp6cproc;.
clockwise, emp., oi::s10mp6qJcoi:;.
clockwise couple, <DYE., oi::st6cr1po<pov scuyoi:; (ouvaµi::cov).
close agreement between (a) and (b), MA0., rcA.11prii:; cruµcpwvia. µi::msu (a) mi (p).
close plane, rcA.11crtecrm10v f.rrircE-oov.
close point, rcA.rimecrrnwv crl]µE1'.ov.
closed, KAEtcr-r6i:;,T),6v.
closed chain, MHX., KAEtcrrl) uA.ucrti:;.
closed circuit, H!\EK., KA.i::mrov KUKAco~ta.
closed convex hull
closed convex hull of a set, MA0., KA.EtcrriJ KUpriJ y<icr-rpa. tvoi:; cruv6A.ou.
closed covering, MA0., KA.Etcr16v K<iA.wi~ia.
closed curve, KA.i::tcr-rij Kaµrrulc1i. inscribed angle of a closed curve,
i;yycypaµµ£v11 yrovia KA.EtcrTiic; Kaµ-1tuA.1ic;.
simple closed curve, anA.i'j KA. i: tcrti] Kaµnu A. 11 .
closed-end investment funds, OIK., rci::pa.ra [ KA.i::tcr-ra] f.rci::vounKa -ru~ni::6µarn.
closed form, MA0., KAEtcrrij ~1opcp11.
solution in closed form, f;n[A.umc; KA.i:tcrti'jc; µopcpi'jc; .
closed integral, MA0., KA.i::tcr16v oA.oKA. ij pw~ia..
closed interval, MA0., KAEtcrrov otcicrnwu.
closed loop, !\OrIEM., KAEtcr16i:; pp6xoi:;· [Klci::tcrrov K6KA.riµa].
closed mapping, MA0., KAEtcrroi:; ELKOVtcrµ6i:;· [ KAEtcrTiJ arrEtKOVtcrti:;}.
closed n-cell, MA0.,, KAEtcr-rov vuKunapov· { KA.EtO'TOV VUOtUO''W· wv K6na.pov].
closed nonorientable surface, KAEtCTTTJ µij i::u8i::-riJcrtµoi:; [ KA.i::tcrrij µij rcpocrava10Aicrtµoi:;] em<p<iVEta.
closed orientable surface, MA0., KAEtcr-rij i::U8i::1ijmµoi:; [KAEtcrriJ rcpocrava10A.icrtµoi:;] em<p<ivi::ta.
closed oscillation circuit, KAEtcr-rov -raA.av-rconKov KUKA.coµa.
closure of a set
closed plane figure, KAEtcrrov f.rcirrEoov crxfjµa.
closed polygon, KA.Etcr16v rrolc6ycovov.
closed prismatic surface, KA.i::tcrrft rrptcrµa.nKij f.m<pcivi::ta..
closed routine, !\OrIEM., KAEtcr-rft crup~L Ti.
closed sequence, KA.i::tcrTl) aKoA.ou-8ia.
simple closed sequences (of slabs), MHX ., anA.ai KA.Etcrtai UKOA.ou0iat (nA.aK&v).
closed set, MA0., KAEtcrrov cr6-voA.ov.
closed shop, AOrIEM., KAEtcr-rov Ka1cicr111µa.
closed simplex, MA0., KA.stcr-rov µov6rcA.qµa.
closed subroutine, !\OrIEM., KAEt-crrij urrocrupµ11.
closed surface, KA.EtO'TTJ ETCt<pUVEtO..
closed system, KAEtcr16v cr6cr-rl]µa.
closed transformation, KA.i::tcr-roi:; µe-rncrx11µancrµ6i:;.
closing, KA.i::icrtµo(v).
closing inventory, TEAtKOV ot<i8i::µa.· {ot<i8Eµa SE7tOUA. ijµaTO<;j.
closing of a sequence, KA.i::icrtµov (µti'ii:;) aKoA.ou8iai:;.
closing rate, MHXT. MA0., ota-rtµTj rrA.YJcrtacr~iou"[ pu8µ6i:; rcpocri::yyicri::coi:;].
closure, MA0., 8yKA.i::tcr~1a.
axiom of closure, a!;iroµa mu eyKA.Eicrµarnc;.
closure of a set of points, l:yKA.i::tcrµa. O'UVOAOU O'l]µEicov.
139
clothoid
clothoid, KA.ro0ostoec;· [ KNro0ostoT]c;· Kepa-r6mmpa ].
cloud, <!>YI., ve<po<;. noctilucent clouds, VUKt0A.aµiti'j [ cpro
tElVU VUKtEptva) vf;cp11.
cloud chamber, <PYI., vscpo0aA.aµoc;.
cloud physics, <!>YI., vscpoA.oytKi} <j>UCHKTJ.
cluster, 1, AITP., ovi"jvoc;. 2, MA0., crncrnsiproµa· [ crncrrreiprocrt<;}.
cluster point, MA0., miµsiov crucrrcstpwcrsroc;· [ crriµetov €mcrropsucrsroc;J.
cluster point of a sequence, crriµsiov crucrrcstpc.Ocrsroc; [ miµsiov €mcrropsucrsroc;] aKoA.ou0iac;.
cluster set, MA0., crucrrcstpronKov cruvoA.ov.
coalition, MHXT. MA0., cruvacrmcrµ6c; .
coaltitude, MA0., AITP., cru~mA.1)proµa u\vouc;.
coaltitude of a celestial point, cruµrcA.1) proµa U\VOU<; {Sevt0LUKTJ arc6-crmcrt<;} crqµsiou TOU oupavou.
coated optics, <PYI., €rcixpwm o-rcnKa opyetva (t\ µfoa).
coating, <PYI., €rcixptcrt<;.
coaxial, MA0. , 6~t0asovtK6<;,T] ,6v.
coaxial circles, 6~t0asovtKoi KU-KA.ot.
coaxial helices, 6µoasovtKai ( cr-rspeai) !:A.tKe<;.
concentric coaxial helices, 6µ6KEVtpot 6~toa;ovtKai eA.tKEc;.
coaxial planes, 6~toasovtKa €rcircsoa.
140
code
coaxially, 6µoasovtKG><;.
COBOL, = Common Business Oriented Language.
cobordant, TOIIOJ\., cruv6µopo<;, oc;,ov.
cobordant manifolds, TOTJOJ\., cruv6µopa rcoA.urc-ruxa.
cobordism, TOIIOJ\., 1, cruvoµoptcrµ6c;. 2, cruvoµ6ptcr~ta.
cobordism group, TOIIOJ\. , cruvoµoptcrnKTj 6~1ac;· [oµa<; cruvoµoptcrµou}.
cobordism theory, TOIIOJ\., cruvoµoptcrnKTj 0sropia· [0sropia wu cruvoµop1crµou].
coboundary, MA0., 6~1ocruvopov.
cobweb chart, upaxv6ypa~1µa· [ upaxvoypacpriµa J.
cochain, MA0., cruvaA.ucnc;· [6µoaA.ucr1c;}.
cochleoid, KoxA.t0st8ec;· [ KoxA.10st-8ijc; Ka.µrruA.ri].
cocycle, MA0., 6µoKUKA.T]µa· [cruyKUKAT]µa].
Cochran (William Gemmell - ), (rouA.teA.µo<; rKe~tµsU) K6-xpav ( = O'KWTO<; crmncrnKoA.6-yoc;· y. 1909).
Cohran's theorem, Koxpavtavov 0swpriµa· [0swp1iµa wu K6-XPav ].
Codazzi equations, Kooasstavai €s1-crwcrs1c;· {€stcrc.Ocret<; wu Konarnt }.
code, J\OrIIM., KffiOtKW ( = µsm<pp<isro rcp6PA.ri~m de; A.oytcrµrinKov rcp6crmyµa t\ O'UVOAOV
code ,
rcpocr-raywv pacrei c:bptcrµevric; µrixavriµanKfj<; yA.wcrcrric;). d~ode, aitoKro8tKiil.
code, I, Kw81s. 2, J\OrIIM., Kwots evwA.wv· {KG>ots}.
absolute code, O.it6A.ut0c; [d8tK6c;} KiiJ8t;.
automatic code, aU-r6µm:o c; Kcll8t;. Baudot code, Bro8onav6c; Kiil8t;·
{Kiil8t; wu Mitrovt6}. binary code, 8ua8tK6c; Kiil8t;. biquinary code, 8mEvta8tK6c; KiiJ-
81;. building code, MHXT., oiKo8oµt
K6c; Kiilot; (ft KUV0Vtcrµ6c;). Chinese binary code, crtvtK6c; 8ua-
8tk6c; { O'lVOOUa8tK6c;} K&8tl;. column-binary code, crt11A.08ua81K6c;
{ O'~ Vl KO<;} K008t;. . computer code, A.oy1crµll't[K6c; KW-
81;. cyclic code, KllKAT\µUnK6c; K&81;·
{ KllKALOKiil8t;). dictionary code, Kro8tKoA.e;t/,6ywv·
{f..e;LKiiJ81;). error correcting code, crcpaA.µaw-
8wp0ooti]<;' [ auteA.eyx6µEvoc; K&81;]. error detecting code, crcpaA.µatocpoo
pati]<;' [ aUtE;aKptBooti] c; KiiJ8t;• autEA.eyx6µEVOC, Kw81;].
excess-three code, i':ititpttoc; KW81;.
four-address code, t Etpa8uiµovoc; KW8t;.
Gray code, Kiil8t; tOU rKpairi. instruction code, KiiJ81; i':vt0A.&v·
{f.VtaAtlKO<; K008t;}. interpreter code, i:pµT]VE\ltlKO<; {a
tEXVOC,} KW81;. (~YN.: pseudocode).
interpretive code, f;p~lllVEllttK6c; Kiil&t;.
machine-language code, KiiJ81; µ11-xav11µanKfic; yA.cllcrcrric; · [A.oy1crµ11nK6c;,xiil81;· µi1xav11µanK6c; KiJJ81;}.
microcode, µtKpoKiiJ8t;. minimum access code, K&81; i':A.a
xicrtric; itpocrBacreooc;· {f.t-axt0'1:oBanK6c; KiJJ81;· i':t-ax1crtoitpocrBacrtK6c; KW8t;).
code information
minimum latency code, KiiJ81; i':t-uxicrtric; UVtl~LOVi'jc;' { Kiil8t; tAUXicri'T]c; npocrBacreroc;].
mnemonic (operation) code, µvnµovtK6c; KiiJ81;.
modulation code, 8taµopcpt<HtK6c; {8tatOVLO'tlKO<;j KiiJ8t;.
multiple-address code, ito!.u8taµovoc; K&8t;.
numeric code, apt0µtK6c; Kiil8tl;. one-address code, µovo8uiµovoc; Kiil-
8t;. operation code, npa;eot-oytK6c; iciI>-
8t;. optimum code, B€A.T. tcrt0c; icw81;. pseudocode, ww8oKiJJ8t;· {O.texvoc;
KiiJ8t;} . pulse code, na!.µ0Kw81;· {ita'-µ1ic6c;
Kiil8t;}. quibinary code, 7tEVta8ua8tK6c; icro-
8t;. .
reffected code, avaKAacrnK6c; KiI>-81;.
relative code, crxenK6c; Kii'>8t;. seismic code, MHXT., avncrEtcrµ1-
K6c; Kii'>8t; (ft KUV0Vt0'µ6c;). self-checking code, autEAEYX6µEvoc;
K&8tl;. self-demarcating code, auwpo0Ett
K6c; Kii'>8t;. self-demarking code, = self-demar
cating code. single-address code, µovo8taµovoc;
Kfu8t;. skeletal code, crKCAEttK6c; [f.nito
~wc;} Kfu81;. specific code, Ei8tK6c; [an6!.~toc;J
K008t;. s traight line code, Eu0uypaµµoc; KiI>-
8t;. symbolic code, cruµBo!.1K6c; K&81;·
{ lj!Etl80KiiJ8t;). three-address code, tpt81aµovo<;
Kfu81;.
code-element, AOrIIM., KffiOtKOcr-rmxsi:ov.
code information, 11.:ro8tKTJ {KOiJOtKID-rij] TCAT]pO<pOptaKi} UAT].
141
code line
code line, Aorn::M., KwDtKoypaµp11· { KWDtK'i] ypaµµij}.
code number, Kro<>cipt9µoc;· [ KWDLKO<; apteµoc;J.
codecli nation, cruµnA. i] proµa KA icri;roc;.
codeclination of a celestial point, AITP., cruµnA.i]proµa KAicrEro<; { TrOALKij U1tOGTCLcrt<;}<>lJ ~LE LOU !OU oupavou.
coded decimal, KffiDtKrotov DEKa8tK6v· {KWDLKODEKCLDLKOV }.
coded decimal digit, KWDLKWTov 81:KaDtKov ljllJ<piov.
coded decimal notation, mwi:toypacpi] KWDtKrot&v DEKUDtK&v· [KwOtKODEKCLDtKi'] criwi:wypacpi1 } .
binary coded decimal notati on, <JT]µEtoypaqn'J OUao11ccl>; KOl0lKOl9EVHllV oF.KaotKG>v· [ouaoLKOKmotKi] OEKaoLKTJ <JT]µF.toypacp i]j.
coded decimal number, KCODtKwroc; oEKa.8tKoc;[ Kro8tKoDEKa8tKoc;J apt9µ6c;.
binary coded decimal number, ouaOtKcl>c; KOlOlKOl9dc; I OUUOlKOKOlOlK6c;} oeKaoLKoc; apLSµoc;.
biquinary coded decimal number, OlltEVtaOLKcl>; KOlOlKOl9tic; [Ol7tEVtaOtKOKOlOLK6c; j oF.KaoLKoc; apLSµoc;.
coded digit, KWDtK6v ljll]<piov. decimal coded digit, OEKUOLKOKOl
OLK6v IVTJQJ[ov.
coded program, KWDtKwtov [ KCOOtKov} np6ypaµµa.
coded stop, J\OrIIM., KWDtKcoti] [KWDtKi]j DLCLK01ti1.
coder. Aorn::M., KWDtKconlc;. decoder, AOllIM., a1toKOlOLKOltfjc;.
codimension, cruvouicrrncrtc; .
coding, AOrIIM. , KWDiKcocrtc;.
142
coefficient
alphabetic(al) coding, UAqJaf3qtlKTJ Kmo[Kmcnc;.
equivalent loop coding, KrooiKmcnc; icroouvaµou f3p6xou· [6A.oKuKA.mµanKTJ KOlOLKOlO"Lc; j.
minimum access coding, KOlOLKOlcnc; et..ax[crt11c; npocrf3acrF.mc;· f i:A.ax1-crwf3anKiJ KOlOLKOlcrLc; /.
numerical coding, apt9~ttK1'J Kmo[Kmcnc;.
Straight line coding, EU9Uypa~L~LO; KOlO[Kmcnc; .
coding time, J\OrIIM. , xp6voc; KCODLKcOGEW<;.
minimum coding time, i\A.6.xtcrwc; xpovoc; Km0tKciicrF.mc;.
codomain, 6~toni:ptoxir [ cru~mi:ptoxi]}.
coefficient, cruv-ri:A.rnnK6c;, 11,6v· [ <>UVtEAEGti] ptoc;,a,ov].
coefficient, cruvtEAEGtiic;. absorption coefficient, cruvtF.A.ecrti]c;
anoppoqJfjcremc; · I anoppOqJT]tlKOc; cruvtEAEcrti]c; j .
activity coefficient, XHM., cruvteA.ecrti]c; opacrt6tqt0c;.
aerodynamic coefficient, aepoouva~ttK6c; cruvteA.ecrti]c;.
attenuation coefficient, cruvteA.ecrti]c; i\C;acr9evi]crF.mc;.
autocorrelation coefficient, cruvtrA.ecrti]c; auwcrucrxer[cremc;.
axial drag coefficient, cruvteA.ecrti]c; aC;ovtKfjc; 6mcr9EAKUO"EOlc;.
ballistic coefficient, f3A.T]tLK6c; cruvteA.ecrti]c;.
beta coefficient, f3ritanK6c; cruvteA.ecrri]c;· [cruvreA.ecrti]c; f3fjta}.
binomial coefficient, OLmvuµLK6c; crUVtEAEcrti]c;.
biserial correlation coefficient, cruvteA.ecrri]c; OtcrELpta s:fjc; crucrxer[cremc;· {otcrELP lUKOc; crUVtEAEcrti]c;j.
buckling coefficient, A.uytcrttK6c; cruvteA.ecrti]c;· [ cruvteA.ecrtiJc; A.uyLcrµou j.
capital coefficient, OIK., KEQJaA.maK6c; O"UV"tEAEuti1c;.
coefficient
choice of coefficients, i:mA.oyi] [euxtpe ta emA.oyfjc;} cruVtEAEcrtcl>v.
condensation coefficient, cruvteA.ecrti]c; cruµ7C UKVOJcrEOlc; .
confidence coefficient, IT AT., cruvteA.ecrri] c; 7CE7!0 t9i]cremc;.
constant coefficient, crta9ep6c; cruvt eA.ecrr i]c; .
correlation coefficient, cruvteA.ecrt1'Jc; O"UO";(EtlO"EOlc;.
damping coefficient, cruvn:A.ecrti]c; CL7COcrf3foewc;· { U7Cocrf3ecrtt Koc; O"UVtE/~Ecrtllc;}.
decay coefficient, cruv1eA.ecrri]c; napaKµfjc;.
detached coefficients, anecrnacrµi;vot O"UVtEAEcrtai.
determinant of the coefficients (in a set of linear equations), 6pil;oucra tiilv cruvteA.F.crtcl>v ( cruv6A.ou ypa~tµ LKcl>v i\C;tcrcilcrewv) .
determining the Fourier coefficients, npocr8t0ptcrµ6c; [ F.upF. crLc; / tcl>v q>OUPLEptavcl>v cruvtEAEcrtiilv.
differential coefficient, otaqJoptK6c; O"UVH:A.ecrti] c;.
diffusion coefficient, cruvteA.ecrtiJc; oiaxucremc;· {otU;(UtOtT]c;}.
directional coefficient, 8teu9uvnK6c; cruvteA.ecrti];.
displacement influence coefficient, M HX., cruvteA.ecrri]c; lmtppofjc; µEta Kt v1"1crEm;.
drag coefficient, cruvtEA.Ecrti]c; 6mcr9EA.Kucrem;.
eddy coefficients, otVLKOi cruvtEA.Ecrtai. (IYN .: exchange coefficients).
evaporation coefficient, cruvtEAEcrti'Jc; eC;atµicrewc;.
Everett interpolation coefficients, Ef3epnnavoi cruVtEAF.crtai napeµf3oA.fjc;· [cruvtF.A.F.crtai napF.µf3oA.fjc; tou "Ef3epF.H}.
exchange-coefficient hypothesis, un69F.cr tc; 7tEpi tcl>V O"UVtEAEO"tcl>V E\IUAA.ayfjc;.
exchange coefficients. cruvtF.A.Ecrtai evaUayfjc;. (IYN.: eddy coefficients; interchange coefficients).
coefficient
excitation coefficient, cruvteA.ecrti]c; oteytpcremc;.
extinction coefficient, M ETEQP., cruvteA.ecrti]c; aqJav[cremc;.
force influence coefficient, M HX., O"UVtEAEcrtl']c; emppofjc; ouvaµEmc;.
Fourier coefficients, qJouptEptavoi O"UVtEAEO"tai• [ O"UVtEAEcrtai tOU <lloupt t }.
fundamental coefficients of a surface, 9EµEAlclJOELc; cruvtEAEcrtai (tfjc;) i:mqiaveiac;.
heat-transfer coefficient, cruvteA.ecrti]c; 9epµtKfjc; µnaf3tf36.m;mc;· [ cruvt EA.Ecrti]c; µetaq>opac; 9cpµ6tqtoc;j.
hygroscopic coefficient, uypocrK0-7llKOc; cruvtcA.ecrti]c;.
hysteresis coefficient, ucrtEPlltlKOc; O"U\ltEAEcrti] c;· {cruvtEAEcrti]c; ucrtep~O"EOl~ } .
indeterminate coefficient, U7CpOO"Ol0• ptcrtoc; crUVtEAEO"tllc;.
influence coefficient, cruvtEA.Ecrti]c; i:mppofjc;.
interchange coefficients, = exchange coefficients.
interpolation coefficient, napeµf3oA.tK6c; O"U\ltEAEO"t l1 c; · [ crUVtEAEcrti]c; naPE).tBoA.fjc;}.
Joule-Thomson coefficient, cruvteA.ecrti]c; T~6.ouA.-T6~1crov.
lag coefficient, cruvteA.ecrti]c; Ka9u<HEpi]µawc;· [xpovLKi] crra9ep6.j.
Lagrangian correlation coefficient, cruvteA.ecrti]c; A.aypav~tavfjc; crucrxeticreroc;.
Lagrangian interpolation coefficient, Aaypav~tav6c; cruvtEA.Ecrti]c; nape~1f30-A.fjc;· [crUVtEAEcrti]c; napeµf3oA.fjc; tOU AayKpavO.
lateral force distribution coefficient, crUVtEAEcrti]c; Katavoµfjc; tfjc; 7CAEUptKfjc; OUVUµEWc;.
leading coefficient, npmtap;(tK6c; [f.C;i;xmv J O"U\ltEAEO"tllc;.
Legendre's coefficients, A.eyevoptavoi cruvteA.ecrtaf · [ cruvtEA.Ecrtai tou Ae~6.vtp}.
lift coefficient, O"UVtEAEcrti]c; avci>crEmc;.
143
coefficient
linear coefficient, ypaµµ 1K6i; cruv-rtA.rn-ri] i;.
matrix of (the) coefficients (of a set of linear equations), µrj'tp ttov -rc7>v cruv-rtA.tcr-rc7>v (cruv6A.ou ypaµ~11 Kc7>v E-1;1crc0crewv).
mean coefficient, µecroi; cruvrtA.tmi]i;.
metho:l of tension coefficients, µe-0o8oi; rc7>v Eq>tA.KucrnKc7>v cruvrtA.tcrrc7>v.
multiple correlation coefficient, cruv-rtA.tcr-ri]i; noA.A.aitA.fji; crucrxtricrtooi;.
negative local seismic coefficient, MHXT., apvf]nK6i; -romK6i; m;1crµ1-K6i; O'UV'ttAtcrti] i;.
negative temperature coefficient, <l>YL , O'UV'ttAtO'ti]i; apvf]nKfji; Otp·µoKpacria i;.
nonvanishing coefficients, µi] µ118 cv1~6µevo1 cruv-rtA.tcrrni.
nozzle thrust coefficient, J1YPA YA. O'UV'tEAEO'ti]i; QKpOq>UO'LCLKfji; WO'tWi;.
numerical coefficient, ap10µ1K6i; O'UV'ttAtcrn1i;.
Pearso n's coefficient, nripcrov1av6i; O'UV'ttAtcrTi] i; · { O'OVttA.tcrti]i; 'tOU J1i]a.pcrov ] .
permeability coefficient, cruvi:tA.tcr-ri]i; 8wnepa.i:6i:11wi;.
phi coefficient, vovi:tA.ecrri] i; q>. progressive differential coefficient,
npoo8tonK6i; 81aq>op1K6i; crovi:tA.tcri:i] i;.
recombinat ion coefficient, crovi:tA.tcr-ri]i; ava.crovouacrµou.
recrangular array of coefficients, op. Ooywvwia nap<irn!;ti; crovi:tA.tcr-rc7>v.
144
reflection coefficient, ava.KA.a.crnK6i; O'UVTtAtO'tiJi;· { O'OVTtAOJti]i; ava.KAUO'EWi;}.
regress ion coefficient, crov-rtA.tcri:i]i; ava.8poµiJcrtwi;.
regressive differential coefficient, ava.8poµtK6i; 8ta<poptK6i; O'UVTf.AtO'ti]i; .
reliability coefficient, MHXT., cruv-rtA.tcri:i] i; A.ttt0upyqcriai; ( = cruvi:tA.t crti] i; f3amµ6i:riwi; A.tt wopyi]crtwi;).
scattering area coefficient, crovi-EA.tcri:i]i; {A.Q yoi; j O'Kt8a.O'nKOU {;µf3a8ou.
coefficient of absorption
scattering coefficient, O'Kt8acrttK6i; O'UV'tEAtO''tlli;.
second order linear homogeneous ordinary differential equation with constant coefficients, 8toi:tpota!;toi; ypaµµ1Ki] 6µoytvi]i; crovi]Orii:; 81aq>op1Kii €1;,icrwmi; µi: crrnOtpoui:; crov-rcA.rni:ai:;.
seismic coefficient, crt 1crµ1Koi:; crovttA.ecr-riJi;.
shear coefficient, 81a1µqnK6i; cruvttA.tcrtiJ i;.
stiffness coefficient, cruvrcA.tcri:i] c; 8ucrKaµljliai;.
suitable choice of coefficients, apµ6~oucra [ np6cr(flopoi;} i:mA.oyi] cruv-reA.tcrto:>v.
tension coefficient, MHXT., E<flEAKucrnK6i:; O'UV'tEAEO'Tlls' [ O'UV'tEAEO'ti]i; . E<f!EAKUO'µOU}.
theory of linear differential equations with constant coefficients, Oewp[a -rc7>v ypaµ~nKc7>v OLCL<f!OptKc7>v µti:ci. crw0epc7>v cruv-rtA.tcr-rc7>v t!;,1crrocrewv.
torsion coefficients (of a group). O'UV'tEAEO'tai O'TPE\j/EWi; { O'TPE7t'l'LKOi. O'UV'tEAEO'Wi} (µtai; 6µa8oi;).
Townsend ionization coefficient, WOVO'EVOtav6i; O'UV'tEAEO''ti]<; lOV'tlcrµou· [ cruv-reA.ecr-riJi; i.ovncrµou wu Taovcrev-r J.
transmission coefficient, crovi:eA.tcr-ri]i:; µna86cri;wi; .
undetermined coefficient, QKCL06ptO''t0s O'UVTEAEO''tlls·
vertical spring coefficient, KataK6-pu(floi:; €A.mqp1aK6i; crovreA.ecrtiJi;.
viscosity coefficient, cruvttA.rn-ri]i; tfii; yA.016n1wi;'[yA.otonK6<; O'UV'tEAEO'Ti]i:;}.
coefficient field, MA0., cruvrnA.i:crnK6v ni:8iov· [ ni:8iov cruv-ri:A.rntwv].
coefficient matrix, µ11-rpi:fov cruv-ri:A.rntwv· [ cruvtf:Xi:crnK6v ~LTJ--rpdov].
coefficient of absorption, <l>Y:E., CTUVtf:Af:crti'ji; ano p pocp ~ cm.oi;.
coefficient of active
coefficient of active earth pressure, MHXT., cruv-ri:A.i:crti']i; -rfji; tvF.pyou mfoi:mi; n"ji; yfli;'[ cruvtdi:crti']i; tvi:pyou £8a.cptKfji; nu':cri:mi;].
co~f(icient of alienation, :ET AT., O'UV'rf:Af:crti'ji; unosi:vrocri:mi; .
coefficient of barotropy, cruv-ri:A.i:crti']i; Ba.po-rponia.i;· [Ba.potpo
. mK6i; crUV'rf:Af:crt~i;].
coefficient of compressibility, <l>Y:E.XHM., cruvrnA.i:crt~i; cruµnrncrt6n1rni;.
coefficient of connection, MA0., cruvti:A.i:crti']i; cruvucpi:la.i; ( tou) xropou).
coefficient of contraction, cruvti:A.i:crti']i; crucrrnA. i"ji;.
coefficient of correlation, cruv-r i:A.i:crti']i; crucrxi:ticri:mi;.
coefficient of coupling, HAEK., cruvtdrnti']i; crut;i:usi:mi;.
coefficient of cross-elasticity, cruvti:A.i:crti']i; (tfji;) 8ti:A.a.crnK6tT]t0i;.
coefficient of cubical expansion, cruvti:A.rnti']i; KuBtKfji; 8ta.cnoA, fj i;.
coefficient of depression, <l>Y:E . XHM., cruv-ri:/"i:crt~i; (moBtB a.crµou.
coefficient of diffusion, cruvrnA.wn)i; 8mxucri:mi;.
coefficient of efficiency, cruvti:A.i:crti']i; tm8onK6tT]toi;.
coefficient of elasticity, cruv-ri:A.i:crti']i; tA.acrttK6n1t0i;.
coefficient of ellipticity, cruvti:A.i:crti']i; tA.A.i:rnn KOTT] mi;.
coefficient or-stiffness
coefficient of expansion, <l>YI., O'UV'rf:AEcr-ri'ji; 8tacrtoA. fji; .
coefficient of fatigue, MHX., cruv-ri:A.i:cr-riji; 1<:0nrocri:mi;.
coefficient of fineness, MHX., cruv· -ri:A.i:cr-riji; A.i:nt6t11-roi;.
coefficient of friction, MHX., .cruv-rf:A.i:crti']i; -rptBf\i;.
coefficient of homology, cruvti>A.i-crti']i; 6~toA.oy tKOtT]t0i; . ,
coefficient of hysteresis, <l>Y:E., cruvrnA.i:crn)i; u crti:p~cri:mi;.
coefficient of inertia, cruv-rf:A.i:crti)i; u8pa.vf:lai;.
coefficient of internal friction, M HX., cruvrnA.rnti'] i; tcrm-ri:pt~ Kfji; -rptBfji;.
coefficient of linear expansion, cruv-ri:A.i:crti)i; -rfji; ypa.µµtKfji; 8ta.crrnA, fji;.
thermal coefficient of linear expansion, 0epµ1Koi; cruv-reA.ecr-ri]i; (-r11i;) ypaµµLKiii:; 8tacrwA.fi i:;.
coefficient of mobility, cruvrnA.i:ct<i)<; Kl VT]'rOtT]t0i;.
coefficient of partition, cruvrnA.Ecrti'ji; µi:ptcrµou .
coefficient of polytropy, METEflP., cruvti:A.rnti)i; noA.utponiai;· [ 7tO
A.utpomKoi; cruvtf:Arnti] i;].
coefficient of rigidity, MHXT., cruv-ri:A.rnti)i; crti: pp6tT]toi;· [ cruv-ri:A.i:crriji; oA.tcr8~0'Effii;· Of:U'rEpov ~t6chov tA.acrnK6tT]toi;].
coefficient of rotation, OIIT., cruv--ri:A. i:cr-rij i; ni:ptcrtpocpfji;. ·
coefficient of stiffness, MHXT., O'UV'rf:Af:O''ri)i; 8ucrKUµ\j/ia.i;.
145
coefficient of strain
coefficient of strain, MHXT., cruv-ri:/crnn)c; l':nmicri:roc;.
coefficient of tension, MHXT., cruv-ri:/crn-ri]c; l':qii:lcKucrµou.
coefficient of thermal expansion, O'DV"C!:AECT"Cl'j<; Eli:pµtKfj<; bHlO'"CO/cfic;'[Eli:pµtKO<; O'DV"CEAEO"Tl'j<; btaO'"COAfj<;).
coefficient of variability, IT AT., cruv-ri:/ci:cr-ri]<; µi:rn~/c Y]"COTlFO<;. 2, = coefficient of variation.
coefficient of variation, LTAT., cruv-ri:/ci:mi]c; napaUayfjc;.
Pearson's coefficient of variation, 7tTJPGOVtav6c; GUV'tEAEG'ti]c; napaA.A.ayfjc;· [auV'tEAEG'ti]c; napaA.A.ayfjc; 'tOU Ili]apaovj.
coefficient of velocity, Y LiP., cruv-rdi:mi]c; rnxuvcri:roc;.
coefficient of viscosity, <DYL., cruv-ri:/ci:cr-ri]c; y /cot6-rrirnc;.
coefficient of volume elasticity, cruv-ri:/crn-riJc; oyKtKfic; t/cacrnKo•riwc;· [ cruv-ri:/ci:mi]c; £/cacrnK6-'tTJTO<; OyKOD j.
coefficient of volume expansion, O'UV"C!:AEO"Tl'j<; OyKtKfj<; btUO'"CO/cfjc;.
coefficients of the quaternion, cruv-ri:/ci:crrni wu 'TE<Jcrapiou· [ -ri:crcraptaKoi cruv-ri:/crnrni].
cofactor, MA0., cruµnapayrov.
cofactor of an element of a determinant, cruµn:apayrov crrntxi:iou 'Tfj<; 6ptso6CTT]<;. .
cofactor of an element of a matrix, cruµn:apayrov cr-rmxi:iou wu µY]'Tpi:iou· [ cruµnapayrov ~LYJ-rpi:iaKou crwtxi:iou }.
146
coherent
cofinal, MA0., cruvri:lctK6<;, f] ,6v· [ 6µo'T1>AtK6<;, f],6v }.
cofinal subset, MA0., cruv-rdtK6v { 6µ0-ri:/ctKOV j un:ocruvo/cov.
cofunction, MA0., crucr( cr)uvap-rrimc;· [ cruµn/criproµanKij cruvap'TY]crt<;}.
trigonometric cofunction, 'tptywvoµzrptKi] auauvcipn1atc;.
cognition, <t>IJ\., AOr., yvrocrnK6-'TY]<;.
theory of cognition, 9i;copia 'tfj<; yvwan KO'tqtoi;.
cogredient, MA0., cruyK!ctnK6<;,f], 6v.
cogredient isomorphism, MA0., cruyK!ct nK6<; icroµopq>wµ6c; .
coherence, 1, cruvoxf]· [ dpµ6c;}. 2, MA0., cr6µq>ucrtc;.
coherence of a set, MA0., cruµq>ucrtc; ( wu) cruv6/cou.
coherence of the first order, MA0., 1tpCDTO"CUStO<; O'U~lq>DO"l<;' [ cruµq>Dcrt<; 'tfj<; npWTY]<; 'TUSECD<;}.
adherence of the first order of the coherence of the first order, npwrntcil;wi; npompuati; npwrnml;iou auµcp(JaEwi;· [ npoacpuati; npwtqi; tcil;i:wc;; tfic;; auµcpuai:wc; tfji; npwtqc; tcil;i:w;J.
coherence of the first order of the coherence of the first order, nprow-rastoc; cruµq>ucrt<; nprowrnsiou cruµq>ucri:roc;· {8rnti:poniStO<; cr6µq>ucrtc;}.
coherence of the second order, MAE>., <>rn-ri:po-raswc; cru~tqiumc;· [ cr6µq> ucrtc; 'Tfj<; 8rn-r£pac; 'TUsi:roc;}.
coherent, MA0., J, cruµqiuf]c;,f]c;,tc;· [ cr6µq>moc;,oc;,ov}. 2, dpµtK6<;, 11,ov· [cruvoxtK6c;,f],6vj.
coherent oscillator
coherent oscillator, dpµtK6<;{ cruvoXtK6<;} rn/cavrnrijc;.
coherent reference, dpµtK6v [ cruvoXtK6v J crfjµa avaq>opflc;· [ dpµuo't uvaq>opa}.
coherent train of periodic motion (in the emergent wave), dpµtKl'j aUrilcouxia (-r fic;) ni:ptobtKfj<; Kt vf] cri:roc; ( wu £K8ri /couµsvou Kuµawc;) .
coherently, MA0., dpµtK&c;· [ cruµq>u&c;}.
coherently oriented, MA0., dpµtK&<; [ cruµq>u&c;} n:pocravaw/ctcrEli:ic;,i:foa,sv· [ dpµtK&<; d1Eli:-rriEli:ic;,dcra,£v}.
cohesion, MHXT., cruvi:KnK6tT]<;. atomic cohesion, citoµtKi] auvi:Kn
KO'tTJ<;. multiple cohesion, noA.A.an:A.1') auvi:
KnK6tqc;.
cohesive strength (of soil), MHXT., O'UVEK"ClKl'j UVWXiJ { UVTOXiJ O'DV!:K"ClK6'°tT]"CO<;} (wu l':Mqiouc;).
Cohn-Vossen (S. -), (L.) K6v-B6crcri:v ( = cr6yXPovoc; µa.Elriµa.nK6<;).
Cohn-Vossen theorem, Kov~ocrcri:vtav6v Eli:ffipriµa· [Eli:ffipT]~La wu K6v-B6crcri:v }.
.cohomology, MA0., cruvoµo/coytKO'TTJ<;' [ cruvoµo/coyia}.
Cech cohomology, tGEX!ClVi] auvoµoA.oytKotqc;· [ auvoµoA.oytKotrii; mu TatK}.
Eichler cohomology, EixA.i:ptavi] auvoµoA.oytK6t11i;.
Grothendieck cohomology, ypo9i:v-8tK!ClVi] auvoµoA.oy1K6tqc;· [ auvoµoA.oy1K6Tr1c; toU rKp69EVVnKj.
cohomology class, cruvoµo/coymKij
coincident loci
KM.me;· [ Klcacrt<; cruvoµo/coytK6-rriwc;}.
cohomology group, MA0., cruvoµo/coytaKij 6µac;· [ 6µac; cruvoµo/coytK6-rriwc;].
r-dimensional cohomology group, pm81ciatatoc; auvoµoA.oy!ClKi] 6µcic;.
cohomology sequence, cruvoµo /coymKij UKo/couElia· [ uKo/couElia cruvoµo/coytK6n1wc;}.
cohomology theory, cruvoµo/coy w.Kij Eli:ropia· [Eli:ropia 'Tfi<; cruvoµo/coytK6'TY]W<;}.
coil, HAEK., nriviov. inductance of coil, llnaywy1K6tqc;
(rnu) nqviou. induction coil, llnaywytKOV nqviov.
reactance [reaction} coil, ava8paanK6v 7tJlVLOV' {7tJlVlOV ava8pacrt6-'t1lt0s' nqvlov ai;pyou avncrtciai:ooc;· avo.opcicrtqc;}.
coin-matching game, MA0., nai.yvwv ('Tfj<;) npocrapµoyfjc; ('T&v) Ki>pµamv· [«Kopffiva f] yp<iµµa'TO.>> j.
coin-tossing, MHXT. MA0., avappn1nc; Kspµawc;· [ cr-rpi\lftµo , n.x. ni:v-rapac;, cbc; «head or tail)), «Kopffiva t] ypaµµarn))].
coincide, cruµnin: -rro.
coincidence, MA0., cr6µn:'trocrtc;. curve of coincidence, KaµnuA.11 auµ
mwai:ooc;.
coincidence circuit, HAEK., cruµmrocrtaK6v K6K/croµa.
coincidence gate, AOrIHv,L, cruµn:'TCDCTtaKij 86pa.
coincident configurations, cruµninwvrnc; crxri µancrµoi.
coincident loci, rB1M,, . 0Uµninwv-ri:c; -r6not.
147
colatitude
colatitude, cruµnA. ii pwµa nM:mu:;.
colatitude of a celestial point, cruµnA. TJ pw~tanKOV nM:m:; [ 1tOAlKTJ an6crrncrt:;} miµi:iou mu oupavoii.
colatitude of a point on the earth, cruµnA. ii pwµa nA.amu:; crri µi:iou 't'fj:; yfj:;.
collapse, M HX., Karappwm:;.
collapse load, M HX., <popriov KU
rnppsum:w:;· [ 6ptaK6v cpoprlov }. (:EYN.: limit load).
collapse mechanism, µrixavtcrµ6:; Karappi:ucri:w:;.
elementary collapse mechanism (of rigid frame), O"tOLXt troonr; µi1xavtcrµor; lC<l'tappt\JcrtOJ<;; { crtOLXtLcl:JOT]<;; acrta-9tta} (crtEppoii itA.mcriou).
collapse of a structure, KU't'appwcrt:; mu ooµiiµam:;· { KUTappsucrt:; 't'fj:; OlK000µ1"j:;j.
collate, Aorn:M., cruvrnl;i9i:r&· [ crucrcrwµar&}.
collation, 1, PAMENT., avnnapa(3o!vii. 2, AOrILM., crucrcrro~ta't'rom:;· [ cruvrnl;t91irrim:;}.
sequential collation of range, aKoA.ou9T]nKii avnitapaPoA.ii ("COii) EKtaµawr;· [ crucrrnµa EKtaµanKi'}<;; avn-7tapaPoA. i'}r;}.
collation sequence, AOrIEM., cruvrn1;19t:nKT) aKolvou9ia.
collator, AOrILM., cruv1a1;19i:rri:;· [ cruvrnl;t9t:nK6v oiacrKwov}.
collecting terms, MA0., napi:v9i:nKT) 1tcplO"lJAAOYTJ opwv.
collection, 1, cruAA.oyf). 2, MA0., = aggregate.
collective action of a number of single impulses, MHX., crulv-
148
· ·collision
/voytKTJ opi'icrt:; nA.ii9oU<;' . µoVlULWV 6 p µci:>cri:wv.
college, AMEP., KoU{;ywv ( = a, 'iopuµa UVWTi:pa:; TcTpat;mii:; muxtaK~:; eKnatosucri:ro:;" (3 , navi:mcrrri~naK6v rµfjµa nrnxtaKil:Jv Kai µcTU1tTUXlUKWV crrrouo&v).
collimate, I , orrri:uw. 2, cruvo1ni:uro (= pu9µisro 1tp6:; orrniucrtv).
collimation, I. OflT., onTCucr1:; ( = crK6rrsucrt:; ot' orrnKOU opyavou). 2, cruv6rrrnucru; ( = orrrcun Kl)
pueµwt:;) . line of collimation, ypaµ~ui oitreu
crewr;· [ om:npia ypaµµi1].
collimation error,"crcpaA.µa onri:ucri:ro:;· [ crcpaA.µa (A.6ycp) crK-0nwnKfj:; e1nponfj:;}.
collinear, cruyypa~t~nK6:; , ij,6v.
collinear planes, cruyypaµµtK<i btini:oa. (:EYN.: coaxial planes).
collinear points, cruyypaµ~ttKa crriµi:Ia.
collinearly, cruyypa~tµtK&:;· [eni 't'fj:; aur~:; i:u9cia:;}.
collineation, cruyypaµµtcr~16:;. axis of collineation, ii~wv (roii) cruy
ypa~1µtcr~t0ii .
center of collineation, Ki:v-rpov (roii) cruyypaµµtcrµoii.
collineatory transformation, cruyypaµµtK6:; ~ti:rncrx11µancrµ6:;.
collineatory transformation of a matrix, cruyypaµ~nK6:; µnacrx11-~iancrµ6:; ~lTJ't'psiou.
collision, <l>YI., cruyKpoum:;. Coulomb collision, KouA.oµPtavij
cruyKpoucrtr;• [cruyKpoucrtc; Kou),6µ]. elastic COilision, EAUcr"CtKll cr\JyKpOU•
crtr;.
collision ionization
inelastic collision, QVEAClcr'ttKii cr\JyKpOUcrtC,.
ionization by collision, = collision ionization.
collision ionization, cruyKpoucrnK6:; tovncrµ6:;· [iovncrµ6:; EK cruyKpoucrsro:;}.
collision rate, pu9~16:; [otanµi]j croyKpoucri:rov· [crux v61ri:; cruyKpoucri:rov }.
colloidal particle, KoA.A.oi:toe:; crroµanov.
cologarithm, cr0Uoyap19~10:;.
«Colonel Blotton (16 naiyvwv) x11; MnA.6non.
color, xpwµa.
game, MA0., «Luvrnnmra p-
four-color problem, TOCTOJ\., itp6-PA.1iµa {tfjc;) terpaxpwµiar;.
color index, xproµanK6:; OctKTT):;.
colorimetry, <l>Y:E., xproµarnµi:rpla.
coloring, MA0., xpro~1ancrµ6:;.
column, 1, MHXT., crruA.o:;. 2, MA0., crrfiA.TJ.
bases of columns, MHXT., Pacretr; tciiv crtUAOJV.
beam-column, M HXT., crtuA.oooKor;.
elastic column, MHXT., £A.acrnKor; crruA.or;.
elastically restrained column, EA.a<HLKcii<;; CtVEcrtUAµEVOC, crtUAOC,.
idealized theoretical column, MHXT., ioeator; [l0av1KEW1tvor;J 0ewpntt Kor; crt\JA.or; .
fixed-ended vertical segments of columns, MHXT., &~1cpiitaKta KataKopuqm wiiµma (tciiv) crr\JA.wv.
foot of a column, MHXT., itoiir; [itoot} (wii) crtuA.ou.
modal column, MA0., tp07tT]ttKii crtiiA.TJ.
Combescure transformation
multiple-column matrix, it),Et0v6-crtnA.ov µT]tp eiov.
original straight-line shape of a column, MHXT., apxtKii e\J0uypaµµor; otaµopcpii crt\JA.ou.
single-column matrix, MA0., µov6crtnA.ov µT]tpeiov.
tops of (the) columns, Kopucpal [ KEcpaA.aplCl} tciiv crtuA.wv.
column-binary code, AO rILM. ,<J't'TJA.oouaotKO<; { crt VOOUUOLKOS} KW-011;.
column index (of the determinant), oi:lK't'TJ<; crrfiA. ri:; ( 6ptsoum1:;).
column matrix, <JTT)AtK6v ~1111pi:tov. multiple-column matrix, itA.i:tovo
crtnA.ov µqtp Eiov. single-column matrix, µov6crtnA.ov
µT]tp eiov.
column maxima, O"TTJAtK<i [ ra Kara cr't'ijlv11v} µi:y1crrn.
column of a determinant, crrfilv11 't'fj<; 6ptl;;oucrri:;.
column of a matrix, cr1!1A. ri mo µT]rpdou .
column top, MHXT., Kopu<pi] [KccpaM:pt} mu crruA.ou.
column vector, <JTTJAtK6v avucrµa.
colure, KoA.oupwv· [K6A.oupo:; KUKlvo:;· KoA.oup6KuKA.o<;}.
equinoctial colu re, icrT]µEptavor; KO· A.oupor; (KUKA.or;).
solstitial colure, iiA.t0crtac:naKor; KO• A.oupor; (KuKA.or;).
coma, OTIT., K6µri.
Combescure transformation of a curve, Koµ(3i:crKouptav6<; µi:mcrxTJ µancr~LO<; Kaµ nu A. T)<;' { µi:rnO"XT)µancrµ6<; KaµrruA. ri:; KU't'a KoµnfoKtouap}.
Combescure transformation of a
149
combinable
triply orthogonal system of surfaces, Koµpi;mrnuptavoc; µETUcrx1iµanCJµ6c; •PtCJop8oycovtKou CJUCJri]µawc; £mcpavw7>v· [ µETUCJXl]~tanCJµoc; Kena KoµnfoKtouap wu •ptnA.G.Jc; 6p8oycovtKou CJuCJn1µawc; £mcpavEtG.lv].
combinable, CJUVOUUCJL~toc; , oc;,ov.
combination, 1, MA0. , cruvouacrµ6c;. 2, cruvouacr~16c;· [£vcomc;· cruv8ccrtc;].
convex linear combination, Koproi; ypa~tµtKo<; crov1ioacrµ6i;.
forbidden combination check, AO· rn:M ., cimnopsoµEVT] crovcSoacrnKi] t~£A.i:y~ti;· [t~£A.i:y~1i; Kat' cimnopsoµzvov crov1ioacr~16v ].
linear combination (of two or more quantities), ypaµ~nKo<; crov8uacrµ6i; (Mo i1 1rnptcrcrortpcov nocrori]rcov).
number of combinations of n things (taken) r at a time, cipifJµoi; [ nf.T1floi;] crovcSoacrµiiJv v uvnKi:tµtvcov uvu p.
odds of combination, cruµnrrortK6-•TJ<; cruv1iuacr1.wu· [croyKuplat cruvcSuacrµrov ].
theory of combinations, fli:copia <rov cruvcSoacrµrov.
total number of combinations of n different things, 6A.tK6<; up1flµ6i; cruvcSuacrµ&v v 1ita<p6pcov civnKctµtvcov.
combination analysis, = combinatorial analysis.
combination of matrices, cruvouacrµoc; µl]rpcicov.
fundamental Jaws of the combination of matrices, fJi;µcA.tcJ:JcSmi; v6µot wu cruvcSuacr~tou <rov µT]rpi:icov.
combination of n things (taken) r at a time, cruvouacrµoc; v avnKELptvcov UVU p.
combination of n things taken r at a time, when repetitions are allowed, cruvouacrµoc; v avn-
150
combining volumes
KEtµEVCOV UVU. p, ~LET' E7tUVUAij\jfECOV.
combinatorial, cruvouacrµtK6c;, 11,6v ( = •ffiv cruvouacrµffiv).
combinatorial analysis, cruvouacrµtKi] UVUAUCJl<;.
combinatorial geometry, CJuvouacrµtKi] yi;coµE•pi.a.
combinatorial multiplication, cruvouacrµtKoc; rroUarcA.acrtacrµoc;.
combinatorial topology, cruvouaCYptKi] wrroA.oyia.
combinatorially equivalent, cruvouacr~ttK&c; icroouvaµoc;,oc;,ov.
combinatorics, MHXT.MA0., CJUVouacr~tt Kll.
combine, MA0., cruvou6.1;;co.
combined, MHXT.MA0., cruvouacrr6c;, l] ,ov· [ cruv(oc)ouacrµtvoc;, l],ov· ~llKTO<;, 11,ov· O'UV8ETO<;,O<;, ovj.
combined experience table, ET AT. , rr[va~ cruvouacrrfjc; (uvaA.oytcrnKfjc;) nctpac;· { O'UV8ETO<; (avaAOYLGHKO<;) rrivu~ 8vl]mµ6n1-wc,].
combined moment of inertia, CJUVouum:i] { O'UV8ETO<;j porrij aopuVctU<;.
combined stress, MHXT. , cruvouuCJTi] [ cruvoi;ouucrµtvl]] •amc;.
combined variation, MA0., cruvouucrn) [ cruvoi;ouucrµtv11] µi;rnA.A.uyi].
combining volumes, XHM., cruvouamc; {ZVCOcrt<;} oyKCOV.
law of combining volumes, v6µ0<; O"lJVOllclO"!:CO<; Oy!CCOV.
combustion
combustion, <I>YI., Kaucric;. internal combustion, tcrcori:p1Ki]
KUUO"l<; • .
spontaneous combustion, alnoycvi]i; Ka\icrt<;.
combustion chamber, cpA.oyo86.A.uµoc;· [8aA.a~wc; KUUCJccoc;].
comitant, MA0., nupoµupwuCJu ( = UVUAAOLCOTO<; ll O'UVUAAOLC0-1"i]).
weight of a comitant, papoi; [ crmOµT]ti]} •fi<; napo~iaprnucrrii;.
comma category, MA0., KUTT]yopiu K6µµuroc;· [ KoµµunKi] Kannopiu].
command, AOrn:M., npocrrnyi]. preparation in machine language of
the commands to be inserted into the memory of a computer, i':rntµacria { cruvra~t<;} Ei<; µT]XUVT]µanKOV i1iiroµa <wv npocr<ayiiiv <iiiv Eicrax0ricroµtvrov i:ii; TO µvri~ttK6v wu A.oytcrµT]•ou.
radio command, pacSwnpocrrayi]· [ pacStaKi] npocrmyfi].
system of commands, crucrrriµa npocr<ayiiiv.
command guidance, AIAI:T., npocrtuKnKi] [ crl]µmtKi]j OOT]YEcriu.
command guidance system, AIAIT., npocrTUKTlKOV [ Gl]µUTOOllYEnKOV J O'UO'Tl]µU.
commencement, evup~tc;.
commensurable, MA0., cru~1µE•p11-•6c;,i],6v· { O'UppE1"pO<;,O<;,OV}.
commensurable magnitudes, crwtµE-rp11ra [cr\J~tµE-rpuj µcyt811.
commensurable quantities, cruµµf:'"Cpl]rni[ cru~tµErpot] nocr6Tl]TE<;.
comment, crx6:1.iov.
commerce, E~trr6p10v· (KU'"C' avnota-
common difference
crrnA.i]v rrpoc; TO trade, cruvaA.A.uyi], i"] £µnopcia, Kai business, £µrropiu).
commercial, £~mop1K6c;, i} ,6v.
commercial power, HAEK., OIK., E~trroptKi'j OUVUO'L<; ( = TJAEKTptKi] OUVUCJl<; rrpoop11,;0µ£Vl] Ot' £~moptKi'jv xpfim v).
commercial year, £µrroptKov i'.rni;.
commission, £cpopcia ( = avco•un1 £rrnporri]).
commissioner, i'.cpopoc;.
committee, £n:nporri]. advisory committee, yvroµocSonKl't
tmrponi].
commodities, OIK., oiKOVO~llKCt ayuea. · [ ayaea].
Commodities Exchange, OIK., Xp11-µunCJTi] pwv 'E~mopw~Lu rcov.
common business oriented language, KOLVi] £µrroptOGKOntKi] yA.fficrcru· {Koµrr6A.}. (IYN.: COBOL).
common catenary, MA0., Ko1v1i UAUO'OELOi]c;.
common characteristic, Kotvov xapaKn1ptcrnK6v.
salient common characteristics, tl:#xovra {Kaipw} l<OlVU xapaK'tT]Pl• crnKa.
common cycloid, MA0., Kotvi'] KllKAOf:toi]c;· {KOL VOV KlllCAOEtOE<;).
cQmmon denominator, MA0., KOt
voc; nupuvoµucr•iJc;. least [lowest] common denomina
tor (of a set of fractions), tA.axicrwi; Kot voi; napovoµacrri]i; ( cruv6A.ou KAa· cr µci m v).
common difference (in an arithmet-
151
common divisor
ic progression), MA0., A.6yoc; (rfjc;) apt8µ11rncfjc; rcpo68ou.
common divisor, MA0., Kotvoc; 8tatptn1c;. (LYN.: common measure).
greatest common divisor, µtytcrwc; Kotv6c; &tatphric;.
common factor, MA0., Kotvoc; rcapuywv· [Kot voc; 81mpt1T]c;].
common fraction, MA0., KOtvov KAciaµa.
common law, NOM., £8tµ6Kotvov 8iKatov.
common limit, MA0., Kotvov 6-ptov.
common logarithms, Kotvoi A.oycipt8µot.
common machine lang,uage, AOrILM., KOlVTJ µT]')'.UV1WUHKTJ y'Awcma.
common measure, MA0., KoLvov µfapov· {Kot VOC, OtatptcT]C,j.
• common multiple, MA0., Kotvov rcoA.A.arcA.ciaLov.
least {lowest] common multiple, tAaxiawv Kot v6v rroAAurrAacrtov.
common notions, rEOM., (ai) Kotvai i::vvotat (mu EuK).sioou).
common perpendicular (to two or more lines), Kotvl] Ka01>rnc; (80o f] rccpmaortpwv ypaµµwv).
common points, Kotva crriµcia.
common ratio of a geometric progression, 'A6yoc; ci'jc; yswµs-1pudic; rrpo68ou.
common syllogism, AOr., Kotvoc; [ crnvi]8ric;J 00Uoymµ6c;.
communicate, £mKmvwvw.
152
commutative algebra
communication, 1, TEXN., £mKotvwvia.. 2, MHXT. MA0., AOr., £mKotvffiv11mc; ( = £mKOt vwvia ~1srn~u mcrnwµtvwv av8primwv).
mathematical theory of communic?tion, µu0riµanKi) 0£co;iia rf]c; tmKOt vcovi)cr£coc;.
telecommunications, TJlAEmKotvrovim.
theory of communication, 0£cop[u rf]c; tmK01vrovi)cr£coc;· [emKotvrovqnKi) 0£copia].
wire communication, TEXN., tvcrupµawc; emKOLV<.OVLU.
communication engineering, £mKOtVCOVT]HKTJ ~LTJXUV01EXVLU.
communication theory, f:rrtKotvroVTJnKT] 0zwpia'{81>wp[a 1fjc; ETCtKOt vwvi]a1>wc;].
commutable, MA0., I, avnµsrn8s-16;,11,6v. 2, ~1srn1pEm16c;,f],6v.
commutable matrix, avnµsrn81>16v µ11 1psiov.
commutation, l, µsrniporr~. 2, avn~1n6.8smc;.
cammutation columns, AL<D.MA0., anl}.at psrarponfjc;.
commutation symbols, AL<D.MA0., 06µ00}.a pnmporcfjc; (£111aiac; npoc68ou).
commutation tables, AL<D. MA0., n: ivan; ~1srn1porrfjc; (rfjc; rcpov68ou).
commutative, ni<6c;,1),6v· 6v}.
MA0., avnµs1a81>[ avrnUaKnK6c;,f],
commutative addition, avn~1s1a8snK~ rcp608.smc;.
commutative algebra, avnµs1a81>ff:i1 Ci.A. ysp,'Ja.
commutative group
noncommutative algebra, µi] avn~l£i:a0£nKi) aAy£~pa.
commutative group, avnµs1a8snKll oµac;.
ncncommutative group, µi) avnµE· TU0£nKi} 611ai; .
commutative Jaw, avnµsrn8crtKOC, { aviaUantKoc;} v6poc;.
commutative law for the combination of two quantities, avnps-1a8snKOC, v6µoc; wu auv8uaaµou ouo rcocron)iwv.
commut.ative law of addition, avnµsia0snK6c; v6µoc; 1fjc; rcpoa8foswc;.
commutative law of multiplication, av1iµsrn8snK6c; v6poc; WU TCOAA.arc'Aamaaµou.
commutative multiplication, avnµs-1a8snKoc; rcoA.A.anA.acrtacrp6c;.
commutative principle (of addition or multiplication), avnpsm8sTlKTJ [avrnUaKnKT]j iot6111c; (ifjc; npocr8foswc; t] mu rroP.A.anlvamaaµou).
commutative ring, MA0., avnµsm0snK6c; oa.Kiu'Atoc;.
commutative substitutions, avn~1s-Ta81>nKai urroKarnmacrstc;.
commutativity, 6.vnps1a8snK6111c;.
commutator, MA0., µsrniponsuc;.
commutator of elements of a group, MA0., psrniponsuc; (1wv) awtxciwv (ptuc;) opaooc;.
commutator subgroup, MA0., urrooµac; µsrnipom:cov.
commute with (a square matrix), avnµsrn1i8sµat npoc; ( 1s1paywVtKOV µ111psfov).
compactness
commuting obligations, OIK.MA0., µsmiponi] unoxpswaswv· [ µs-1a1porri] xps&v}.
comonotone, 6poµov6wvoc; ,oc;,ov· [ cru~tµov6wvoc; ,oc;,ov}. · ·
compact, MA0., awmayi]c;,i]c;,tc;. weakly compact, &.cr0i;vii\c; cruµn:a
yi) c;, i) i;,tc;.
compact connected set, auµnayl':c; CTllVUTC'"COV auvoA.ov.
compact form, aupnayi]c; [f.viaia] µoprpf].
more compact form, rr£ptcrcr61£pov cruµrrayi)<; µop(j)i).
compact matrix, aupnayl':c; [ aovo: mtKOV} µ111pdov. ·
compact matrix form, auµrcayi]c; [ CTUVOTCHKTJ} µ111pctaKT] µop• qn).
compact set, MA0., auµrrayl':c; auv:.. OAOV.
bicompact set, 010-uµrraytc; cruvoAov.
countably [ sequentially] compact set, cmupt0µqi:iiic; [ UKO~.ou0T}nK&i;J cruµrraytc; 0-UVOAOV.
compact space, MA0., auµnayi]i; xwpoc;.
locally compact space, romKiO<; cruµrrayi]i; xropoc;.
compactification, MA0., auµnayiffimc;· [ auµni]Kmmc;}.
one-point compactification, µovocr11µ£taKi) crwmayirocrtc;.
Stone-Cech compactification, cruµrruyiwcric; [ cruµrri)Krcomc;] (wrroAoytKou XOOPOU) KUTU fa6ouv-Tcr{;K.
compactification process, MA0., auµrcaytwnKT] otaotKaaia· [otaotKaaia auµnaytfficrswc;j.
compactness, MA0., auµnayt6n1c;.
153
compactness theorem
paracompactness, rrapacruµrray16-i:1ic;.
weak compactness, acr0ev1ic; cruµrray16r1ic;.
compactness theorem, 9sffip1iµa tfjc; crntmayt6tT]toc;.
compactum, MA0., TOITOA., (to) cruµrmyec; ( = 6 cruµrray1) c; Kai µstpi)crtµoc; t07tOAOYLK6c; XWpoc;) .
companion matrix (of an algebraic equation), MA0., cruvo86v µT]tps'lov (ciA.yspp1Kfic; £s1crfficrswc;).
company, OIK., f:tmpEia.
comparability, rrapaPA.TJtOtT]c;'[ cruyKptmµ6tT]c;j.
comparable,rrapaPA.TJt6c;,ft,6v· [ cruyKpicrtµoc;,oc;,ov ].
comparable function, rrapap/, T]tTJ cruvciptT] crtc;.
comparative method, cruyKprnKi] µ€9o8oc;.
comparator, AOrI.EM., napaPA.TJtftc;· f avnrrapaPA.TJtiJc;· civnrrapapoA.suc;J.
compare, cruyKpivw· [rrapapaA.A.w· &.vnrrapapciUco ) .
comparison, O'UyKptcrtc; · { rrapapoJ...ft· avnrrapapoA.ft}.
method of comparison (for solving equations), µt 0oooc; tfj c; avnrrapaf3o/d'jc; (ota i:T]v i:rriA.ucrtv i:~tcrrocrerov).
comparison data, MHXT.MA0., crt0tx;sla. [8s8oµf.va] &.vnrrapaPoA. fie;.
comparison date, OIK.MA0., ftµspoµT]via civtmapapoA.fjc;.
comparison of the equations, civnrrapa.poA. iJ t&v £stcrfficrscov.
154
compensation
comparison test for convergence of an infinite series, cruyKpmKi] Pcicravoc; cruyKA.icrnwc; cirrdpou O'Etpiic;.
comparison theorem, 9sffipT]~W. tfjc; avnrrapapoA.i'j c;.
compass, 1, rrusic;. 2, 8taPiJ1TJc;. mariner's compass, vauwci] rru~ic;·
[ 1t\J~ic,j. Napier's compass, varrteptavoc; 01a
f3T]i:1ic;- [ 81af3t1n1 c; mu Nerrtpouj. ruler and compass construction, KCl
tacriceui] µi: KClVOVa Kill 8111f3~tf1V.
compass heading, NAYT., rru~t8tKTJ rropsia.· [ rropEia rrusi8oc;j.
compasses, 81aPiJn1c;. (EYN.: dividers).
proportional compasses, avaA.oytic6c; 01af3t1i:1ic;.
universal compasses, ap0prot6c; ol!lf3T]t1ic;.
compatibility, MA0., AOr., cruµPtPacrt6tT]c;.
equipment compatibility, J\Orl:EM., cruµf31f311crt6t11 c, i:~apncrµou· [i:~apttcrµtKTJ cruµf31f311cri:6n1c,].
compatibility equations, MA0., £s1-crfficrs1c; cruµPtPacrt6tT]toc; · [cruµPtPacrttKai £s1crfficrstc;}.
compatible, cruµPtPacrr6c;,ft,6v . .
compatible deformations, MHXT., cruµpipacrmi rrapaµopcpfficrw;.
compatible equations, MA0., cruµPtPa.crtai £stcrrocmc;.
compensating errors, cruµ\jlT]qJtcrn-Kci crcpciA.µara.. ·
compensation, 1, OIK., cruµ\jli)qnmc;· { cruµ'l'T]QJL0'µ6c;j. 2, MA0., &.vn\jlftcptmc; ( = civncrtci9µtmc; t] p09µtmc; 01a rnzov crcpciA.µa., cpopav, KtA..).
compensation pendulum
compensation pendulum, avn\jlT]q>tcrttKov £KKpsµ€c;.
compensation signals, THAEM., &.vn\jlT]q>tcrnKa cri)µa.ta..
compensatory, cruµ\jl11<J>tcrnK6c;, it, 6v.
compensatory errors, cruµ\jlT]q>tcrnKU crcpci/,pata..
compete, OIK., crova.ywvisoµm.
competition, 1, OIK., cruva.ywvtcrµ6c;. 2, 8taywvicrµ6c;.
cutthroat competition, mpaytacrttic6c; cruvayrovtcrµ6c;.
duopolistic competition, ouorrroA.taic6c; cruvuyrovtcrµ6i;.
imperfect competition, ateA.i]i; cruvayrovtcrµ6i;.
monopolistic competition, µovonroA.mK6c, cruvayrov1crµ6i;.
competitive, OIK., cruva.ywv1crnK6c;,i1,6v.
competitiveness, OIK., cruvaywvtcrnK6tT]c;.
competitor, OIK., cruvayffivtcrri)c;.
compilation, Aorn:M., 1, cruµrri.A.T]mc; ( = cruyKf.vtpffimc; t&v avayKatffiV lJ7tOO'llpµrov de; Kllpia.v £vta.A.nKT]v crupµftv). 2, cruµrriA. TJ µa..
compile, AOrIEM., cruµmA.& ( = cruyKsvtpci:lvffi imocrupµac; de; µiav Kllpiav £vra.A.nKT]v crupµT]v).
compiler, AOrIEM., cruµrrtAT]ti)c;.
compiling routine, AOrIEM., cruµmA. T]ttKTJ crupµi).
complanation, MA0., £mrrf.8fficrtc; [ O'llVE7tl7tE8(.()(Jtc; j (Ka.µrruA.T]c; £mcpavEiac;) .
complementary energy
complement, MA0., cruµrrA.i)pffiµa.. arithmetical complement (of a log
arithm), Upt0µqrtKOV O"UµitAi}proµu (ev6i; A.oyapi0µou).
orthogonal complement, op0oyroVtK6v cruµnA.11proµa .
radix complement, pt~tK6v cruµrrA.i}proµa· [ cruµrrA.i}proµa pi~11i;].
radix minus 1 complement, pt~tK6V µetov 1 cruµrrA.11proµu · [ cruµrrA.i}proµa pi~11i; µetov l ].
complement of a parallelogram, cruµrrA.i)pro~m (wu) rrapaAATJAOypciµµou.
complement of a set of points, cru~tnA.i)pffiµa. evoc; cruv6A.ou crTJµEiffiv.
complement on N, MA0., cruµrrA. i)pffiµa. µe ~cicrtv [ cruµrrA.ftpffi.,. µa Ka.tci} N.
complement on N - 1, MA0., cruµrrA.ftpwµa µe ~cicrtv -ro [ cruµrrA.1) proµa. Kata] N - 1.
complementarity, <l>YL ., MA0.,cruµ~ nA. T] pffittK6tT]c;· [ cruµrrA.11 proµa.n-1',0't'TJc;}.
complementary, cruµrrA. TJ pffiµanK6c;, 1),6v.
surface complementary to a given surface, emcpuveta cruµrrA.11proµunici) 808eicr11c; £mcpuveiac;.
complementary acceleration, cruµ-7tATJ pffiµa.nKT] bmaxuvcric;.
complementary angles, cruµrrA. T] pffi~w.nKai ywvla.t.
complementary arcs, cruµrrA.~pwµa.nKa t6sa.
complementary determinant, cruµrrA.T]pffiµanKT] 6pisoucra.
complementary energy, cruµnA.T]proµattKTJ £vf.pysta.
155
complementary energy
increment (in complementary energy), al\~1wa (tile; cruµnA.ripcoµanKfj<; tvi;pyi;ia<;).
minimum of complementary energy, tA.axtcrwv cruµnA.qpcoµanKfi<; tvi;pyeia;· [tA.axicrtri crwmA.11pco~mnKii EVEpyEta j .
complementary energy principle, apxiJ 1fjc; crnµrcA. TJ pcoµanKfjc; EVepyEiac;.
complementary extent, crnµrcA. TJ pcoµanKi] i:Krncrtc;. (2:YN.: complementary surface).
complementary function, crnµrcA.riproµanK1) crnvap1ricnc;.
complementary minor, crnµrcA.riproµanKi] sA.acmrov· f D.acrcrrov 6-pif,oocra).
complementary modulus of an elliptic integral, cruµnA. TJ proµanKov µ68tov [ cruµrcA.ri proµanKi] arc6A.urnc; nµijj EA.A.ctTC'ttKOU 6-AOKA 11 pwµarnc;.
complementary parallelogram, croµrcA. TJ pcoµ anKov rcapaA.A.riA.Oypaµµov.
complementary point set, cruµrcA.11-pwµanKi] miµi>tocri>tpu.
complementary regulus, cruµrcA.ripro~1an Kij XUPUKW'tTJ.
complementary solution, crw1rcA.riproµanKij l':rciA.ucrtc;.
complementary surface, cruµrc A.11proµanKi] l':rct<p<ivcta.
complementary system, cruµrcA. TJ proµanKov <:JU<:51T)µU.
method of complementary systems, ~uHlolioc; tcilv cruµnA.ripcoµmtKcilv crucrtri µatcov.
complementary trigonometric function, cruµrcA. ri pcoµanKi] 1pt yro-
156
complete expectation of life
voµe1ptKi] cruvap111cnc;. (2:YN.: trigonometric cofunction).
complementation, MA0., cruµrc A.riproµamcrtc;· [ crov1EA.i>ta}.
complementator, MA0., cruµn A.riproµancr1f]c;· [ crov1eA.i>tro1i]c;}.
complemented, MA0., cruv1i>A.f]c;, i]c;,Ec;.
complete, AAr., J, cruµrcA.ripw. 2, l':v1i>A.& ( = Ka0tcr1&, rc .x. £va. ne8iov, sv1i>A.tc;).
complete, I , MA0., sv1i>A.i]c;,11c;,tc;. 2, TCA 11PTJc;,11c;,cc;. 3, arcorccpa.1co-8Eic;,dcra.,tv.
boundedly complete, nepatcil<; tvtdfi<;, i]<;,tc;.
model complete, MA0., npownotcA. fi<;, fi <;,tc;.
weakly complete, MA0., <icr0cvcilc; EV'tEA i]c;, i]c;,tc;.
complete carry, Aorn::M., l':v11>A.i]c; Kpa1ricr1c;· [1i>A.cia µi::rncpopu Kpmou~itvou }.
complete convergence of the sequence (or series) of vectors, MA0., EV'tcAl)c; cruyKAtcrtc; UKOA.ou8iac; (11 cretpiic;) avocr~iamv.
complete description of the motion, l':v1i>A.1)c; 8taypacpricrtc; [ rcA.i]pric; 81aypacpi]} 1fjc; Ktvf]creroc;.
complete dynamic summetry, l':v1£A.i]c; 8uvaµtKi] croµ~t£1pia.
complete elliptic integral, svrnA.Ec; l':AA.i>trcnKov 6A.oKA. i] pro~ta..
complete equation, sv1£Ai]c; ssicrrocnc;.
complete expectation of life, l':v-1i>A.i]c; [ rcA. f] pric;J npocr8oKia. l':m~tcilcri>roc; .
complete field
complete field, MA0., sv11>/1.£c; rci>-8iov.
complete graph, l':v1i>Mc; ypacpriµa .
complete group, l':v11>/.i]c; 6µac;.
complete induction, AOr. l':v11>-A.i]c; [1i>A.da} l':rcaycoyf] . (l:YN.: mathematical induction).
complete integral, l':v11>A.ec; 6A.0KA.11-proµa.
complete limit, svrnA.ec; optov (aKOAOU8iac; cruv6A.rov).
complete normed linear space, l':v'!cA. i]c; yvroµovta.Koc; ypaµµtKoc; x&poc;.
complete operation, AOrn:M., sv-1£Ai]c; rcpi'istc;.
complete orthornomal system, sv'!cA.ec; op861UK10V <:JU<:51TjµU.
complete oscillation, l':v1i>A. i]c; [ 1£A.i>ia} rnA.av1rocnc;.
complete perspective, MA0., sv11>A.i]c; rcpoomtKi]· [£v1eA.i]c; 6µ0-A.oytK61ric;J.
complete primitive, sv1eA.1)c; rcpro•6yovoc;.
complete primitive of a differential equation, l':v1i>A.i]c; npro16yovoc; 8tacpoptKfjc; l':l;tcrcilcri>roc;.
complete quadrangle, l':v1eA.l':c; [ rcA.fipi>c;] 11>1paK6pucpov.
angular point of a complete quadrangle, otayciJvtOV { ycovtaKOV} m1-µEtOV wu nA.i] pouc; tEtpaKopucpou.
complete quadrilateral, rcA.fjpec; [tv-1eA.ec;} Tc1parcA.wpov.
diagonal line of a complete quadrilateral, oiaycovucfi otaµi;croc; I oiaµEcroc; 'tOOV otaycovicov} tou nA.i]pouc; 'tEtpaitA.c\Jpou.
completely separable space
diagonal triangle of a complete quadrilateral , otayciJvwv tpiycovov WU nA.fipouc; t EtpanA.i;upou.
opposite sides of a complete quadrilateral, <ivnKciµi;vai ['Evavn] nA.i;upai wu nA.i]pouc; tEtpanA.i;upou.
vertices of a complete quadrilateral, (a[ e~) KOpucpai WU n/ci]pouc; 'tE'!paltAEUPOU.
complete residue system modulo n, EV1cAEc; crucr1riµa KCJ..1UAOL1tffiV KU'tcl ~tOOtOV V.
complete scale, EVTcA i]c; [ rcA.f] pric;J ( apt8~ttK11) KA.i~ias.
complete space, MA0., l':v1i>A.1)c; x&poc;.
complete structure, sv1i::Uc; 86µT)µcc [ arcorci>pam8eic; cpopi>uc;]. ·
complete surface, sv1i>A.i]c; l':mcpavi>ta.
complete system of functions, l':v1eA.£c; crucrniµa crova.p111cri>rov.
complete system of incongruent numbers modulo n, £v1£Aec; crucr1ripa acruvap~t6crmv apt8µ&v KU'!U µ681ov v.
completely, l':v11>A.&c;.
completely additive (set) function, £vrnA.&c; npocr0£nK1l Guv<ip•TJcrtc; (cruv6A.ou).
completely enclosed structure, M HXT., f; v1i>A.&c; i:yKA.£tcr'rnV 86µriµa· [rcA.11proc; l':yK£KActaµtvoc; cpopi>uc;j. (I:YN.: diffraction structure).
completely mixed game, MA0., l':v-1i>A.cl>c; µtKTO V rcaiyvwv.
completely separable space, MA0., l':v1cA.&c; 8taxroptcr16c; x&poc;.
157
completeness
completeness, MA0., f:vti:A.i::ta. axiom of completeness, a~lroµa -rijr.;
EVteA.dw;. Cauchy completeness, Krocr1:1av11
Evi:i;A.i;w· [Evi:€A.s ta i:oii Krom)]. Dedekind completeness, oEoEKl v
otavi] EV'tEAeta" I EVtEAeta i:oii Nt€V'tEKlVt}.
model completeness, nponJmKi] €vt€A.i;w· { 7tpOtU7tO'tEAEta j .
sequential completeness, aKoA.ou0T]nKi] [enaA.A.q A.or.:, ] evi:€A.eta.
weak completeness, acr0i;vi]r.; evt€Aeta.
completeness theorem, 0i:;ci:>p1wa. -rfj<; EVT£A£ia<; (tou rKaivrnA.).
completing the square, MA0., ow1-nA.11pwcn<; [ anoni:;par:mcrt<;} mu -ri::tpaywvou.
completion, rEnM.,cruµnAilPWcrt<;. equivalent by completion, lcrooova
µor.;,rn;,ov EK cruµnA.ripci>crs@;.
complex, I, MA0., ~nya8tK6<; , 11 ,6v ( = 'tWV µtyaDtKffiV apt8µ&v). 2, MA0., cruµµtKto<;,o<;,ov"[ cruv0£rn<;,o<;,ov ]. 3, MA0., cruµn/...cyµa.nK6<;,i],6v· [cruµnA.£KnK6<;,i] , 6v j ( = r:&v cruµnA.i:;yµar:mv) . 4, MHXT., cruµnAOKO<;,o<;,ov· [ rroA.ucruv8£rn<;,o<;,ov } .
complex, MA0., cruµrrA.cyµa.· [ cruvoA.ov}. (LYN.: set).
158
abstract complex, acp!]p!]µ€vov cr0µ-7tAeyµa.
abstract simplicial complex, ucpqp11-µtvov µOV07t AEyµm:tKOV cr0µ7tAeyi.lU.
algebraic complex, uA.ysPptKov cr0µnA.eyµa.
anharmonic ratio of four complexes, uvapµovtKor.:, A.6yor.; rscrcraprov cruµnA.i;yµcnrov.
apolar linear complexes, unoA.a [a-7t0AtKa] ypaµµ1Ka cruµnA.€yµam.
axis of a (linear) complex, u~rov toii (ypaµµtKoii) cruµnA.€yµamc;.
complex analytic
chain of a complex, aA.ucrtc; (evor.;) cruµnMyi.iamc; .
class of a complex, KA.6.crtc; cruµnA.Eyµai:or.;.
cosingular complexes, cruviot<i~ov-ra cruµnA.Eyµaw.
degree of a complex, Pa0µ6c; (i:oil) cruµnA.€yi.1at0 c; .
dimension of a simplicial complex, otacrracrt~ i:oil µovonA.i;yµanKoil cruµnA.Eyµai:oc;.
dimension of an abstract complex, ot<icrtacrtr.; TOil Ucp!]p1iµtvou cruµnA.i;yµawc;.
geometric complex, yi;roµETptKOV cruµnA.syµa.
line-complex, ypaµµocruµnA.syµa· { cr6µ1tAEyµa eu0etwv j .
linear complex, ypaµµtKOV cruµitAEyµa.
orthogonal complex, 6p0oyrov1Kov cruµnA.i;yµa.
pencil of complexes, ofoµT]µa cruµnA.i;yµcnrov.
potential of a complex, oUVT]tLKov (toil) cruµnA.tyi.wi:or.;
quadratic complex, tetpayrovtKov [oEUTEpoPa0µtov J cr0µ7tAEyµa.
rank of a complex, P6.0µ11µci. toil cruµnMyµawc;.
skeleton complex, crKEAEttKOv cr0µ-7tAEyµa.
simplicial complex, µovonA,syµartKov cruµnA.syµa.
tetrahedral complex, tetpai;opov [ 'tE'tpasoptKOV J cr0µ7tAEyµa.
topological simplicial complex, tonoA.oytKov µovonA.eyµanKov cr0µnA.syµa.
complex algebra, ~nya8tKi] [SmA.fi] lD.yi:;~pa.
complex analysis, MA0., cruµnA.i:;yµa.nKij UVUAl.l<Jt<;" [ avaA.ucrt<;t&V cruµnA.i:;yµatmv ].
complex analytic structure (for a space), µtya.StKij ava.A.unKij Soµi] (ota nva. x&pov).
complex argumellt
complex argument, MA0., ~nyaotKov Optcrµa.
complex Banach algebra, µ1ya.01Kij ~UVUX,tuVll a).yi:;ppa: { µtya8tKij {:it.yi:;ppa. wu MnavaK).
complex Banach space, µtyaotKo<; ~avaxia.vo<; x,&po<;· [ µt yaotKo<; x&po<; mu Mnava.Kj.
complex building, MHXT., cru~mA.oKov [ 7tOAl.l<JtJV8£toV J K'tipt0v.
complex chain, MA0., µiyaotKi] liA.um<;.
complex configuration, MA0., cruµ-µtKto<; { <JUV8£t0<;} cr;(l'}µUtt-crµ6<;.
complex cone of a point, cruµnA.i:;yµanKo<; [ cruµn'AEKttKO<;] KWVO<; evo<; cr11 ~1£iou.
complex conjugate (of a matrix), µtyaotKOV crul,:uyE<; (µ11-rpciou).
complex coordinates, µt ya.otKa.i cruvtEta.yµi;vm.
complex curve of a plane, MA0., cruµnA.cyµa.nKT] [ cruµn'AEKnKljj Ka.µnt'.JA. 11 evo<; E7tt7tEOOl.l .
complex domain, µtyaotKij ni::pwx,i].
circle of convergence of a power series (in the complex domain), K0-KA.oc; cruyKA.icri;roc; ouvaµtKijc; cretpiic; (EV i:l] µtyaotlClJ 7tEPlOX1]).
complex field, µiyaotKov ni:;oiov.
complex Fourier transformation, µtyaotKo<; cpoupii::pta.vo<; µi:;-racrx11~1a.ncrµ6<; · { µtya.otKo<; µEta<JX,T]~Lancrµo<; toli <l>oupti; ] .
complex fraction, <JtJ~tµtKTOV { <JtJV-8£tOV j K'Aacrµa.
simplification of a complex fraction,
complex manifold
anA,oucrteucrtc; { anl.,onoi 11cr1c;j cruµ~1(Kt0U Kl.acrµai:os .
complex frames, MHXT., cruµnA.oKa [ rcoA.ucruv8£ta. j nA.afota.
Complex function, ~nya.OtKlj <Jl.lVUp• 'tll<JL<;.
theory of complex functions, 01:00-p[a •0v µtyaotKwv cruvapTi]cri;rov.
complex function of a complex variable, ~ttyaOtKij cruvapnJ<n<; ptyaotKii<; µEta~AT]'tTJ<;.
complex geometry, ~ttyaotKT] yi::w~ti::tpia..
complex harmonic function, ~nya-
8tKi] apµOVtKll <Jl.lVUPTllcrt<;.
complex in involution, cruµnA.i:;yµa f:v f:vi:;A.i~Et. (L.YN.: orthogonal complex).
complex index, MA0., cruv8cto<; O£iK1T]<;.
complex index of refraction, cruvcruv8£to<; OciK'tll<; oia.0A.acr£m<;· { crt'.Jv80to<; Ota0A.acrnKo<; o£iK't11<;}.
complex integer, MA0., µtyaotKo<; a Ks pa.to<;.
Gaussian complex integers, yrocrcrtavoi µ1yao1Koi C!K€paw1· [ µ1yao1Koi &xtpmot wil rKaouc;j.
complex integration, MA0., µtyaOtKi] 6A.oKA.i]pcocrt<; ."
complex line, MA0., µtyaotKij i::u-8i:;i:a· [ µiyaotKi] ypaµµi]}.
complex line bundle, µtyaotKi] ypaµµtKij ofoµT].
complex linear space, µtyaotKo<; ypaµµtKO<; x,&po<;.
complex manifold, µtyaotKov noA.umuyµa.
159
complex multiplication
complex multiplication, µ1yao1Koi; 1roA.A.arcA.amacrµ6i;.
theory of complex multiplication, 0rnipia wii µ1yaotKOii 7tOAAU7ttcUCHUcrµoii.
complex nonlinear curvature expression, MA0., µ1yao1KT] µT] ypaµµtKT] rcapcicrmmi; KaµrcuA.6-'tTJTOi;· [ rcapcicrrncrti; µ1ya81Kfji; µT] ypaµµtKfji; Ka.µrcuA.6TTJTOi;j.
complex number, µ1ya81Koi; cip18-µ6i;· f µ1yai; ap1eµoi;· µiyai;J.
160
absolute value of a complex number, U7tOAUWc; n~Li] µtyaotKOU apt0-µoii.
addition of complex numbers, rrp6-cr0Ecru; µtyUOLKOJV apt0µGJv.
amplitude of a complex number, EOpoc; µ1yaOtKOii apt0µoii.
argument of a complex number, optcrµa µ1yaOtKOii apt0µoii· { r;opoc; µtyaOtKOii apt0µoii· cpcicrtc; µtyaOtKOii apt0µoii}.
conjugate complex number, cru~u-1Tic; µ1yaotK6c; apt0µ6c;.
division of complex numbers, ow.ipr;crtc; µtyaO!KOJV apt0µGJV.
equality of two complex numbers, icr6•ric; µEml;\J O\Jo µ1yao1KGJv 6.ptflµGJv.
graphical (representation of) addition of complex numbers, ypacptKi] UVUTrUpclcrTacrtc; rrpocrfJECJECOc; /ypacptKi] rrp6cr0ccrtc;} µtyaOtKOJV apt0µGJv.
imaginary part of a complex number, cpavmcrnK6v µi:poc; µ1yaotKoii 6.pt0µoii.
modulus of a complex number, µ6-owv { µi:Tpov} µtyaOtKOii apt0µoii.
multiplication of complex numbers, 7toAAU7tAacrtacrµ6c; µ1yao1KGJV apt0-µGlv.
phase of a complex number, cpacrtc; {optcrµaj µ1yao1Koii apt0µoii .
polar form of a complex number, 1tOALKi] µopcpi] µtyUOtKOU apt0µoii.
power of a complex number, ouvaµic; µtyaOtKOii apt0f.!OU.
complex sphere
quotient of complex numbers, rrriA.iKov >lLYUOLKOJV apt0µGJV.
real part of a complex number, rrpayµanKOV µi;poc; µ1yaOtKOii apt0-µoii.
rectangular form of a complex number, opfJo-fCOVtaia { OpfJoyrJ:Jvtoc;} µopcpi] µtyaotKOU apt0µoii.
root of a complex number, pi~a µ1-yao1Koii apt0µoii.
trigonometric form [trigonometric representation] of a complex number, Tptycovoµr;i:p tKll µopcpi] [ TptycovoµETptKi] OVarrapcicrmcrtc;} µtyUOtKOU a.pt0µoii.
complex of lines, = line-complex.
complex pencil, cruµrcA.EKnKov OEcrµriµa· [otcrµriµa cruµrrA.qµci'tffiV j.
complex-periodic function, ~nyaoo-rcEptootKT] cruvcip1rimi;.
complex plane, µ1yaotKov i';rc[rcEoov.
complex point, µ1yao1Kov mwcfov.
complex quantities, µ1yao1Ka.i rcocr6-TTJTEi;.
complex quaternion, µ1yao1Kov TEO"crcipwv.
complex root of a quadratic equation, µ1ya81KT] pit;a, 8wTEpo(3aeµ iou {;~ wfficrt:rni;.
complex series, µ1ya81KT] O"Etpci.
complex singularity, cruµµtK'tOV loiacrµa· { cruµµtKTOV avciJµUAOV O"Tj~LEtoV j.
complex space, µtyaOtKoi; xwpoi;· [ cru~mAEKnKoi; x&poi;].
complex space of n dimensions, µ1-yaOtK6i; xwpoi; 'tCOV v OtaO"'tUO"WlV" [vu8tcicrrnrni; µ1ya.otK6i; x&;mcJ
complex sphere, MA0., µ1ya.01KT] mpaipa.
complex structure
complex structure, MHX., cru~trcA.oKOV 06µ11µa"[rcoA.ucruvet:rni; <popcui;].
reducing a complex structure to a number of simple structures, MHX., avci/cucrtc; { avaycoyi] f cruµrrAOKOll cpopi:coc; de; apt0µ6v ancov iirr/cfJJv cpop{;cov.
complex term, MA0., µ1yao1K6i; opoi;.
infinite series of complex terms, iirrEtpoc; crr;tpii µtyaOtKOJV opcov.
complex topology, ~nya8tKT] Torco-A.oyia.
complex unit, µ1yao1KT] µovcii;.
complex-valued, µ1ya86nµoi;,oi;,ov.
complex variable, µ1yao1KT] µEta-f3A. Tj'tij.
affix of a complex variable, errfcrnyµa µtyaOtKfjc; µEm[3AT]Tfjc;.
analytic function of a complex variable, cbaA.unKi] cruvcipTT]crtc; µ1yao1-Kfjc; µr;m[3Al1Tfic; .
derivativ({ of a function of a complex variable, napciyroyo; cruvapTi]crEOJc; µ1-yao1Kfjc; µrnif3/crii:fic; .
fundamental period of a periodic function of a complex variable, 0r;µr;/c1rooric; rrr;pio0oc; rrEpwotKfjc; cruvap•i]crEroc; µ1yao1Kfjc; µEmf3/cri•fic;~
imaginary part of a complex variable, cpavmcrnKov µi:poc; µ1yao1Kfjc; µEm[3AT]Tfjc;.
multiple-valued function of a complex variable, n/cr;wv6nµoc; cruvcip1:T]crtc; µ1yao1K1ic; µETU[3AT]Tfjc;.
periodic function of a complex variable, rrr;pw81Ki] cruvcipTT]crtc; µ1ya81-Kfjc; >lETU[3AT]Tfj<; .
regular function of a complex variable, KUVOVLKi] CJUVclpTT]crt<; µtyaotKfj<; µr;m[3AT]Tfj<; .
regular point of a function of a complex variable, KUVOVLKOV CJl"]µELOV cruvapTi]crEOJ<; µ1ya81Kfjc; µHa[3:l.T]cfjc;.
simple (periodic) function of a com-
componen.t
plex variable, arr/cfj (rrr;pwotKi]) cruvapTT]crtc; µtyUOLKfj<; µHa[3AT]Tfj<; .
theory of functions of a complex variable, Or;ropia TGJv cruvapTi]crr;rov (•fie;) µiyaOtKfjc; µEm[3/crii:fic; .
complex-variable theory, 8swp[a Tfjt; µ1 yaotKf\i; µErnf3A. TJTf\i;.
relation of complex-va1·iable theory to prediction theory, cr'(fotc; Or;ropiac; µ1yao1Kfjc; µsrn[3A.r1i:fic; - Kai 0Eropiac; rrpof3Ai:ww>v.
relation of conform1l m1ps to complex-variable theory, crxtcrtc; cruµµ6p9wv EiKovtcr,t'Dv Kai Or;copiac; µ1yaOtKfic; pr;mpl.TJT~c;.
complex velocity, µ1yao110) Taxuvvti;.
complex-velocity potential, MA0., 8uvrinK6v µ1yao1Kfji; Taxuvcrcwi;.
complex zero, MA0., µ1yao1K6v µTjOEV.
complexity, MA0., rcEptrcA.oKi]" {8rctrcA.oKi]j.
complexity units, MA0., µovcioi:c; rcEptrcA.oKfji;· [ µov6.oci; 8rcmA.oKfji;j.
compliance, cruµµ6pcpwmi;.
complicated, rcoA.urcA.oKoi;,o;,ov· [f.rc[rcA.oKoi;,oi;,ov].
complicated patterns of ground motion, MHXT., rcoA.urcA.oKa. otaµopcpcilµarn EOCJ.<ptKfji; Kt vi]O"E(J)i;.
complicated structure, rcoA.urcA.oKov 06µTJ~La"{ rcoA.urcA.oKoi; cpopcui;].
complicated systems, rcoA.urcA.oK.a. [ rcoA.ucruvena} crucr'tl'Jµarn.
complication, i';mrcA.oK.lr [ µrcEpOEµa j.
component, 1, MA0., MHX., au-
161
component
vtcn&cra.. 2. crucrrnnK6v· [ crucrtanK6v crrnixdov].
acceleration component, cruv1crrwcra tfjc; £mtax.uvm;roc;.
active component, MHX., tw:py6r; cruvtcrt&cra.
breaking a force into its x and y components, owx.rop1crµ6r; [010J.umr;/ ouvO.µcroc; Elc; tar; Ka8ernuc; cruv1cr1cilcrar; t1ir;.
Cartesian components, Kaptccria-vai cruvicrt&crm.
direction components, cruvLcrrwcrm ou;u80vcreror;.
energy component, evepyeLUKT) cruvicrt&cra.
horizontal component, 6p1~ovtia cruv1crt&cra.
impedance component, HA.EK., cruvicrt&cra tfjr; napaKroA.unK6tqtoc; .
input component, AOrI!:M., crucrtanK6v (crrn1x.dov) Elcrcpopac;· { crucrKeui] Eicrcpopiic;}.
memory component, AOnrM., crucrtanK6v (crrnix.dov) µvqµ1Kou · [µv11-µ1K6v crrnix.eiov (A.oy1crµ11rnu )· µv11~nJCij crucrKeui]}.
output component, AOnrM., crucrtanK6v (G'tOlX,!::loV) £KcpOpfic;· {GUGK!::Uij £Kcpopar;].
reaction component, MHX., cruvtcrt&cra tfjc; &.vt18pO.creroc;.
reactive component, HA.EK., avaopacrnKi] { ciBatnKi]/ cruvicrt&cra.
rectangular components, 6p8oycilvL-01 (Kaptecriavai) cruvtcrt<'iicrm. storage component, AonrM., cru
crtanK6v (crrn1x.i::Iov) &.no811Keucreroc;· { &.no811KeunKi] crucrKeui] (A.oy1cr~111-toil)· c'tito8T]KTJ I.
162
unknown reaction components, <'iyvrocrtot cruvicrrrocrm c'tvnopO.cre1c;.
vector components, avucrµanKai cruVlcrtc7lcrm· [ cruvtcrtrovta &.vucrµam].
vertical component, JCataK6pucpoc; cruvicrt&cra.
vertical force component, JCataK6-pucpoc; cruvtcrtiiicra tfjc; liuvO.~Leroc; .
vertical reaction component, JCUtaJC6pucpoc; cruvtcrt<l'>cra tfjc; &.vnopO.m::roc;.
components of the stress vector
wave component, KU~LanKij cruv1-crt&cra.
component impedance matrix, µriTpdov na.pUK(J)Al)Tl K6nrroc; TWV
cruvwnovTrov (pwµc'muv Kai ouvuµtK&v).
component of a force, cruvtcrT&cra. (T~<;) ouvU.~ti>roc;.
component of a set of points, cruvicrT&cra cruv6A.ou criwdrov.
component of acceleration, cruvicrT&cra. n'jc; £mrnxuvm:roc;.
centripetal component of acceleration, nv1po~L6A.oc; cruv1crtc7lcra tfjc; tm tax. uvcreroc;.
normal component of acceleration, 6p068i::rnc; {ta Kn Ki]} cruv1crtc7lcra tfjc; £mmx.uvcreroc;.
tangential component of acceleration, £cpamo~1ev1Ki] cruvicrtll'>cra tfjc; £m mx.uvcreroc;. ·
component of reactive force, MHX., cruvicr1&cra Tfj<; &.vnopa.crnKfji; OUVUµcroc;· { O'UVtcrTfficra. UVTlOpUcrnKl) ouva.µt<;}.
componental, cruvtcrTronK6c;,i],6v ( = Tfj<; cruvtcrnocrric;).
components of a vector in a given direction, m.lvtcrT&crm &.vucrµa.wc; KUTU oo0cfoa.v Otcu0uvcrtv.
components of strain, MHXT., cruv1cr1&cra.t Tfj<; EmTU.crcroc;.
components of the strain tensor, MHXT., cruvtcr1&cra.t TOU i:mTa.nKou Ta.vucr~ta.1oc;· [ cruvtcr1&v1a. ETI:tTUTtKU TUVUCY~lUTU j.
components of the stress tensor, MHXT., cruvtcrT&cra.t TOD Ta.nKOU TUVucrµa.wc;· [ cruvtcrTffiVTU TUTtKU TUVUO'~LUTU].
components of the stress vector,
componentwise relaxation
MHXT., cruvtcr1&cra.t wu rnnKOU a.vucrµurnc;· [ cruvtcrT&cra.t TOU avucrµu1oi; Tfji; TUcrcroi;}.
componentwise relaxation, MA0., CTlJVtcrT(J)TlKll XUAUprocrt<;.
compose, cruv8t1ro.
composer, cruv8t111i;.
composite, CTUV0cTO<;,O<;,OV.
composite determinant, cruv0i:rnc; 6pi1;;oucru.
composite differentiation, cruv0i:TO<; Ota<p6ptcrti;.
composite factor, cruv0crn; napayrov.
composite function, cruv0i>rni; cruv-6.pTflcrti;.
differentials of composite functions, owcpoptKci cruv8i:trov cruvaptT]crerov.
composite function of two variables, CTUV0cTO<; O'lJVUpTflO'L<; OUO µf:TU~A flTWV.
composite group, cruv0crnc; 6µ6.c;.
composite hypothesis, cruv81:1oc; un60i:mc;.
composite numbers, cruv81:1ot [ µl) np&rnt J &.pt0µoi.
composite quantity, cruv81:1oc; nocr6n1c;.
composite series, cruv0i:rnc; [ cruv0i:nKl)j cr1:1pa.
composite soap-bubble, cruv0i:rni; crunrovo<pucruA.ic;.
composition, cruv0ccrti;. fallacy of composition (and divi
sion), (to) m;pi tf\V GUV8CGlV (Kai 0Laipecr1v) cr6cp1crµa.
material composition (of a column), MHXT., u/,1Ki] cruv8i::cr1c; (crtuA.ou).
compound fraction
composition factor (of a group), na.payrov cruv0foi:roi; ( 6µ6.ooc;)· [ napayrov cruv0foi:roc; (tv Tij cruv81:nK.1'j cri:tpq n'ji; 6µ0.ooi;)}.
composition in a proportion, cruv-0rntc; EV ( n'j) a va.A.oy(~.
composition of forces, cruv0i:crt~ ( TWV) OlJVUµf:(J)V.
composition of ordinates, cruv0i:mi; (TffiV) Tf:TUyµtV(J)V.
graphing by composition of ordinates, ypO.cp11mc; f unotunromc;] ota cruvOecreroc; trov tetuyµevrov.
composition of proportion, cruv-0rnti; UVUAoyiui;· { UVUAO'YtKi] cruv0i:mi;}.
composition of tensors, cruv0i:crti; (1&v) TUVtJCTµUT(J)V.
composition of vectors, cruv0i:crt~ (1&v) U.vucrµci1rov.
composition series, MA0., cruv0erno) cri: t p U..
compound, I, MA0., cruµµiyi]i;,i]i;, tc;. 2, cruv0i:wc;,oi;,ov· [ cruµµtK'roc;,oc;,ov}.
compound amount, OlK., cruv0i:wv nocrov (Kc<paA.aiou Kai TOK(J)V).
compound beam, MHXT., cruv0i:wi; ooK.6<;.
compound chain, MHX., cruv0i:wi; CiA.umc; .
compound curve, MA0., cruv0i:w~ [cruµµ1K1oc;] Ka.µnuA.ri.
compound determinant, cruµµtKTO<; opil;;oucra..
compound event, I:TAT., cruv0i:TOV cruµ~U.v.
compound fraction, MA0., cruv8e-1ov [ cru~tµtKTOV 1 KAUcrµa.
163
compound h ~ r .nonic functiqn
compound harmonic iunction, cr6µ~ttKrn<; apµOVtKf) CTUV<ipn1crt:;.
compound interest, OIK., cr6v9E-mc; [ avaTOKlCTLlKO<;] TOKoc;· [ TOKO<; avamKtcrµofJ }.
continued conversion of compound interest, cruvcxii <; µna-rp onii cruv0i:rnu 'LOKOU" [<JU VEX ii<; UVUTOKlcrµ6; / .
compound motion, GUV9E"ro:; KL\lllcrt<;.
compound multiplicatio1, cru~tµ1y1i::; rco/..J.arrA.a.crw.crµ6;· [ rroU.a.;c),acrw.crµ6::; cru~tµtywv].
compound number, cruµ ,u1y1):; apt0-~t6c;· [ cruµµ11f):;].
compound partition, MAE>., cruµ~nyljc; µt:ptcr~16:;.
theory of compound partitions, 0Ewpia i;iiiv cruµ~t1yiiiv µt.ptcrµiiiv.
compound pendulum, <DYL, µtK-rov EKKPE~tec;. (IYN.: physical pendulum).
compound proportion, MAE>. , cr6µµtKTO<; avaAoy[a.
compound ratio, MAE>. , cr6µ~nnoc; Myoc;.
compound stress, MHX., cr0v9t:m:; n i crtc;.
compound survivorship probability, AI<D. , MAE>. cruv9t:to<; {µtKTlj j m9av6n]<; £mPtwcrEW<;.
comprehensible, 1, cruµrrt:ptA ii-rc1foc;,a,ov. 2, KaTaA 11rc16c;, 11,6v· [rnrnvo1116c;, f) ,6v ] .
comprehension, /\.01., MAE> ., cruµrct:p1/c11rc16nic;.
principle of comprehension, apxii n'ji; cruµn Ep1A.11 nr6r11 rn<;.
comprehension (of), Karnvo1116qc; { rc/..:f) P11<; KUTU\/Ollcrt<;} ( tofJ, Tfj<; ,
164
compression member
Twv)· [ cra.qn'Jc; <iv1lA.111J1t<; (mu, -rfj c; , Ttuv)].
comprehensive, 1, cruµrct:ptA.11rc16c;, ij,6v. 2, cruµrc t:ptA.11rcnK6c;,11 ,6v.
comprehensive search (for), £~0-
vux1crnKT] UVCJSllTllcrt<; {AETCTOµEpCCTT UTJl avt:pEUVJlCTt<;} (mu, Tfjc;, -rwv).
compressed air, mt:cr16c; [ rct:mEcr~1evoc;] a 1) p.
compressibility, cruµm t:crn K6111c;· { CTWLTCtSCTTOTJl<;}.
coefficient of compressibility, cruvrnA.t.cr•ii i; <JU>l1tt t.cri:6i:q roi; .
modulus of cubic compressibility, MHXT., >t6otov 1rnP1Kfj<; cruµmt.cri;6-TT]rn<;· { µ6 otov oyKOU EAacrnKO!llW<;" µ6 8tov 6yKOUj. (LYN.: bulk modulus).
compressibility burble, aKpa-rw1 cruµmt:cr16-r11mc;· [ cruµmt:crnKT] aKpa-rt:ta}.
compressible, cru~1mt:crr6c;,1'],6v.
compressible flow, AEP0.1. , cruµmrn-rlj poi].
compression, 1, <DYI. , cruµrclt:crtc;. 2, MHXT., 9At1Jft<; .
axial compression, MHXT., al;ov1-Kii 0Allll1<;.
mod ulus of compression, <l>Yr., µ6 8tov crwl1t1i:crt.W<;.
one-dimensional [simple j compression, M HXT., µOVO Ol(l(J!Ul:O<; [ 6.nl.ij} 01..11111<;.
relief in compression, MHX., eA.6.q>puvcrti; Tfji; 0A. i111 t.ooi;.
compression bar, MHXT. , 9A.tPoµev11 pap8oc;.
compression member, MHX. , 9A.tP6µt:vov crtotXEfov· {0A.tP6~LEVOV ~teA.oc;j.
compression modulus
compression modulus, µ68wv cruµmecr£ffi<;.
compression phase, cI>YI. , <pcl.crtc; {8ta.8poµljj cruµmfo£ffi<;.
compression(al) wave, MHXT., 9A.tmtK6v KU~ta.
compressive fluid, cI>YI., cruµm£cn6v pwcr16v.
adiabatic flow of a compressive fluid, c'tow.~anKii por, (wil) cruµmecrwu PEU(J!OU.
compressive force, MHX. , 9A.tm:tKTJ 80vaµtc;· [80vaµt c; 9Ailj!E~j.
compressive strain, MHXT. , 9A.trcnKf) ETClTCl.CTt<;" {£rciTacrt<; 9Ailj!Effi<;}.
compressive strength, MHX., 9A.trcnKT] &.vwxi]· [avrnxf] £rci 9A.l-1Jf£t}.
compressive stress, MHXT. , 9A.tTCTtKTJ Tel.enc;· { -rfot<; 9/,..[ lj!E(J):;j.
Compton (Arthur Holly -), ("Ap-9oup X6A.A.u) K6µTCTOV ( = aµEptxavoc; <pucnK6c;· 1892 - 1962).
Compton effect, EVT0rcro~ta. [<pat v6-µi::vov (wu)j K6µmov · [Koµn1ovtav6v £vt0rcffiµa].
Compton electron, Koµrc1ov1a.v6v TJAEK-rp6vwv· [ TJAEKTp6Vto\I TOU K6~LTCTOV].
Compton recoil effect, ava.KpoucrnKOV EVT(mroµa. wu K6µrcwv· [ KOµTCTOVtaVOV EVTUTCWµU].
Compton wavelength, Koµrc1ovtavov µ11K6Kuµa · [ µfjKO <; K0µa.TO<; K6µmov ).
compulsion, KarnvuyKa.crµ6c;.
computability, MAE>., £mA.oytcr16-•11c;.
computational processes
Turing computability, tup1vyKta.viJ i:mA.oy1crt6i:T]<; ( = emA.oy1crr6tl]<; µ!i<J(fl i:uptvyKtavii<; crucrKcufii;).
computable, MA0. £mA.oytcr16c;,i], 6v· [£rctA.oylmµoc; ,oc;,ov J ( = µ11-x,avtK&:; UTCOAOyicn~LO<;, O<;,OV) .
computable function, A.oytcrµ1111'] [ErctA.oytcr1ljj cruvcl.p111crtc; .
CDmputation, MAE>. 1, urroA.oytcrµ6c;. (IYN.: calculation). 2, MHXT. MA0., £mA.oytcrµ6c;.
accuracy of CJmputation, ciKpiPt.ta (wu) unoA.oytcrµou.
aseismic computations, MHXT., avncrt.1crµ1Kol U1tOAOytcr~t0i.
engineering computations, µrixo.voi:t.xv1Kol u1to/..oytcrµol.
numerical computation, ap10µ1K6~ unoA.oy1crµ6i;.
step-by-step numerical computation, P11µancrnK6i; c'tpt0µ11C6i; unoA.oy1crµ6<; .
tabular computation, mvaKoot6<;[mvaKo0Et1K6<;} f:m/.oytcrµ6<;.
computation tables, £mA.oyicrnKoi [A.oytcrnKoi J rci vaKE<;.
computational, 1, £rc tA.oytcrnK6<; , ij,6v· [urcoA.oytcrnK6<;, i],6v]. 2, MHXT. MA0., A.oytcrµtK6<;, Tj, 6v· [A.oytcr~t11TtK6c; , 1'] ,6v].
computational accuracy, EmA.oytcrTtKTJ {A.oytcrµtKTJ) UKpi~EtU.
computational convenience, urcoA.oytcrTtKTJ i::ux,ept:ia.
computational method, urcoA.oytcrnKlj µe9o8oc;· { µe9ooo::; UTCOAOytCT~lOU }.
computational procedure, urcoA.o-ytcrnKT] 8turnKnKi] · [ rcopf.ia t&v imoA.oytcr~t&v].
computational processes, 1, ETCtA.oytcrnKai [urcoA.oytcrnKai] otu8tKacrla.t. 2, MHXT. MAE>.,
165
computational technique
Aoy1crµ1yrtKai otaotKUO"tat' [A.oytcrµucai µr,rnyroyai].
computational technique, i;mA.oy1-crn1C1) {AoytcrµtKi]} tf.XYLKl).
computational techniques for dynamic programming, A.Orn:M., A.oy1crµrrr11Ca.i ·rnxY1Kai t&Y ouyaµtK&Y npoypaµµrnµ&Y.
computations of conformal maps, MA0., f:mA.oytcr~toi cruµµ6p-<pcoY EiKoYtcrµ&Y.
compute, 1, unoA.oyisw. (EYN.: calculate). 2, f:ntA.oyisco ( = i:moA.oyisco µfoQl ~LT]X,UYLKOU ~LEcrou, A.oytcrµriwu, Tj niYaKoi;).
computed, 1, unoA.oytcr8cii;,cfoa,£y, 2, i:mA.oytcr8cii;,£lcra,£v.
computer, 1, i:mA.oytcrtll<; ( = 6 EKtcA.&Y i:mA.oytcrµoui;). 2, MHXT.MA0., TEXN., A.oytcrµrin)i; ( = i]AEKtpoY1 KOY f:mA.oytcrnKoY Tj taX,UAO"flO"tlKOY µiuuvriµa).
166
absolute value computer, A.oy1crµ11--ri]c; ano/..Umu 'tl>ll'ic;.
analog [analogue] computer, avaA.oy1aK6c; A.oy1crµ11n'!c;.
analog-digital computer, avaA.oyolj/JlqHaK6c; A.oy1crµ11-riic;.
asynchronous computer, acruyxpovoc; [ acrurxp6vtcrmc,] A.oy1crµ11n1c;.
automatic computer, aui:6.1m:oc; A.oy1crµ11•fic;.
buffered computer, napi:µS).11t1K6c; A.oy1crµ11•iJc;.
coder of a computer, KrolitKroti]c; A.oy1cr~111mu.
coding for computers, KroliiKromc; (twv npocrmywv) trov A.oy1crµ11trov.
commands to a computer, npocrtayai np6c; A.oy1crµ11•iJv.
course-line computer, nopEtoypaµ· µ1K6c; /...oy1crµ11•fic;· [A.oy1crµ11•iJc; ypaµµfjc; nopeiac;}.
computer
dead reckoning computer, avaµi:tp11nK6c; A.oy1crµqt1)c;.
design of computers, crx.elit0A.6y11-mc; [ crx.eliw'Aoyia j TWV A.oytcrµTJTWV.
digital computer, ljlqcptaK6c; A.oy1-crµ11•iJc;.
electric analog computer, i]A.EKTptK6c; UVUAOYtaK6c; AOytcrµq-ri] c;.
electronic computer, 1]A.eKTpov1K6C, A.oy1crµ11-ri] c;.
fixed-program computer, naytonpoypaµµ1K6c; A.oy1crµ11-ri]c;.
general purpose computer, A.oy1-crµ1FiJc; YEVLKfjc; e/;U1t11PETTJcreroc;.
high-speed computer, '-raxuA.oywµ11-i:i1c;.
high-speed digital computer, '1'11C?taK6c; -raxuA.oy1crµ11• 1)c;.
incremental computer, a01;1iµanK6c; ).oy1crµ111fic;.
linear analog computer, ypaµµ1K6C, avaJ..oytaKoc; AOYIO"µTJTl']c;.
machine language (for computers), µi1x.av1Ki] yA.wcrcra [ µ11XUVLKOV lliiroµaj (i:wv A.oy1crµ11trov). ·
memory location (of a computer), µvn,µovtKi] [ µv1]µ1Kii j 'tOito0ccria (mu A.oymµ11wu)· f µv11µ1K6v (mu A.oy1-cr>n1rnu)j.
memory (of a computer), µviJµ11 [ µv11µ1K6v j (mu A.oytcrµTJTOO).
multi-address system of commands (for computers), noA.uliuiµovov crucr-r11µa npocrmywv i:wv /.oy1crµ111wv.
parallel computer, napa/.A.11/.oc; /.oy1crµ11•fic; .
preparation in machine language of the commands to be inserted into the memory of a computer, h"otµauia [kat6.u-rpromc,j de, ~111xav11µanKi]v yMJuuav i:wv npocrmywv -rwv duax.8110-oµi:vrov Eic; i:6 µv11µ1K6v wu A.oyrnµT]rnQ.
programming for (electronic) computers, npoypaµµ1uµ6c; TWV (TJAEKtpoVtKWv) /.oy1uµ11TWV.
serial computer, m:1paTrn; /.oy1crµTJ-rl']c;.
single-address system of commands (for computers), µovoli16.µovov uu<H11µa r.:pournywv •WV /.oy10-µ111&v.
-•
computer analysis
solid-state computer, crtepeoKatacrtamc; A.oywµ111fic;· [A.oy1crµTJi:iJc; crTEpeuc, Kammaur.roc,j.
special-purpose computer, /,oy1crµTJ· -rl)c; eilitKi'jC, E/;U1tl1 pei:ficrero:;.
storage (of a computer). a r.:o8fiKTJ fµvTJµIKOV J /.oy1crµ11mu . (kYN.: me.mory of a computer).
stored-program computer, evlionpoypaµµ1K6c; A.oy10-µT]tl']c,· /A.oytcrµTJi:i]c, uno8riKeu8i:vrnc; r.:poypaµµai:oc;j.
storing information (in a comput-er), uno81iKWmc; 1tATJpOlj)OP11'tlKfjc; uA.ric; (ev •<!> /.oy10-µ11-rij).
synchronous computer, uuyx.povoc; [ uuyx.pov1cn6~} /.oy1uµ11-rl']c;.
wired program computer, uupµarnnpoypaµµ1K6c; A.oy1uµTJ•l'Jc;.
computer analysis, MHXT.,MA0. A.oytaµT]ttKi] ciYciA.umi;.
digital computer analysis, 'l'l1C?t0-A.oy1uµTJTLKTJ UVCtAUcrtc;• {0.VCtAUGLc; µi:O"(!l \j/TJcptaKou A.oy1uµ11rnu ) .
computer-based technical analysis, A.oytcrµ rp:oA.oytKi] [A.oytcrµ T]ttKi] j tf.X,YtKi] (iyciA.umi;.
computer code, A.OrIEM., A.oyt-oµT}nKo<; Kffiotl;.
computer efficiency, AOrn:M., A.oytcrµY]nKi] i:moonK6tT]i;.
computer graphics, A.oytcrµT}ttKTJ ypa<ptKTj.
computer hardware, AOrIEM., A.oyicrµY]ttKi] crKA T] pocrKwij. (:EYN.: hardware).
computer language, A.oyicrµY]tl Ki] yA.&crcro.· [A.oytcr~tYJnKoY ioicoµo. j.
computer librarian, A.oytcr~tT]nKoi; PtPA.to8T}KUplO<;.
computer memory, A.oyrnµ1rnKi] ~LYTJµT}' [A.oy1crµY]1lKOY ~lYT}µt
KOY j.
computerize
computer method, AOrI.EM., A.oytcrµ'l']nKi] µ£8oooi; ( = ~1t0oooi; i:mMor,coi; npopA.f]µutoi; oui A.oytcrµritou.)
computer operation, 1, A.oytcrµrinKij npiil;ti;. 2, A.oytcrµY]nKi] A.ntoupyY]crti; ( = -rp6rroi:; A.Et rnupyiai; tou ~.oywµrirnu).
computer operations, A.oytcrµrinKO.i npcil;ct<;.
computer operator; X,ctptcrn1i; (wu) A.oy1crµritou.
computer program librarian, PtPA.1-08T]1Ccip10i; A.oytcrµT]nK&Y npoypo.µµchcov.
computer programmer, A.oytcrµT]tt-Koi; npoypu~1µ1cr-rT]i;. ·
computer programming, A.oyicrµT}-ttKo<; npoypaµµtcrµ6i:;. ·
computer science, A.oytcrµT}ttKir [A.oy1crµY]toA.oyia j.
computer software, AOrI.EM., A.oytcr~tT]ttKi] YWpOO"Kf,\)i}. (.EYN.: software).
computer storage, 1, A.oytcrµY]ttKi} ano011 KWcrti; ( = dcro.ycoyi] OEooµEYCOY di; TOY A.oytcrµri-rTJ. v). 2, cino8iJKTJ A.oy1crµrirnu.
computer terminology, A.oytcrµT}nKi] 6poA.oyia.
computer time-sharing, A.oytcrµT]~tKi} XPOYO~topn'r [A.oyicrµY]nKi} Katpoyo~n1].
~_::__·----~ -=- . _z-=: - - . --:::::;;. --- -~
computerization, AOrI.EM., A.oytcrµT]twcrti;.
p=-- - -~·-:::,:-:-:--:::_-::=:-::
computerize, AOrI.EM., A.oyrnµT}-rr,uco ( = crxcot0A.oyro, KTA., µ£O"Ql A.oy1crµritou).
167
computing
computing, J' . urcoA.oytcrµ6c;. 2, MHXT. MA0., ETC tA.oytcrµoc; (= µfl xa.vriµcmKoc; T\ A.oy1crµT)nK6c; UTCOA.oywµ6c;). 3, ErctA.oytcrnKi) oiaotKa.cria..
art of computi ng, A.oy1crµuci] 'tExVll . ( =; >1':x v11 toii urroA.oyi~etv) ..
computing automaton, A.oy1crµtK6v [6mA.oywn K6v j a.trr6µa.wv.
Turing's theory of computing automata, t upt vy1nuvr] itepi A.oytcrµtKcilv
, uu'tO~Hitwv 0e(l)pio: /0i;wpla tcilv A.oytcrµtKcilv aurnµa~wv tOii TlOUP LVY K} .
C()mputing . device, 6mA.oytcrnK6v ouicrKf;uov· [ 6mA.oytcrn Ki) auaKwi] j .
discrete-varia ble computing device, J,oytcrµtK6v .S ui criceuov {j3acret) 8taKpttii c; µE'tUj3A.TJtfic;.
computing efficiency, 6rc tA.oytcrnKi) [A.oytcrµtKi)} 6rct8onK6t T] c;.
computing equipment, A.oytcrµt Koc; [A.oy1crµT)ttK6 c;} 6~a.pncrµ6c; .
large-scale computing equipment , µ£yaA.ric; c'>A.Kfic; A.oy tcrµ11nK6c; EE,ap
: ncrµ 6c; · [A.oy 1 cr~u1nKi] trcm:acrtucr tc; ~Lsyicr't11c; a1to86crcwc; I .
cOJDputing machine, A.oy1crµo µrixa.vi) ( = A.oytcrµr1nK6v T\ £rc1A.oy1cr:nK6v µT]X,UVl]µU).
high-speed computing machine, tuxuA.oy tcrµ tKi] µTJ'XO.Vli ( = A.oytcrµO ,lllXUVl'j t UXELU; UJ!OOOcrEWc;).
computing machinery, £mA.oytcrnKa {'Aoy1 cr~1rinKa} µrixa. vi]µa.w· [ A.oy1crµT)rnci) 6yrnt 6.crtamc; · A.oytcrµrp:1Kov crucrtTJ µa j.
computing method, I, urcoA.oywnKi) I 6rc1A.oy1crnKi) / ~tEeofoc; . 2,
. A.oytcrµ rin KTj µi:9o8oc;.
168
direct computing method, U/l Ecroc; i:ittA.oytcrnKri µ£0ofoc; .
iterative computing method, ava-
concentrated
rrpocre·1y1crµtKi] tmA.oy tcrnrcl'J ~ti:0o.Soc;.
computing technique, urcoA.oytcrnKi) {imtA.oytcrn Ki) j tEX Vt Ki] .
concave, MAE>., KotA.oc;,T),ov: .
concave-com·ex game, MAE>:, Kot-
A.6Kuptov rcaiyv10v. ·
concave function, MAE>., KoiA.TJ cruvapn1m c;.
concave game, MAE>., JCoi:A.ov rca[yvwv.
concave polygon, MAE>., Koi:A.ov rcoA.uywvov.
concave polyhedron, . MAE>., KOtA.ov rcoA.ui;opov.
concave toward a given line, (Kaµrc6A.TJ) KoiA.11 rcpoc; [ Kct.µm'.>A.11 crtpE<poucra ta KO LAU . autric; rc poc;j 8o9dcrav ypa.µµiJv.
concave toward a given point, (rnprcuA.11) K0[)..11 rcpoc; f K:aµrcuA.11 <npt<poucra ta KOtAa au~ t fir, rcpoc,j 8o9f:v crriµi;Iov .
concavity, KotA.6rric;.
conca vo-concave, a~t<piJCotA.oc;,oc;,ov.
conca vo-convex, KotA.6 icuptoc;,oc;, ov.
CODCllVO·-COnvex surface, KOlAOKUprnc; 6rc1<pa VE ta .
concei vable, I, avnA.11rct6c;,1l,6v· [cruH11rcr6c;, ~,6vj. 2, 8ta.v011-t 6c, ,i] ,6v ( = rcou ouva.rat Kavdc; v:x (j)avrncr91] i1 8tav0119~).
simplest conceivable solution, (~) a itA.oucrri;pa 81avoriti] tniA.ucric;· /Pi ci.'tA.oucrri:pa 8uvar~ f.rri f..ucrt r;,}.
com:entrate, XHM., 6µrcuKv&.
concentrated, I, M HXT., cruyKEV-1:1::.i:o;. i] ,6v· [ cruyKEvrpw~itvoc;,
concen.trated lateral load
TJ ,Ov }. 2, XHM., i:µnuKvo c; ,oc;, OV .
concentrated lateral load, MHXT., auyKEvtpunov [ auyirnvtpwn-Kov j rcA.wpucov <poptiov.
concentrated load, MHXT., cruy-nvtpwtov [ cruyKEVtpwnKov} <popriov.
sys tems of concentrated loads, cru. cr'ti)µma cruyKEvi:pwtrov [ crucr'tl'jµata cruyKEV'tpwnrcrov] q>optiwv.
concentrated mass, MHXT. , cruyKEVtpwti) [ cruyKEVtpwnKi)} µIlsa.
point of attachment of the concentrated mass, crriµETov npocrap'ti)crcroc; / crriµcTov itpocrapµoyi;c;] tiir;, cruyKcv'tprottKiic; µa~ri c; .
problems of a single concentrated mass , npoj3A.i)µatu µo vtaiac; cruyKEV'tpwt1rciic; µa~ric;.
concentrated moment, M HXT., cruyKEvtpwtiJ [ cruyKEVtpcm:uclj J .potri].
concentration, 1, MAE>., cruyKf:v. tpcomc; [ auyKEVtpconcrµoc;j. 2, XH:M ., £µrc6Kvwcrtc;.
principle of concentration (in warfare) , UPXTJ tOU crUylC€V'tpWttcr~lOii ('ti;c; noA.eµtKii r;, t i:xvric;) .
s tress concentration, MHXT., 'tU'tlKi] cruy rci:vtpwcric;· / cruyrci:vtpwcrtc; 'tUcrewc; · cruyKi:vtpwcri r;, tacrewv).
concentration method, auyKEvrpwtiKi] µ{;9o8o c;.
concentration method for the potential of a complex, MAE>., auyKEVtpconKi) µt 9o8oc; 8ta to OUV.llttKOV f:voc; cruµrcA.tn1arnc;.
concentric circles, MAE>., 6µ6KEVtpot KUK;\ot.
concentric coaxial helices, MAE>.,
oµoKEv1pot 6µoasovtKa i .. (arn-piai) eA.tKEc;. . · ·
concept, AOr., l:vvota· [ £vvotoA.o-ym) avtiA.TJ\jltc;}. ·
generalizing concept, y€VLKEUttKTj /yEVtKEuoucra] svvo ta.
geometric concept1 yeroµetptrci] svvom.
idealized concept (of a perfectly rigid body), MHXT., i.SUvtKEUµi:vq UV'tiA.ri1111 r;, (crwµa-co r;, 00~ . anoM.'tWc; crtcppoii).
mea ningful concept, AOr., MA0., VOllllll'tllCTJ EVVOLU.
concept coordination, AOr., 6vvotoA.oytK6c; cruvrnvtcrµ6c;.
concept of work, <l>YL., MAE>., i:vvota. / £vvotoA.oytKi] av1iATJ\jltc;} tou i: pyou.
conception, 1, iotacrtc; . . 2, (6vvotoA.oym)) <ivtiAT]l.jltc;.
conceptual, !£vvotoA.oytK6c; , 11,6v.
conceptualistic theory (of probability), 6vvotoA.oy1crµ1Ki) [i:vvoto/.,oyu-:i)} 9i;wpia (tcl)V meavoci]twv).
conceptualistic view, 6vvot0A.oytcr~LtKi) / £vvotoA.oytKi)j arco\jltc;.
conchoid, MAE>., KOYXOEt8f:c;· {KoyXOEtoi)c; rnµrc6 A.T] ' 1COYXOEt81'Jc;}.
conchoid of Nicomedes, KOYXOEtoi]c; toli NtKoµiJ8ouc;.
concise, cruvorcttK6c;,i],6v.
concise matrix form, MAE>., cruvorcttKi) [ au~mayi)c;} µop<pi) µT]tpdou.
conclude, cruµrci;paivw . one might conclude (that), 0a i]ou
va'to rcaveic; vu cruµ7tcpavet (on).
169
conclusion
conclusion, 1, AOr., cruµm':pa.crµa.. 2, KU1"UKA£ic:;.
draw a conclusion, cruvciyco { t~ayro j cruµ1ti:pacrµa .
foregone conclusion, avait6'rpe1rrnv cru~mtpacrµa.
general conclusions (may be drawn ), (ouvavi:m vu t~ax0oilv) yevtKa cruµitepcicrµam.
conclusion of a theorem, ('ro) 1:;11-w uµi::vov { O"UVa.y6µ£VOV j 0£W·
· p11µmoc:;.
concomitant, MA0., cruµna.poµapwucra. [ rmpi::no~18v11] ( cruvap·n1-crtc:; ).
bil inear concomitant, l51ypaµµ1Ki] cru~mapoµaprnucra ( cruvcipi:11mc;).
mixed concomitants, µ1Krni cruµita· poµapmiicrat ( cruvapn']cretc;).
concomitant factor, cruµna.poµa.p'tIDV na.payrov.
quantitative relations with the concomitant factors, itocronKai crxtcretc; µei:a niiv cruµitapoµaprnuvi:cov napay6vi:cov.
concomitant variations, AOI'., cruµ"" napo~iaptoucrat µi::i:a.A.A.a.ya.i.
method of concomitant variations,, µt0ol5oc; i:wv cruµitapoµaprnucrwv µei:al..A.aywv.
concordance, 1, f;va.pµoyi]. 2, av't£1ta.va.yroyi] ( = f;va.pµocrnKov £Up£tl]pta.K6v anav0tcrµa.).
topological concordance, mitoA.oytKTJ tvapµoyi].
concordantly oriented, cruµmni:6v'tWc:; npocra.va.toA.tcr0£ic:;,i::Icra.,f;v· [ cruµmm6vi:coc:; i::li0£t1']0£ic:;,i::Icra., tvj.
concrete, cruyK£Kptµf;voc:;, lJ ,ov.
concrete, MHX., crKup68qia· [µn£t6vj.
170
condensation test
prestressed concrete, itpoi:ai:ov [ itpoi:ei:aµtvov j crKupooeµa.
reinforced concrete, cbitA.tcrµtvov [tvtcrxuµtvov j crKup68eµa.
concrete number, cruyK£1Cptµf;voc:; apieµoc:;.
concurrence, I, MA0., cruµntrocric:;· [ cr11µi:i:ov cruva.vt~cri:roc:;j. 2, cruva.i vi:crtc:;.
concurrent, cruµnintrov,oucm,ov· [ cruyKA.i vrov,oucra.,ov]. ·
concurrent forces, MHX., cruµnimoucrat [ cruy1CA. i voucrat j 8uvaµi:tc:;.
concurrent lines, MA0., cruµnimoucra.t ypa.µ~tai.
concurrent planes, MA0., cruµni:rctovta €nini:8a..
concyclic points, cruyKuKA.ta.Ka [ 6-µoKl>KA.ta} cr11µ1:1:a.
condensation, 1, MA0., ttUKVWcrtc:;. 2, <I>YL, XHM., METEQP., cruµm'.>Kvrocrtc:;.
point of condensation (of a point set), miµetov 7tUKvrocrecoc; [ 6p1aKov miµetov j ( cruv6A.ou miµeicov).
condensation coefficient, <I>Y:E., METEQP., cruvti::A.i:crti]c:; cruµnuKvci>cri::roc:;.
condensation point, = point of condensation.
condensation rate, 1, 8tattµ~ nuKvci>cri:roc:;. 2, 8tanµi] cruµnuKvci>cri::roc:;.
condensation shock wave, cruµnuKvrocrta.K6v 7tA l]KttK6v · 1Cuµa.· [ 7tAl]ICttK6v EK cruµnu1Cvci>cri:roc:; KUµa.j.
condensation test (for convergence), nuKvronKi] pacra.voc:; ( cruyKMcri::roc:;).
condense
condense, XHM., cruµnuKv& .
condensed, 1, cruµni:1w1Cvroµf;voc:;,11, ov. 2, MA0., ni:ptA.1']1tttK6c:;,~, 6v. 3, XHM., cruµnuKvoc:;,oc:;,ov.
condensed form, ni:ptA.1']7tttKll µop-<p~.
condensed instruction deck, AOrrrM .. 8i:crµic:; 1t!:j)lATJ1ttlKIDV €vwA.&v· [ rri:ptA.rinnKi] €vta.A.nK1l 8i:cr~1ic:;}.
condensed number, ni:ptATJ7tttKoc:; apie~16c:;.
condensed cri:tpa.
series, ni:ptA.1']7tttK1l
condensed table, ni:ptA.11nnK6c:; [ O"UVOITttK6c:;j ni val;.
condition, I, opoc:;. 2, MA0., cruv-0~KlJ. 3, KUtUcrta.crtc:;· {0fotc:;}.
analytic condition, avaA.unKT'] cruv-0T']Kq.
boundary condition, cruvoptaKT'] [ e!c; i:o 6pwv] cruv01']Kq .
conformality condition, cruv0i]Kq c uµµopcp6i:qrnc;.
critical condition of stability, MHX., KpL<Jtµoc; <JIJV0f]Kfl eucrta0eiac;.
Diriclet's conditions, 81p1KA.et1avai cruv0fjKUI" { cruv0i'\Kut mil Ntt· ptKMj.
discriminant condition, 81aKpivoucra cruv0f]Kfl.
end conditions, 0.Kpatut cruv0fjKat. equation of condition, £~icrcocr1c;
(ti'\c;) cruv0i]Kric;. first necessary condition (in cal
culus of variations), itprotri O.vayKaia cruv0f]Kfl (mil A.oy1crµou til>v µemA.A.ayil>v).
fixed boundary condition, cruv0fiKTl itayiou cruv6pou· [itayia cruvopiaKT'] cruv0i]Kri].
geometric boundary condition, cruv-0f]Kfl yecoµetptKoil cruv6pou· [yecoµe-rpLKT'] cruvop1aKT'] cruv0i]Kri].
condition for a minimum
initial conditions, apxtKai cruv0i'\· Kut.
isoperimetric condition, icroiteptµE· i:ptKT'] cruv0i]Kfl.
limiting condition, iteptopi~oucra cruv0i] Kfl.
Lipschitz condition, A.titcrtrntuvi] cruv0iJKTl" [ cruv01'1Kfl toil Aiitmtc;].
necessary and sufficient condition, avayKaia Kai E1tUPKi]c; cruv0i]Kq.
necessary condition, O.vayKaia cruv-0i]KT].
necessary condition of Euler, euA.riptavi] O.vayKaia cruv0i]Kri· [O.vayKaia cruv0i]Kri wu ·ouA.epj.
necessary condition of Jacobi, iaKroPtavti 0.vayKaia cruv0i]Kri· [ O.vay· KCltU <JUV9f]Kfl 'tOU rtaK6µmj.
necessary condition of Legendre, A.eyev8pmvi] O.vayKUia cruv0f]Kfl" [O.· vayKaia cruv0i]Kfl toil Ae~civtp].
necessary condition of Weierstrass, Pa'iepcrtpacrcr1avti 0.vayKaia cruv0iJKTl" { O.vayKaia cruv0fiKTl wu Bc'.t'iepcri:pcic;J.
prescribed (initial) conditions, KU· 0coptcr0eicrut [£m~ePA.11µtvm/ (O.pxt
. Kai) cruv0i'\KUL. stability conditions (in ballistics),
cruv0i'\Kut eucrrn0eiac; ('rfic; ~A.rinKijc;).
sufficient condition, £itapKi}c; cruv-0iJKT1.
three-point condition, i:ptcrriµetaK!'j cruv0f]Kfl.
time-dependent boundary condi-tions, xpove~6.pi:fJ'tOL cruvoptaKai. cruv0i'jKut.
transversality condition, cruv0iJKT1 itepi £yKapcrt6i:qwc;.
uniqueness conditions (in Riemann mapping theorem), cruv0i\Kut µov6-rriwc; [ cruv0i'\Kut µova8tKO'tfl'tOc;] (toii e!Kov1crµ1Koii 0ecopi]µarnc; wu Pi· µav) .
variety of end conditions, 7tOtKtA.ia [ 7tOLKlAO'tllc;] 0.Kpaicov cruv0riKil>V.
condition for a minimum, cruv0iJKlJ 1tcpi €A.a.xicrtoD.
necessary condition for a minimum, uvayKaia itepi &A.axicrwu cruv0f]Kfl.
171
I'
·I
co11dition (or consistency
condition for consistency of simultaneous linear equations, cruv-0ipo1 cruvaKOAou0im; '!WV mutotiµcov ypaµµ1Kwv £1;1crffim:cov.
condition for decoupling of rotation from translation, MHX., cruv0i]Kl] anocru(;i:ul;i:co<; crtpo<pfj<; Kai µsm0fosco<;.
condition of mobility of rigid figures, MA0., cruv0i]K1] KtVl]'!Otl]tO<; '!WV crti:ppwv CTXl]µ<i'!COV.
condition per cent of equipment, OIK., MHXT. MA0., i':Katocrnafa Kanicrmcrt<; [ cruv0i]Kl] •fj<; EKatocrnaia<; cp0opfJ.<;} tou £1;apncrµou.
condition that a line be perpendicular to a plane, cruv0~K11 Ka-9i:t6'tl]W<; su9sia<; Kai E7tt7tEOoU.
condition that four points in .space be coplanar, cruv0i]Kl] tva tscrcrapa <rl]µcfo tOU Xffipou KciVtal E7ti 'tOU autou E7tt7tEOOU' [ cruv8i]Kl] tfj<; cruvsmni:Mtl]to<; trncrapcov xcopalcov O"l]µi:icov ].
condition that two lines be perpendicular, cruv0i]Kl] Ka9i:t6tl]tO<; ouo suesiwv.
condition that two noncoincident lines in a plane be parallel, cruv8i]Kl] tva Mo µ1) crnµnintoucrm ypaµµai tou £mnsoou <lien napaA.A.riA.ot· [ cruv011KlJ napaA.A.riA.ia<; Mo µi'j cruµmntoucrwv ypaµµwv tou £nmtoou}.
172
analytic condition that two noncoincident lines in a plane be parallel, avaA.unKi] cruv8i]KT] Iva 8\Jo µTj cruµninwucrm ypaµµai wu Emm':8ou cbcrL 7tUp<iUT]AOl" [ UVUAUtlKTj cruv8i]KT] 7tU-
conditional entropy
paA.A.riA.ia~ 060 µTj cruµmnroucrwv ypaµµoov wu fmmt8ou}.
condition that two noncoincident lines in space be parallel, cruv-0~Kl] \'.va Mo µi] cruµnintoucrm ypaµµai tou xffipou cbcrt napaA.Al]AOt' [ cruv0i]Kl] napaUriA.ia<; Mo µi'j cruµmntoucr&v ypa.µµwv tou xffipou}.
condition that two noncoincident planes be parallel, cruv0i]Kl] l'va Mo µ iJ cruµnintovm tninsoa. cbcrt napaU lJ A.a· [ cruv8i] Kl] na.paU ri A.ia<; Mo µi'j cruµmnt6v•cov £mntocov}.
analytic condition that two noncoincident planes be parallel, avaA.unKTj cruv8i]KT] tva 860 µTj cruµnimovrn tnim:8a rocrt napaA.A.riA.a· [avaA.unKTj cruv8i]KT] napaUriAiw; 8\Jo µii crDµm n<6v<rov l;mnt8rov].
condition that two planes be perpendicular, cruv0~Kl] Ka8i:t6tl]to<; Mo £mntocov.
conditional I, I, AOI'., tmo8snK6<;, i],6v· [npoi'mo8snK6<;,i],6v]. 2, MA0., 1tpolino8i:t6<;,i],6v (=a, U7t0 opov· ~· 7t0U Ka.8opi(;i:t Ti 7tpolino8Etct opov f] cruv8l']Kl]v· oriA.conK6<; cruv8i]Kl]<;). 3, £ntcpuA.a.KnK6<;,i],6v ( = µst' £mcpuA<i-1;sco<;).
conditional branch, AOI'IIM., £mcpuA.aKnKi'j otaKA.aococrt<;.
conditional breakpoint instruction, Aorn:M., tmcpuA.aKnKl) tvwA.l'J otaKonfj<;· [£mcpuA.aKnK1) OtaKo-7tttK1) £vtoA.i]}.
conditional convergence (of a series), 7tp0li7to8i:tl) [un6 opov 1 cruyKA.tcrt<; ( cri:tpfJ.<;). ·
conditional entropy,Aorn;M., npo-
conditional equation
uno0i:ti'j [tmcpuA.aKnKi'jj £vrpo·· nia.
conditional equation, npolino0sn1 ES i CJCOcrt<;.
conditional expectation, ITAT., npolino0i:ti'j npocrooKia.
conditional inequality, npolino0i:t11 avtcr6tl]<;.
conditionai jump, AOI'IIM., £mcpuA.aKnK6v {iA,µa· {£m<pUAaKnKl'j µsm~i~acri<; (£A.tnou)].
conditional probability, npolino0s•iJ [fm6 opov 1 m0av6tl]<;.
law of conditional probability, v6-µoc; <ijc; npoiino8i:<ijc; m8av6<ritoc;.
conditional proof, AOI'., uno0snKi'j [npolino0snK1)] an6oi:t1;t<;.
conditional proposition, AOI'., uno-0i:tiKl'j np6mcrt<;.
conditional sentence, AOr., uno-0snK1) cpp<icrt<;.
conditional transfer, AOI'IIM., £mcpuA.aKnKi'j µsm~ipacrt<;.
conditional transfer of control, AOI'IIM., £mcpuA.aKnK1) µnaPiPacrt<; £A.tnou.
conditionality, MA0., npolino0st6tl]<;.
conditionally, I, MA0., npolino0stw<;· [uno opov }. 2, AOI'IIM., £mcpuA.aKnKw<;.
conditionally convergent series, MA0., npouno0i:tw<; [uno 6-pov] cruyKA.ivoucra cri:tpa.
conditioned reflex, 'PYX., otrn0i:tl]µtvov {otoaKtOV j UVUKAacrµa· {ESl]Ptl]µEvov avaKA.acrnK6v}.
conditioning, AOI'JIM., 1hrn0Etl]-crt<;.
cone
air-conditioning, TEXN., KA.tµancrµ6c;.
signal conditioning, crriµanKi] 811:6-SE<ricrtc;.
conductance, <l>YI., aycoytKOtl]<;. Seismic conductance, CJ!:tcrµtKTj ayro
YlKO'rT]\;. specific Conductance, dOtKi'j UyO>
YLKO'tT]I:;.
conductance matrix, MA0., µ11-tpciov aycoytKOtl]tO<;.
conducting (heat, electricity, etc.,), <l>YI., aycoyij (8spµ6tl]to<;, T)A.sKtptcrµou, nA.. ).
conduction, HJ\EKT., ayffiytcri<;· (Kat' &.vnotacrw/,T]v np6<; •o convection, µstayci:lytcn<;).
conduction current, HJ\EK., aycoytK6v psuµa. .
conductive equilibrium, METEQP., aycoytKi'j I icr68spµo<;] icropponia.
conductivity, aycoyt~L6t1K electric conductivity, i']AEK'(plKTJ U•
ymytµ6<ris-nonconductivity, KUKi] uyroytµO<T]\;. sound conductivity, aKoucrnKTj [fixi
Kij I ayroytµ6TT]c;. specific conductivity, i:!OtKTt ay0>
y1µ6tT]c;. thermal conductivity, 8i;pµ1Kij ayO>
yLµO'tlll:;.
conductor potential, HJ\EK., ayro-yiKov OUVaµtKOV.
cone, KWVO<;. altitude of a cone, Ulj!O\; 1<c0vou. altitude of a frustum of a cone,
Ulj/01:; KOAOUpOU KtOVOlJ. apex of a cone, Kopmvic; [aKpoK6-
pucpov J ( toD) KcOVOU. asymptotic cone, acruµn<WLO\; {a
crUµ7t'rffiHK01:;} Killvoc; base of a cone, j3acrtc; Kcbvou.
173
cone
174
base of a truncated cone, Pacrn; KO· /.oPou Krovou.
circular cone, KUKA.tKoc; Killvoc;.
circumscribed cone, m:p1yeypaµ~lE· vo:; Krovo:;.
complex cone of a point, cru~1n/,EKnKo:; Kwvo:; (i:voc;) cr11µEiou.
double cone, otnA.ou:; Krovo:; . element of a cone, crw1xi::tov (wu)
KWVOU. frustum of a cone, K6A.oupov Kro
vou· [K6/,oupo:; K&vo:;]. frustum of a right circular cone,
K6A.oupovop0oiiKUKA.LKOU Krovou· {op-06:; KUKA.tK6:; K6A.oupoc; K&vo:;].
inscribed cone, tyyi::ypaµµevoc; K&voc;.
lateral area of a frustum of a right circular cone, tµpaoov napan~.Eupou Cmcpaveiac; op0oii KUKA.LKOU KOA.oupou KCOVOU.
lateral area of a right circular cone, &µPaoov napanA.Eupou &mcpavi; ia:; { itapaitA.EUpOV i;µpaoov j op0ou KU· KA.tKOU KWVOU.
Mach cone, µaxtavoc; K&voc;· [ K&voc; wu Max].
oblique circular cone, A.o~oc; [nA.aywc;} KUKA LKo:; K&voc;.
quadric cone, OEU'tEpocr'to:; [ocu'te· popaeµw:;] Krovoc;.
right circular cone, 6p06:; KUKA.tK6:; ICWVO<;.
right cone, 6p06:; Krovoc;. rulings of a cone, xapayai [0.K'ti
vi;:;j (wu) KWVOU. spherical cone, crcpatptK6:; Killvoc;.
tangent cone of a quadric surface, eq>alt'tOµEvo:; Krovoc; OEU'tEpOcr'ti]c; i:mcpaveiac;.
tangent cone of a sphere, &cpmn6-µi;voc; Krovoc; ('ti]:;) crcpaipa:;.
tangent plane to a cone, €cpait't6-µi;vov i:itiltEOOV KWVOU.
truncated cone, KoA.oPoc; Kll'lvo:;. vertex of a cone, KOpi.icpft (wu) KW·
vou. volume of a (right circular) cone,
OYKO<; (6p0oii KUKA.LKOU) KWVOU.
confidence limits
cone circumscribed about a pyramid, Kci:>voc; m::ptyi::ypaµµtvoc; de; 7tupaµi0a .
cone of escape, ~IAIT., Kffivoc; 8ta<puyi'jc;.
cone of precession, MHXT., Kci:>voc; µi::rn7ttchcri::coc;.
cone of revolution, MA0., Kffivoc; i:K 7tEptmpo<pi'jc;.
conference, 8t<icrKE\j/t<;. briefing conference, €v11µ1;pon:11Ct)
oiacrKEljltc;. debriefing conference, CtV'tEVllµEpoo
nKft 816.crKEljltc;. press conference, ori~wmoypacptKi)
OLUCTKEljltc;.
confidence, 1, I:TAT., 7trnoi0qcrtc;. 2, l:µmcrwcruv1i.
preassigned degree of confidence, LT AT., npoKa0optcr0d:; Pa0µ6:; nrnot-0ftcri;roc;.
confidence coefficient, I:TAT., cruvri::/..,i::crri]c; 7trnot8i]cri::wc;.
confidence factor, I:TAT., 7tap<iywv 7tE7tot8i]cri::wc;.
confidence interval, I:T AT., 8t<icrniµa 7trnot8!1cri::wc;.
asymptotically shortest confidence interval, &cruµn'tro'troc; ppaxu'tawv 816.cr'triµa neno101icreroc;.
short unbiased confidence interval, PPaxu &µi;p6A.11nwv otacr'triµa nrnot-0i]crEro~
shortest confidence interval, ('to) Ppaxurnwv (ouva'tov) 816.cr't11µa nEnot0i]crEroc;.
unbiased confidence interval, &µEp6A.rinwv 816.cr'tT]µa 7tE7tot0i]cr&roc;.
confidence level, I:TAT., crr<i8µT) 7tE7tot8i]cri::coc;.
confidence limits, I:TAT., (8tacrtT)µanKa) Opta 1tE1tOt8i]crEffi<;.
configuration
configuration, MA0., yi::wµi::rptKo<; crxripancrµ6c;· [ crxriµancr~16c;j.
address configurations, AOIIIM., OlUµOVJl'tlKOi crxriµancrµoi· [ crxriµa'ttcrµoi otaµovll'Jv· cruvouacrµoi otaµov&v}.
buckling configuration, /,uy1crµtK6:; crx11µancr~16c;.
centroid of a configuration, KEV· 'tPOEtot'::; [ KEVtpov µa~ric;J 'tOU crxriµancrµou.
coincident configurations, cruµnilt'tOV'tE:; crx11µancr~t0i.
complex configuration, cruµnA.EK'tO<; [ cruv0eroc;] crx11µancr~16c; .
determinate configuration, npocrotoptcrro:; [ npocrotroptcrµf.vo:;} crx11µancrµ6c; .
eccentric configuration, EKKEV'tpoc; [ CKKEV'tPLKoc;] crxriµancrµ6:;.
equilibrium configuration, icroppo· 7tll't6<;; crxriµancrµ6:;· [ crx11µancrµ6:; £~ icropponiac;].
Maclaurin's configuration, µaKA.ropt vwvoc; crx11µancrµ6:; · [ crxriµancrµo:; 'tou MaKA.roptv ] .
planar configurations, &mitEOLKOi crx11µancrµoi.
reference configuration, crx1wancrµ6:; &vacpopiic;. (LYN.: standard configuration).
simple (and complex) configurations, UltAOl (Kai cruµµtK'tOl) crx11µancrµoi.
spatial configuration, xropaioc; µEwcrxriµancrµ6c;· [ev 't0 xropqi µE'tacrx11µancr~16:;· µHacrxriµancrµoc; 'toii xropou].
standard configuration, O.it6'tUitoc; {0eµEA\UKO<;} crx11µancrµ6c;.
superposable configurations, (mi;p-0Ewi {imep0fotµOl} crxriµancrµoi.
symmetric buckling configuration, cruµµE'tPtK6:; A.uy1crµ1K6c; crxriµancrµ6:;.
unstable configuration, &crrn0i]c; crxriµancrµ6:;.
configuration of a beam, MHXT., <>XYJWHtcrµoc; ti'j<; 8oKOU.
confocal paraboioid
effect of shear and rotatory Inertia on the congiguration of a beam, em:vf.pyEta 81arµ11creroc; Kai crrpocptKfjc; aopavEia; Eltl 'tOU (yEroµnptKoii) CTXtlµa'ttcrµo i) 'tfjc; ooKoii.
configuration of a system, crx1wancr~16c; crucrri]pawc;.
configuration of deflection, MHX., crxriµancr~16c; UTCOKUµ\j/ECO<;.
configuration factor, MA0. , crx11-µancrp1K6<; rcap<iywv· [ yi::roµi::rptKoc; 7tap<iywv· rcap<iywv (yi::co~LE-· -rptKOU) crx.m1attcrµou}.
confine, 7tEptopi~co.
confined, ni::ptoptcrr6c;,T],ov· [7tEpu:optcr~1tvoc;, 11 ,ov· 7tEptoptcr8dc;, i;foa,tv].
confined plastic flow, 7tEptoptcrn). {8rn~ti::u0i::foa J 7tAacrnK1) poi].
conflict of interest, avnvo~1ia [av-ri8rntc; J cruµ<pi::p6vrwv.
confluence, <DYI:., cruppoi] ( = cruµ~o/..,1i pol'jc;° Kat' avn8tacrrn/.ijv npo; to difluence, arcocruppoij).
confluent, <DYI:., MA0., crupptwv, oucra,ov.
confluent hypergeometric function, cruppfoucra U7tEpyi::wµi::rptKTJ cmv<iptT]crtc;.
confocal, 6µornnaK6c;,11,6v.
confocal conic, 6µoi::crnaKij KffiVtKi]· [ 6µornnaKij KWVtKi] '!0-
µi]j.
confocal ellipsoid, 6~wi::crnaK6v l;/..,/..,i;i\j/OEtotc;.
confocal hyperboloid, 6µornriaK6v urci;p~o/..,oi::t8tc;.
confocal paraboloid, 6µornnaK6v 7tapa~OA0Et8tc;.
175
conf!Jcal quadric
confocal quadric, MA0., 6µoi=:crnaKT) 8wn:pocrTij.
conformable, MA0., cruµµopcpcoT6c;, ij,6v· [ cruµµopcpci:>crtµoc;,oc; ,ov } .
conformable matrices, cruµµopcpona [ cruµµopcpci:>crtµa} µT]Tpi::ia.
conformable projectio'n, cruµµopcponi) [ cruµµopcpci:>crtµoc; J npo~oA ij.
conformal, MA0., cruµµopcpoc;,oc;, ov.
conformal-conjugate · representa-tion of one surface on another, MA0., cruµµopcpocrusuyi)c; avarcapcicrrncr1c; tmcpavi::iac; trci a;\ATJV £mcpcivi::tav.
conformal map, MA0:, cruµµopcpoc; ctKOVtcrµ6c;.
canonical types of conformal maps, 6ccrµtKOi 'tU1tOL cruµµ6pqirov ElKOVlcrµrov.
computations of conformal maps, tmA-oy1crµoi -rrov cruµµ6pqirov dKovtcrµrov.
directly conformal map, iol>Seroc;cruµµopqioc; ElKOVtcrµ6c;.
directly conformal plane map, i;u6eroc; cr0µ>topqioc; tnini;0oc; dKovtcrµ6c;.
inversely conformal map, avncr1p6-qiroc; cruµµopqioc; ElKOVtcrµ6c;.
length and area in conformal maps µiJKll Kai tµ~a8a -rrov cruµµ6pqioov d: KOVLcrµrov.
numerical determination of plane conformal maps, ap18µ1K6c; npocr8t·· optcrµoc; -rrov tmne8rov cruµµ6pqioov cLKOVtcrµGJv.
Osgood-Caratheodory theorem for conformal maps, 6i;oop11µa "OcryKouvi:Kapa9w8oopfi 8ta wuc; cruµµ6pqiou c; dKov1crµou~.
·.pla:ne conformal map, t nin!:8oc; cruµµopqioc; dKovtcrµ6c;. ·
relation of conformal maps to complex-variable theory, cr)lencrtc; i:rov
176
conformal parame.ters
cruµµ6pqJCtlV cLKOVtcrµGJV Kai tfic; 6C<ilpiac; -rfjc; µ1 ya81Kfjc; µi;m~A 111fic;.
conformal map of unit circle on itself, cr\)µµopcpoc; dKOVtcrµoc; µoVUOO<; KUKAOU £cp' EaUTijv· [ cruµµopcpoc; dKovwµoc; µovaoiaiou xuKA.ou tcp' fom6v }.
conformal map projection, cruµµopcpoc; dxov1crµtKTJ rcpo~o;\ij · [ cruµµopcpoc; dxov1crµ6c;· cruµµopcpoc; dx6v1crtc;}.
C(mformal mapping, MA0., cruµµopcpoc; dx6v1cric;· [ cruµµop<poc; dxov1crµ6c;}.
nonconformal mapping, µTi cruµµopqioc; dKOVLcrtc;· { ucruµµopqioc; dK0Vtcrµ6c;j .
numerical methods in conformal mapping, aptSµtKai µe800o1 cruµµ6pqiou cLKOvicrcooc;· { ap16µucai >tE6o8ot cruµµ6pqioov dKov1crµc7Jv}.
one·to-oee ·and directly conformal mapping, µovoµov6nµoc; , Kai c06eroc; cruµµopqioc; ctKOVtcrtc;.
conformal mapping function, cruµµopqioc; dKovtcrµtKTJ cruvcipTT]cric;.
conformal mapping methods, cru~1-
µopcpo1 dKov1crµ1xai µE00801· [ µE00801 cruµ~t6pcpou dxovicri::ffic;· µt00801 cruµµ6pqiou dKov1crµou }.
conformal maps of Euclidean volumes on Euclidean volumes, cruµµop<pot dxovtcrµoi cUKAct-8ciffiv OYKffiV ETCl UAAOU<; cUKAclbcLOU<; oyKouc;.
conformal maps of multiply connected domains, cruµµop cpot dKOVtcrµoi rco;\;\arcA,&c; cruvanT&v ni::pw;:&v.
conformal parameters, cruµµopcpot rcapciµi::Tpoi.
conformal projection
conformal projection, cruµµopcpo c; rcpo~o/,,,ij.
conformal property of inversion (in a sphere), cru~tµopcpoc; i816-TT]c; UVtl<JTpO<pfj<; (EV Tij crcpaipq).
conformal representation, cruµµop<poc; avarcapcicrrncrtc;.
conformal transformation, cruµµopcpoc; ~ti::rncrxTJµancrµ6c; .
conformality, MA0., cruµµopcp6-TT]c;.
conformality condition, MA0., cruv-0i]KT] cruµµop<p6TT]toc;.
conformally, MA0., cruµ~16p<pffic;· {Kata <JU~tµopcpov ctKOVLcrtV j.
(to) map conformally, MAE>., dKovi~ro cruµµ6pqiroc; · [ dKOVL~Ctl Ka'ta cruµµopqJOV 'tp01tOV}.
conformally transforming a near circle into a circle, cruµµopcpoc; µi::rncrxTJµancrµoc; crxi::Mv KUKAOU de; KUKAOV.
conformance, cruµµ6p<pfficrtc;.
conformation, cruµµopcpir [ cruv81aµ6pcpfficrtc;}.
conformational, cruµµop<pT]ttK6c;, ij, ov ( = Tfjc; cruµµopcpfjc;).
conformational analysis, cruµµop<pT]ttKTJ UVUAU<Jtc;.
confound, IT AT., crucrKorisffi.
confounded, IT AT., crucrKottcrµtvoc;,T],OV.
confounded factors, IT AT., crucrKottcrµtvot rcapciyovTi::c;.
confounding, IT AT., crucrK6ttcrtc;.
congruence, 1, 0EQP.AP.,cruvapµocrr6n]c;" [ cruvapµoyij}. 2, MA0.,
congruent
cr~tfjvoc; . (IYN.: congruencyf 3, rEQM., icroµot6TT]c;.
binomial congruence, 8100Vuµncit cruvapµocrt6i:ri c;· [81rovuµ1Kii cruvapµoyi]) .
linear congruence, ypaµµ1Kii cruvvapµocrt6tric;· [ypaµµtKit cruvapµoyi]).
modulus of a congruence, µ68wv cruvapµocr161q1oc;.
quadratic binomial congruence, 'tci:puyrov1Ki] 81oovuµ1Kii cruvapµoyf] .
q-.1adratic congruence, ·rn1payoov1Kii cruva;:i>tocr16i:ric;· [ -rnpuyoov1Kii cruv~ a pµoy i1/.
root o f a congruence, pi~a i:fic; cruvapµo yfic;· [ pi~u tfic; cruvapµo cr16111-10c;/.
congruence and similarity relationships, rEOM., crxfoi::tc; 6µ016-TT]toc; Kai icro~1ot6n1toc;.
congruence group, cruvapµocrTTJ 6-µcic; · [ oµac; cruvapµoyfjc;).
congruency, MA0., 1, crµijvffiµa· [ crµfjvoc;}. 2, = congruence.
center of a ray of a congruency, Kevi:pov uKtho; crµi]vouc;.
class of a congruency, Kl,6.crtc; (wu) crµi]vouc;.
line congruency, c09ctaK6v crµi]vooµa· [ c06ctaK6v crµ1;voc;].
rank of a congruency, ~a8µ11µa wu crµi1vouc;.
congruent, 1, 0EQP.AP., cruvapµocrr6c; ,ij,6v. 2, rEOM., icr6-µ010c;,a,ov· [fooc;,TJ,OV}.
a (is) congruent to b, modulo c, (16) a cruvapµ6~nat npoc; (to) ~. Ka1a µ68wv r [a = B, µ08 y).
directly congruent, rEQM., cMteo<; icr6µowc;,a,ov· [ cl>Seroc; !croc;, 11,ov].
inversely congruent, avttcrtp6qiooc; icr6µowc;, a, ov.
to be congruent (to), cruvapµ6~oµat (np6c;).
177
~ongruent arcs of a circle
congruent arcs of a circle, icr6µoia [foa J To~a Kudou.
congruent figures, icr6µoia {foa J CTXTJµUTU.
congruent matrices, ia6µota µi1-;;pi:ia.
congruent numbers, 0E!1P.AP., auvapµocrrni ap18µ0L
congruent quantities, auvapµocrrni noa6TT]T&<;.
congruent transformation, auvapµoaro<; [iaoµow<;] µi:rncrxTJ~tanaµ6<;.
congruent transformation of a matrix, ia6µow<; [ auvapµoaro<;] µi:rncrxYJµancrµo<; µT]rpi:iou.
congruent triangles, I'EQM., icr6-~10ta ['iaaj cpiywva.
congruity, rEnM., icroµ016n1<;.
congruous, I'EQM., icr6µ010c;,a, ov· ['iaoc;,11,ov].
conic, K(l)VtKij· [KWVtKl'j wµ11]. (:EYN.: conic section).
178
acoustical properties of conics, QKOll<HlKUi io16-i:rrm; 'tcDV KCOVlKcDV.
central conics, KEVTptKai KCOVLKai. chord of a conic, xopoi] (rfjc;) KCO
VLKfj<;. confocal conics, 6µoi:crr1aKai KCO
VLKai. conjugate conics, cru~uyi:ic; KCOVL
Kai. degenerate conic, EKq>Ul..tcrµtv11 KCO
v1Ki]. diameter of a conic, 81aµi:rpoc; (rfjc;)
KCOVLKfj<;. directrix of a conic, otw9i:roucra
{ OOTJYO<;} Tfj<; KCOVLKfj<;. dual of a conic, oiOuµov KCOVLKfj<;
(toµfjc;). focal chords of conics, tcrnaKai
xopoai TOOV KCOVlKOOV.
conical projection
focal property of conics, tcrnaKTj iot6'tl)<; TcDV KCOVLKOOV.
focus of a conic, foria ( rfjc;) KCOVLKfj<;.
general conic, YEVIKi] KCOVLKi]' [yeVlKi] KCOVlKi] TOµfjj.
general equation of a tangent to a conic, 'YEVLKi] i';~icrcocr1<; (rfjc;) i':q>an1:0µtv11c; Tfj<; KCOVlKll<; (roµfjc;).
general equation of any conic, yev1Ki] t~icrcocrv; o(acroi]nore KCOVtKfj<;.
harmonic conics, apµOVLKUl KCOV!KUi.
optical property of conics, onnKi) iOtOTI)<; TcDV KCOVLKOOV.
parameter of a conic, napaµi:rpoi; KCOV!Kfj<;.
particular conic, iowµepi]c; Kcov1Kfj. polar of a conic, nol..tKi] KCOVtKfj<;. sextactic conic, EKTan1i] KCOVtKi]. similarly placed conics, 6µoicoc; ro-
no9E'tl)µi:vm KCOVtKai. spherical conic, crq>mptKi] KCOVtKi). tangent to a general conic, i';q>anro
µi:v11 n;c; YEVlKfj<; KCOVlKfj<;.
conic tangential, KWVlKOV scpanrnµ&VlKOV CTT]µ&iov.
conical, KWVtK6<;,ij,6v.
conical function, KWVtKl'j cruvapT11crt<;.
conical helix, KWVtKl'j !:A.t~.
conical map, MA0., KWVtKo<; dKOVtcrµ6<;.
conical point (of a surface). KWVtKOV a11µi:fov (smcpav&fac;).
conical projection, KWVtKl'j npo-. PoA.iJ.
orthomorphic conic(al) projection with two standard parallels, op9oµopq>tKi] KCOV!Kij {KCOVLKij op9oµop(j)!Kijj npof3ol..i] µE'tU ouo 9EµEAlUKOOV napaUi]A.cov.
simple conic(al) projection, anl..fj KCOVlKi] 7tpof3ol..i).
conical scanning
conical scanning, PAL1IENT., KW
VtKT) 81i:pi:uv11cr1<;.
conic( al) section, KWVtKl'j wµij-[ KW
VtKl'jj. (LYN.: conic). spherical conic( al) section, crq>mp1K1)
KCOVtKi] roµir [ crq>mptKi] KCOVtKi)j.
conical surface, KWVtKl'j £7ncp<ivi:ta. apex of a conical surface, Kopcovic;
1fjc; KCOVtKfj<; tmq>avdac;. circular conical surface, KUKALKi]
KCOVLKi] E1tl(j)UVELU. directrix of a conical surface, OLEU-
9i:toucra [01w9uvoucra} (rfjc;) KCOVLKfj<; tmq>avdac;· [ 00\lYO<; 'tfj<; KCOV!Kfj<; tmq>avEiac;].
equation of a conical surface with vertex at the origin, t~icrcocrt<; KCOVtKfj<; tmq>avEiac; µt'; 'tl'jv Kopuq>i]v Tl)<; de; 1i]v urrapxi]v.
quadric conical surfaces, ow1i:pomai [OEU'tEpof3a9µtot} KCOVLKai tmq>UVELUl.
vertex of a conical surface, Kopuq>i] (1fjc;) KCOVtKfjc; tmq>avi:iuc;.
conicality, MA0., KWVtK6n1<;.
conicoid, KWVtK0&18ijc;,11<;,t<;.
conjectural, dKacrnK6<;,ij,6v.
conjectural variation, LTAT., dKa-arncl'j napaUayij.
conjecture, A Or., dxacria· [ &ixaaµ6<;].
Bieberbach conjecture, f31f3epf3axtavi] EiKacria· [ EiKacrµ6c; 'tou Mniµni:pµnax].
Goldbach conjecture, yol..Of3axiavi] ELKacria· [ EiKacrµ6<; TOU rK6A.v1µnax}.
Hadamard conjecture, al>aµapoiavi] eiKacria· [dKacrµOc; rou 'Avmµapj.
Waring's conjecture, ooap1vyK1avi] EiKacria· {dKacrµ6<; 'tOU rouciiptV'YK}.
conjoint, MA0., auvT]µµtvo<;, 11,ov.
conjugacy, MA0. aol;;uy6r11<;.
conjugate, MA0., crul;;uyi]<;,TJ<;,t<;.
conjugate CJll'Ve
isothermal-conjugate, icro9epµoau~uyi]c;,l)c;,i:r;.
conjugate, MA0., I, aul,:uyi]<; ,(a~wv, 8t<iµ&rpo<;, 11 urci:ppo~Tj). 2, aul;;uyl':<; CJT]µ&fov· [ crul;;uyl':<;]. 3, crul;;uyl':<; µ11TP&fov.
complex conjugate of a matrix, µ1-yao1K6v crut:uytc; µ111pi:iou.
harmonix conjugate, apµOVtKOV OU~uy£i;;.
harmonic conjugates with respect to two points, apµovtKa cru~uyfj roi;; np6c; ouo m1µi:la.
isogonal conjugate, icroyciivtov au~uytc;.
isogonic conjugate, lcroycov1K6v au~uyi:c;.
method of successive conjugates, µt9ooor; 1oov om0ox1Koov cru~uyt'i'lv.
conjugate algebraic fields, aul;;uyf) aA. yi:pptKa ni:8ia.
conjugate algebraic numbers, <rnl;;u-yi:i<; aA. yi:PptKoi upt8µoi.
conjugate angles, crul;;uyd<; ywvim.
conjugate arcs, aul;;uyfj c6sa.
conjugate axis of an ellipse, crul;;uyi]c; i'i~wv (cfj<;) sU&i\j/&W<;.
conjugate axis of an hyperbola, aul;;uyi]<; i'iswv (rfj<;) urci:ppoA.fj<;.
conjugate beam, MHX., aul;;uyljc; bOKo<;.
conjugate binomial surd, crul;;uyi]c; btWVWLtKl'j app11r6pt/,:a.
conjugate complex number, aul,:uyi]<; µ1ya8tKo<; apt8µ6<;.
conjugate conics, crul;;uy&i<; icwvtKai (wµai).
conjugate convex functions, aul;;uy&i<; Kuprni cruvaprficri:t<;.
conjugate curve, crul;;uyi]<; KaµnuA.11. mean-conjugate curve on a surface,
179
conjugate diameter
µEcrocrui;uyr, c; KaµrruA.11 !mi £mqiu.vEiac;.
conjugate diameter, crnt;uy~c; otciµi:-rpoc;.
conjugate diameters of a diametral plane of a central quadric, crnt;uydc; otciµi:-rpot otaµnptKou £mrr£oou KEv-rptKii<; ocuTEpocrrfjc;.
conjugate diametral plane, crut;uyf:c; OtaµErptKOV f:rrirrEOOV.
conjugate directions, crnt;uydc; 8t£ueuvcr£tc;.
mean-conjugate directions on a surface at a point, µEcrocru~uyEic; otEv-0\JvcrEtc; (imi) l;mqiavEiac; de; n crriµEiov.
conjugate dyads and dyadics, crui;uydc; oua.8£c; [ crut;uyfj ouciota J Kai OUUOlKU.
conjugate elements of a determinant, crul;uyfi oro1xda (~na.c;) 6ptl;oucrric;.
conjugate elements of a group, crut;uyfj mo1xEia 6~1ciooc;.
conjugate foci, crut;uydc; £crriat.
conjugate function, cru(uy1)c; cruvapn1mc;.
conjugate gradients, crut;uyfj 1CA.in1.
method of conjugate gradients, ~lt-0o8oc; 'tWV crui;uy&iv Kl-t 'tWV ( 'tWV Xtcr<rivc; Kai I-riqiEA.).
conjugate groups, crut;uydc; oµci-0£<;.
conjugate harmonic function, crut;uyf]c; Up~lOVlK~ CTUVUp'rTJCTt<;.
triple of conjugate harmonic functions, 'tptac; cru~uy&iv apµOVLKWV cruVUp'ti]crEWV.
conjugate roots
conjugate hyperbolas, crut;uyi:Ic; urri:p~oA.ai.
conjugate hyperboloids, crut;tiyfj u-ni:p ~OAOEtofj. .
conjugate imaginary, crut;uyf]c; cpavrncrnKoc; ( ap18µ6c;).
conjugate imaginary numbers, crut;uyEic; cpaVtaCTTtKOl Upt8µoi.
conjugate imaginary roots, · crut;uy£Tc; cpavrnmtKai pit;m.
conjugate line, crut;u·p)c;ypaµµir[ crut;uy1)c; £u8£laj.
isogonal conjugate lines, iqoyci>vtol crui;uyETc; ypaµµai.
conjugate lines on a surface, crut;uy£Tc; ypaµµai i:mcpavdac;.
conjugate number, crut;uyf]c; apt9-~t6c; .
conjugate of a matrix, crut;uyf:c; µT}TpEiou· [ crut;uy£c; µ11-rpdov].
complex conjugate of a matrix, µ1yaotK6v crui;uyi;c; µri<pEiou· huyaOLKOV crui;uyi;c; µri<pETov}.
conjugate operations, MA0., crut;u-yEt<; npci1;£tc;. ·
conjugate planes, crut;uyfj £n[n£oa.
conjugate point, 1, crut;uyf:c; crriµEiov. 2, = acnode.
conjugate points relative to a conic, crut;uyfj CTTJ~lEta avacpoptK&c; 1tpoc; K(l)VtKl']V W~llJV.
conjugate polyhedra, crut;uyfj noA.uEopa.
conjugate quaternions, crut;uyfj -rEcrcrcipta.
conjugate radicals, crut;uyfj pt/;tKci.
conjugate roots, crut;uydc; pit;at.
conjugate ruted surface
conjugate ruled surface of a given ruled surface, crot;uy~c; £u8i:toy£vf]c; bncpav£ta oo8£icrric; £u-8£toy£vouc; i:rrtcpav£iac;.
conjugate ruled surfaces, crut;uy£Tc; £u8£toy£V£t<; £mcp<iv£tat.
conjugate series, crut;uyf]c; cr£tpa.
conjugate space, crut;uy~c; x&poc;. (l:YN.: adjoint space).
conjugate space of Banach, crut;uy~c; ~avaxmvoc; x&poc;· [ crut;uyf]c; x&poc; wu MnavaK}.
conjugate spherical harmonics, cru-t;uydc; CT<patptKUl apµovtKai.
conjugate substitution groups, crut;vy£Tc; urroKarncrrnnKai 0~1aocc;· [ crut;uyETc; O~lUOE<; UITOKUTUCT'rUCT!:(l)<;].
conjugate surfaces, crut;uydc; £rct<pavi:tat.
conjugate system of curves on a surface, crul;uy£c; CTUCTTlWU Kaµ-1tlJA(l)V £m<pav£iac;.
isothermal-conjugate system· of curves on a surface, icrolkpµocrui;uyec; crucr-criµa 1mµnuA.rov smqiavEiai;.
conjugate tangents, cru~uy£tc; i':cpam6µeva.t.
conjugate triangles, crusuyfj 'Ipty(l)va.
conjugate trihedra, crut;uy~ -rpieopa.
conjugation, MA0., l;;uywmc;· [ crut;uywmr;].
charge conjugation, cru~uyrocric; <pop<iou· [ qiopnKii i;uywcrv;].
conjunction, 1, AI:TP., cruvoooc;. 2, AOI'., crut;cul; tc;. 3, cruvoccr~toc;.
connected map
conjunctive, MA0., cruvo£cr~ttK6r;, i],6v.
conjunctive probability, cruvoEcrµtKf] meav6-r11c;.
conjunctive search, AOrn::M., cruvo£crµtKf] EPEUVl')<nc;.
conjunctive transformation, mJVO£crµtK6c; µ£mcrx,11µancrµ6c;.
conjunctive transformation of a matrix, cruvo£crµtK6c; µewcrx11µa-rw~1oc; ~LTJtpeiou.
conjunctural, I:T AT., cruyKuptmc6c;, i],6v.
conjuncture, OIK. , l:TAT., cruyKupia.
connected, MA0., cruvan-r6c;, i] ,6v.
connected aggregate, cruvamov cruva8potcr~La.
perfect connected aggregate, <l':A.EtoV crtJVU7t'tOV cruva9potcrµa.
connected domain, cruvarr-rf] n£pt-oxiJ:
conformal maps of multiply connected domains, cruµµopqJOl ELKOVtcrµoi 7tOA.A.aitA.&t; Cf1.JVUJt'tWV 1tEPtox&v.
multiply connected domain, itoA.:l.a7tA.&c; cruvan-ci] 7tEpwxfi .
triply connected domain, -cpn-c&c; cruvurr<ii m;pwxfi.
connected equations, cruvmnai 61;1-crfficrEtc;.
connected graph, cruvan-rov ypucp11µa..
connected map, cruvamoc; £iKovtcrµ6c;.
canonical types of multiply connected maps, SccrµtKoi 'tU7tOt 1toA.A.a1tA.~ cruvait<fuv dKovtcrµGJv.
multiply connected map, noA.A.anA.&i:; <JU\IU1t't0t; ELKO\ltcrµOt;.
181·
connected region
connected region, cruvarrr'l'] rrEptox1).
simply connected region, cinA.l'iis cruvanni m;p10xi]. ·
connected set, cruvarrrov cr0vo/,.,ov. arcwise connected set, · rn~ocruva
ittov { tO~OE!OWs O'UVU1tTOV O'UVOf.OV j. compact connected set, cruµnayts
O'UVCl1tTOV O'UVOAOV. locally connected set, t0mKl'iis cruva
ittov O'UVOAOV. open connected set, clV.)lKTOV cruva-
1tTOV cruvo/.ov.
connected set of points, cruvarrrov <JUVOAOV cniµEimv.
connected space, cruvanro<; :x,&po<;. affinely connected space, cruyyi:voos
O'UVU1tt0s XWPOs.
connected surface, cruvwn'l'] l;mcp6.VEta.
doubly connected surface, Olnciis O'UVU1tti] E1tlq>UVElCl.
simply connected surface, a1tf.l'iis O'UVU1t1:fj emcpciVElCl.
connectedness, MA0.,cruvanr6tT]<;.
connection, 1, MA0., cruvacp1:ta. 2, MHX., MA0., cr0v8rnv:;.
affine connection, cruyyi.:vi]s cruv8i:ms· [ cruyyi:viis cruv8i:nKT] axtmsf.
coefficient of connection, cruvteA.EcrtfJs cruvac:pEim; (rnu x<ilpou).
determinate connection of arithmetic symbols, 1tPOO'OtoptcrtT] O'UVUq>E!Cl TWV apt0µrrmcl'iiv cruµP6t.cov.
elastic connection, E:A.acrnKi] cruv-8Ecrts.
Levi-Civita connection, l.ePtKtPttavi\ cruvcic:pi:w· [ cruva.q>Eta tou Ai:P1-TmPita}.
connective, A.Or., cruv8EnK6v· [ cruvOEnKov µ6ptov].
182
logical connectives, A.oytKi.t cruv8E· TLKCt ( = Kai· fr Ei8ciUros· to.v-t6TE' OUTE-oihe' EKt6s av).
consequence
statemental connectives, a1toc:pavn-, KU O'UVOEtlKU.
connectivity, MA0., cruvacpf]. edge connectivity, ciKµ11ci] cruvaqn'J. local connectivity, tom KTJ cruvacpfr
[ cruvar.pl'j i;v crµ ucpc!J}.
connectivity in the small, cruvacpi} i;v crµtKpij:i· [ TOmKT] f.na:cpi)j. (repµ.: zusammehang im kleinen).
connectivity number, MA0., U.ptOµo<; cruvacp1''j<;.
connectivity of a surface, cruvacpl) l;mcpavEia<;.
connector, HAEK., cruv8En)<;· [ cruvOETf]p].
variable connector, ~LEtaPl.TlTO~ cruv-8eri]s.
connexity, cruv8EnKOTT]<;.
connotate, €surraKo0m ( = unovo&· crnvaym Ken' UKOAouOiav).
connotation, cruvEK8ox'l'J ( = €sunaKouoµ£vT] £p~l11vEia).
conoid, 1, KOJVOElOE<;. 2, KOJVOEiOT]<; E1tl<j>UVELU.
elliptic conoid, i;A.A.E titnKov K©VOEL· 8i:s' [lUEtljlOElOEs}.
parabolic conoid, napaPoA.1Kov KW" ' voet8f.s· [ napaPoA.oe18i:~].
.right Conoid, op00V K©VOelOEs.
conoid(al), JCOJVOEtOf]<; , f]c;,£<;.
consecutiYe, 8ta8ox1K6<;,f],6v.
consecutive points, 8ta8oxtJCa CJT]-µEia.
consensus of opinion, 1, 6µ6cpmvo<; yvffiµT]· [6µocpmvia yvcilµT]<;]. 2, yEVlKl) yvwµT].
consequence, cruv£nEta.
consequent
co._seq~ent, l, MA0., £n6µEvoc;· {~rr.O~lEVO<; opo<; (avaA.oyiac;)· OE\)rr,po<; opo<; ( civaA,oyia<;) ]. 2, A.Or., £rr.6µEVO \I (urroOEnKfj<; KpicrEw<;).
consequently, cruvrn&<;· [Kata cruv£rrEta v· £rr.o ~t£vm<;}.
conservation, 1, 8tarf]p11mc;. 2, cruvn'JpTJmc;· / 8tacp0A,astc;}.
conservation of energy, 8tatf]pT]crt<; tfj<; f,vr,pyEiac;.
principle {law} of the conservation of energy, cipxi\ f v6µos] tfi~ 8tatT]pi]· 0-i:w~ tfis tvi:pydas.
conservation of mass, 8tarf] pT]crt<; 'tfj<; µ6./;T]<;.
conservation of matter, 8tarf] PTJcrt<; Tfj<; DAT]<;.
conservation of momentum, 81atf]p'r)crt<; tfj<; p0µT]<;.
Jaw of the conservation of momentum, v6µos tfis OlQtT]pi)crEWs tfi~ puiil'ls' ' [ npl'iirns v6µos tfis K1vficreros rnu Ni:\Jtwvosl.
conservation of natural resources, 81acpuA,asic; [ rrpocrrncria J t&v <j>UCJl'KWV rr;6pwv.
conservative, J, cruvrT]pTJnK6<;,f], 6v. 2, 8iatT]pT]nK6<;, f],6v· [ rr1-pTJnK6<;;f],6v].
conservative force, TTJPTJHKTJ 80-vaµi<;.
conservative set of forces, tT]pTJnJCov cr0vo/,.,ov OUVUµErov ..
conservative systems, TTJPTJnKci crucrn)µam. (Kar' civno. rrpo<; rci dissipative systems, CJKEOacrnKa crucrrf]µarn).
conservative theories (in mathematics), CJUVTTJPTJTlKCti 0Empiai (t&v µaOT]µanJC&v).
consistent
conserving (the size of) all angles, MA0., OtaTTJPTJGl<; (rou ~1r,yuSouc;) r&v yroviwv.
consideration, €s£mcri~· /(wptµoc;} crKE\lft<; ' OcropT]crt<;}.
time under consideration, (6) i.in6-0i:ropT]crlv xpovo.;.
under consideration, lino crKEljltv· [lino µEAETT]V].
consistency, J\Of., MAE>., cruvaJCoAou0ia ( = A.oy1 KTJ cruvoxiJ).
solving the proble1b of consistency, tniA.ucr1s wu npoPA.fiµurns •T\s ouvaKoA.ou0ias.
consistency of an axiom system, cruvaKo/,ouOia [cruµPtPacrr6tl)<;] crucrriJµaro<; astro~16.tmv.
proof of the consistency of an axion system, ciit60El~Ls tfis O'UVUKOAOU(Hus I ait68et~ls tfis cruµf:l1f:lacrTOTlltos} t-VOs crucrtfiµarns 6.~100µ6.Trov. ·
consistency of equations, cruvax;oA.ouOia twv €sicrwcrEwv.
consistency of homogeneous linear equations, cruvaKoAouOia (t&v) 6~1oyEv&v ypaµ~uK&v i;sicrrocrEmv.
consistency of n linear equations in m variables, cruvaKoA.ouOia v ypaµµiK&v EStcrwcrr,rov nov µ µEmPATJT&v.
consistency of simultaneous linear equations, cruvaKoA.ouOia (T&v) raurnriµmv ypa~1piK&v €smrocrEwv.
condition for consistency of simultaneous linear equations, cruvSi]Kfl cruvaKoA.ou0ias Tciiv taurntiµrov ypaµµ1Kciiv {;~1crrocrcrov .
consistency theorem, Ocwpriµa rfj<; crUVUKOAOU0ia<; (TOU rlCetl\ltEA).
consistent, l, J\Or., cruvaJC6AouOo<;, o<;,ov ( = A,oytJC&<; cruvrnf]<;, i)<;,
183
oonslstent assumptions
· · £<;). 2, MA0.; cruvaK61i.ou0°';,o<;, cw [ crwtPtPacri;6<;,11,6v ].
consistent assumptions, /\Of'., cruv. aK6A.ou0ot npoUno0tcrcL<;.
<;onsistent axiom system, . MA0., cruvaK6A.ou0ov [ cruµPtPacri;ov] crucrnnta U~LWµ<lTffiV.
consistent deformations, MHXT., ' . O"UVUKOAOU00L napaµopqirocrcL<;.
consistent equations, cruvaK6A.ou-0oL · [ crt.iµPLP.acrwi] £~Lm:ilcrcL<;.
consistent postulates, MAE>., cruva.K6A.ou0a aiTiJ µarn.
c~nsistent systenl, MAE>·., cruva.r .. K6A.ou0ov [ (J"\)~tPLPacrTOV 1 cru-
cru1µa.
c'onsole; .xc:tpLcrTil pwv· [ Kovcr6A.a ].
consonance, <DYE., cruvfixricrt<;.
conspectus; tmcrK07tnK6v ( = cruvo-rcttKTJ cruµnc;p LA TJ nn Ki] £mcrK6-1l:TJ O"L<; E1tlTpE1tOUCJU ycVLKTJV UAAU O"U(jlll clKOVU {;v6<; etµa.w<;· crnµnc:ptlcT)7tnKi] cruvoljft<;).
constant, crrn9c;p6<;,<i,6v. . multiconstant, nA.ctovom:a9cp6<;,6., OV.
constant, MAE>., crrn0c;pa. aberration constant, anonA.aVTJ'tLKTt
184
crm0i:pa. . . absolute constant,. an6A.uw<; crra-
0i:p6.. . ...
additive constant, rrpocr6cnKT] <HU-0€p6.. ·. . .
affiniiy constant, crta9i;p6. cruyyi;vEia<;. ·
arbitrary constant, au0ai;Jf.W<; ITTCl-0i;pa.
astronomical constant, acrrpovoµiKi] crra0i;pa.
attenuation constant, ti;acr0EVTJ'tlKi] o'ta0i;p6.. ·
constant
Avogradro's constant, <iPbyaoptlCT] crmBi;p6.'[ crra0Epa wu 'APoyriopou}.
beta decay. constant, crm9i:pa PTJ-ranKii<; napaKµii<;. ; ,.
. boiling constant, ppacrµuo'l , tl'ta9i:-pa. .
boiling point constant, ., maBepa crT]µEiou ppacrµou. . :• ...
Boltzmann's constant, PoA.i;crµavv1aviJ crta0ep6.'[ ITTa0i;pa rou Mn6hcr~mv }.
burning rate constant, ITYPAYA. crra0i;pa 01ai:'tµii<; cpA.i;l;i;w~. ' · · · '
circular constant, 1Cu!CA.1K'f],.cri'a9i:p6: [n}. ·· . ,
cosmical constant; 1COcrjiL'1Ci'} · ~ra0i;-pa. ...
critical constant, Kpicriµo<; i;rmBi:p6.. cyclic constant, ICUKA.taKT'\ [.icuKA.rt
µan Ki]} crta0i;p6.. damping constant, arroo'j3i;o'rn(i]
crm0i;pa: [ Cf't'Cl0Epa a1tocrPfowli; I. decay constant, crra0i:p¢ napaKµii<;. derivative of the product of a con
stant and a variable, nap6.yc\iyo<; wu y1voµi;vou crraOi:pii<; Kat ~1i:mf3A:rt•ii<;.
dielectric constant, Ollif.tKtpLKJ'\ crmfli;pii. . ..
diffusion constant, Ci>Y~·.', crm0i:pa owxucri:@;. • . . .
dimensional constant, .-:ocacr:tan1Cf] m:a0cpa . . .. "
direction constant, 01cu6uvnKT]. crra-0cpli · [ crra0cpli 01cu0uvcrci:o~]: ·
ebullioscopic constant," j3pucrµ:ocr1ComKT] crm0i:pii.
effective damping constant, opacrn-. Kl] arrocrPccrtLK~ crm0i:pii. ·
elastic constant, tA.acrnKT] crm-Oepa. · ·
equivalent damping· constant, !croouvaµo<; cirrocrj31:crn1C1] crm0i:p.a.
essential constant, oumroo~<; crm-0i;pa. · · ·
· Eulerian · constant, i:uA.T]p1rivf] crm-Oi;pa. . .
extensional spring constant, E:neKtatLICTJ €A.CltTJPlUKTJ crm0i:pa.
Faraday constant, q>apaoa'iKi] · crra-0E.J:i· [ crm0epa wil <1>6.pctvmtri}.
. f.leimral spring constant, 7tcptKaµm11.~ft , i';A.arrtptClKTJ crralJcpci.
gas constant, crra0epa rwv O.cpiwv· [ ai:ptaKT] crra0ep6.}.
G'aussian ·constar.!, yro~mav]l · crra-0i:pa· [ crm0cpa rno rKaou<;]. . G<1ussian gravitation constant, yummayf] j3apunKT] crm0i:p!l· [j3apunKi] crrci~tpa rnO rK6.ou.;· ywcrmaviJ crm-0i:pci}. . .
gravitational constant,' PapunKT] c:rme&pa· [ crra0r;pa •ii<; j3apurrtrn<;· crTa.0EpCt Tii<; 1tClYKOcrµiOU ef.i;cw<;· VEU't'OOVELO<; crm0Ep6.}.
Hall constant, xaA.A.iav]l crm0cpci· [ ma0i:pa wu xwn].
h·ysteretic constant, ucrn:pT]nKT'\ crraOf:pa.
Joule constant, ~ouA.ctav~ crra0i:pci· [ crw.0i;pa wo T~6.ouA.}.
Lame's constant, A.aµi:mvf] crra0e-p6. ·I crra0£pa rnu Aaµe]. ,
lattice constant, nA.qµanKT] crraOi:pa,
lemniscate constant, A.rtµvmKLKTt qra0cp6..
liteml constant, eyypaµµarnc; Cf't'Cl()i;p6..
logical constant, A.oytKTJ crm(kpa. multiplication of a determinant by
a constant, noA.A.anA.amacr>LO<; 6p1-~oiicr11~ erri crm0ep6.v.
Newtonian constant, vcurcovmv1] ITTLi0€pa· [ crm0cpa 't'fi<; nayKocrµiou £f./;Ero<;· papU'tllCTJ crm0Epaj.
nonzero constant, µft µT]i>cvtaia {l'JL6.q>opo<; wu µrtl>i:voc;} crta0cpa. . normalizing constant, 6p0o0ernucra crmllE'pa.
· ilumber of essential constants in an equation, api0µ6<; TWV oucriwoc1iv crm-0cpiilv µtac; ti;icroocrcw<;.
oscillation Constant, 't'Clf.ClVtW'tLKTJ crra0cp6.· [crra0epa (•ii<;) raA.avrrocrr;w;.j,
physical constant,cpumKLICT'\ [0A.tKi]) crm0ip6.. .
Planck constant, nA.avK1avi] crmOi;p(.r [ crm0r;pa rnO TIA.6.vK ].
plotting the damping constant in
. co11sta_nt
percent of the cri tical, unoru1m1m<; [ ypacp"Qmc;} •ii<; cinocrj3r;r1Kii<; crral:h::pa<; ci<; EKarncrra rfj<; Kptcriµou.'
Poisson constant, · Jtouacrcrovmvl) crm0cp6.· [crm0epa rnu .nouacrcr6v}.
precession constant, crra0i:pa (tiic;) µETClit't'cO<rEW(;. . .. · pressure constant,' crra0cpa '<•iic;)
mtcri:w<;. · · propagation constant, npoaywyiKi\
crra0cpu· [ crm0r;pq &iaoocri;w<;J.. proportionality constant, crra0i:pa
(Tfj<;) civaA.oyLKO't''QTO<;. . purifying constant, &i;ayvlcrrtKT'\
crra0i:pa. radiation constant, 0.Knvoj3oA.taKi]
crm0cpa· [ crm0cpa •ii<; aKnvol3oA.ia<;}.
radioactive constant, pai>tE\IEpyemKi] crm0i;p6..
solar constant, fiA.1aKT] crta0i:p6.. spring constant, tA.a•rtPtaKi] crm
()i;pa. station constants, THJ\EM., ·crm-
0i:pai (rnu) crra0>L00. Stefan-Boltzmann constant, cna0i;
pa fatcpav-Mn6hcrµav. surface constant, i'.mq>ClVEtClKTJ crra-
0cp6.. system of astronomical constants,
<rU<r't'T]µ,Cl CtcrTpOVOµtKWV crm0cpc1iv. time constant, xpovtKTJ crra0i;pu.
(EYN.: lag coefficient). torsional spring constant, crrp£7tTt
KTt €:1..atflptaKT] crra0cpa. undetermined constant, aKa06pt
crw<; crra0i:p6.. universal gas constant, Ka00A.11Ci]
crra0i;pci. r<iiv ciepioov· [ nayKocrµw<; CtEPLClKTJ crm0cpii. J
universal gravitational constant, crm0cpa •ii<; nayKocrµiou £A.i;i:ro.;· [(nayK6crµto<;) papunKTJ crm0i:p6.}.
variation of constants, µeruA.A.ayiJ riiiv crra0i:p&v.
volume constant, oyK1K1] crmOi:pa· [crm0epa TOU oyKOU}.
Wien displacement constant, crT<h 0r;pa µcraronicrcw<; roil Biv.
Zeeman splitting constant, ~11µav1a-
185
constant acceleration
vl] otacrnacrnKT] cr1a9epii· {otacrrmcr11KT] crm9epa wii Zfj~1av j.
c:onstant acceleration, cn:a8i:pa £rrttcixuvcw;.
constant acceleration method, µs. 8ofo::; (t~::;) ma8i:pfi::; £mtet
xuvcrsffi::;.
constant acceleration pulses, cna-8i:poi £mraxuvnrni n:aA.~toi · [ crra8spoi n:aA.µoi £mrnzuvcrnffi::;}.
constant amplitude, MHX., cnu.. 8i:pov i:upo::;.
constant area. Aorn:M., crrn0i:pa ( Un:00tj1CEUttK1'j) n:EptoX iJ.
constant coefficient, crra0i:po::; cruvti:A.rnri]::;.
second-order linear (homogeneous ordmary) differential equations with constant coefficients, ocu1i:po1aC,w1 ypaµµ1Kai (6µoyevi:li; cruvl19eti;) otacpoptKai f:C;tcrrocrnti; cxoucrm crm9epoui; cruv1e/,ecnai;.
constant curvature, crta0i:pa Kaµn:uA.6n1::;.
constant damping, crtu0i:pa an:ocr~i:m::;. (LYN.: Coulomb damping).
constant error, crrn0i:pov mpciA.µa.
constant force, MHX., crta0i:pa 00-vaµt::;.
· suddenly applied constant force atcpvtolroi; acrK11f.JE!cra am0epa ou~ vaµti;.
constant instruction, AOrILM., crta0i:pa £vwA.i].
constant. load, crrn0i:pov [ µ6vtµov j <popnov.
cons~ant ~ean velocity, crrn0i:pa ~ti:cn1 taxuvm::;.
quadratic pulses of a constant mean
186
constant speed
velocity, 1c;rpayrovtKoi {oi:tijkpoP!i0-µ~ot} rraA.µoi am6epi'ii; ~ttcrrii; m-xuvcrrnii;. ·
cons~ant motion, crrn8spa [oµaA. i]} KtVl]CH::;.
constant multiplying facfor, crrn-0i:po::; n:oA.A.an:A.amacntKC>::; . n:apciyffiv· [ crrn8spo::; noU.ft;n:A.acnacrt~::;].
unknown constant mult iplying · factor, ayvwarni; ara9Ep6<; 1toA.A.ci1tA.aO"lU<HlKOs itapayrov· { ayvrocrrn~ · u'tU-9ep6i; 1to/.A.arrA.acrtacr1fii;}.
constant of aberration, anoniavrinKi] crrn0EpCl" { crtU8Epil an:on;A,avijcri:w::;j.
constant of capillarity, tptxoi:t8tKi] crta0epa· {crtu8r.pa -rfj::; tpt-X 0Et8( t1C)6tl] ta:;]. . · ..
constant of gravitation, crta8Epa n'j::; ~apun1w::;.
universal constant of gravitation ma0epa 1fii; itayKocrµio u t;A.C;ewi;: [ (1tayK6cr~ttoi;) PapU'ttKT] cr1a0ep6.].
constant of integration, cna0i:pa n'j::; 6A.0KA.11 pwcri:co::;.
arbitrary constant of integration UU~Ui~em; OAOKATJj)ffinKT] crm0ep6.'. [ au0mperni; crm0epa 1fic; 6A.oKA.TJpril· m;w:,].
constant of multiplication, crta0i:pu wu n:oA.A.an:A.acnacrµou. ·
constant of nature, <pucrtKi] crrn-8i:pci· [ crrn0i:pa i-fj::; cpucri;co::;].
constant of proportionality; crta-8i:pa i-fj::; avaA.oytKOtl]to::;:
constant of purification, MHX., crta8Epa tOU £sayvtcrµou:
constant quantity, crrn8i:pa Jtocr6-i-ri::;.
constant speed, crrn9:::.J:'.t [oµa'}.,,i]j taX:utri::;.
constant stimuli
constant stimuli, 'PYXO<l>., crta-8i:poi £pi:0tcrµoi.
method of constant stimuli, µi;0o-8o<; riiiv m:a0Ep0iv f:pe0tcrµiiiv.
constant-sum profits, MA0., aw(:)i;p6n:ocra K£p811.
constant term, crni8i:po::; opo::;. addition of infinite series of con
stant terms, rrp6cr0ecrt<; aiteipwv cretpiiiv Exouaruv am(kpoui; 6poui;.
constant velocity, crta8i:pu [oµa),1)] i-cizuvm::;.
constant wave phase, cri-a0i:pa KUµanKi] cpam::;.
constituent, crucri-anK6v· [ crucri-anKOV O"tOLXELoV].
constituents of a determinant, crucrtanKa ( O"tOLXEta) tfj::; 6ptsoucrT]::;.
constituents of a matrix, crucrtanKU crt0t;t;Eta i-ou ~111-rpi:iou.
constitutive equation, cruyKpOtT]ttKll £sicrwcn::;.
constrain, Katacrtf:A.A.co· [ £savayKasw}.
constrained, Kai-i:cnaA.µsvo::;,ri,ov· {£savayrnm6::;,i] ,6v}.
constraining force, MHX., Kmamah1Ki] 00vaµ1::;. (LYN.: constraint).
constraint, I, MHX., Katacrt0A. i]. 2, £savayKacr~t6::;.
elastic rotational constraint, f:A.acrn KT] u'tj)O<(Jl KT] KU'tUCi'tOA ii. [ i;A.aan Ki\ crtpo<ptKT] KamcrmA. nKT] O\Jvaµ1<;].
geometric constraints, yewµe1ptKal KU'tUCT'tOAUi.
construct, KatacrKcu<isco.
construct, KatacrKi:uacrµa.
construction
construct a line perpendicular to another line, KUtacrKEUUSW { xapaaaw] i:u8i:fov Ka8Et0V £n:i. aA.A.riv · i:u8E1:av.
constructibility, MA0. AOr., cruµn:i:pacrt6tT]::;.
axiom of constructibility, a~iroµa 1fji; cruµ1tepacr16•111:0<;.
constructible, MA0. AOr., cruµn:i:pacrt6::;, 11,ov ( = TCOU ouvatm vu n:poKu\j/Et EK cruµni:pacrµou i'j AoytKfj::; KUtaO"KEUfji;).
nonconstructible, µ11 auµ1tepacr16i;, fi,6v.
constructible universe, MA0., cruµn:i:pacrtov cruµnav.
construction, 1, MA0., (yi;coµi:tptKij) KUtUO"KEUll. 2, MHXT., KUtaO"KEUi]" [ oiK086µ11cn::;]. 3, MA0., AOr., cruµni:pacrµ6::;.
aseismic construction, avnaEtcrµtKTJ KU'tUCiK£Ufi.
aseismic construction methods, µi;-00801 UV'tlCi&!O"µtKfi<; KU"tUCiK&Ufj<;.
building construction, ooµtKTi [ oiKoooµtKT]] KU'tUCiKeufi· { OtKOOOµlKOV i\pyov· oiKOooµi]}.
earthquake-resistant (design and) construction, avncre1crµ1KT] (crxeowA.6y11ati; Kai) KU'tUCTK&Ui].
gauge construction, rEQM.. vo-
geometric construction, yeroµe1ptKi) KU'tUCTK£Ufi.
graphic construction, ypmptKT]. Ka·racrKeuii.
harmonic construction, rEQM., apµOVtKT] KU'tUCiK£UiJ.
linear construction, rEQM., ypaµµtKT] KU'tUCTKWi].
mechanical construction, µ11xavtKT] { yeroµetptKT]} KU'tUCiKWii.
model construction, Ka1acrKeul] 1tpo-1urroov.
Pontryagin-Thom construction, Ka-1acrKeul] Ilov1puuyK1v-T6µ.
187
construction engineering
rigid-type construction, ·MHXT., O"'tEppa { O"XEOOV iixaµ1mx;,j KU'taO"K&ui].
ruler and compass construction, KU't<lO"K&ui] KUVOVOC, Kai Otaf3i]'t0\l.
step-by-step graphic(al) construction, f3TJµUtlO"nKi] [ O"l']µElOO"lWElUKli] ypa~LKi] KUtUO"KE\lfi.
construction engineering, µl]xavo·rexvia 'rOlV JCU'rUCJICEUWV.
construction in proving a theorem, ')'ECOµE1pt1Cij JCU'"CUCJKEUl'j 'TCpOt; a?100ElSl V 0i:copi}µarnc;.
construction line, (i:rctJCouptKij) ')'paµµij (yi:coµi:iptJCfjt;) JCam-crKwfjc;.
construction method, MHXT., µt-0o8oc; JCU'"CUCJKEUfjt;. .
aseismic construction method, avncretcrµtKi] µt0ooor:, KatacrKeufjr:,.
construction of maps, JCa1acrKw1) f xapasic;] xap1rov.
construction points, (bttJCouptJCa) CJl]µEta (yECO~LE'"CptK~t;) JCU'rU-CJKEUfjt;.
construction proof, MA0., 1, arr6-8i:tstc; JCU'"CUCJJCEUfjt;. 2, U7t00EtSlt; cruµm:pacrµou.
constructional, oi.JCo8oµtJC6t; ,i},6v· [ 1Ca1acr1CwacrnJC6c;, iJ,6v ]' ( = '"CWV JCU'"CUCJKEUrov).
constructive, 1, AOr., cruµn:i:pacrµanJC6c;,i} ,6v ( = i:s tpµ11vEiac;· EK JCarncrKwfjc;· EK cruµrri:pacrµou). 2, 811µioupyiK6c; , ii ,6v· [bt0tKOOOµl"jnK6c;,iJ,6v ].
non-constructive, µi] cruµnepacrµattK6r:,, i], OV.
constructive argument, AOr., cruµn:i:pacrµanK6c; [EK cruµrri:pacrµou] icrxuptcrµ6c;· [ crtiµni:pacrµanKov EmxEip11µaj.
188
contact transformation
construe, AOr., cruvayco Kata crwtm;pacrµ6v· [tpµT)VEUCO EK Kaia
. CJICEUfj t; j.
consultant, cruµpouA.oc;· [ 7tpayµarn')'VWCJ'"CT)t;}.
management consultant, otaxetpicrttK6r:, cr\Jµf3ouA.or:,· { cr\Jµf30UAOC, OtaXElpicreror:,j.
consulting, npayµa1wnK6t;,T),ov· [ npayµarnyvcocmK6c;, iJ,ov j ( = tKUVOt; va cruµ~OUAEUEt we; Eµ?1Etporrpayµcov).
consulting engineer, rrpayµarnyvcocrnK6<; [ rcpayµa1wnK6c;j µrixav01txv11c;.
contact, MA0., i:nacp1). angle of contact, yrovia tna~fjr:,.
chord of contact, xopoi] tna~fjr:,.
chord of contact with reference to a point outside of a circle, xopoi] tna~fjr:, <.Or:, rtp6r:, O"TJ>LELOV EK'tOC, KUKAOI) e6ptcrK6µevov.
order of contact, <<i~tr:, tna~fjr:,.
point of contact, O"T]µe'iov erta~fjr:,.
second-order contact, oeu<epo<<i-~wr:, tna~i]· [tna~i] oeuttpar:, <<i~eror:,].
stationary contact (of an algebraic curve), m<icrtpor:, tna~i] (al. yef3ptKfjr:, KUprtUAT]r:,).
surface of contact, tm~<iveta tna~fjr:,.
tree-point contact, <ptcriiµetaKi] trta~fi.
contact of higher order, E7tacpiJ avco-rtpac; •asi:coc;.
contact of the second order, i:rracpi] &witpac; 1asi:coc;.
contact potential, 8uv11nJCov E7tctcpfjc;.
contact transformation, MA0., EnacptKoc; µi:mcrx11µancrµ6c; .
characteristic function of the con-
contagion
tact transformation, XUPUK'tT]plO"'tlKli cruvllp"fT]crtr:, (to\l) &na~tKo\l µe<acrx11-pancrµou.
contagion, I:T AT., µ6A.uvcrtc;.
container, 1, ooxi:iov. 2, NA YT., cpoplolioxEiov· [ooxi:tov } .
containerization, NA YT., <>oxEicocrtt;.' [ cpoprnlioxEicocric;].
containerize, NA YT., 8oxi:tffivro ( = crucrKi:ua~co Eµnopi:uµa1a i:v1oc; cpoprnlioxdcov).
contain~rship, NA YT., 8oxi:i6n:A.oiov· I cpoprn8oxi:wcp6pov].
conten,t, 11 m:ptEXOµEVOV. 2, 7tEptEJC~lK01T]t;.
average information content, µecrottK6v 1tAT]pO~OpT]nKOV 1tEPlEX6µevov· [ µfo'f] n/,T]pO~OplUKi] m;p1EKttK6-'tT]r:,].
exterior [outer} content, E~OO<EptKOV ittpu:x6µevov.
exterior Jordan content, t~ro<&plKOV iopoaviav6v 1tEpl&XOPEVOV.
heat content, 0epptK6v rt&piex6-µevov.
information content, MHXT. MA0. 1tAT]PO~OPTl'rlKOV 1tEPlEX6µevov· [ rtA.11-po~opiaKi] 7t&plEK'tlKOtT]C,' UUtOKUta't01tl0"µ6r:,}.
inner [interior} content, tcrro<&plKOV 1tEPlEXOµEVOV.
interior Jordan content, €crro'tEptK6v lopoavtav6v nep1ex6µevov.
Jordan content, iopoavtav6v neptex6µi;vov· [ 1tEPlEXOPEVOV 'tOU ZopV'tUV }.
linear content, ypaµµtK6v rt&p1ex6µevov.
to have Jordan content zero, i:xro µT]otv lop0avmv6v n&pttx6µevov · f i:xro iopOaVLUVOV 7t&plEX6µ&VOV µT]OEV } .
content of a point set, ni:pti:xoµi:vov crT)µi:iocri:tpfic;.
contingency .tlJbl.e
content of a s~t of points, 7tEpt&x;6-µ&vov cruv6A.ou cr11µ&i.cov.
context, AOr., cruµcppacn.c;· [ cruµcppacrnK6v] ( = ia cruµc:ppa.s6-µi:va). ,
out of context, €K't6r:, I acrxf.-r<iY;,] cruµ~pacreror:,.
contextual, AOr., · cruµcppcto"tuc~, ij,6v.
contextual definition, IYM,B. AOf., crpµcppacrnKoc; 6ptcrµ6c;.
contiguity, 1, <l>IA., cruvacp&ta.. 2, MA0., i:<j)an1611'];.
contiguous,. MA0., J, = adjacent. 2, Ecpctm6c;,t'],6v· [yi:iwvtJC6c;,t'], 6v· i:cpan16µ&voc;,l],OV ].
contiguous sequences (of slabs), Ecpamai { y&t'"COVl"KUl j UKOA.ou0iat (7tACl.KWV).
contingence, MA0., cruv&na.cpi) ( = CJT) µi:iov \jlUUCJECOt; KaµnuA.11c;). ;.'
angle of contingence, yrovia cruverta~fjr:, · [yrovia K\lpt6n1wr:,}.
angle of geodesic contingence, ya>via ytroomcrtKfi r:, Kupt6t11wr:,.
contingency, J, i:vo&xoµi:v6-r11c; · [Ev<>i:x6µi:vov j. 2, IT AT., cruvwxi.a.
mean-square contingency, cruV'tUxia µtcrou 't&'tpay<ilvou.
contingency method, ITAT., cruvrnxiaKij µt0o8oc;· [ µt0o&oc; cruv-1uxiac;].
contingency table, IT AT., cruv1uX lUKOt; 7tl vu~. [ ni vas ()utA. fjc; dcr68ouj.
two-by- two contingency table, :ETAT., rtiva~ om).fjr:, cruvwxiar:,· {rtiva; <E<pmtA.fjr:, eicr60ouj. (EYN.: fourfold table). ·
189
contingent
contingent, 1, £vosx6µsvoc;,11,ov. 2, tsaprc0~1svoc;,TJ,ov (ano) .
contingent probability, EVOEXO~lEVll meav6n1<;.
contingent proposition, AO!., £vosxoµi:v11 [ meavi]} np6ra.crt<; .
continual proportionals, MA0., cruvsx6µsvot uva.A.oyucoi 6pol.
continuant, MA0., cruvi:xoucra"[ crwpsuoucra}. (LYN.: cumulant).
continuation, cruvi:xtcrt<;. analytic continuation of an analytic
function of a complex variable, civaA.unKi] cruv!;xicm; avaA.unKfic; cruvapt"i]m.mic; µiya8tKfic; µEm~A.1Ffic; .
principle of analytic continuation, apxiJ ,fie; avaA.ut"tKfic; cruvcxicm!)c;.
continuation notation, cruvi:xtcrnK1) crl]µswypacpi] ( =E<pESfi<; crnyµai , 11 unomwnl]nKa, cb<; 011A.wnKa cruvcx,icri:wc;).
continuation of sign (in a polynomial), cruvi:x tat<; crl] µEiou ( Ei<; 'tOU<; 6pouc; 'tOU 1tOAUWVUµou).
continued, CTUVEXtK6<;,T],6v· [ CTUVExoµEVO<;, T],ov· CTUVEXll<;,T]<;,E<;j.
continued conversion of compound interest, cruvi:xtKi] [ auvi:xiJ<;] ~1s'ta'tponi] cruv6E'tOU 'tOKou· [ cruvi:xf]c; '1VU't0Ktcrµ6<;}.
continued equality, cruVEXtKi] [ auvEXi]<;) icr6n1<;.
continued fraction, cruvi:xi:<; [ cruvsxucov} KA<icrµa.
convergents of a continued fraction, cruyKA.iµam (wu) cruvcxouc; KA.acrµa-roc;.
improper continued fraction, aS6-1Gµov [ KamxpricrnKOV J <JUVEXEc; KA.acrµa.
190
continuity
irregular continued fraction; amnov[ aKav6vtcrrnv jcruvEy.}x, KA.acr"µa.
nonterminating continued fraction, am~parnv [µii 1t&pm6v J cruvcx£c; KMcrµa.
partial quotients (of a continued fraction), µEptKci m1/,[Ka (rnu) cruvExouc; Kt-<icrµarnc;.
periodic continued fraction, m:ptoi5tK6v cruvExi:c; Ktd'mµa.
proper continued fraction, 86Ktµov [ yvi]crtov] cruvExi:c; KA.acrµa.
recurring continued fraction, (m6-crt"poq>ov [EimvaA.T]rtttK6v j cruvi;xtc; KA.acrµa .
terminating continued fraction, 7tEpat"6V [aKpi~tc; } cruvcxtc; KA.<icrµa.
continued fraction of the second order, ow'ti:porastov cruyi:xi:c; KA<icrµa· [ auvi:xb; KA.acrµa. 'tfi<; OEU'tEpa<; 'tasi:w<;}.
continued product, cruVEXtKOV [crov-i;xi:<;} ytVO~LEVOV. .
continued products of matrices, cruvqtKa [ auvi:xfi} ytv6µi:va µT]'tPElOJV.
continued proportion, cruvi:xi]<; { CTUVEXtKf] j UVUAoyia.
continuing education, £mµ6pcpwcrt<;.
continuity, 1, crUVEXEta" [aAAT]AOUxia}. 2, CTUVEKHKO'tll<;.
absolute continuity, arr6A.uwc; cruvtXEtct: { arr6A.uwc; af.A11A.ouxiaj.
axioms of continuity, a~iroµam. (t"fic;) crUVEXEiac;.
disruption of continuity, Kat"aA.ucrtc; [816.crrtacrtc;] t"i']c; crUVEXEiac;.
equation of continuity, t~icrrocrtc; (t"fic;) <JUVEXEiac;.
geometric continuity, YEOJµEt"ptKTJ <JU VEX Eta.
method of continuity, µ{;0o8oc; Tijc; <JUVEXEiac;.
postulate of continuity, = postulate of (the) continuity of description .
( continuity equatil>n
principle of Continuity, apxT) t"fic; <JUV€XEiac;.
uniform continuity of a function on a given interval, 6µm6µo pq>oc; cruvtXEta cruvapt1icrEco;; KUt"U 8o0tv 816.vt"T]µa .
continuity equation, £sicrwat<; cruvsxEiu<;.
continuity of earthquake shock, CTUVEKHKO'tll <; 'tOU CTEtCT~ltKOU nf. 1)n1awc;.
continuity of description, CTUVEK'tlKO!ll<; [ auvi:xi:w ] 'tfi<; ni:ptypa
. <pfi<;. postulate of continuity of (the)
description, ahqµa. t"fic; cruvi:xciac; [ ahT]µa t"ijc; cruveKnK6_t"T]Wc;} t"fic; 7tEp typaq>1]<;.
continuous, crovi:xi'1<;, T]c;,i:c;· [ aotaKonoc;,oc;,ov}.
uniformly continuous, 6µowµ6p<pco~ cruvex i]c;, i;c;,ec;.
continuous additive function, cruvsxf]c; 1tpocr9EnKf] CTUVUp'tl]crt<;.
continuous aggregate, MAE>. , cruvsxi:<; cruvaepotcrµa,.
continuous at a point, cruvi:xfic;,T]<;, E<; El<; n crl"]µEloV.
continuous beam, MHXT., cruvi:Xll<; OOK6<;.
continuous correspondence of points, cruvi:xiJ<; avncrwtxia m1-µEirov· [ cruvi:xf]c; miµi:tuKi] uvncrwtxio.).
continuous curve, cruvi:xf]c; Ka~muA.11.
nonlinear continuous force-deflection curve, µi] ypaµµtKT) cruvExiic; KaµrruA.ri 8uvaµ Ecoc;-arr0Kaµlj/Ecoc;.
continuous deformation, MHXT., cruvi:xi]<; nup a.~16pq>wcrt<;.
continuous in a region
continuous description, cruvsxf]c; [aotaKonoc;J ni:ptypacp~.
continuous distribution function, cruvapn1crt<; CTUVEXOU<; KUtUVOµi"'j<;.
continuous elastic structure, cruvi;xi:<; Ef.acrnK6v 06~t1iµu· [ cruvEXi]<; £f.acrnK6<; cpopi:uc;J.
continuous force, <DYL, cruvi:xl)<; ouvaµt<;.
nonlinear continuous force, µT) ypa.µ~LLKi] cruvexi]c; 8Uvaµ1c; .
continuous function, cruvi:xi]<; cruv-6.pn]ot<;.
absolutely continuous function, a-7tOAUtOJc; cruvcxi]c; cruvcipt"T]crtc;.
piecewise continuous function, t"Eµa.xri i56v cruvExiic; cruv6.p-rT]crtc;.
semicontinuous function, i]µ1cruv€xiic; cruvapt"T]crtc;.
continuous function of any number of variables, cruvi:xi]c; crovaptTJcrt<; of OUOTJ1tO'tE apt6~LOU µE'tU~AT]'tWV.
continuous function of one variable, cruvsx11<; cruvapn]crt<; µtu<; µsw~ATJ'tfi<;.
continuous game, MA0., cruvi;xi:<; naiyvtov.
continuous girder, MHXT., cruvsXE<; 06Kroµa"[ cruvi:xi]<; OoK6<;}.
continuous group, crUVEXl)<; oµa<;.
continuous group of linear substitutions, cruvi:xiJ<; oµa<; ypaµµtKWV unoKaracrracri:wv.
continuous in a domain, cruvsxf]<;, i]<;,£<; EV nvt 1tEPtoXU·
continuous in a region, cruvi:xf]<;, T]c;,€<; Ev nvt nspwxij.
191
con•inuous in ;:m interval
continuous in an i,nterval, crovsxi]i;, i]i;,ti; di; n C>uicrt1iµa.
COJltinuous in the neighborhood of a point, crovsxi]i;,i]i;,ti; di; "CTJV ysnoviciv (tvoi;) crriµEioo . .
continuous mass distribution, crovsxi'Ji; µal:;tKTJ KU"CUVOµij.
continuous medium, MHXT., <l>YL., CJ'OVEXE<; { CJ'OVEKHKOV j µfoov· [ crovsxo<>o~ltKOV µfoov· OAlKOV crovsxoui; C>oµfji;).
dynamics of continuous media, OUVUµ1Ki) 'tWV O"UVEK'tLKWV {ouvaµtKi) -r&v · cruvi;xo0oµ1K&v J µfocov.
stress in a continuous medium, 'tclO"ls Els O"UVEXOOoµlKOV µfoov· [-raO"ls Els uA.tKOV O"UVEXOUs ooµij~j.
continuous observation, crovsxi'Ji; [ a<>iaKonoi;] na pmi] PT] crii;.
continuous on the left, cruvsxiji;,iji;, ti; npoi; "Ca apicrtsp<i.
continuous on the right, crovsxfti;, i]i;,ti; npoi; ta <>s~t<i.
continuous precession, crovsxi'Ji; ~1s"CU7r"CCOcrti;.
continuous prediction, cruvsxi'Ji; np6~AE\j/t<;.
continuous quantity, CJ'UVEXTJ<; 'TrO· cr6n1i;. ' digitalization of continuous quantities, MHXT. ·MA0., IJITJ<picocrts cruvcx&v 7tOO"O'ti]'tCOV.
continuous range, cruvsxti; €K:rnµa.
continuous set, cruvsxti; cruvoA.ov· I crovsxf.i;}. (:LYN.: continuum).
continuous spectrum, cruvsxti; <p<icrµa.
continuous spectrum of a transformation, cruvsxti; <p<icrµa (mu) µsmcrx 11 µa ncrµou.
192
continuous.1~
continuous. structure, cruvqti; [ cruVEKnKov 1 b6µ11µa· [ CTUVEK"ClKO<; <popsui;}.
continuous. surface, crnvsx~i; f.m<p<ivsia.
continuous surface in a given region, CJ'UVEXTJ<; Ert:l<pUVElU Kata bo9stcrav nspwxi]v· [ crnvsxi'Ji; i:v nvi nspwxij f.m<p<ivsta].
continuous throughout an interval, crov~xl]i;,i]i;,ti; Ka0' oA.ov to C>i<icrr11µa ..
continuous time, cruvsxi'Ji; [ crovsx6-µsvoi;] xpovoi;.
continuous time series, cruw:xi'Ji; XPOVOCJ'Etp<i.
continuous . to the left, = continuous on the left.
continuous · to the right, = continuous on the right.
continuous transformation, crovsxili; µsrncrx11µancrµ6i;.
continuous variable, MA0., crovsxili; µsta~A.T]tl].
continuous variation, MA0., crow:xili; µsrnUayl].
continuous wave, <l>Y:L., cruvsxti; Kuµa.
modulated . continuous wave, oiaµopqncrµtvov /01atov1crµtvov j cruvi:xts Kuµa.
continuous-wave radar, cruvsx;oKuµanKoi; paC>isvromcrtl]i;.
continuously, cruvsx&;. (to) vary conti nuously, µEmA.A.6.cr
crco [ µE-raPaA.A.oµm j cruvi:x&s.
continuously differentiable function, cruvq&; C>ta<popicriµoi; cruvO.ptT]crti;.
continuum
twice continuously differentiable function, ois O"UVEXWs {otO"UVEXffis} OlU!j>Op[O"lµOs O"UVUp'tT]Cl'ls.
continuum, 1, MA0., <I>Y:L., cruvsxf.i;. 2, MHXT. MA0., cruvi:xo-C>oµl]. ' ' '
noncontinuum nature of gas flow, µi] cruvi:xoooµ1Ki] cpucrts tiis pofJs (tou) acpiou.
nonenumerability of the continuum, · MA0., µi] anap10µ11-r6n1s [µi) cinap10µ11t6v J 'tOU O"UVEXOUs.
numerical continuum, cip10µ1K6v crUVEXEs.
potency of the continuum, icrxl>s [ouvaµtKOtllsl toU O'UVEXOUs·
power of the continuum, MA0., ouvaµts 'tOU O"UVEXOUs.
problem of the continuum, n:p6PA.TJµa (tou) O"UVEXOUs.
real continuum, MA0., n:payµa-rtKOV cruvcxts.
space-time continuum, <l>Y!:., xcopoxpovtKov cruvi:xts.
continuum flow, cruvsx.iKT] [ cruvsx.oC>oµtKT]j pol].
continuum mechanics, crovsxo<>oµiKT] [ crovqtK.T]] µ11x;avtKT]· [ µ11-x;avtKTJ rfji; cruvsx;oC>oµfj s ).
continuum of real numbers, cruv!:xts [ crovsxts cruvoA.ov] c&v npayµanKffiV apt9~t&V.
continuum radiation, cruvsx.oC>oµt-KT] [cruvqtKT]j aKttvo~oAia.
contour, nspiypa.µµa.
contour curve, I, rEQA., icrou\j/TJ<; KaµnuA.11. 2, MA0., rcsptypa.µµtKT] KaµrcUAT] .
contour curves of a function of two varfables, rrsptypuµµ:tKai KaµrcuA.m cruva.prl]crscos c&v Mo ~tstaf3AT]c&v.
contraction
contour integral, m:piypdµµ1Kov [su9r.taKov] 6/,oKA.~pw~ia.
contour integration, MA0., nsptypaµµ lK1) 6A.oKA l] pcocrti;.
contour . interval, rcsptypa.µµtKOV oiacrt1iµa. · [(rcsptypa~t~ttKT]) icrarr6ma.crti;}.
contour lines, fEQt.., iuouljldS KU~muJ.a.v {lcr6npot ypuppai}.
contour inap (of a surface), I, rEfH .. uljloµnptKoi; xapn:ii; (£rcupavsiac; n]c; y~i;). 2, MA0., lcroypa.µptKoi; s iKovwpos (f.mcpcm::iac;).
contour mapping, icroypa~L~llKTJ dK6vtmi;· {lcroypa.~tµtKoi; dKovLcrµ6s}.
contour of (uneven) ground, rcspiypa.µ~ta (a1rnvovicrwu) f.oa.<p<i>µacoi;.
contour surface, MA0., nsptypa.µµtKTJ El1l<pUV8ta.
contour surfaces (of a function with three variables), rcsptypa.µµtKai i;m<p<ivstat ( cruvaptijcrscoi; t&v tpt&v µsrn~A. T]t&v).
contract, OIK., cru~t~a.ms.
contracted tensor, MA0., crucrrnA.'rOV [ cruv11 priµf.vov J t<ivucrµa..
contractible, crucrrnh6i;,l] ,6v.
contraction, 1, <I>Y:L, MA0., crucrwA.~. 2, MA0., crucrrnA.ij· [cru-va.ipsms]. 3, anA.orroi11cr1<; (apt9µT]ctK~i; rrpa~scoi;).
adiabatic contraction, <l>Y!:.,. ciotaPa-rtKil crucrwA.fi .
coefficient of contraction, cruv-ri:A.rnt~s ('rf)~) crucrroAiis· ·
Fitzgerald-Lorentz contraction, crucnoA. Ti <l>nc;t~tpaJ.. v-r-J\6pcV'ts.
193
contraction of a tensor i
contraction of a tensor, cruc>toA.iJ [ cruvaipwtc,] tavucrµarnc,.
co~traction of the earth, crucrrnA.ij [ cruppiKVWcrtc,} ti'jc, yiic,.
thermal contraction of the earth, 6i;pµuo1 crucrw/..r) [6i;pµ1Kr) cruppiKvromr::,} n;r::, yfir::,.
contractor, £pyoM1.Poc,.
contractual, OIK., cruµ~acnaK6c,,T], ov ( = rcl>v cruµpcicrcwv).
contradiction, A.Or., civdcpacnc,. law of contradiction, v6µor::, n;r::,
a vnq>acreror::,.
contradictories and contraries, avncpcntKOHjTf:C, Kai £vavn6n1-·rnc,.
contradictory, MA0., A.Or., civncpanK6n1c,.
contraflexure, MA0., bravciKa~1-\jltc,· {bravacrrpocpij).
point of contraflexure, miµetov £navaKUµljl i:;ror::, · [ miµi:Tov f;navacrrpoq>fjr::,j.
~ontragredient, MA0., civnKA.tnK6c,,ij,6v.
contragredient isomorphism, uvnKA.tnKOC, icroµopcptcrµ6c,.
contraposition, A.Or., MA0., U.vmvri0wtc, ( =avri0wtc, Kar civncrrpocpi]v).
contrapositive, A.Or., (fi) avravriGcrnc,.
contrapositive, A.Or., avravri0croc,,oc,,ov.
contrapositive of an implication, AOr., (11) avravtHkrnc, (µtfrc,) CYlJVf:7t:aywyi'jc, ( = UVTaV'ti0f:'tOC, cruvrnaywyi] · Ti avttcrrpocpi'j ti'jc, avacrrpocpi'jc,, i'j 11 avacrrpocpi'j
l94
contravariant tensor field
tfjc, uvncrrpocpi'jc,, riic, cruvrna-yroyi'jc,). .
contrariety, A.Or., £vavriwcr1c,· [£avn6n1c,].
contrary, A.Or:, £vu.vnoc,,a,ov· [£vavrioc,,a,ov }.
contrary, MA0., A.Or., £vavn6-nic,.
contrary flexure, = contraflexure.
contrary proposition, A.Or., £vav. tia np6racrtc,.
contrast, <l>YI., civnrnvia (= civriGccnc, r6vou, :x,pwµarnc,, nA.., KOVtpcicrrn ).
threshold contrast, avrnov1aicor::, oU.Sor::,· I ouoor::, avn wviar::,J.
contrast of luminance, OilT., &.vnrnvia . <pWTf:lVOTTJTOC,.
contrast threshold, = threshold contrast.
contrasty difference, <l>YI. , avnrnvtaKi] 8tacpop<i.
contravariance, MA0., avraA.A.016-rric,· f avnµnaPA.rirorric,J.
contravariant, MA0., avraA.A.otror6c,,ij,ov· f avnµcraPA.riroc,,fi, 6v).
contravariant derivative of a tensor, MA0., O.v-raA.A.otwri] mipciywyoc, tvoc, ravucrµarnc,.
contra variant indices (of a tensor), MA0., civrnA.A.otrorni 8ciKTat ( ro\J mvocrµcnoc,).
contravariant tensor, MA0., uvrnA.A.otwrov -rcivucrµa.
contra variant tensor field, MA0., · avmA.A.otrotOV ravucrµanKOV 7t:f:-8iov.
CQntravariant vector
contravariant vector, MA0.,. av~ mlvA.01rorov Civucrµa. ·
contravariant ' 'ector field, MA0., UVtaA.A.otWtOV clvucrµanKOV 7t:f:-8iov.
contribution, 1, cruµpoA.1). 2, cruvcpyacria (n.y;. de, nEpt08tx6v).
contribution to rigidity, MHXT., cruµ~o/..11 de, ri]v crrcpp6rrim· {crUµ~OATj de, TTJV O.KUµ\jltUV j.
stairway contribution to rigidity, uuµ~0/,r) roG KAtµaKocrmuiou dr::, •r)v uri:pp6r~ra [cruµ~o/..r) roO KA1µaKouracrlou dr::, rr)v aKaµljliav] rfjr::, 1ea•amq::ufjr::,.
contributor, cruvcpycin1c, (ncp108txo\J, KTA.).
contrivance, £m v61iµa· [£cpcup11-µa).
control, 1, i:Jccyxoc,. 2, TEXN., £A.cyx,oc,· [Xctptcrµ6c,· xu~tpv11-crtc,}. 3, .1IAIT., ef.qxoc, ( = X,Etptcrµoc, nupaoA.ou, KTA., roe, npoc, to U\!fOC, Kai ri]v mxt'.HT]tci -rou· xa.r ' civt101acrrnA.i]v npoc, -ro guidance, 001l)'Ecrio., i'j Xf:t-ptcrµoc, 1rnpcpvT]crcCDC, £ni roptcrµtvric, -rpox1uc,, nA..). 3, AOrIIM., =control unit.
cascade control, AOrIIM., KA.1µaKocre1paior::, EA!:YXO(,.
conditional transfer of control, AOrIIM., £mq>u/..a1en1er) µi:•a~!l3acrtr::, £"-Eyxou.
feedback control, TEXN., AOrIEM., avaopacrt1Kor::, i:f..i;yxor::,.
flow of control, AOrJIM., £/..qKnKr) por) ( = XlJOVll(r) aKo/..ou9ia £1ercMcri:ror::, •&v tvroA.&v).
manual control, TEXN., Aoru:M., xi:1po1eiv~ror::, Ef..i:rxor::,· [xi:1poKiVDt0r::, K\J~Epv~mr::,}.
master control, Aorn:M., npcompxtKor::, /Kup1008~r::,J i:f..i;rxor::,.
control mechanism,
numerical control, AOrIIM., cipt9-µ1Kor::, £/..i:yxor::, .
optimal control, ~f,/..ncrror::, i:l.i:yxor::,.
process control, AOrIIM., µeraycoy1Kor::, EAf:YXO<;.
program control, AOrIIM., npoypapµtKor::, EAf:YXO(,.
proportional control, AOrIIM., ava/..oy11eor::, i:f..i;yxor::,.
radio control, pa818/..i:yxor::, ( = a, paotaKor::, ef..i:nor::,· ~. paowxi:1p1-crµ6r::,).
remote control, •11/..i:xi:1p1crµ6r::, . sequential control, AOrIIM., 6.KO•
/..ou611n1eor::, [ ena"-ADf..or::,] i.\f..i;yxor::,. statistical control, MA0., crranun
Kor::, i.\f..i;yxor::,. supervisory control, AOrIIM., £
nonn KO(, eA.i:nor::,. transfer control, AOrIIM., µi:ra
f31~acrnKor::, i:Ai:nor::,· ["E/..i:yxor::, µi:ra~1l3auwir::,· µi;m~i~acrt~ }.
unconditional transfer of control, AOrIIM., avi:mq>u/..a1eror::, µi;raf3lf3acr1i:; f;f..f.rxou.
control card, AOrilM., tA.cyxKnKov Of:A -rcipwv· {of:A -rciptov eA,tyxou].
control counter, AOrIIM., · EAey-1mxoc, µEtpTJ-riJc,.
control data, AOrIIM., eA.i::yntKa crrotxcia· [ awixda f-Mnoo ].
control field, AOrilM., EA.cyJCnJCOV ncoiov· [ncoiov £/..tnou ].
control grid, TEXN., £A.cyJCTUCTJ f 6oriycnxiJJ ecrxapa.
control instruction, AOrilM., tA.i::yxnxi] £vroA.ij.
control loop, AOrIIM., HAEK., £A.qJCnxoc, ~p6xoc,· f Ppoxoc, e'}..ty;:ou].
control mechanism, X,EtptcrnKoi;
195
control panel
µri:x.nvtcrµ6c;· h1ri:x.nvtcrµ6c; f.Uy:x.oo].
control panel, l , f.AcyK<i1 pwv· {rrivas rJ...,tnoo J. 2, Bocrµi>iov.
control program, AOrII:M. , f.'Ac.yKn1e6v [ :X,i>tp1crnK6v] np6ypuµµu .
control problem, MA0., e'Ai>yKnKOV np6B A.riµu· [np6B'A11µn (6-bTJyEnKo0) f.Hyxou j .
control register, AOflI:M. , e'AEyKnKOV µlFPWOV.
control sequence, AOrIEM., f.'AzyKTLKl) f £mAEKTLKll} aKO'Aoo8ia.
control system, crucrn1µn £/...tyxoo· [ crUcr'tT)µa Xi>tptcrµou].
control theory, MA0., £/...i>yKnK~ 9i>ropiu· [8i>ropiu 'tOU (68T)yi>nKou) E/...,f,YXOU }.
control unit, AOrIEM., µovac; f.A.tnoo· [ crKw~ f.A.tnoo· :x,c.tptcrnK6v O"UGKEOOV j.
control word, AOrII:M. , f.A.i>yKnKTJ A.tstc;· fA.tsic; ntnou].
controJiability, MAET., f.'Ai>yKnK6-. -rric;· fxc.tptcrnKOTT}c;].
controlled, TEXN. , f.A.i>rx6µi>voc;, .TJ,OV" [e7ttTTJPTJ<Oc;,i],6v } .
radio-controlled, ·pa81i:A.i:yx6µi:voi;, TJ,ov· [ pa8toKarnu0uvoµ i:voi;, ri,ov } . ·
controlled environment, MAI:T., eA.c.noµc.vov f £mn1PTJ<OV} 7teptBc1.Uov.
controls, TEXN., :X,Etptcr'ti]pm ( = µfoa f:A.tnou 11 Xi>tptcrµou).
controversy, 8mµax1r [8mµcptcrBiJ'tTJcrtc,}.
conventional proportions
convection, 1, <l>YI:. , µi>rnyroy11. 2, HAEK., µc.myroytcrtc;.
forced convection, avayKacri:i) µEi:ayooytcrti;.
natural convection, cpucrt"!Ci) [f.A.r,u-0tpa] µi:myroy1mi;.
convection current, HAEK.; µc.myroyfonK6v fri>w..yroytK6v] pi>u~1a.
convenience, p::i'AtK6n1c;· (i>00-,,-r6-nK i>u:x,f.pEta}.
computational convenience; imoA.oy1crnKi] suxtpi: ta.
convenient, 1>u81>10t;,oc;,ov· { c.u:x,i>poc;, T) ,o· Bol.tK6c;,11 ,6(v)}.
convention, 1, cruvf.A.wcrtc;. 2, MA0. cruµpamc;· { cruµpanKO<T)c;}.
frame convention, cruµf3amc; m;pi rrA.atcrtooi:Giv cpoptoov.
left-handed screw convention, cruµf3acrti; 7tf.pi o.ptcrtr,pocrtp6cpou KOXALOOcrf.00<;" [ aptcrn;p6crrpocpoi; cruµf3acrti;}.
right-hand convention, od;ioxr,1p1-1CTJ [8r,~ 16crtpocpor:,] cruµf3acr1i; .
right-handed screw convention, cruµf3acrt<; 7tEpi Of,~l0cri:p6cpou KOXAloocri:ooi;· [or,~16m:pocpoi; cruµf3acrti;}.
sign convention, crT)µf.taKi) cruµf3ami;· { cruµf3acrt<; 7tEpi cruµf36AOOV }.
summation convention, a9po1crn1Ci) cruµf3amr:,· [ cruµf3acrt<; rrspi a0poicrf.roi;].
conventional, cruµpanK6c; ,i],6v ( = a, Ka8tc.pmµf.voc;,TJ,OV" cruvi]9T)c;, T)c;,c.c;. p, cruv91iµanK6c;,i] ,ov).
conventional drafting, cruµBanKl) [ Ka8tc.proµf.v11 J cr:x,i>8tacrnKi].
conventional manner, cruvi]8T}c; [Ka-9ti>pmµf.voc;} 'tp6noc;.
conventional proportions, cruµBanK:ai [K.a8tc.pwµtvm] avaA.oyiat.
conventional sign
c onventional sign, cruµBan1e6v cruµBo·A.ov· [ cruv911µanK6v crriµetov].
conventional simple support, MHXT., croµBanK~ [ crov1']0ric;J anA. fj cr•i] ptstc;.
conventionalize, cruµpanKEOro ( = Ka9tcrn'il cruµ<pWVOV 7tp6c; 't~ V
napa8o•l)v 11 f:s f.9tcrµou napaOeK'tl)v ~1opcp~v 11 µf.9o8ov) .
conventionalized, cruµBanKeO~Lf.voc; TJ,OV.
converge, MA0., croyK'Aivw (np6c;)" [ cruy KA i vw (de;)}.
converge absolutely, MA0., croyKA.ivro <ircoA.6-rwc;.
converge in probability, MA0., croyKA.ivro de; m8av6-r11w...
converge in the mean, croyKA.ivw de; -r6v µf.crov.
converge weakly (to), cruyK:'Aivro <icr9i>v&c; (np6c;).
convergence, MA0., cruyKA.tcrtc;. Abel's test for convergence, af3&
A.iavi) f3acravo<; cruyKA.icri:roi;. Abel's test for uniform convergence,
af3i:A.tavi] f3acravoi; 6µ010µ6pcpou cruyKAicri:wi;· [f3acravoi; 6µoioµ6pcpou cruyKA.icri:ooi; tau • Aµrri:A.] .
absolute convergence, arr6A.ui:o<; cruy1CA.tmi;.
alternating series test for convergence, f3cicravoi; cruyKA.icri:ooi; f.vaA.A.acrcroµtvrii; cri:1piii;.
Cesaro convergence, Katcrapiavi) cruyKALcrt<;"{ cruyKA.tcrt<; tOU Tcri:~apo ] .
circle of convergence, KUICAO<; cruyKAicri:wi;.
complete convergence of the sequence (or series) of vectors, &vtE/.iJ~ cruyKA.tcrt<; UKOAOU0iai; (ii crEtpii<;) avucrµcitoov .
convergence of a sequence
conditional convergence, rrpoiirro-0Eti) {urro opov j cruyKAtcrt<;.
interval of convergence, otcicrtriµa cruyKA.icri:wi;.
method of successive convergence, µt0oooi; 01a0ox11Cfi<; cruyKA.icri:wi;.
M'oore-Smith convergence, cruyKA.tcrti; Mouap-:I:µW.
nonuniform convergence, µi] 6µoto~t6pcpoi; cruy!CA.tcrt<;.
pointwise convergence, crriµi:16-crrpocpoi; cruyKALcrt <; .
probability convergence, m0avonKTJ criJyKALcrt<;.
problems of stability and convergence of solutions, rrpof31.i]µai:a Eucrta6dai; Kai cruyKA.icri:roi; i:Giv &mA.ucrr,rov.
radius of convergence, aKtii; cruyKA i cri:roi;.
successive convergence, owooxtKTJ cruyKA.tcrt<;.
test for convergence, f3acravoi; cruyKA.icri:roi;.
uniform convergence, 6µ016µopcpoc; cr\JyKAlO"l<;.
weak convergence, ucr0i:vi)i; cruyICA tcrt<;.
convergence criterion, Kpni]pwv cruyKA.icri>roc;.
convergence in measure, cruyK.A.tcrtc; sv ~Lt-rpqr { cruyKAtcrtc; K.a'tU µf,'tpov }.
convergence in probability, cruyKAtcrtc; de; m9av6<TJTa.
convergence in the mean, cruyK.A.tm.c; c.ic; 'tOV ~Lfoov .
convergence of a power series, cruyKAtcrtc; OUVUµLK:fjc; O"Etp1ic;.
circle of convergence of a power series (in the complex domain), Ki>Kl.oi; cruyKA.icrEW<; ouvaµ1Kfi<; cri:tpiic; (EV ttl µ1yao1Kj] 7tEpt0xtl).
convergence of a sequence, cruyKA.tcrtc; cl.KoA.ou8iac;.
197
convergence of a series
convergence of a series, cn)yKA.tcrtc; cretpiic;.
Dirichlet's test for convergence of a series, otptKA.Etiavii pacravoc;; cruyKA icrEcoc; crE1pac;· f Pucravoc; wil NnptKU Iha tiiv cruyKAlcrtV CJEtpac;].
Dirichlet's test for uniform convergence of a series, lhptKA.Ettavii Pacravoc; 6µotoµ6pcpou cruyKA.icrEcoc; crEtpi'ic;.
convergence of a set of functions, cruyKA.tcrtc; cruv6A.ou cruvapti]crecov.
convergence of alternating series, O"UyKA.tcrtc; evaA,A,acrcroµeV''lt; cretpiic;.
convergence of an infinite product, cruyd,tcrtc; ari:eipou yt voµevou· { cruyKA.tcrtc; ytvoµevou arreipcov rmpay6vtcov].
absolute convergence of an infinite product, an6A.u'roc;; cruyKA.tcrtc; y1voµtvou anEipcov napay6vrcov.
convergence of an infinite series, cruyKAtO"tt; arrei.pou cretpiic;.
absolute . convergence of an infinite series, an61.utoc; cruyKAtcrtc; anEipou crnpac;.
198
Alembert's test for convergence (or divergence) of an infinite series, aA.EµPEpnavii Pacravoc; [Pcicravoc; 'AA.aµntp} Iha tiiv cruydtcrtV (i1 ti]v an6-KA.tcrtv) U7tELpOU CJEtpCic;.
comparison test for convergence of an infinite series, cruyKpH1Ki] Pcicravoc; CJUYKAlCJECOI:; U7tELpOU CJE!pil;.
generalized ratio test for convergence (or divergence) of an infinite series, YEVtKEUµtvri ava/,.oy1Kii P<'mavoc; [yEVlKEUµEVT] Pcicravoc; avaA.oyiac;] (tile;) cruydicrEcoc; (il anodicrEcoc;) anEipou crEtpi'ic;.
necessary condition for convergence of an infinite series, avayKaia cruvEh'lKfl Ota (tiiv) cruyKA.tcrtv U7tEipou O"Elpi'ic;.
Raabe's ratio test for convergence (or divergence) ·of an infinite series
conversation
of positive terms, paaSEiavi'j Pacravoc;; avaA.oyiac; ota cruyKA.tcrtv (il un6KA.tcrtv) U7tEipou O"Etpi'ic; 0ETIKOOV opcov.
convergence of an integral, cruyKl..tcrtc; 6A.oKA. T] pffiµawc;.
convergence properties, 18t6tT]tec; ( tfjc;) cruyKA.icrecoc;.
convergence to a limit, CTUyKA.tcrtc; de; (l:v) opwv.
convergent, MA0., cruyKA.ivcov,oucra,ov.
absolutely convergent, anoA.utcoi;; cruyKA.ivcov,oucra,ov.
uniformly convergent, 6µotoµ6pcpcoc; cruyKA.ivcov,oucra,ov.
weakly convergent, acr0Eviiic; cruyKA.ivcov,oucra,ov.
convergent, MA0. cruyKl..tµa .
convergent integral, MAE>., cruyKA.ivov 6A.oKA.ijpcoµa.
convergent (of a continued fraction), MA0., cruyKA.tµa (tvoc; cruvexouc; KA.6.crµawc;).
convergent sequence, MAE>., cruyKAivoucra axoA.ou8ia.
convergent series, MAE>., cruyKA.ivoucra cre1pa.
conditionally convergent series, 7tpOii7t00Etiiic; {U7t0 OpOV j O"UYKALVOUCJU O"Elpcl.
permanently convergent series, µoviµcoc; cruyKA.ivoucra. oEtpci.
rapidly convergent series, taxtcoc; cruyKA.ivoucra crEtpa.
slowly convergent series, ppaotcoc; cruyKA.i voucra crEtpci.
converging, cruyKl..ivcov,oucra,ov.
converging meniscus, <I>YL, cruyKA.ivcov µT]vicrKoc;.
conversation, 1, crnvoµ1/..ia . 2, cruv-816.A.e~tc;.
converse
converse, 1, AOr., av1icrtpocpoc;, rn;,ov;' 2, MAE>., avacrtpocpoc;, oc;,ov;
converse, AOr., avricrtpocpoc;· [avncrtpocpi]j.
converse (of a theorem), MAE>., uvampocpov (8eropi]µuwc;).
com-eirse of an implication, AOr., avricrtpocpov tfjc; cruverrayroyfjc;· [ av'dcnpocpoc; cruverraycoyi]j.
converse of the factor theorem, MAE>., avacrtpocpov wu rrapuyovnxou 8eropij~Lat0c;.
converse of the inverse of an implication, AOr., avncrtpocpi] tfjc; avacrtpocpfjc; [ avticrtpocpoc; tfjc; avacrtp6cpou] tfjc; cruvermyroyfjc;. LYN.: contrapositive of an implication).
conversely, 1, MAE>., avncrtp6cpcoc;. 2, t~ CiA.A.ou.
conversion, 1, MAE>., µetatpom'r [avaycoyi[J. 2, AOr., avncrtpocpi].
analog-to-digital conversion, AOrn::M., avaA.oyOljlT]<plUKi] µEtatponij ( = µEtO.tp07tij UVCl.AOylUKll<; 7t00"0TT]· 'tOI:; de; ljlT]<ptaKi]V).
binary-to-decimal conversion, AOrn:M., OUCl.OlKOOEKUOtKi] µEtatpo7ti] ( = µEtatpo7tii ouaotKilc; 7tOcr6tT]to<;; Eic; OEKUOtKi]v).
continued conversion of compound interest, OIK. MA0., cruvi;xi]c; µEtatponi] cruv0ttou t6Kou· [cruvExi]c; UVUtoKtcrµ6c;j.
data conversion, Aorn::M., crto1-XEtoA.oy1Ki] µEta.1po7ti1.
decimal-to-binary conversion, AOrILM., µEratpo7tiJ oEKao1Kilc; 7tocrotritoc; de; ouao1Ki]v· [oEKa.01Koouao1-Ki] µEtUTp07tll}.
digital-to-analog conversion, ljlT]cp1a.vaA.oy1aKi] µEta.tpom;.
convertible
frequency of conversion of compound interest, OIK. MA0., uuxvotT]c; µEtatpo7tilc; cruv0i:tou t6Kou· [ cruxvorric; UVUtoKtcrµoiJ j .
ratio of conversion, HAEK., Myoc; µETUTP01tll\;·
conversion equipment, AOHLM., µetatperrnKoc; e~apncrµ6c;.
conversion formula, EMil. MAE>., turroc; µetutpon~c; {turroc; avaycoyfjc;) cruv8f:tou t 6Kou· { t6-rroc; avarnxwµou· uvatox1crnxoc; turroc;).
conversion from Centigrade to Fahrenheit (or Fahrenheit to Centigrade), µe1atponi] ~a0µ&v KeA.criou de; ~u8µouc; <I>apevxa'l't (Kai tuvarraA.tv).
conversion interval, OIK. MA0., 816.crniµa µi:tatporr~c; (cruv8ernu 'tOKOU ).
conversion period, OIK. MAE>., nEpio8oc; µetutporrfjc;· [ rrepio8oc; avurnx1crµou).
conversion tables, EMil. MA0., rrivaKec; µemtporr~c; (cruv0faou 16Kou)"[ rrivaKec; avatox1crµou ].
convert, <l>YL.,MAE>., µern.pemo.
converter, <l>YL.,MAE>., µetatpentiJc;· [µe1a1porreuc;].
analog-to-digital converter, avaA.oyoljlT]<ptuKoc; µEtatprntf]c;.
card-to-tape converter, AOrn:M., OEA.ta.ptormvta.Ko<;; µEtatprnri]c;· [ µEtatpo7tEl>c; oEhaptuKffiv crtotXEicov Eli; tat VlUKcl}.
digital-to-analog converter, 1j1T]<ptavaA.oy1aK6<;; µEtatpEmi]c;.
tape-to-card converter, AOrn:M., tat VlOOEA ta.p!Cl.KO\; µE'tatpE7tti]c;· { µEtatpOTCEUI:; tat VlUKWV O"tOlXEicov Ei<;; OEA ta.ptuKU}.
convertible, µemtpem6c;, iJ,6v.
199
converting equations
converting equations into geomet.ric shapes, ~umlrporrr) f:stcrfficrscov sis; ysco~tt:rptKU<; Staµop<p<i<;.
converting shapes into equations, ~1t:w.rp9rrr) Sw.µop<p&v sis; EStcrfficrt: t<;.
convex, 1rnpr6s;,i1,6v.
convex and nondecreasing function, Knprr) Kai µ r) cp9i voucra cruv<ip·Tr]crL<;. h1r) cp9i voucra Kuprr) cruv<ipn1cr1<;].
convex body, MAE>., Kuprov cr&µa. polar reciprocal convex bodies, n:o
·ALKU avi.im:pocpo. KUpTU crooµm;o..
COnVex curve in a plane, KUp"Cr) KUµrrt'.JA, 11 mu Errtm~Sou.
convex domain, K:uprr) nspwxii.
convex function, K:upn'J cruv<ipn1-ms;.
conjugate convex functions, cru~uye1c; KUpmi O"UVO.pTi]O"Elc;.
generalized convex function, yev1-KEuµE:v11 KUpTi] O"UVUPHIO"Lc;.
logarithmically convex function, A.or:o.p10µ LKiiic; KUpTi] O"UVUpH]O"Lc;.
convex game, MAE>., K:Uprov rraiyvtov.
convex hull of a set, MAE>., Kupn1 yc'.tcrrpa cruv6A.ou.
closed convex hull of a set, 1CAE1crri] Kupri] yacrrpo. cruv6A.ou.
convex in the sense of Jensen, (cruvapn1crt<;) KUPTll KU't"U (rr)v <popav mu) I'Lf:vcrt:v.
convex increasing function, Kuprr) ausoucra cruvapn1crts;.
convex linear combination, Kupr<'><; ypa~t~llKO<; cruv8uacrµ6s;.
200
convex toward
convex map, MAE>., K:upros; siKov1crµ6s; .
convex pentagon, MAE>., 1rnprov rrsvraycovov.
convex point set, MAE>., Kuprr) 0"1iµstocrt:tpa.
convex polygon, K:uprov rroMycovov.
angle of a convex polygon, yrovla Kuprou n:oA.uyoovou.
convex polyhedron, Kuprov n:oA.0-t:Spov. ·
convex polytope, MAE>., Kuprov n:oA.umnov.
convex programming, AOrI.rM., Kupros; rrpoypaµµtcrµ6s;.
convex programming problem, rrp6-~A.11µa K:upmu rrpoypa~1µ1crµou.
convex sequence, MAE>., KUprr) aKOt.oueia.
convex set, MAE>., Kuprov cruvoA.ov. locally convex set, wmKiiic; Kuprov
O"UVOAOV.
convex space, MAE>., K:upros; x&pos;.
strictly convex space, o.ucrnlPiiic; Kuproc; xwpoc;.
uniformly convex space, 6µ010µ6pcproc; K\JpTOc; XWPOc;.
convex surface, MAE>., Kuprr) f:mcp<ivEta.
convex toward a given line, (KaµrruA.11) Kuprr) npos; 8o9dcrav ypaµ~i~v· /KaµrruA.11 crrpf:cpoucra ru K:upni atnfj<; rrpos; 8o9dcrav ypa~1µi1v j.
convex toward a given point, (Kaµn:uA.11) Kupn'J n:pos; Soef:v cr11-~tsiov· [Kaµ nu A. 11 crrpf:cpoucra ru
convexity
Kupru ainfj<; rrpos; So9ev m1-µdov ].
convexity, MAE>., Kup16n1s;. logarithmic convexity, A.oy.o.p10µ1Ki]
KUptOtTJ<;.
convolution, MAE>., nruxcoms;. . , bilateral convolution, oin:A.eupoc;
/otµEpi]c;} n:tUX©O"lt;.
convolution of two functions, rrruxrocrt<; ouo cruvapn)crscov.
convolution of two power series, muxcocrt<; Mo SuvaµLKWV O"El
p&v.
convolution theorem, 9t:rop11µa nspi n:ruxrocrscos;.
convolutor, MAE>., n:rnxcorr)<;.
cooling, \jluxpavms;· [ \JfUSt<;}. . regenerative cooling, &.vo.n:A.o.crnKi]
IVUXPO.Vcrtc;.
cooperation, cruvspyacria.
cooperative game, MAE>., cruvspyanxov n:aiyVLOV.
coordinate, cruvrsrayµf:vos;,11,ov.
coordinate, cruv•srayµf:v11. acyclic coordinates, aKUKAlOl cruv
T&ro.yµE:vm. areal coordinates, tµ~O.OlKO.i O"UVtE
To.yµf:vm. associated coordinates, cruvmp⁣
O"UV'l:ETO.yµi:vm. astronomical coordinates, acrrpovo
µLKO.i [yeroypo.<pLKO.i] O"UVTETo.nll':vm. axes of coordinates, dl;ovec; i:wv
O"UV'l:ETO.yµi:vrov. axes of coordinates in space, dl;o
vec; O"UVTEmnti:VCOV WU XOOPOU. barycentric coordinates, ~o.pUKEV
i:ptKo.i O"UV1:ETO.yµtvm. biangular coordinates, 01 ycovmKo.i
O"UVTETO.yµtvm. bicircular coordinates, OLKUKAtKo.i
O"\lV1:&0.)'J.lEVO.l.
coordinate
bilinear coordinates, 01ypo.µµ1Kai O"UVTE'l:O.yµtvm.
binary coordinates, ouo.01Ko.i cruvi:emyµi:vm.
bipolar coordinate, omol..'.Ki'] cruvi:ei:o.yµtvri.
bipunctal coordinates, otcrriµeto.Ko.i O"UVTHO.yµi:vm.
Boothian coordinates, ~ou010.vo.i cruvremyµtvm · [ cruvtemyµtvm wu Mn:ou0}.
Cartesian coordinates, Ko.pi:emavo.i O"UVtETO.yµtvm.
celestial coordinates, oupo.voypo.<pLKO.i O"UVTEmyµtvm.
celestial equator system of coordinates, = equatorial system of coordinates.
centroidal coordinates, KEVTpoEl· OELc; O"UVTEmyµi:vm.
change of coordinates, aA.A.o.yi] cruvi:emyµi:vcov.
circular cylindrical coordinates, KU· KAtKo.i KUA.1vop1Ko.i cruvi:ewyµi:vm· [ KUAl vopLKO.i O"UV1:HO.yµtvm J.
complex coordinates, µ1yo.litKai cruvi:emyµi:vm.
curvilinear coordinates, KO.µn:uA.6-ypo.µµ01 cruvremyµi:vm.
cyclic coordinates, KUKALo.Ko.i cruvi:ei:o.yµi:vm.
cylindrical coordinates, KUKl..tvoptKO.i cruvtcmnitvm.
cylindrical polar coordinates, KUA1vop1Ko.i n:oALKo.i cruvremyµi:vo.l" [Ku Al vopLKO.i O"UVtETO.yµtvm}.
ecliptic system of coordinates, tKA.ernnK6v crucrrriµo. cruvtei:o.yµtvcov.
ellipsoidal coordinates, tA.A.Etlj/OEloEic; O"UV1:ETo.yµEVo.L.
elliptic coordinates, i;A,A.emnKo.i O"UV1:HO.Y!-lEVo.L.
equatorial system of coordinates, icrriµept vov crucrrriµo. cruvremyµtvcov.
equinoctial system of coordinates, icrriµ&pto.v6v crucrtriµo. cruvi:emyµtvrov.
Eulerian coordinates, euA.ripto.vai O"UVtE1:0.Y~lEVO.L.
galactic system of coordinates, yo.-
201
coordinate
202
A.aK'ttKov crucr'triµa cruv'tE'tayµi;vrov.
Gaussian coordinates, yrocrmavai O"UV'tE'tayµi;vm .
generalized coordinates, yEVtKEUµE· vm cruv'tEtayµi;vm.
geodesic coordinates, yEro8mcrtUKai O"UVtE'tayµi;vm .
geographical coordinates, yEroypaq>tKai O"UV'tEtayµi:vm.
geomagnetic coordinates, yEroµa'YVTJ'tlKai O"UV'tE'tayµi;vm.
grid coordinates, ecrxaptKai cruvtEtayµi;vm.
homogeneous coordinates, oµoyEVEI<; O"UV'tEtayµi;vat.
ignorable coordinates, ayvort'ttKai cruv'tEtayµi;vm.
intrinsic coordinates, npocrq>uEt<; [ cpucrtKai] cruv'tEtayµtvm .
isothermal coordinates, lcr60Epµot cruv'tE'tayµi;vat.
kinosthetic coordinates, KtvocrOEVL· Kai [ KUKAtKai J cruvtEtayµi;vm.
Kleinian coordinates, KAEtvtavai cruvtE'tayµi:vm · [ cruvtE'tayµevm wu KMXv].
Lagrangian coordinates, A.aypav~mvai cruvtE'tayµi:vm · [ cruv'tE'tayµevm 'tOU AayKpav~· uA.tKai cruvt&tayµevm] .
line-coordinates, Eu0EtocruvtE'tayµi;vm · [cruvtEtayµevm (8Uo crriµEirov) xropaia<; EuOEla<;].
logarithmic coordinates, A.oyaptOµtKai cruv'tE'tayµi:vm .
material coordinates, uA.tKai cruvtEtayµevm.
natural coordinates, q>UcrtKai cruv'tEtayµevat.
noncyclic coordinates, µTj KUKAtaKai cruvtEtayµi:vm.
normal coordinates, op060Etot cruvtEtayµi;vm .
oblate spheroidal coordinates, i\mnA.atocrcpmpoE18Ei<; cruvtEmyµi;vm.
oblique coordinates, A.o~ai [nA.ay1-oyoovtot} cruv<Emnievm.
origin of coordinates, anapxiJ [ apxii} 'tWV O"UVtE'tayµEVIDV.
orthogonal curvilinear coordinates,
coordinate
opOoyrovtKai KaµnuA6ypaJiµot O"UV· 'tETayµevm.
orthotomic coordinates, opOotoµtKai cruvTE'tayµevm.
parabolic coordinates, napaj3oA.tKai cruv'tEtayµevm.
Pliicker's coordinates, 7tAUKKEPta· vai cruv'tE'tayµevm.
point-coordinate, crrtµEtocrUV'tEmyµi:vri· [cruv'tE'tayµevri crriµEiou] .
polar coordinates in space, noA.tKai O"UV'tE'tayµi;vm '"COU XOOPOU.
polar coordinates in the plane, noAtKai cruvtEtayµevm (crriµElou) wu E7tt7tE8ou· {7t0AtKUi O"UV'tE'tayµevmj.
position coordinates, crUV'tE'tayµi;vm OfoEro<;.
positional coordinates, 0EcrtKai cruv'tE'tayµevm.
projective cordinates, npoj3oA.tKai cruvtE'tayµi:vm .
prolate spheroidal coordinates, emµTjKocrqimpoEt8EI<; cruv'tEtayµi;vm.
quadriplanar coordinates, 'tEtpaEm7tE8tKai O"UVtE'tayµi:vm.
quasi-Lagrangian coordinates, olovEi A.aypav~tavai cruvtEtayµevm.
rational integral quadratic function of the increments of the coordinates, PTJ'tij UKEpaia 'tE'tpayrovtKTJ crovapn1-crt<; 't&v au~riµatrov 't&v cruv'tEtayµevrov.
rectangular Cartesian coordinates, 6p0oyoovt0l KaptEO"tavai O"OVtE'tayµi;vm.
rectangular coordinates, opOoyoov101 cruv'tE'tayµevm.
rectangular curvilinear coordi-nates, 6p0oyoovtot Kaµnul..6ypaµµot cruvtE'tayµevm.
rectangular spheroidal coordinates, 6p0oyoovtot crcpatp0Et8Ei<; O"UV'tE'tUY· µevm.
rectilinear coordinates, EU06ypaµ~wt O"UV'tETayµi;vm.
Riemannian coordinates, ptµavvmvai cruv'tEtayµevm · [ cruv'tE'tayµi:vm toii Piµav]. ·
Rodrigues' coordinates, po8ptyE-
coordinate axes
mavai cruV'tE'tayµtvm· [cruV'tE'tayµi:vm . 'tOU Pov'tpiyK].
space coordinates, xropaim cruv'tE· 'tayµevm · [ cruvTE'tayµi:vm 'tOU xoopou].
space-polar coordinates, noA.tKai O"UVtE'tUyµ i;vm 'tOU XOOPOU.
spherical coordinates, crcpmptKai O"UV'tE'tayµi;va t.
spheroidal coordinates, crcpmpoEt-8EI<; O"UV'tE'tayµevm.
symmetric coordinates, cruµµE'tptKai cruv·rn'tayµevm.
tangential coordinates (of a surface), ecpa7t'toµEvtKai crUV'tE'tayµe vm (i\mq:iaVEta<;).
terrestrial coordinates, yEroypacptKai cruv'tE'tayµi;vat.
tetrahedral coordinates, 'tE'tpaE8ptKai [ 'tE'tpUE8pot J O"UV'"CEtayµi;vat.
toroidal coordinate, wpoEt8i]<; cruv'temyµevri.
transformation of coordinates, µE'tacrx 1iµaucrµ6<; cruv'tE'tayµi:vrov.
triangular coordinates, TptyrovtKai cruv'tE'tayµi;vm .
tricircular coordinates, 'tptKUKAt· Kai cruvtE'tayµ-':vm.
tricyclic coordinates, 'tptKUKAtUKai cruv'tE'tayµi;vm.
trigonometric(al) coordinates, 'tpt· yrovoµE'tptKai cruv'tEmyµevm.
trilinear coordinates, 'tptypaµµtKai cruVtE'tayµi:vm .
tripolar coordinates, 'tpt7tOAtKai cruv·rn'tayµeva1.
vectorial coordinates, avucrµanKai cruv'tE'tayµevm .
velocity coordinates, cruvtE'tayµi;vm ( 'tfj<;) 'tUXUVO"EIDI;.
coordinate axes (of a point), crov"ts"ta.yµl;vot lii;ovs<; (cn1µdoo).
coordinate geometry, crov"tna.yµEvTJ ysroµs"tpia..
coordinate indexing, AOrILM., O"OV't"S't"UyµEV TJ SUpS't"Tjpta.crt<;.
coordinate of displacement, MHX.,
coordinate systems
O"l)V'tS't"UyµEVTJ Tfj<; µs-ra.Ktvfjcr&(1)<;.
single coordinate of displacement, µovmia cruv'tE'tayµi:vri 'tfj<; µE'tCLKt vijcrEro<;.
coordinate paper, crov"ts"ta.yµ!;vo [ -r&1:pa.yrovtcrµ!;vo J xap"t"i ·(LYN.: graph paper).
logarithmic coordinate paper, A.oyaptOµuco O"UV'tE'tayµi;vo xapi;i· {/.oyaptOµtKO xap'tij.
polar coordinate paper, noA.tKO cruvi:Ei:ayµevo xapi:i"[noA.tK6 xap·cij.
coordinate planes, cruv-rsmyµ!;va bci1rn8a.
coordinate response, MHXT., crov-rsmyµEvTJ av-rhui;t<;.
generalized coordinate response (to earthquake), YEVlKEUµEVTj O"UV'l:E'tCLY· µevri aVtita~t<; (Ei<; crEtcrµ6v) .
coordinate retrieval, AOrILM., O"UV't"S"t"Uyµf;vTj UVUAU~ij.
coordinate system, crov"ts"ta.yµ!;vov crucr-rTjµU .
absolute coordinate system, an6-/.uwv cruv'tEi:ayµevov crucrtriµa.
inertial coordinate system, a8paVELCLKOV O"llV'l:EtayµeVOV O"UO"TT']µCL.
left-handed coordinate system, c'tptcrtEp6crtpocpov O"llV1:E1:CLYµtvov O"UO"tl']µCL.
rectangular coordinate system, 6pOoyoovtov cruvi:E'tayµi:vov cr6crt11µa.
relative coordinate system, O"XE't"tKOV cruvtEtayµi;vov cr6crt11µa.
right-handed coordinate system, 8E~t6cri:poqiov cruVtEi:ayµevov cr6cr'tTJ· µa.
rotation of coordinate system, MA0., nEptcr'tpocpiJ toii cruvTEtayµEvou crucr'tfiµmo<;.
coordinate systems for ballistics, crons"ta.yµl;vu cromfj µum -rfl<; ~A.TjnKfj<;.
203
coordinate trihedral
coordinate trihedral, cruvtc-rayµtvov -rpii;opov.
origin of a coordinate trihedral, urrapxiJ -cou cruvti:rnyµevou -cpttopou.
coordinate velocity, cruvti;wyµtv11 -ruxuvcrtc,.
coordinates of a point, cruv-ri;myµtvm (mu) cr11µdou.
coordinates of a point in space, cruv-ri;wyµEvat cr11µ1>iou mu X,cOpou.
coordinates of a point on a circle, cruv-ri;-rayµEvat cr11~1i;iou rccpupspeiac, xuxA.ou.
coordination, cruvmvtcrµ6c,.
coordination number, XHM., cruv-rovtcrnxoc, apt0µ6c,. (LYN. : ligancy).
copier, avnypacp11-ri]c,· [ rcoA.uyp<icpoc,· rcoA.Uypacpoc,].
coplanar, cruvrnirci;ooc,,oc,,ov· [ cruvsmrcsotx6c,, 11,ov 1.
coplanar axes, cruvrnircsoot al;ovsc,. noncoplanar axes, µi] cruvi:rrirri:oot
a~ove<; .
coplanar directions, cruvrnircsoot <heueuvcri;tc,.
noncoplanar directions, µi] cruvi:rrirri:oot OtEU0UVCJEl<;.
coplanar forces, MHX., cruvercircsoot { cruvsmn:eOtKai j ouv<iµstc,.
set of coplanar forces, cruvoA.ov cruvi:mrrtocov ouvaµi:cov.
coplanar Jines, MA0., cruvrnin:soot su0ciat.
coplanar points, MA0., cruvrnircsoa cr11µsia.
204
condition that four points in space be coplanar, cruv0i]KTJ 'iva -ctcrcrapa crriµeta ·rou xropou KELVtUL i'mi "COU
Coriolis
aurou emrrt0ou· [ cruv0i)K11 cruvi:mrri:-06-criw<; tecrcrapcov crriµEirov -cou xwpou ].
copolar, MA0., 6µon:oA.tK6c,,i],6v· [ cruµrcoA.1x6c,,i],6v].
copunctal, MA0., 6µocr11µ1>taK6c,, 11,ov· [ crucr(cr)11µstax6c, ,i] ,6v].
copunctal planes, MA0., crucrcr11-µstaxu [ cruµn:ircrnvw] £n:lrcsoa.
copy, 1, av-riypacpov. 2, µsmypaq>l) (xstµ€vou). 3, NOM., arc6ypaq>ov. 4, OA.11 ( = xdµi;vov rcp6<; F-K-rUn:fficrt v 11 µswypaq>i] v).
hard copy, AOrn:M., evrnrro<; µi:taypaq>i)· [ µrixav1iµanKi] µetaypaQli) · evtU11:0V Kf:iµEVOV } .
copy supervisor, smµi;A.11ni c, OA.11c,.
copying, 1' avnyp<icp11cr1c,· [ avnypacpi]]. 2, rcoA.uypucp11crtc,.
cord, .MALT., M'lpoc,. umbilical cord, MA:ET., 6µq>aAtK6i;
Aaipo<;· {AGJpo<;}.
cordiform projection, Kapotocrx.11-µoc, [ Kapotostoi'jc,j rcpo~oA. iJ.
cordonnier system, = peek-a-boo system.
core, 1, MHX., \j!UX,TJ. 2, HAEK., n:upi]v. 3, KOKKOC,. (LYN.: kernel) .
core dump, AOrILM., an:o811KeunKi'j OTCOO'cOpWCHC,.
core storage, AOrILM., µayv11mn:up11 VtKi'j UTC00Tj KeUO'tC,.
magnetic core storage, µayvqwrruPTJVl Ki] urro0i) Kf:Ucrt<;' { arro0ilKEUCJL<; µayvrinKou rrupfivo<;}.
Coriolis (Gaspard G. de -), (rucrn:apoc, r. v-rf:) KoptoAi ( = yaA.A.oc, µa811µanK6c,· 1792 - 1843).
acceleration of Coriolis, = Coriolis acceleration.
Coriolis acceleration
Coriolis acceleration, xoptoA.tcrtavi'j sm-rux.uvcrtc,• [sm-ruxuvcrtc, mu KoptoA.i].
Coriolis force, MHX., KOptoA.tcrtavi'j ouvaµtc,· [ouva~nc, (mu) KoptoA.i].
Coriolis parameter, xoptoA.tcrtavi'j rcap<iµs-rpoc,· [ rcap<iµs-rpoc, mu KoptoA.ij.
cornu spiral, MA0., xspm6crrci;tpa · [ Kspa-ri v11 £A.ts}.
corollary, AOr. , MA0., srcaxoA.ou-011µa.
corona, A1:TP., cr-rEµµa . solar corona, i)A.taKOV crteµµa .
corona discharge, cr-ri;µµanxi'j [otocrKouptKi'j} SKKEVfficrtc,. (LYN.: brush discharge; corposant).
corporate enterprise, AMEP., cruvs-rmpi;taKi'j STClX,cLPll<JlC,.
corporation, A MEP., OIK., cruvs-rmpeia ( =aµeptKUVtKi'j UVcO· vuµoc, ihatpda).
corporeal, crffiµ<in voc,,oc,,ov· [ crffiµanK6c,, i],6v].
corposant, = corona discharge.
corpus, MA0., crcI>µa· [ rcsoiov }. Abelian corpus, U~EA!UVOV crooµa·
[u~EALUVOV rri:oiov}. Galoisian corpus, yaA.o tcrtav6v croo
µa· [ yaA.owwvov rri:oiov}.
corpuscle, crffiµa-riowv· [ µ6ptov].
corpuscular, <l>YL., crffiµanotaK6 c,, i],6v.
corpuscular ray, crffiµanotaxi'j UK-ric,· [ crffiµanotaKi'j xocrµtKi'j aK--ric,].
solar corpuscular rays, i]A.taKai crcoµanotaKai aKtlVE<;.
correlation
corpuscular theory of light, crffiµanotaKi'j { µoptaK1) j 0effipfa mu <)>ffi-r6c,.
correct, op06c,,i],6v"[ crfficr-r6c,,i],6].
correct answer, opei'j [ ()(J)<J'tijj arc<ivn1cric,· [ apµ6soucra arc<iv-r11-crtc,}.
correct distribution of loading, operi [ crfficr-rij] xamvoµi'j q>op-ricreffiC, .
correct proof, opei'j [ crfficrn1] arc6-ost1;tc,· [ UKpt~i'jc, arc6oetl;tc,}.
correct solution, op81l[crffimi'jj sn:iA.ucric,· [ apµ6~oucra sn:iA.ucrtc,}.
correction, ot6p0fficrtc,. differential correction, otaq>optKT')
016p0cocrt<;. Sheppards's correction, crrnrrapota
vi] ot6p0cocrt<;" [ cri:mtap8tavi] pu0µtcrt<; · pu0µ1crt<; wu :Eerrrrapvt].
Yates correction (for continuity), i>ati:crtavi] ot6p0cocrt<; {ot6p0cocrt<; wu rtail')t<;} (rrpo<; arrOKUtcicrtacrtV tfi<; cruvi:xi:ia<;).
zeroing correction, µqoi;voA.rirrnKT') {E~UKpt~CO"C!Ki]} ot6p0cocrt<;.
correction in interpolation, ot6p-0fficrtC, £v n:api;µ~o).ij · {ot6p0fficrtc, n:apsµ~o)-i'jc,}.
correction line, XQPOM., sMeta £n:a vop0rocrsffic,.
correctness, op86-r11c,· [ crffim6-r11c,J.
correlation, MA0., crucrx.Encrtc,. attenuation of correlation, e~acr0t
Vl')crt<; tfi<; crucrxi:ticri:co<;. canonical correlation, 0i:crµ1Ki] cru
crxencrt<;. coefficient of correlation, cruvtEAE
crti]<; (tfi<;) crucrxi:ticri:co<;. curvilinear correlat ion, KaµrruA.6-
ypaµµo<; crucrxencrt<;. Eulerian correlation, i:\JA.11pmvi] cru
crxfatcrt<;.
205
correlation coefficient
interclass correlation, oUlKA.acrtKi] crucrxtn me;.
intraclass correlation, l:voo11:A.acrt11:i] crucrxtncrtc;.
Lagrangian correlation, A.aypav~ta· vii crucrxtncrtc;.
linear correlation, ypaµµt11:i] crucrxt· ncrtc;.
multiple correlation, 7tOA.A.a7tA.fj cruuxti:tcrtc;.
negative correlation, apvrin11:i] crucrxtncrtc;.
net correlation, 11:a0apa [ µeptKi]) crucrxtn crtc;.
nonsense correlation, a11:ataA.oytuwciJ crucrxtncrtc;.
normal correlation, taKnKi] [6p-060si:oc;] crucrxtncrtc;.
partial correlation, µsptKi] crucrxt· nmc;.
perfect correlation, teA.Eia crucrxt· ncrtc;.
positive correlation, 0en11:i] crucrxt· nmc;.
principle of correlation, apxiJ tfjc; crucrxsi:icrscoc;.
rank correlation, crt0tXTJPU crucrxtnmc;· [ crucrxtncrtc; cri:oixcov· crucrxt· nmc; ~uyrov ).
Spearman rank correlation, <J7tT]P· µavmvi] crucrxtncrtc;· [ cri:otxripa cruuxfamtc; i:ou E7tfjpµav).
spurious correlation, v60oc; crucrxtttmc;.
synoptic correlation, cruvomtKi] crucrxtncrtc;.
tetrachoric correlation, tetpaxcoptKi] crucrxtncrtc;.
correlation coefficient, crnvn:A.ecnl']c; O"l><JXE'tlO"ECOc;.
206
biserial correlation coefficient, Ot· m:tpt<l11:oc; cruvi:eA.scri:i]c; crucrxsi:icrecoc;· [ cruvi:sA.em:i]c; otcretpUlKfjc; crucrxei:iuscoc;].
Lagrangian correlation coefficient, cruvi:sA.ecri:i]c; A.aypav~tavfjc; crucrxsi:[uscoc;.
multiple correlation coefficient, cruvt&A.ecri:i]c; 7toA.A.anA.fjc; crucrxericrecoc; .
correlation tracking
order of a correlation coefficient, ta~tc; cruvteA.ecrtoii crucrxsticrscoc;.
product moment correlation coefficient, cruvteA.ecrti]c; crucrxsi:icrscoc; toi> yt voµtvou trov po7trov· [ cruvi:sA.ecrti]c; taKttKfjc; crucrxei:icrscoc;].
second-order partial correlation coefficient, osuwpora~toc; cruvi:sA.scri:i]c; µept11:fjc; crucrxei:icrecoc;.
correlation curve, crucrxenKT] { crucrxencrnKT] j KaµrcuA.1r {KaµrcuA.ri crucrxe'ticrecoc;]. ~YN.: correlogram).
correlation detection, AOrI~M., <JUO"XE'ttKTJ ESlXVEUO"tc;.
correlation diagram, 8uiypaµµa cru<>XE'ticrecoc;.
correlation ellipse, crucrxenKT] [ crucrxencrnKT]j eA.A.rnvtc;· {EA.A.et'lftc; ('tfjc;) crucrxe'ticrecoc;].
correlation function, crucrxencr'ttKTJ [ crucrxenKT]] cruvap'tT]crtc;.
correlation of intensity with distance from the epicenter, crucrxencrtc; ev't<icrecoc; ( cretcrµou) Kai &.rco<>'t<icrecoc; &.no wu emK€v'tpou.
correlation of relationships, crucrxencrtc; ( 'tWV) crxfoecov.
correlation principle, ~TAT. , crucrxenKT] { crucrxenKtcrnKT]) &.pxrr { &.pxl'J 'tfjc; crucrxe'tic:recoc;].
correlation ratio, A.6yoc; crucrxe'ticrecoc;.
correlation tracking and ranging, crucrxenKT] 'ixveucrtc; Kai EV'tOTCLcrtc;• { crucr'tlJ~LU crucrxenKfjc; ixveucrecoc; Kai EK'tayfjc;j.
correlation tracking and triangulation, O"DO"XE'ttKTJ 'iXVWcrtc; Kai 'tptycovtcrµ6c;· { crucr1riµa crucrxe-
correlation tracking
nKfjc; ixveucrecoc; Kai 'tptycovtcrµou ].
correladon tracking system, crucr'tlJµa <JUO"XE'ttKfjc; lXV&UO"ECOc;.
correlative, crucrxenK6c;, T],6v.
correlogram, crucrxe't6ypaµµa· { crucrxewypacpriµa].
correspondence, MA0., &.vncr'totxia.
indices of (the) correpondence, 8eiK'rm (tfjc;) avncri:otxiac;.
one-to-one correspondence, µovoµov6nµoc; avncrtotxia· [ avncri:otxia tvoc; 7tpoc; i:v· aµcptµovom']µavi:oc; UVTt<JtOLXi<l].
projective correspondence, 7tpo~oA.t11:i] 6.vncri:otxia.
rational correspondence of two algebraic curves, prp:i] avttcri:0txia OUO UA "(E~plKWV KClJ.17tUACOV.
correspondence of points, crriµetaKTJ &.vncrwtxia· [&.vncrwtxia criiµeicov].
continuous correspondence of points, cruvexiic; crriµetaKi] avncri:otxia· [ cruvexi]c; avncri:otxia (i:rov) crriµeicov] .
corresponding, &.vncr'totxrov,oucra, ouv· { &.v'ticr'totXoc;,oc;,ov· 6µ6A.oyoc;,oc;,ov].
perfect restraint corresponding to rigid end fixation, MHXT., t&A.eia ofoµeucrtc; icroouvaµoucra 7tpoc; 7tA.i]P'l 7tUKtCOcrtV.
corresponding angles, UV'ttcr'tOtXOL { 6µ6A.oyot] ycoviat.
corresponding angles of two lines cut by a transversal, &.v'ticr'totxot ycoviat Mo eu9et&v 'teµvoµ€vcov rcapa eyKUpcriac; (eu9eiac;).
c()rresponding lines, &.v'ticrwtxot { 6~t6A.oyot 1 eu9e1:at.
cosecant of an angle
corresponding period, &.vncrwixoucra { av'ticrwtxoc;] rcepio8oc;.
ratio of the amplitude of pulses to the corresponding period, A.6yoc; 1:00 tupouc; t&v 7taA.µrov 7tpoc; i:i]v avi:t· crtotxoucrav 7tepiooov.
corresponding points, &.v'ttO"'tOLX<l { 6µ6A.oya] crriµeta.
corresponding polyhedral angle in a spherical pyramid, &.v'ticrwixoc; {6µ6A.oyoc;] rcoA.Ue8poc; ycovia cr<patptKfjc; rcupaµi.Ooc;.
corresponding rates, OIK., &.v'ticr'totxot 8tanµa.i.
corresponding sides, MA0., &.V'ti<J'tOtXOt { 6µ6A.oyot J rcA.eupai.
corresponding trihedral angle in a spherical triangle, &.v'ticr'totXoc; {6µ6A.oyoc;] 'tpie8poc; ycovia (&voe;) cr<patptKOU 'tpt yrovou.
corrigible proposition, AOr., ercavop9co'til rcp6mcrtc; .
cos, = cosine.
cos x, cruv X· exponential values of sin x and
cos x, l:11:0Ett11:ai nµai i]µ x 11:ai cruv X·
cos· 1 x, = arc cos x.
cosec, = cosecant.
cosec x, cn~L X·
cosecant, cruV't€µvoucra. circular cosecant, KUKALKi] cruvtt·
µvoucra. logarithmic cosecant, A.oyapt0µtKi)
cruvttµ voucra.
cosecant curve, cruV'teµvoucra KaµrcuA. ri.
cosecant of an angle, cruv't€µvoucra ycoviac;.
207
coseismal line
coseismal line, crucr( cr)stcrµtKi] KaµnuA.rr [ 6µocrncrµtKi] ypaµ~n']}.
co-set, au( cr)cruvoA.ov· [ 6µocruvoA.ov }. (l:YN.: corresponding set).
left CO-set, aptcr!EpOV crucrUVOAOV. right co-set, 1ie~t6v crucruvoA.ov.
co-set of a subgroup of a group, crucr( cr)uvoA.ov imooµ<i8rn; 6µ<i-8oc;.
cosine, cruv11µtt0VtK6c;,1'],6v. circular cosine, KUKALKOV cruv1iµ!
'tovov. direction cosine (in space), 1itw0uv
'ttKov [1i1w0iivov] cruvriµirnvov (ev 't/i'> xrop(J)).
law of cosines, cruvri~1tt0VLKO<; v6-µoi;.
logarithmic cosine, A.oyapt0µtKOV cruvriµirnvov.
versed cosine, napacruvriµirnvov.
cosine, cruv11µi'rovov .
cosine circle (of a triangle), cruv11-µnovtK6c; Kudoc; (rptyrovou).
cosine curve, cruv1iµnovtKi] [ cruv-1']µt t0vost8i]c;} KaµrcuA.11.
cosine function, cruv1iµnovtKi] cruv<iptl]crtc;.
periodicity of the sine and cosine functions, nepto1itK6rrii; riiiv f}µt rnVtKiiiv Kai cruv1iµ1rnv1Kiiiv cruvaprf]crEoov.
cosine integral, cruv1iµtt0VtK6v 6A.oKA.f]pwµa.
cosine law, cruv1iµnovtK6c; v6µoc;· [ v6µoc; t&v 0"\)Vl]µtTOV(l)V } .
Lambert cosine law, A.aµ~Epnavoi; uuvriµtLOVLKO<; v6µoi;· [v6µoi; cruvriµtL6voov wii Aaµrr.f.p].
cosine law (for a triangle), cruv1iµtt0VtK6; v6µo; (mu tptyrovou).
208
cost
cosine law of illumination, cruvT]µttOVtK6c; v6µoc; cpwncrµou.
cosine of an angle, cruvT]·µitovov ywviac;.
cosine series, cruv1umovuci] crstpa: [ crstpa toll cruvT]µn6vou].
cosine transformation, cruvT]µtmVtK6c; µsrncrxTJµancrµ6c; .
cosingular, MA0., cruvt8tacrt6c;,f}, 6v· [ cruvt8t<i1;;wv,oucra,ov. J
cosingular complexes, MA0., cruvt-8t<i1;;ovta [ cruvtotacrt<i} crwmA.eyµa.ta.
cosmic, <l>Yl:., KOcr~ttK6c;,1'],6v (= a, mu cruµrcavmc;, L8iwc; rcepa.v tfjc; yT]iv11c; 1hµocrcpa.ipac;· p, 8tacrtT]µtK6c;,1'] ,6v).
cosmic cycle, <l>IJ\., Kocr~ttK6c; KUKA.oc;.
cosmic radiation, KocrµtKl) aKnvoPoA.ia.
cosmic rays, KocrµtKai aKtivsc;.
cosmic rocket, KocrµtKOc; TCUpUUAOc;. (~:YN.: space rocket).
cosmic ship, Ko0µ6rcA.ot0v [KOcrµtKOV rcA.oiov). (l:YN.: space ship).
cosmical constant, KocrµtKi] crta-9sp<i· [A.}.
cosmical number, KOcrµtKOc; Upt9-µ6c; · {N j.
cosmological model, Kocrµo/,oytKOV rcp6rnnov.
cosmotron, <l>Yl:., Kocrµoi:p6v11.
cost, OIK., x6crmc;. opportunity cost, K6crrni; EUKm
piai;.
cost accountant
replacement cost, K6crrni; [f.'f,oliov] avrtKaracrracreooi;.
cost accountant, OIK., Kocrt0A.oy1-crtf}c;.
cost accounting, OIK., KocrmA.oytcrnKf].
cost analysis, MA0., Kocrtav<iA.u-6tc;'{KocnoA.oytKTJ UVUAUcrtc;}.
cost engineering, KocrmA.oytKTJ µT]xavoi:sxvia..
cost of living index, l:TAT., nµ<ipt9µoc; (K6crt0uc;) t;;wiic;.
cost of unit of power delivered, K6-crmc; rcpoµ119siac; µtfic; µov<iooc; (l']A.sKtptKfjc;) &uv<icrswc;.
costing, OIK., Kocrt0A.6y11crtc;.
cot, = cotangent.
cot x, crcp X·
cot·1 x, = arc cot x.
cotangent, cruvscpamoµevT]. circular cotangent, KuKAtKT] cruvE
q>anroµtvri. logarithmic cotangent, A.oyap10~1LKTJ
cruveq>anwµtvri.
cotangent curve, cruvscpa.nmµsvtKTJ KU~lTCUA 1'].
cotangent of an angle, cruvscpamo~1ev11 ywviac;.
cotangential, cruvscparct0~1svt Koc;, Yi, 6v.
coterminal, cruA.A.1']KttK6c;,1'],6v.
coterminal angles, cruA.A.11KnKai ywviat.
Cotes (Roger-), (Poyfjpoc;) K6oui:c; ( = ayyA.oc; µa9T]µUnK6c;· l 682 -1716).
Newton-Cotes integration formulas, 61..oKA.ripoonKa litarunroµara [ru-
Coulomb's ring theory
not 61..oKA.riprocreooi;] N euroovoi;-K6-ouri;.
Cotes's assumption, KotsmaVI) rcpoi.irc69scr1c;· [ rcpostKUcria. tou K6oui:c;}.
Cotesian, Koi:scrtuv6c;,1'],6v ( = t0u K6outc;) .
Cotesian law (for a plane cubic curve), Koi:scrtav6c; v6~1oc; (tf1c; 8mrce8ou tpnoPa9µiou KaµrcuA.11c;) .
couette flow, <l>YL, tptPrnnKT] poJi.
Coulomb (Charles Augustin de-), (K<ipoA.oc; Auyoucri:ivoc; vt£) KouA.6µ ( = y<iA.A.oc; cpucrtK6c; Ka.i ijAEKtpoA.Oyoc;· 1736 - l 806):
coulomb, KouA.OµPwv'[(µovac;) KouA.6µ].
Coulomb collision, KouA.oµp1a.vl) cruyKpoucrtc;.
Coulomb damping, KOUAoµptavi] arc6crPrntc;• [ arc6crPrntc; t0u KouA.6µ).
Coulomb vibration, KouA.oµpia.v6c; Kpa.8acrµ6c;· [Kpa8acrµ6c; toll KouA.6~1].
free Coulomb vibration, l;/..i;u0epoi; KOUAOµ~tavoi; Kpa1iacrµ6i; .
Coulomb wave function, KouA.oµPtetvi] Kuµa.nKi) cruv<ipn1mc;· [ Kuµa.nKi) cruv<ipi:11cr1c; mu KouA.6µ).
Coulomb's law, KouA.0~1Ptav6c; v6-µoc;· [ v6µoc; t0u KouA.6~1}.
Coulomb's law for point-charges, KouA.oµpwv6c; rcspi aiiµswcpopticrswv v6µoc;· [ v6µoc; 1'WV cr11-µst0cpopticrswv t0u KouA.6µ ).
Coulomb's ring theory, KouA.o~tPta.-
209
council
vi] 00.K'tUAlUKTJ 9Erop{a.· {Sa.K'tUA.ta.Ki] 9Ecopia. wu KouMµ}.
council, cruµ~ouA.wv.
councillor, (voµtK6c;, bmpomK6c;, Yi SmA.coµa.nKoc;) croµ~ouA.oc;.
counseling, 'PYX., cruµ~ouA.wnKi].
counseling, cruµ~ouA.EUnK6c;, f],6v.
counselor, auµ~ouA.w-rf]c;.
count, Ka-ra.pt9~tG:r {bttµErpCl'r cipt9-µoµE-rp& )" (= µErp& rn-r' civnKEiµEvov· µErp& cipt9µT]rn<&c;).
count, I, Kma.pi9µT]cnc;· {l:m~1f;-rpT]-aic;· apt0µoµf;-rpTJcnc;]. 2, AOnI:M., x,povoµf:-rpTJcrtc;.
plus count, 6IA1:T., µeraxpovtcrµoc; ( = tmµl:TpT]crt<; TOU XPOVOU de; liwtepoA.eit-ra, A.eitta, Kai &pac;, roe; ((Q"UV 1», «crov 2l>, cruv 3», KTA., O.ito -rou miµEiou T, Kai tv cruvexeig -rou countdown).
count by twos, threes, fours, etc., µE-rp& Kara Su6.Sa.c;, rptciSac;, -rE-rpciSac;, KrA..
countability, MA0., Katapt9µT]r6-'tT]c;· { anapt9µT]-r6rT]c;· l:mµErpTJnK6-rTJc;].
first axiom of countability, npc'Owv a~iroµa Tll<; aitapt9µT]TOt1FO<;.
second axiom of countability, lieu-repov O.~iroµa -rile; <'mapt9µT]tOtT]TO<;.
countable, Karapt9µT]-r6c;, fj,6v· { &.napt9µT]-r6c; , f],6v· l:mµErpT)-r6c;, i],6v ].
countable set, Ka-ra.pt9µT]-r6v { ci1mpi9µ11rov 1 aovoA.ov.
countably, anapi9µ11-r&c;· {Ka.rapi9-µT]r&c;j.
countably additive (set) function, chapi9µT]-r&c; npocr9EttKTJ cruv-6.ptT)cnc; (auv6A.ou).
210
counterclockwise
countably compact set, anapt9µT)-r&c; auµnayec; cruvoA.ov.
countably infinite set, anapt9µT]-r&c; { Kara.pt9µT]-r&c;j dm:tpov auvoA.ov.
cardinal number of all countabiy infinite sets, liuva;ltKO<; O.p19µ6c; [86-vaµ1<;} -rile; 6A.0tT]TO<; trov O.itapt9µritii'l<; O.iteipc.ov cruvoA.rov. (1:YN.: alephnull).
countdown, ~IAI:T., rrpoxpovicrµoc; ( =avaSpo~nKT] x,povoµhpT]crtc; de; Sw-rEp6A.Enra., AErmi, Kai &pa.c;, we; HµE:iov I 0)), «µdov 9», «µdov 8>>, K-rA.., µtxpt wu aT]µdou T, il T-time).
countdown sequence, ~IAI:T., npo:x;pov( tcrt)tKTJ ciKoA.ou9ia (l:pyrov &A.tnou).
counter, TEXN., µEtpT]rf]c;. binary counter, liualitK<'>c; µetpT]ti]<;. Cerenkov counter, KEPl>VKO~tavo<;
µetpri-ri]c;· [ <pc.opati]<; wu TcrepevKo<p }. control counter, i:A.eyKtlKO<; µetp11-
-ri]c;. Geiger counter, yetyeptavoc; µetp11-
-ri]c;· [ µEtpT]Ti] <; rKcJ.°iyKEp }. Geiger-Muller counter, = Geiger
counter. instruction counter, AOrI1:M., tv
taA.ttKO<; µetpl'Jti]<;. location counter, AOrIEM., J.J&
TpT]ti]<; TOito9ecriac;· [ µetpT]ti]<; i:vti:-raA.µev11c; lita;Lovilc;].
modulo 2 counter, l51µ61ito<; µe'tpT]ti]c;· [ µetp11titc; Kata µ615tov 2}.
program counter, AOrU:M., npoypaµµtKO <; µe'tpl'JtTJ<;.
program address counter, AOrI1:M., µetp11tftc; _ npoypaµµ1Kil<; litaµovfj c;.
ring counter. liaKtuA.mK<'><; µetp11-'tTJ<;.
counterclockwise, Ka.-ra cpopav civ-ri-9Ewv -rijc; -r&v OEtK'tWV wu cl>po-
counterclockwise
A-oyiou (=a, c'tptcrrEpocr-rp6cproc;· ~' ciptcr-rEp6cr-rpocpoc;,oc;,ov).
acting counterclockwise, tvi:py&v, oucra,ouv Kata <popav O.vtl9ewv 'tll<; tlilv linKtci'>v wu <ilpoloyiou· [tvepylilv,oooa,ouv 0.ptcrtepocrtp6cproc;].
measured counterclockwise, µe'tpouµevoc;, 11,ov, ap1crtepocrtp6<proc;· [ µe'tpo6µi:vo<;,T],OV itpoc; 'ta O.ptcr'tepa].
counterclockwise polarized wave, aptarnpocrrp6cproc; mmoA.roµf;vov Kuµa.
counting, 1, Karapi9µT]mc;· {f.7nµ£rpTJaic;· c1.pt9~1oµf;rpT]cnc;}.2, AOnrM., MAI:T., x,povoµ£TpT]crtc; (auv il µEtov) .
finger counting, 1, liaKtuA.oµetpT]m<;. 2, liaKtUAOVOµia.
T minus 90 (seconds) and counting, T µetov 90 (15wti:p6A.eitta) Kai cruvexisoµev. (Kat' avti9ecriv itpo<; 'tO T minus 90 and holding, T µeiov 90 Kai 0.vaµevoµi;v) .
counting (of the votes), 01aA.oy1) (-r&v 'Vficprov).
countless reflections, refractions, and irregular dispersion of wave (in its travel), UVapie~LT]TOt UVaKAUcrEtc;, Sia9A.acrEtc;, Kai aKav6vtaroc; crKEOacrµoc; Tou Kuµaroc; (Ka.Ta TTJV µE-racrraaiv rou).
couple, MHX., <I>YL, °(,Euyoc;· {r,Euyoc; SuvciµErov}.
arm of a couple, ppaxirov (t00) ~euyouc;.
clockwise couple, lie~16cr'tpocpov si:Oyoc;.
dynamic couple, liuvaµtKOV seuyo<;. externally applied couple, t~roti:p1-
KIIl<; <l.O"K119Ev seuyo<; (liuvaµerov). flexural couple, neptKaµnrncov [Ka
µitttKOV j si:Oyo<;. moment of the couple, poiti] 'tou
sE6you<;.
course line
overturning couple, avm:pennx:ov seuyoc;.
reactive couple, avnlipacrttKOV ~EUyoc;· fsEuyoc; &.vnlipcicreroc;].
restoring couple, O.itoKa'tacrtanx:ov seuyoi;.
resultant dynamic couple, cruv1crt6:µevov liuvaµ1Kov ~euyoc;.
torsion couple, crtpE7ttllCOV si:uyoi;· [seOyoc; crtpEIJIEro<;}.
coupled mode, MHXT., <I>YI:., cro°(,EUK-rov { auvE'(,wyµ£vov] -.p6-nT]µa.
vibrating in a coupled extensionalrocking mode, Kpaliawoµevoc;, ri,ov Kata cruveswyµevov i:iti:Ktanx:oA.1-KvtcrnKov 'tp6itriµa.
vibrating in a coupled flexuralrocking mode, Kpalimv6µi;voc;,T],OV Ka'ta O"UVEsEUyµevov (7tEpl)Kaµ7t'tlKOAlKVlO"tlKOV tp6it11µa.
vibrating in a coupled flexuraltorsional mode, Kpalimv6µevoc;,ri,ov Kat&. cruveswyµevov (itEp1)Kaµm1KocrtpeitnKov 'tpoitriµa.
coupled pendulums, <I>YI:., cru'(,eoKra [cruvE'(,wyµf;va] EKKpeµij.
problem of the coupled pendulums, itp6P/..riµa tc'Ov cruve~euyµtvcov tKKpeµc'Ov.
coupling, HAEK., MHX., '(,eu~ic;·
{ cru'C,wstc;}. coefficient of coupling, cruvteAf:cr'ti]i;
cru<;:eu~ecoc;.
coupling of isolated elements of rigidity, MHXT., au'(,wsic; µeµovroµ£vrov aroix,dcov awpp6-'tT]Toc;.
course, I, oSwcric;· {rr6pwcric; nopf.iaj. 2, NAYT., nopda.
grid course, NA YT., tcrxap1x:i) nopeia.
true course. O.A,ri91'Jc; nopeia.
course line, MA0., rropEtoypaµµir [ ypaµµi] nopdac;j.
211
course-line computer
course-line computer, ~IALT., A.oywµrrcl']c; nopi::toypuµµi''tc;.
course plotting, NA YT., nopi::taKT] unorunrocnc;· [urr.orurr.rocnc; 7t0-
pi::iuc;}.
Cousin (P. -), (fl) Koui;;i;v ( = cruyxpovoc; ycl.Uoc; µu01iµanK6c;).
Cousin problems, Koul;;tvtava rr.po-PA.iJ~tara· [npoPA.T1µura rou Kou1;;€v}.
covalence, XHM., crucr0€vi::ta ( = µl'] iovn KOV cr8€voc;).
covariance, MA0., cruvuA.A.ot6n1c;· [ cruµµcraf) ,\ 11r6r11c;}.
analysis of covariance, avaA.ucru; 'ti'jc; cruvaA.A.ot6'tT]t0c;.
covariant, MA0., cruvuA.A.otror6;, 11 ,6v· [ cru~tµi::raPA.r1r6c;,i) ,ov}.
covariant, MA0., cruvuA.A.otcori)· [ cruµµi::rapA.1iriJ}.
bilinear covariant, otypaµµLKi] cruvaA.A.o wn: i] .
covariant derivative, MA0., cruva.Uotron'j [cruµµi::rapA.1rrl']j rr.upuycoyoc;.
Stokian covariant derivative, crtoKtavi] cruvaA.A.otul'ti] napayroyoc;· [ cruµµna~A. T]ti] napayroyoc; rnu It6ouKc;].
covariant derivative of a tensor, MA0. , cruvuA.A.otrorl'] [ cru~L~L£taPA.11nl} napriyroyoc; (rou) mvucrµuroc; .
covariant differentiation, MA0., cruva.Uotron'j [ cruµµi::raPA.11rl']] 8tmp6ptcnc;.
covariant indices, MA0. , cruvuA.A.otrorni [ cruµ~tcmPA.11roi} oi::TKtut.
covariant indices of a tensor, MA0.,
212
Cowell
cruvuA.A.otroroi odK-rut rou -rav6crµaroc; .
covariant Riemann-Christoffel curvature tensor, MA0., cruvuA.A.otro-rov [ cruµ~ti::raPA.11-rov] -ta.vucrµu KaµrruA.6n1rnc; PlµuvKpicrrocpcpi::A..
covariant tensor, MA0. , cruvuA.A.otcorov [ cruµ~ti::rapA. 11-rov j -ruvucrµa .
covariant vector field, MA0., .cruvaUotro-rov [ cruµµi::rapA.11-rov }mvucr~mnKov ni::oiov.
covariation, MA0., cruµµi::mA.A.uyiJ· [ cruva.Uoirocnc;}.
coverage, KUAU\jftc;· [ nupaKoA.ou811-cnc;}.
instrumental coverage, opyavoµE'tptKi] napaKoA.ou9ricrtc;.
covering, MA0., Kcl.A.uµµa. closed covering, KA.Etcrt6v K<il..uµµa. density of a covering, JtuKv6'tric;
t0u Kal..u~iµarnc;.
lattice covering, nA.i;yµanKov K<iA.uµµa.
open covering, avotK'tOV K<il..uµµa. Vitali covering, ~ttaA.tavov K<il..uµ
µa· [Kal..uµµa (t0u) Btt<iA.1].
covering of a metric space, MA0., KUAUµ~ta µi::rptKOU xwpou.
E-covering of a metric space, Kal..uµ~ta Eljltl..ov ~1np1Kou (ttvoc;) xci>pou.
covering of a set, MA0., Kcl.A.uµµa cruv6A.ou.
co versed sine, nupacruv1iµi -rovov.
coversine, = coversed sine.
covertical, 1, 6~toK6pucpoc;,oc;,ov. 2, PIM. rEQM. ,£mK6pucpoc;,oc;,ov.
Cowell (Philip Herbert-), (<I>lA.rnnoc; X€pµni::pr) Kuoi::U ( = ayyA.oc; cicr-rpov6µoc;· 1870 - 1949).
Cowell method
Cowell method of orbit computation, KOUEAAtavi] µs0o8oc; urr.o.Aoytcr~LOU -ri'jc; -rpox1ac;.
CPM, = Critical Path Method.
CPT theorem, <IlYL., 0i::ci:>p11µu cpop-riou-icr6-r11-roc;-xp6vou.
CPU, = Central Processing Unit.
Cramer (Gabriel-), (rapptl']A.) Kpuµi::p (= SA.pc-roe; µa011µanK6c;· 1704 - 1752).
Cramer's rule, Kpaµi::ptavoc; Kavci:Jv· [ Kavwv rou Kpa~ti::p}.
craft, I, n:xvnciu ( = -ri::xv11µanKT] £vacrx6A.1icric;). 2, -rsxviiµa· [ -ri::xvoupnµa}.
arts and crafts, J, 'tEXVat Kai 'tEXVt'tEiat. 2, 'tEXVi]µata Kai KaA.t~l'tExviiµata.
craftsman, 1, -ri::xv11µu-riuc;. 2, -ri::xvin:\)i:T)c;· [ -ri::xvt-r11c;}.
craftsmanship, -ri::xvi-rcucrtc;.
creation, 81iµ10upyia· [811µ10upnmr;}.
creative, 81iµtoupy1K6c;,i) ,6v.
creative engineering, 811µ10upytKl'] µ11xavo-rsxvia.
creep, MHX. , l:prr.11cnc;· [oisprr.11-cru; · 8t6.rr.A.rocnc;· sprmcr~t6c;}.
creep strength, MHXT., sprc11nK1'j &vrnxrr [ civrnxl'J i;rr.i sprci)crct}.
creep tendency, EPTCllHKl'] £mcpopa· [-rel.enc; npoc; sprrucrµ6v }.
Cremona (Luigi - ), (Aouhl;;t) Kpi::µ6vu ( = haA.oc; µa011µanK6c;· 1830- 1903.)
Cremona transformation, Kpi::µovtavoc; µi::racrx11µancr~16c; · [ µi::-racrx1wuncrµo c; mu Kpi::~t6vu}.
critical damping
Cremona's theorem, Kpqtovtavov 0i::wp11µa· [0i::mp1wu mu Kpi::µ6· vaj.
criminal law, notVlKOV 8iKatov.
crisis, OIK. , Kpicrtc; ( = Otarapux;i) -rfj c; lcropporr.iuc; µi::ml;u rr.pocrcpopuc; Kai 1;;11-ri1cri::co~).
energy crisis, evEpyEtaKTJ Kpicrtc; ( = Kpicrtc; A6-yq> c'Lvi;napKeiac; evEp'YEtaKrov n6prov).
power crisis, ouvacrlKTJ Kpimc; ( = Kpicrtc; A.6yq> c'Lvt1eav6'tTJ'tOt; XPTJ<nµono1i1crero; 'ti'jc; 01a0Ecriµou evEpyEiac;).
criteria for divisibility, MA0., Kpt-ri1pta (-ri'jc;) 8tmpi::-r6-r11wc;.
criterion, Kpt-ri)ptov. convergence criterion, Kpt'ti]ptov
(tf)c;) auyKA.im;roc;. divisibility criteria, Kpt ti]pta (ti'jc;)
otatpEt6tT]toc;. Euler's criterion, i;uA.riptavov Kpt·
'ti]ptov· [Kpt'tllPlOV tOU ' Oul..Ep]. maximum likelihood criterion, Kp1-
'ti]pt0v ti'jc; µcyicrtT]c; m0avoq>aVEiac;.
criterion of design, CTXEOtoA.oytKOV Kpt-ri)ptov· {KptcTJplOV UX£0tOAOYllCTf:(J)c;j.
critical, MA0., MHX., Kpicrtµoc;, oc;, OV.
critical angle, Kpimµoc; ycoviu.
critical buckling load, MHX., Kpicn~1ov A.uyicrnKov cpopriov.
critical condition of stability, MHX. Kpicnµoc; cruv8iJK11 [ Kpicrtµo<; Ka-racrmcnc;} i::ucrm0dac;.
critical constant, Kpimµo c; crra0Ep6..
critical damping, Kpicrtµo c; U7t0-CT~f:crtc;.
decimal equivalent of the percentage of critical damping, OEKai5tKOV
213
critical determinant
icro8Uvaµov wu nocrocrrnu ti'ic; Kptcriµou anocrPtcrf;(J)(;.
plotting the damping constant in percent of the critical damping, {mot6itrocrtc; f ypriqn1cr1c;J tfic; cmocrPf;crnKi'ic; crta0f;pCic; <llc; 1t00"00"TOU <fie; Kptcriµou anocrPi:crwic;.
critical determinant, Kpicnµoc; 6-pisoucra.
critical form, Kpicrtµ~ µopcp11 · [ucr-m9i]c; crx11µancrµ6c;}.
critical lattice, Kpiowov rrMyµa .
critical load, MHX., Kpicnµov cpop--riov.
critical loading, Kpicnµoc; cp6pncnc;.
critical mass, Kpicnµoc; ~ti'isa.
critical path, MA0., Kptcnµo8po-µir{Kpicrtµoc; 68wcnc;· Kpicnµoc; 8ta8poµ11].
critical path method, MHXT. MA0. Kptcrtµo8poµm) µ£8080~· [ µ€-9o8oc; T&v Kptaiµmv 68s0cr!>ffiv· µ€9o8oc; Tfjc; Kptcriµou 8ta8poµfjc;j.
critical path scheduling, MHXT. MA0., KptcnµoopoµtKOc; npootaypaµµ1crµOc;· [ rrpoomypaµµtcrµ6c; (•fie;) Kptcriµou 8taopoµf)c;}.
critical point, Kpicrtµov criiµstov . Morse's theory of critical points,
~wpcriavi] 0Eropia nEpi (toov) Kptcriµrov crriµEirov.
critical pressure, Kpicnµoc; niscnc;.
critical ratio, Kpicnµoc; · A,oyoc;.
critical region, Kpicrtµoc; m:ptox11. biased critical region, ITAT., ~tf;
poA.T]itttKi] Kpicriµoc; nEptoxfi.
critical Reynolds number, Kpicrtµoc; psi.ivoA.8tav6c; api9µ6c;.
214
cross multiplication
critical temperature, xpicn.µoc; 9i:pµoKpacria.
critical value, MA0., Kpicrtµo c; nµ11.
critical value of a point, MA0., Kpicnµoc; nµi] (~voe; cr11µsiou).
critical velocity, MHXT., Kpicrtµoc; nixuvcrtc;. (l:YN.: throat velocity).
criticality, i<ptcrtµ6111c; .
criticality factor, napaymv Kptcnµ6-r11rnc; .
criticism, I, (bctKpl1LKTJ f] oucrµi;vi]c;) KpmKl). 2, i':niKptcrtc;.
cross-bar, MHX., otaswyµa· {8tasi:uyµanK6v cr0crnJµa}.
cross beams, MHXT., crTaupoooKoi-{8tacnaupo0µsvm ooirni}.
cross-cap, MA0., otan€rncrµa (= au10rnµvoµ€v11 ~tov6rrA,wpoc; i':mcpavi:ta).
cross-curve, MA0., 8taKaµrr0A.1r {Stasuyoc; Kaµn:ut..11}.
cross-cut, MA0., crrni.lpoi:oµij ( = i':yKapcria rnµi] i':mcpavduc;).
cross-elasticity, MHX., 8ti:/..ucrnK6111c;.
coefficient of cross-elasticity, cruv- tf;AEO"ti]c; tfic; 8tef.acrnK6t1iroc;.
cross-hair, I, v11µchmµa ( crmupovTiµarnc; 11 vriµcnorrA.Byµawc;). 2, crmup6vriµa (omtKOl> OpyaVOU).
cross-lines, crmup6v11~1u (omtKo(} opyavou).
cross multiplication, I, = duodecimal multiplication. 2, 8tayrov1-oc; 1ro/..A.an:/..acrtacrµ6c;.
cross product
cross product, crmupun6v [i':~mr;i;ptKOV} yt v6µi;vov · { uvucrµanKOV ytv6µi;vov}.
cross product of the multiplication of (two) vectors, cri:aupmr:6v [uvucrµanK6v} ytv6µi;vov mu 7t0lvAUTCAUcrtacrµou (800) uvucrµui:mv.
cross ratio, MA0., crrnupmt6c; /,,6-yoc;. (1:YN.: anharmonic ratio).
cross rntio of four lines, crTauprot6c; [avap~wvtKoc;} A.6yoc; r:i:crcrapcov i:u9i:i&v.
cross ratio of four planes having a common line, cr1uupm16c; [ uvapµovtK6c;} A6yoc; TEcrcrupmv i':mnE:ocov sx6vmv lWtvTJY EU-9Eiuv.
cross ratio of (the) four points, CJTUUpcor:oc; { UVUpµOVtKOc; j AOyoc; r:&v Ti:crcrupmv crtiµEicov.
cross-section, MHX., MA0., Starnµij.
beam cross-section, 81aw~ii] (tfic;) OOKOil.
change in slope of the cross-section, aA.A.ayi] VEUcrEroc; [ aA.A.ayi] KAicrcroc;J ti'i<; 81atoµfic; .
effective cross-section, 8pacrnKi] otawµfi.
nuclear cross-section, nUpflVtKi] 8tawµi].
radius of gyration of the crosssection, <iKtic; yopoopoµfic; [aKr.ic; u-8pavtiac;J <fie; 8tatoµfic;.
rectangular cross-section, op0oyrov1aia { op0oyCJJVlKTJ} 8tat0µ1'].
scattering cross-section, <JKE8acrnKi] OtUTOµi] .
cross-section of a solid, 81ur:oµi] crr:i:pwu.
cross-section of an area, oiuwµi) (xropiou) i':mcpavi:iw;.
crude
cross-section paper, 8tawµtK6 [-ri:r;paymvtcrµE:vo} xapr:i.
cross-sectional, 8tarnµuc6c;, 1),6v ( = r:f)c; Star:oµf)c;).
cross-sectional, area, I, ota10µ1K6v i':µ~ao6v· [i':µ~aoov i':yKapcriac; rn~Lfjc;}. 2, 8tawµ11<1) i':mcpuvi:ia· [i':m<puvi:tu i':ympcriac; rnµf)c;}.
cross sensitivity, i':y1mpcriu i:uaicr811criu. (opycivou).
cross spin, MA0., oiaoivT)cric;-{ota-01vicrµ6c;}.
cross torque, MA0., MHX., uvncrupporrl).
cross-validation, 1:TAT., UYTEmKUpcomc;.
cross velocity, MA0., otaTaxuvcric;· f €yKapcria i:uxuvcnc;}.
cross wind, nl.aytoc; [syKapcrioc;} uvi;µoc;.
cross-wire, cri:aupov11µa· /v11µa16-crrnupoc;}.
crossing, I , otacrr:u0pcocrtc;. 2,MA0., 1tAOKTJ .
knot crossings, MA0., KoµPonA.oJCai· [ nA.oKai r.ou K6µPou· 8tacrtau• prom:1c; wu Koµflou].
irreducible crossings of a knot, uvriyroyo1 {µi] uvayroy1µ01J 7tAOKai "COU K6µPou· [ uvriyroyot KoµPonA.oKO.i].
crosstalk, TEXN., StacpffivT)cnc; ( = TllAE<pffiVLKTJ Otaq>ffiVtU).
cruciform, crTaup6µop<poc;,oc; ,ov· [ crrnupoi:tol)c;, ijc;,E:c;j.
cruciform curve, crrnupoKa~mu/..11· [ crrnupost81'jc; Kaµrru/..11}.
crude, U81€pyucrrnc;,oc;,ov· [ avi;ni;s€pyacrToc;, oc;, ov }.
215
crude birth rate
crude birth rate, ITAT., cbµT] [avc.niA.c.Kwc, I yc.vvl] nK6tT]C,.
crude death rate, IT AT., cbµT] [ avc.niA.c.Kr.oc,] 0v11c:n~LOtT]C,.
crunodal, MA0., crtaupoKoµPtK6c,, Tj,6v.
crunode, MA0., crtcwpoK6µPwv· { yffivt&8£c, mwc.1'.ov}.
cryogenic temperature, Kpuoyc.vl']c, [Kpuoyc.vc.nKft I 0c.pµoKpa.cria..
cryogenics, Kpuoyc.vc.nKTj.
cryptarithm, Kpu1mipt0µoc,.
cryptarithmetic, Kpuntapt0µT]nKTj.
crystal lattice, KPYIT., Kpucrta.A.A.t-KOV n),€yµa..
csc, = cosecant.
csc x, crtµ X·
csc-1 x, = arc csc x.
ctn- 1 x ,= arc ctn x.
cube, I, KuPoc;. 2, fEQM., KuPoc,· [ tphTJ 8Uva.µtc,}.
binomial cube, 81rovuµ1Koc; Kul3oc;.
duplicate a cube, 8mf..acr1a~ro KU-13ov.
duplication of a cube, omf..acrmcrµoc; 'tou Kul3ou.
group of the cube, 6µuc; wu KUl3ou· f oKtaEopoc; oµac; / .
magic cube, µaytK6c; Kul3oc;.
perfect cube, t i:A.ctoc; Kul3oc;.
truncated cube, Kof..ol3oc; Kul3oc;.
cube of a number, KuPoc, ['rpi1TJ 8uva.µtc,] aptOµoG.
cube of a quantity, KuPoc, [1pi111 8Uva.µtc,} nocr6t1110c,.
cube root, KuPtK1) pit;a.
cube root of a given quantity, KUPtKTJ pit;a. 800£lcri1c, nocr6n1r.oc,.
216
cubic equation
cubic, 1, 1cuPtK6c,,Tj,6v. 2, 1pnopa0-µt0c,,oc,,ov· [ 1pt 10cr16;, Tj,6v].
cubic, I , KuPtKft ( = 1pnof}a0µwc, ti;icrUJcrtc,, Ka.µn uA.11 , t] bwpavc.w). 2, tpttocrtij · [1pt1ocr1T] noAA.ocrtij}. (IYN.: cubic quantic).
bipartite cubic, MAE>., otµEpi]c; KU-13lK1'i . .
Cardan's formula for the roots of a cubic, Kap8av1Kov 81a'tuitroµa ['tu-7toc; tOU Kapv-rav J OLU rue; pi~ac; -rfjc; KUj3LKf\t;.
Cardan's solution of the cubic, KapoaVLKi] E1tLAU<Jlt; Ti'\t; KUl31Ki'jc;· [€7ti)..ucrtc; 'ti'\c; -rp1t013a0µiou €1;1crc.i>m;roc; Ka-ra Kapvtav}.
characteristic of a cubic, xapaKTTJp1crnKOV 'ti'jc; KUj3LKi'\c;.
circular cubic, KUKALKi] KUl3LKTJ' [ KUKALKi] -rpnol3u0µtoc; KUµ7tUATJ /.
cuspidal cubic, avaKaµltLKi] Kul31-KJ1 .
reduced cubic, UVllYµEVTJ KUl3LKTJ' [avT]yµtv11 -rptwl3a0µtoc; Kaµ7tuf..TJJ.
resolvent cubic, i\mf..uoucra Kuj31Kij' [f.mAt'>oucra -rp1t013u0~1 toc;}.
solution of the cubic, E7tif..ucrtc; -ri'jc; KUj3LKf\t;.
twisted cubic, crrpEl3A.Ti [ orprnri]j Kul31Ki] (1caµ7tuf..q).
cubic centimeter, KUPtKov Eica.10-crT6~tc.tpov.
cubic compressibility, <l>YI.,M HX., Kuf}tKll cruµmc.crT 6111c,.
modulus of cubic compressibi lity, µ68tov KUl3t1ci'\c; crUµlttEO"'tOTTJ'tOt;' [ µi:tpov oyKO\J EAUO"t'LKO'tTJtOt;' µ6otov O"(KOUj.
cubic curve, KuPtKfi [ 1pnopa9µt0c,j Ka.µnuA. 11.
cubic determinant, 1cuPtKft 6pisoucra.
cubic equation, KuPtK fi ti;icrroc:nc,· {1p110paOµt0c, ti;icrUJc:nc,].
cubic foot
cubic foot, KuPtKoc, nouc,· [ 1rnPtKO 7t00t}.
cubic measure, KU[}tKTJ µc.1ptKTJ µovac,· { µovac, XffiP111tK6111r.oc,· µ€-1pov OyKOU j.
cubic number, KUPtKOC, apt0µ6c,· {Ku Poe, (sv6c, apt0µou)].
cubic quantic, 1pttocrti] {KuPtKTJ} noA.A.ocrTTj.
cubic quantity, KuPtKTJ 7tOcr6t11c,· [Kupoc,].
cubic residue of an integer, KuPtKOV Ka.1aA.omov aKc.pa.iou.
cubic root, Ku(}tKTJ pit;a.
cubic space curve, KUPtKTJ {Tptt0-Pn0µtoc,] mµm'.>A.11 T.OU xwpou.
cubic surface, 1cuPtKTJ [ 1ptr.oPa0µt-oc,] tm<pavc.ta..
cubical, 1cup1;.:6c,,Tj,6v.
cubic.al ellipse, KuPtKTJ sAA.mvic,.
cubical expansion, <l>YI., MHX., Kuf}tK:T] ota.crtoA.fi.
coefficient of cubical expansion, CTU\l'tEACO"'tTJt; KUj31Ki'jc; Otacrtof..i'\c;.
cubical hyperbola, KUPtKTJ unc.pPoA..fi.
cubical !Jyperbolic parabola, KuPtKTJ U7tepPOAlKTJ na.papoA.11.
cubical parabola, KUPtKTJ napa.poA.11. , semicubical parabola, i]µtKul3tKi]
7tapaj3of..ij.
culmination, AITP., 1, oup6.v11mc, ( = µecr11µPp1vi] 81apa.cr1c,). 2, ~1c.croup6.v11mc,'[ <'ivUJ oupav11mc,}.
· upper culmination, µi::croup<ivT]crtc;· [avro oupuvqcrtc;].
cultural, noA.incrµuc6c, , Tj,6v ( = toG 7toA.tncrµou).
currency
culture, 1, noA.tncrµoc, (Kat' avnOtacrrnA.l)v np6c, 16 civilization, EK1t0lctncrµ6c,). 2, ayUJyij:
cumulant, MA0., crwpc.uoucra..
cumulative, 1, crUJpwnK6c,,Tj,6v. 2, ITAT., a0potcrnK6c,,Tj,6v.
cumulative downward spiral,MAEl., &.0potO"tlKTJ { O"UJpf.UttKTJ j KUT(l)<peplKTJ 0"1tf.lpa· { a0potcrttKTJ KU'tffi<peplKTJ KaµnuA. ri].
cumulative frequency, l:TAT., a-0potcrttKTJ O"UXVOTT)C,.
cumulative frequency curve, MAEl., <l0potO"tlKTJ { O"UJpf.UttKTJ} O"UXVOtlKTJ KUµ7tUAT]' {mµnuA.11 U-0potcrttKfjC, O'UX,VOT11T.OC,j.
cuneiform numerals, cr<p11voc.18fi &.pt0µ11nic6..
Curie (Marie - , nee Marya Sklodowska), (Mapia) Ktoupi (To ytvos LKAOV16<pcrKa) ( = 7t0A(fJvoyaAA.ic, <pUcrtKOX11 ~llKOS' 1867 -1934).
Curie (Pierre -), (Ohpoc,) Kwupi ( = yaUoc, <pucrtK6c,· crut;uyoc, 1fjc; Ma.pia.c, Kioupi· 1859 - 1906).
curie, KOUptoV' { KtOUpi }' ( = µovac;; pa.8tc.vc.pyou na.paKµfjc,) .
Curie temperature, Kouptavi] 0EpµoKpacri!r [0c.p~toKpa.cria. Ktoupi ].
curl, MA0., '&ivUJcrtc,'{ crucrtpo<pij}.
curl of a vector, OtVUJO'tC, (tou) UVUcrµar.oc, .
curl of a vector function, 8ivfficrtC, UVUcrµanKfjC, O"UVUp tTJO"f.UJC,.
currency, OIK., v6µtcrµa. ( = o,n EXf.l 1tEpacr11 we, xpfjµa.· KUt'
217
current
· &.vnota.o"toA.l']v npoc; to money, xpf\µa.).
current, <!>YE., pi;uµa. active current, HAEK., &w;pyov
{13at'tlKOV J pEiiµa. alternating current, &vaA.A.acrcr6µE
. VOV pEiiµa. Amperian currents, O.µitEptava [ µo
ptaKa] pEuµa-ra. conduction current, 0.yroytKov pEii
~La .
convection current, µEtayroytcrttKov { µEtayroyLKOV J pEiiµa.
dielectric current, OLT\AEK:tptKov pEiiµa.
direct current, cruvExtc; pEiiµa. grid current, ecrxaptKov pEiiµa. loop-current, f3pox6pwµa· {13poxt-
Kov pEiiµa· peii~ta f3p6xou· 13pox6ppeuµa].
oscillatory current, taA.avtrottK:ov pEiiµa .
periodic current, itepwotK:ov pEiiµa.
. pulsatory {pulsating] current, itaA.µopEuµa· [itaA.µtKov peiiµa· itaA.µwoec; peuµa].
reactive current, O.vaopacrttK:ov [a-13atttKov J peu~m .
vibrating current, oOVT\'tlKOV { itaA.µLKov] pEiiµa.
watt current, 13an6peuµa· [13atttKov peiiµa· evepyT}ttK:ov peiiµaj.
wattless current, 0.13atttK6v peiiµa.
current of air, pi>uµa. utpoc;.
current vector, avucr~ia. (mu) pi;uµa.mc;.
curtate, btippa.xuc;,uc;,u· [pi;ppa.xuµtvoc;,T],ov j.
cm:t.ate cycloid, enippa.xu KUKA.Oetotc;· [pi;ppa.xWLEVT] KUKAO€tof]c;].
curtate expectation of life, 1:TAT., Pc:Ppa.xu~ttvri [ µi>crowcl']j npocrooKia. £mPtmcri;wc;.
218
curvature
curvature, Ka.µnuA.6tl]c;. angle of curvature, yrovia KaµituA.6-
tT}toc;. antic\astic curvature, O.vttKA.acrttKTJ
KaµitUAOtT}c;. average curvature of a curve in a
plane, µecrottKi) [µfo11] KaµituA6tT}c; KaµitUAT}c; 'tOU E7tl7tEOOU. .
axis of curvature, a~rov (tile;) KaµituA.6-rriwc;.
center of curvature, K:f:vtpov (ti'jc;) KaµitUAOtT]toc;.
center of geodesic curvature, KEVtpov yco:>omcrtaKfic; 1Caµ1tuA.6tri-rrn;.
downward curvature, Katroq>EPLKTJ K:aµitUAOtT}c;.
Gaussian curvature, yrocrmavl) Kaµ-7tUAOtT}c;.
geodesic curvature, yeroommaKl) [yErooat'tlKTJ] Kaµ1tUAOtT]c;.
integral curvature, 61..oK:ATJPOOtLKTJ K:aµituA.6tT}c;.
integral curvature of a geodesic triangle on a surface, 61..oKAT\PID'tlKTJ Kaµ7tUA6tric; yEroommaKoii tptyci>vou {eiti) &mcpavEiac;.
integral curvature of a region on a surface, <JA.oKA. T\ protLKTJ Kaµitu1'.6tric; XOOPLOU ttvoc; ti'jc; Em<pavE[ac;.
intercept (on the normal line) between the curve and the center of curvature, 7tEptAT}µµa (ti'jc; op0o0f:toU i.:u0dac;) µi.:ta~u -ri'jc; mµituA.ric; Kai toii Kf:vtpou KaµituA.6tT}toc;.
lines of curvature on a surface ypaµµai Kaµ7tUA.6tritoc; &mcpa:velac;. '
mean curvature of a surface, µecrri K:aµituA.6tT}c; emcpavi;lac;.
mean normal curvature of a surface at a point, µfoll Op060Et0(; Kaµ-7tUAO'tT\\; emcpavEiac; El\; tt <JT}µEtOV . m~asure of curvature, µf:tpov Kaµ
ituA.otritoc;. {LYN.: specific curvature; curvature invariant).
minimum downward curvature &A.axlcrtT} Kllt©q>EplK:TJ K:aµ1tUAOtT}c;.'
normal curvature of a surface at a point in a given direction, 6p060Etoc; Kaµ1tUAO't1ls emcpavi;(a:c; etc; tl m1-µefov tT\c; Kai itpoc; 8o0i;icrav 8ti.:u-0uvcrtv.
curvature excpression
principal curvature of a surface at a point, itpom;l>oucra KaµitUA.6-rric; &mcpavdac; de; n crriµi.:fov.
radius of curvature, aKtic; KaµituA.6tT}toc;.
radius of second curvature of a space curve at a point, 0.Ktic; tile; oeu'tf:pac; KaµituAO'tT}tOc; xropaiac; KaµnuAT]c; de; n miµeiov .
Riemannian curvature, ptµavvtavi] Kaµ7tUAD'tT]c;.
Riemannian measure of curvature, ptµavVtavov µi:tpov K:aµitUAO'tT}toc;.
scalar curvature, KAtµaKID'tTJ 1CaµnuA.6tTK [yrocrmavov µi:tpov 1CaµituMtrit0c;}.
second curvature (of a space curve at a point), owti:pa KaµituA.6'tl]c; (xropaiac; Kaµituf..ric; de; n crriµi.:iov).
space curvature, xropaia 1CaµituA.6-t1ic;- {K:a.µ7tUAO'tl]c; EV tQJ XWP4J] .
specific curvature, EiotKTJ KaµituA.6-tl]c;· { µi:tpov KaµituA.6tT}t0c;}.
spherical curvature, crcpatptKTJ Ka.µ-7tUAOtT}c;.
surface of negative curvature, emcp6.vi;ta clPVllttKijc; K:aµitUAO'tl]tOc;.
surface of positive total curvature, emq>UVE\ll 0EttKfjc; OALK:ijc; 1Cllµ1tuA.6-'tJltoc;.
surface of zero total curvature, €mcp6.vi.:ta µrioi.:vtalac; 61..tKiic; K:aµnuA.6-'tl]toc;.
theory of curvatures (of geometric surfaces), 0i.:ropia 'tciJV Ka.µituA.o'ti]trov (tiOV yi;roµi;tptK:WV em<pa.VE\OOV).
total curvature, 61..tKTJ Ka.µituA.6tric; . total curvature of a surface 'at a
point, 61..tKi) mµituf...6tT}c; emcpavi;ia.c; Etc; n crl]µEiOV.
upward curvature, avrocpEpLKTJ K:aµituA.Otric;.
curvature expression, na.pacrta.crti; Ka.µnuMtT] me;.
complex nonlinear curvature expression, µtya.8LKiJ µi] ypaµµLKlJ ita.p6.crtacrtc; KUµ7tUAOtT]tOc;.
curvature invariant, &.va.A.A.oiwmc; htttpov J Ka.µmiMtl]mc;.
curve
curvature-moment relationship,crx;tcric; Ka.µ7tUAOtT]'tOc;-po1tfjc;.
curvature of a curve, Ka.µnuA.6tT]c; Ka.µ7tJJA T]c;.
curvature of a space curve at a point, Ka.µnuA.6tT]c; Ka.µnuA. T]c; tou x;mpou i;l'.c; n crl]µdov.
curvature of a surface, Ka.µnuA.6-tT]c; E7ttq><x.Vda.c;. · normal curvature of a surface (at a point), op060Et0c; Kllµ7tUAO'tT]c; em(jlUVEiac; (E"ic; tl miµEiov).
curvature of a twisted curve, Ka.µ-7tUAO'tTJc; crtpi>PA.iic; Kaµm'.JA.T]c;.
axis of curvature of a twisted curve on a point of it, a~rov KaµituA.6triwc; crtpEl3A.i'ic; 1Caµ7tUAT}c; i;lc; 'tt crT}µEiov tllc;.
curvature tensor, tavucrµa. KaµnuA.6tT]t0c;.
covariant Riemann-Christoffel curvature tensor, cruva./...A.otID'tOV tavucrµa K:aµituA.6tT}'toc; Pi~1av-Kpicrt0cpq>EA.
Riemann-Christoffel curvature tensor, tavucrµa. K:a.µ7tU/...6'tl]10c; PlµavKpicrtocpq>EA..
curve, 1rnµnuA.11. adiabatic curve, &8tal3anKi] K:aµitU
A.ri. adjoined [adjoint] curve, l:mcruva-
7tti] KaµituA. T\. air-blast pressure-time curve, Ka.
µituf...11 mi:crEroc;-XPOVOU (t0u) aEpOnva.yµou.
algebraic curve, c1/... yEl3ptKi] Ka.µituAT\.
algebraic curve of degree n, al.. y&J3ptKTJ KaµitUAT\ 13a0µou v.
algebraic plane curve, al.. yi;f3ptKi} E7tt7tEOOc; K:a.µ7tUAT\.
amplitude of a curve, Ei'ipoc; {6ptcrµa.] (ti'i<;) KaµituA.1ic;.
anaclastic curve, uvaK/...a.crnKi] Ka.µiti>A.ri.
anallagmatic curves, 6.vaA.A.ayµa.nKa.i Ka.µm'.>f...at.
219
~rve
analytic curve, uvaA-lmK11 1caµnuAT].
analytic space curve, avaA.unKij Kaµm)AT] mu XOOPOU.
angle between two intersecting curves, ycovia. 8\Jo cruvteµvoucriilv [ymvia ouo cruvteµvoµtvcov} 1ca.µnuA.cov.
anharmonic curve, 1caµnuA.11 .
a·vapµOVlKTJ
antifriction curve, 1caµnuA.11 avn-rptPfjc;· { avn tpl1tTLKTJ Kaµ7tUAl"J}.
arc of a curve, t6~ov KaµnuA.11c;. asymptotic curve, acruµmrotoc;·
[acruµn-rcotoc; KaµrruA.11}. axis of a curve, a~cov KaµrruA.11c;. ballistic curve, PA.11nKij Ka.µrruA.11. Bertrand curve, PeptpavoiaviJ Ka-
µnuA.1r [ KaµrruA.11 toii Mrrep-rpav ]. binormal to a space curve (at a
point), Otop060ernc; XCOpa[ac; Kaµm'.J/c 11c; (elc; -rt cr11µ eiov).
bipartite curve, otµepiJc; KaµrruA.ri. branch of a curve, KA.aooc; Ka.µrru
"-1ic;.
bundle of curves, otcrµ11 Kaµrru-1'.cov.
canonical representation of a space curve, SecrµtKll avarra.pacrmmc; xcopa.ia.c; Ka.µrru/c 11 c;.
Cartesian curve, Ka.ptecr1a.viJ Ka.µrruA.11 · [ Ka.µrruA. q rnii Ka.p-recriou}.
catacaustic curve, TCata.Ka.U<ntKTJ Kaµm'.JA.11 .
Cauchy curve, Kcocre1avij Ka.µrru1'.11· [ Ka.µrruA.11 rnii Krocru].
caustic curve, OCTT., Kaucrt1K1) Kaµn:uA.11 .
center of a curve, Ktvtpov -rfjc; Kaµnu1'.11c;.
characteristic curve, xapa.Kt11Pl<JttKTJ K0.µ7tUA 1] .
circular curve, KUKAlKll Ka.µrruA.11. class of an algebraic curve, KA.amc;
a/c yepp!Kfjc; K0.µ7tUA11<;. closed curve, KAEl<HTJ Ka.µn:uA.11. complex curve on a plane, cruµrrA.e
KttKTJ Ka.µ7tUA 11 tOU £m7ttOOU. compound curve, cruµµ1Ktoc; [ cruv
Setoc;} Ka.µnu1'.11.
220
curve
conjugate curve, cru~uyT,c; Kaµm'.JA.11. continuous curve, cruvexiJc; mµnu
"-l"J. contour curve, I, rE06.., icroiiljlTJ<;
Ka.µrruA.11. 2, MA0., n:ep1ypa.µµuo'1 KU>l1tUA 11.
correlation curve, crucrxenKil [ crucrxencrtLKTJ} KaµnuA.11· [KaµrruA.11 crucrxeticremc;].
cosecant curve, cruv-rtµvoucra Ka.µnuA.11.
cosine curve, cruv1iµtt0VlKTJ [ cruvT]µttovoetoijc;} Ka.µrruA.11.
cotangent curve, cruvccparrtO>L&VtKl') Kaµn:\JA l"J.
cross-curve, ota.KaµrruA.1r [01u~uyoc; Ka.µm'.JA 11}.
cruciform curve, crtaupoKa>muA.1r [ crmupoeioiJc; Ka.µrru1'.11} .
cubic curve, KuP1Kij {tp1t0Pu8µwc;J Ka.µrrut. 11.
cumulative frequency curve, a0pOlcrnKTj Kaµnu1'.11 cruxv6t11toc;.
curvature of a (twisted) curve, KaµnuM-r11c; (cr-rpi::PA.i'ic;) Ka>muA.11c;.
cuspidal curve, ava.Kaµm10) KaµnuA.11.
cyclic curve, KUKALUKTJ [ KUKAl]µUtlKTJ} KUµ7tUA11.
cycloid curve, KUKAOEtoiJc; KUµ7tUAT].
deflection curve, an:oKa.µ7ttlKTJ KaµnuA.11· {K0.µ7tUA11 cl7tOKUµlj/Effic;}.
deformation curve, KaµrruA. 11 n:a.pa.µopcpcbcri::mc;.
degree of a curve, Pa0µ6 c; (tfjc;) KUµ7tUA TJc;.
degree of a net of plane curves, Pa0µ6c; otKtuou tmrrtocov TCaµrru A.mv.
degree of a plane curve, Pa.0µ6c; tmntliou Kaµnu/.11c;.
degree of a space curve, Pa0µ6c; xcopaiac; KaµnuA. TJ<;.
deltoid curve, oi::A.toe101)c; KaµnuA.11.
demand-and-supply curve, OIK., Kaµm'.JA.11 n:pocrcpopiic; Kai ~T]t1icri::coc;.
derived curve, napuymyoc; Kaµnu"-11.
describe a curve, 010.ypacpro Kaµn\JAl"JV.
curve
developable of a space curve, U.va.-7t'tUK'tTJ (emcpavi::ia) xcopciiac; KaµnuAT\c;· [ avanwKtl'J Ka.µnu/cTJc; rnii xoopou}.
diacaustic curve, OIIT., oiaKa.ucrnKTJ KUµ7tUA 11.
diametra) curve, OlUµE-rptKTJ KUµ• n0A.TJ.
direction of a curve (at a point), 01i::ueuvmc; ( tfjc;) Ka.µn:uA. TJc; de; tl cr11-crT]µEiov.
director curve, 01w8i::toiicra. [ 6011-yi]-rp1a.] KaµnuA.11.
displacement curve, MHXT., Ka.µ-7tUATJ µEta.Kl vi]cri::mc;.
displacement-time curve, MHXT., KUµ7tUAT] XPOVOU-µetUKLVll<JEffi<;.
distribution curve, Kata.vi::µ11nlflll TCa.µn:uJc11· [Ka.µnuA.q Katavoµflc;}.
'eight curve, oKtaptov· {ox-rapt· 6Kta.p1avi] Ka.µnuA.11· A.11µvicrKoc; toii nf.p6vo}.
elastic curve, &A.a.crn KTJ Ka.µ nu A. l"J. empirical curve, tµn:i::tptKTJ Kaµnu
A. T] . empirical distribution curve, sµm;t
p1Kl) K;llt<lVEµlltlKTJ KUµ7tUAT]' {Sµ7t€lp1Ki] Kaµm'iA.11 Kata.voµfjc;}.
epitrochoidal curve, smtpoxoi::181)c; KaµnuA. TJ.
equal-product curve, OIK., !cronpoi:ovnKi] KaµnuA.11.
equation of a curve in a plane, t~icrmmc; Ka.µnuA.11c; tOii Em7tEOOU.
equation of a curve in space, t~icrcomc; Kaµm)A T]c; toii XOOPOU.
equitangential curve, icri::cpa.nrnµtvq KaµnuA. 11 · ['fJ .. Koucra}.
error curve, ITAT., KaµnuA.11 -ril'lv crcpa.A.µa-rcov .
even circuit of a curve, MA0., apnov KuKA.mµa. KaµrruA.11c;.
evolute of a curve, s~i:tA.1yµtvT] (-rflc;) Kaµnu/ .. qc;.
experimental curve, n:i:tpa.µattKll KUµ7tUA11.
exponential curve, SK8Et1KTJ Ka.µnuATJ.
extent of a curve, EKta.mc; ( tfjc;) KaµnuA.11c;.
curve
exterior of a simple closed curve, s~co-ri:ptK6v (tfjc;) cinA.fjc; KAE1cr-rfjc; Ka.µnuA.11c;.
extrapolation of empirical distribution curves, ITA T., napi::KPoA.Tj -rrov £µ7tElPlKUJV Ka.µnuA.oov KUta.voµfjc;.
faired-in curves, MA0., 6µa.A.uv-0i::Tcrm Ka.µnuA.ai.
family of curves, ytvoc; Ka.µn:uA.mv. field of a curve, ni::oiov Ka.µ7tUA.11c;. focal curve, i:crna.KiJ KaµnuA.T]. force-deflection curve, KaµnuA.11 ou-
vaµ i:coc;-cinoKaµlj/€(1)<;. frequency curve, ITAT., cruxvonKi]
Kaµn:u/ .. 'll · [ rnµrru/.. 11 crux v6t11 toe;].
funicular curve, crxo1v1Ki] Ka.µn:uATJ" [ crxm voKaµn:uA.11 J.
Galtonian /Gallon's} curve, ya"A.rnvtaviJ KaµnuA.q.
Gaussian curve, ycocrmavij Ka.µn:uAl"J.
genus of a curve, yi::vi:a [ytvoc;] K0.µ7tUAT]c;.
geodesic torsion of a curve, rr.roomma.Ki] cr-rpEljll<; KUµ7tuA.11c;.
geometrical curve, yi::roµi::-rptKTJ [O.A.yi:PptKTJ} KUµ7tUAl"J.
Gompertz curve, yoµni:ptcrta.vi] KUµnuA.11 {Ka.µnuA.11 toii rKoµnr.p-rc;J.
graphing (of) a curve, ypciq>l"Jcrtc; [ unoturrcomc;J Ka.µnuA.11c;.
growth curve, IT AT., Ka.µnu1'.TJ n:pocra.u~ i]cri:coc;.
harmonic curve, apµovtKTJ Kaµn:uA.11.
Hessian curve, xi::crma.viJ Kaµn:u1'.T)· [Ka.µnuA.T] toii Xtc;}.
hyperbolic branch of a curve, un:&pPoA.1K6c; KA.ciooc; Ka.µnuA.11c;.
imaginary curve, cpavtacrttKTJ icaµn:uA.TJ .
indicatrix of a space curve, oEiK-rpta icaµnuA.11 c; to ii xropou.
inertia curve, KaµnuA.q O.opavEia.c;. inscribed angle of a closed curve,
Syyi;ypa.µµf;v11 ycovia KAElO'tfjc; KUµ-7tUAT]c;.
integral curve, 6A.0KA.11pmt1Ki] KaµnuA.11.
221
curve
interior of a simple closed curve, £crro-n:ptK6v (i:f\c;) 6.itA.f\c; KA&tcri:f\c; icaµm'.JA. ric;.
intersecting curves, cruvt&µv6µEVat [&.A.A.riA.ot&µv6µ&vat] Kaµm)A.at.
intersection of two curves, eruvotatoµ1i {toµi]J OUo Kaµm)A.rov .
intrinsic curve, npocr<pui]c; { qJUcrtici]] Kaµm)A. Tl.
inverse curve, &.vrl<npoqJoc; icaµ-7tUAT].
inverse of a curve, O.vricrtpoqJoc; (tf\c;) icaµnuA.ric; .
inverse trigonometric curves, 0.vticrtpoqJot i:ptycovoµ&tptKai Kaµrt\JA.at.
involute of a curve, &ve1A.1yµevri icaµnuA.ric;.
isentropic curve, icr&vtpomKi] Kaµit\JA. T].
isometric system of curves, ieroµ&i:ptKov eruerrriµa. Ka.µnuA.rov .
isoptic curve, !eronnKi] Ka.µn:uA.ri. isothermal curve, lcr60i::pµoc; i<a.µ
n:\JA. Tl. isothermic family of curves, icr6-
0&pµov [lcro0epµ1K6v] yevoc; Ka.µn:uA.rov.
isotropic curve, icr6tponoc; Ka.µn:uA.ri.
Jordan curve, lopOa.vtavi] Ka.µm'.JA.ri· [Ka.µn:uA.ri tou Zopvtav].
kappa curve, KUµ7tUAT] Kcl1t7tU' { KU7t-7tUKa.µn:uA. 11}.
kinked demand curve, OIK., patf3i] .Ka.µn:\JA.11 ~lltficr&roc;.
lemniscate curve, A.11µv1crKtKT] Ka.µnuA.11.
length of (arc of a) curve, µf\Koc; (i:6!;ou) Kaµn:uA.11c;. ·
load-deflection curve, MHXT., Kaµ-7tUAll <popticreroc;-O.rr0Kaµ111&roc; .
222
load-settlement curve, MHXT., Ka.µµ7t\JA.ri qJOpticrEroc;-eyKa0icreroc;.
loading curve, Ka.µ7tuA.11 qJopticr&roc;. logarithmic curve, A.oyapt0µtKT] Ka.µ-
7t\JA. 11. Lorenz curve, A.op&v~tavi] Kaµ-
7tUAT]' {KaµnuA.11 tfic; A6pevi:c;] . magnetic curves, µayv11nKa.i Kaµ-
7t\JA.at.
cune
magnification curve, MHX., Kaµ-7tUA1'.J µeye06vcreroc;.
modulus of a curve, µ6010v i<aµ7t6-A.TJc;.
mortality curve, Kaµn:UA.TJ ( tf\c;) 0vrp:6tT]t0c;.
multiplicity of a curve, 7tOA.A:a.n:A.6-tT]c; ( tf\c;) KUµ7t6A. Tl c;.
normal distribution curve, 6p060&toc; Ka.tav&µT]nKi] KUµ7tUATJ' { 'tUIC'ttKT] Kaµm'.JA.ri Kata.voµfic;].
normal frequency curve, 6p060etoc; cruxvottKT] KUµ7tUATJ' {taK'ttKi] Kaµµ7tUATJ cruxvotritoc;].
normal line to a (space) curve at a point, 6p060etoc; (eil0eta) &n:l (xropaiav) Kaµ7tUATJV de; n erriµetov .
normal plane to a space curve at a point, 6p060&t0V E7tl7tf.OOV xropa.[a.c; i<a.µ7tuA.ric; de; n miµetov .
ogive curve, IJIUA.torotit { lJ.IJltOtroti]] KUµn:(JA. TJ.
order of an algebraic curve, t6.!;tc; lJ.A.yeflptKf\<; KUµ7tUA.TJC,.
orthogonal system of curves, 6p-0oyrovtK6v cr\Jcrt11µa. Ka.µnuA.rov.
orthogonal trajectory of a family of curves, 6p0oyrovtK6v i:poxia.erµa yevou<; Kaµrt\JA.rov.
orth-Optic curve, op007t'tlKT] Ka.µ-7tUATJ.
osculating curve, 7t&ptrtt\Jcrcrouera { tyyutcltTJ j KUµ1tUA. TJ.
parabolic branch of a curve, 7ta.pa.f3oA.tK6c; KA.<iooc; Kaµn:ut...ric;.
parabolic curve, 7tapaf3oA.tKTt i<aµ-7t\JA. TJ.
parallel curves, 7tap6.A.A.T]A.Ot Ka.µ-7tUA.at.
parametric curve, Kaµn:\JA.T] .
7tapUµ&tptKT]
path curve, ix.vtKTt [ix.v11µa.nKi]] KaµnuA.ri· {Kaµrt\JA.11 ooeucrero;].
Pean-0 curve, 7t&av1a.vi] Kaµn:uA.ri· { KUµ7t\JA. TJ tOU Ilea VO J.
pedal curve, 7t0011nKit Kaµm'.>A.TJ. pencil of curves, ofoµ11µa {ofoµTJ]
Kaµn:UA.rov . periodic curve, 7t&p1ootKit Ka.µrtuA.ri. plane curve, &rtim:Boc; Ka.µn(J).TJ.
curve
plot a curve, u7totunii'l {xapuercrro] 1mµn:\JA.11v.
plotting (of) a curve, un:ot\Jn:roertc; [ypuqJTJcrtc;] (tfic;) Kaµrt\JA.ric,.
point-by-point plotting of a curve, crriµ&tocrriµetaKft u7tot\Jn:rocrtc; i<aµrouA.ric,.
polar curve, 7tOA.tKft Kaµrt\JA.ri. pressure-time curve, Ka.µn:\JA. TJ me
ereroc;-xp6vou. primitive curve, 7tprot6yovoc, i<a.µ-
7tUATJ. principal normal to a space curve,
7tpciltri { 7tprote\Joucra] op060etoc, xropaiac; icaµ7tUATJC, .
probability curve, m0avonKit Kaµ-7tUATJ' [i<a.µnuA.ri Tii'lv m0a.voti]i:rov ] .
production curve, OIK., Ka.µrtuA.TJ 7tapayroyfic,.
properties of curves, i016t11tec; tii'lv Kaµn\JA.rov.
pursuit curve, 7tapaKoA.ou011ttKit Kaµn:\JA, T].
quadratic curve, oEUt&pof3a0µtOC, KUµ7tUA T] .
quadratrix curve, t&tpa.yrovicrtpta ( Kaµ7t\JA. ri).
quadric curve, owri::pocrti] Kaµrt\J-A.11. (EYN.: conic section).
quatric curve, t EtaptOcrtft Ka.µnuA.11. quintic curve, 7tEµrtt0crti] Kaµ7t\JA.ri. radial curve, 0.KnVLKft Kaµ7tUATJ. radius of torsion of a space curve,
axric, crtpEIJl&Wc; ( tfic,) xropaiac; KUµ-7tUA. T]c;.
rank of a skew curve, f36.0µriµa i:fic; crtpef3A.fic; KUµ7tUAT]C, .
rational curve, pT]ti] { eruµµetpoc;] KaµnuA.11.
reading a curve, epµi]vwcrtc, (tfic;) KUµrtUA llC,.
reciprocal curve, 0.vticrtpoqJoc; Ka.µ-7t\JA.11 .
rectifiable curve, i::u0euicrtµoc, { i::u-0uvoµi]crtµoc,] Kaµn\JA.11 .
regression curve, :ETAT., KaµnuA.11 O.vaopoµi]cri::roc;· {KaµnuA.11 t7tavayroyfic;· O.vaopoµtKTJ Ka~muA. ri].
regressive supply curve, OIK., 0.vaopoµtKTJ KaµmiA.11 7tpOcrqJOpiic,.
curve
regular analytic (space) curve, KavovtKTJ ava.A.unKit (xropaia) Kaµ7t\JA.11.
regular curve, KavovtKTt Kaµn\JA.TJ. regular point of a space curve,
KUVOVtKOV er11µEtov xropaiac; KUµ7tUA.11c,.
residual curve, KataA.otrtoc; Kaµn:UA.ri.
response curve, MHX., O.vntaKnKi] Kaµm'>A.11'{ KUµ7tUATJ O.vttt6.!;eroc;].
reversed curve, MHX., O.vecrtpaµµEVTJ Kaµ7tuA.ri.
right-handed curve, oe!;t6crrpoqJoc; Kaµm'.Jf.. T].
sagitta of an arc of a curve, f3&A.oc; i:6!;ou Kaµ7t\JA. ric; .
salient point at the origin of a curve, Kaip10v { 7tpoEX,ov] er11µetov rfic; 0.7tapxf\c; rfic; KaµnuA.11c; .
sextic curve, EKtocrtl'J icaµnuA.11. sharply-peaked response curve, 6.
Kproc; aixµ1Ki] Kaµ7t\JA.ri O.vrtT6.!;eroc;· {0.Kproc, alxµ1Ki] CtV't'l't'UKnKi] KUµ7tuA.ri].
simple closed curve, a7tA. fi KAEtcri:i] KaµnuA.11.
simple curve, 6.n:A.fi Kaµ7t\JA.ri. simple linear system of curves,
aitA.ouv ypaµµtKOV crucr't'llµa Kaµn:\JA.rov.
simple point on a curve, 6.7tA.ouv { 6µaA.6v J O'llµEtov KU~lrtUA TJC,.
sine curve, i]µttoVtKT] {i]µ1wvoi::toi]c,} Ka.µrt\JA.11.
singular curve, iotacrti] {iOta~oucm] Kaµ7t\JA. TJ.
s ingular point of an algebraic curve, io16.~ov er11µetov O.A.yef3pLKfic, Kaµ7t\JA.11c;.
skew curve, crTpEflA.i] KaµnuA.TJ. (:EYN.: space curve; twisted curve).
slope of the elastic curve, vi::ucrtc; { KA.iatc;] Tfic; &A.acrnKfjc; KaµnuA.11c,.
smooth curve, 6µaA.i] { crtproTT]j KUµrt\JA.11.
space curve, xropaia KaµnuA.ri· { KUµ7tUA.TJ 'l'OU XOOPOU}.
spectral curve, qJacrµanKi] KaµnuA.11.
223
curve
224
spherical curve, mpmptKTJ 1mµm'.JA.11.
stationary contact of an algebraic curve, cm1criµoi; &1mcpi] ciA.yef3ptKfji; Ka~muA.fli;.
stationary curve, cr-r6.crtµoi; KaµnuAfl.
spiral curve, crn&tpoetoi]i; KaµnuAfl.
stationary point of a plane algebraic curve, cr-racrtµov crflµEi:ov tmntoou UA y&f3ptKf'ii; KUµltUAlli;.
stress-strain curve, MHXT., JCaµnuA. ll -racrE(J)i;-tm -racr&(J)i;.
summation curve, a0potcrttKTJ JCaµ-1tUAfl .
synergic curve, ~IALT. MA0., cruvepy1K1) KaµrruA.11 .
tangent curve, f;cparr-roµtv11 KaµnuA.11.
tetracuspid curve, -re-rpaKaµmKi] [ cicr-rpoEtofii;} Kaµm'IA. fl.
theoretical magnification curve, 0E(J)PllttKfj Ka~muA.fl µcyE0uvcrE(J)i; .
time-displacement curve (of ground motion), KaµrruA.q XPOVOU-µE'tUKtVi\(jE(J)V (i:oii Ktvouµt vou &8acpchµawc;) .
transcendental curve, \mEpf3anKi] JCaµnuA. 11.
transition curve, MHX., µemf3a-rtKfj KaµnuA.fl· [ KaµnuA.fl cruvapµoyfii;}.
translation curve, MHXT., KaµnuA.11 µEm0EcrE(J)i; .
tricuspid curve, -rptKaµmKT] [8eA.t0e18fji;j Ka~muA.fl.
trigonometric curve, -rp1y(J)VOµe-rp1-Kfj Ka.µ nu A. fl .
triple point of a plane algebraic curve, -rptnA.oiiv crflµei:ov tmrrtoou fif..yef3ptKfji; KUµ1tUAfli;.
triple tangent of a plane algebraic curve, -rp11tA.fi tcparrwµtv11 tmm';oou fif..yef3ptKfii; KUµltUAfli;.
trizomal curve, -rpt~roµawi; Kaµm'.JAfl.
true curve surface, aA.110fii; KaµrruAfl £mcp6.veta.
turning points of a curve, miµEta cr-rpocpfii; (•iii;) KaµrruA.fli;.
twisted curve, cr-rprn-ri] [ crtp&f3A.fi]
curve of cosines
KaµnuA.11· [x(J)paia KaµnuA.11]. unicursal curve, µovo tpOXLKTJ Kaµ
nuA.q. unknotted curve, anA.oKo<; [ <'iKoµ
f3oc;] KaµnuA.fl. unloading curve, MHXT., Ka.µnuA.ri
anocpopticre(J)i;. variation of a curve, MA0., µEtaA.
A.a.yi] KaµnuA. fli;. varied curve, µEtflA./..ayµi';vq Ka.µ
nuA.11. velocity-time curve, Ka.µnuA.fl ta
xuvcre(J)i;-xp6vou. visibility curve, Ka.µnuA.11 6pat6tq
t0i;. Weierstrass's curve, f3a'iEpcr-rpacr
crtavfj Ka.~muA.fl· [KaµrruA.q wii Ba'iepcrrpai;}.
weighting factor curve, LTAT., KllµnuA. ll crm0µ1Koii rrapayovwi;.
curve fitting, MAE>., apµocnc; KU~lTCUAT] c; ( = d5pscrtc; -ri'jc; apµosoucrric; KaµrcuA, T]c;).
curve in a plane, 1mµrcu.t.ri £v -rq> Emm~'&qi· [ Kaµrcu.I. ri wu Ercme'&ou].
curve in a complex, Kaµrcu.t.ri crw1-rc.l.€yµm:oc;.
curve of a continuous surface deformation, Kaµrcu.l.ri (-ri'jc;) cruvsxouc; ETCl<j)UVElUKi'jc; rcapaµo p<j>fficrswc;.
path curve of a continuous surface deformation, ixv1Kfj [ixvqµanKfjf KaµnuA.q tiii; cruvExoiii; tmcpav&taKii<;: na.paµopcprocr&(J)i;· [KaµnuA.11 68Eucreroi;. tiii; cruvexoiii; &mcpave1a.Kfii; napaµopcprocrE(J)i;j.
curve of arrival time of the shock front, KU~lTCUAT] '!OU xp6vou E1tEAEUO'EWc; '!OU TCA T] K"CLKOU µi:-rffircou.
curve of coincidence, xaµrcuA. TJ cruµrc-rfficrsffic; .
curve of cosines, = cosine curve.
curve of distribution
curve of distribution, Ka-ravsµrin K~ xa.µrcuA. ri '[Kaµrcu/, ri Katavoµi'jc;j.
normal curve of distribution, 6p06-0ew i; KaµrruA.11 Ka.tavoµfii; .
curve of double curvature, KaµrcuA.ri '&mA.i'jc; K:aµrcuA.6-rriwc;.
curve of equal approach, Ka~mu.t. T] icro-riµou npocri;yyicri:wc;.
curve of error, Ka~muA.ri cr<j>O.A.µarnc;· [ Ka.µrcuA. 11 -r&v cr<J>aA.µ6.-rrov j.
normal curve of error, 6p060etoi; [mKttKfi} Ka.µrruA.11 crcptiA.µa.wi; .
curve of fatigue, 1m~muA. 11 xorcci>cri:roc;· [ lCU~l1tUA 11 KU'!UltOVllO'EwcJ
curve of flexure, MHXT., KaµrcuA.ri 7tEptK6.~l\j/E~.
curve of frequency of error, Kaµnu.I. T] cruxv6tqrnc; crcpaA.µ6.-rwv . (LYN.: probability curve).
curve of ground motion, KaµnuA.ri EbU<j)lKi'jc; Kt VlJO'Effi<:;.
time-displacement curve of ground motion, KaµrruA.fl xpovou-µ emKtvficre(J)i; rnii t8acpci>µa.rnc; .
curve of Hippias, = quadratrix of Hippias.
c11rve of normalcy, LT AT., KaµnuA.ri op8o8i:criac;· { Ka.µ7tUAT] rnKnK6--r11-roc;· KaµrruA.11 6p8o8faou Kamvo~ti'jc;j.
curve of probability, = probability curve.
curve of pursuit, MAE>., xaµrruA.ri rcapa1CoA.ou8~cri:ffi;.
c11rve of quickest descent, Ka.µnu.t.ri mxicr-rric; Ka.m~acri:w;. (LYN.: brachistochrone).
curvilinear coordinates
curve of regression, Kaµnu.l.ri uva'&poµT]cri:~· [ uva'&poµtK:l'j Kaµrcu.t.1r KaµJtUAll EJtaVayroyi'jc;j.
curve of sines, = sine curve.
curve of versed sines, napriµnoVtK1) KaµrcuA.11.
curve of velocity, wx.uvnxl'j KaµrcuA. T] -{ KaµJtUA 11 WXUVO'EW<:;}.
curve tracing, x.apa~tc; /ixvricnc;] ICU/lltUAllS·
curved, Kaµrru A. oc;, ri ,ov· [ xa.µrcuA.ffi-r6c; , T],6v j.
curved line, 1m~11tuA.m-rl'j [KaµrcuA.11] ypuµµT].
curved space, KaµrruA.oc; [ µTj tnirri:'&oc;J x&poc;.
curved space-time, KaµrruA.oc; xrop6XPovoc;.
curved structure, MHXT., Kaµrcu.l.6crxriµov '&6µriµa· [xaµrcuA.6-crxriµoc; <j>OpEuc;· KUptoc; <j)Opsuc;j.
curved structure in space, MHXT., xaµnuA.6crxriµov EV -r<T> xmpq> '&6µriµa· [ xup-roc; EV -r<T> xropq> cpopsuc;j.
curved surface, xaµnuA.ffi-rl'j [KaµnuA. ri J Emcp6.vi:ta..
area of curved surface, tµf3a86v KaµrruA.fli; tmcpavdac;.
element of area of curved surface, &~1f3al5tKOV crtOLXEloV { crt0LXELOV tµf3aooii} KaµrruA.11c; f:mcpa.vdai;.
curvilinear, xa~11tu/,6ypaµµoc;,oc;,ov.
curvilinear coordinates, Ka~11tuA.6-ypaµµo1 cruvri:mnitvat.
orthogonal curvilinear coordinates, 6p0oy(J)VLKa.i KaµnuA.6ypaµµo1 cruv-rcmyµtvm.
225
curvilinear coordinates
curvilinear coordinates of a point in space, KaµnuA.6ypaµJiot crnv-ri::w.yµf:vat cniµdou wfi xropou.
curvilinear coordinates of a point on a surface, KaµnuA.6ypaµµot crnvti::rnyµf:vai cniµdou f:mq>avi::iac;.
curvilinear correlation, Ka~muA.6-ypaµµoc; crucrxf:ttcnc;.
curvilinear motion, Kaµnulv6ypaµµoc; KLVT]crtc;.
curvilinear motion about a center of force, K<i.µnuA.6ypaµ ,µoc; KtVT]crt<; ni::pi t6 lCEVtpov t1)c; ouvuµeffi<; . .
curvilinear network of equipotential lines and lines of flow, KaµnuA.Oypaµµov otKturoµa icroouVTJtlKii'.lv ypaµ~LWV Kai ypa~tµ&v poi'js.
curvilinear perspective, Kaµnu/"6-ypaµµoc; npoomtKi} .
curvilinear rectangle, Kaµnulv6ypaµµov op9oyroviov.
curvilinear , velocity, Ka~muA.6ypa~tµoc; taxuvcrtc;.
cushion, 1, TipOO"Ke<p6.AUtoV" { npocrKE<pUAO" µa~tA.cipt}. 2, TEXN., ni:A.µa.
air cushion, aep6m:f.µa: [ 7tf.Aµa O.epoi;;· 7tpocnctcpaA.o O.tpoi;;].
cushioning, MHXT., i::ovacrttK6<;, i],6v· [ crPi::crttK6r;, fi,6v ].
cushioning action (of the ground), MHXT., i::uvacrtm'l [ crpi::crrndJ] opiicrtc; (too f:oacpcbµatoc;).
cusp, MAE>., avaKaµnir [ crT]µetoV uvaKciµ\jli::coc;}.(l:YN.: spinode).
ceratoid cusp, K£pa10e1oi]i;; O.vaKaµm't.
226
cot line
double CUSp, 0l1tAfj cLVUKUµm')" {CH]· µi;Iov c:ruv£7tacpfji;;· cruyK6µf}wv ].
hypocycloid of four cusps, U1tOKUKf.oe1oti;; t£crcr6.prov U VUKaµm1JV.
rhampoid cusp, paµcpos1oi]i;; avaKaµm't.
simple cusp, a7tA.11 civaKaµ7ti]· [ &.va-Kaµm'J 10u 7tpcinou e[ooui;; j. '
cusp locus, MA0., Kaµn6tonoc; ( = tOTI:O<; UVUKU~mi'j<; yEVOU<; KaµnUAffiV).
cusp of the first (or second) kind, uvaKaµm) WU npci>tO\) (tj tou oi::uttpou) i::i'oour;.
cuspidal, MA0., civaKuµmK6<;, i},6v ( = -rfj<; UVUKU~mfj<;).
cuspidal cubic, MA0., avaKaµmKi] KuPtKi].
cuspidal curve, MA0., uvaKuµmKi] KaµTI:UAT].
cuspidal edge, MA0. , civaKuµmKi] <iKµi]"{ciKµi] naA.ivopoµi]cri::ffic;}.
cuspidal locus, MA0., uvaKaµmKO<; -r6nor;"[t6noc; O.vaKaµnfjc;}.
cuspidal point, MA0., 1, O.vaKuµmK6v crriµdov . 2, O.vaKuµni].
cuspidal tangent, MA0., O.vaKuµmKi] lcpumoµf:vri· {i\cpa.nt0~1f:vri -rfjr; O.vuKu~mfjc;).
customer, OIK., ni::A.<i-rT]<;. (the) universe of customers as a
whole, (to) cruµ7taV {(6) K6crµoi;;j tcl'>V 1t£AU'l"UJV EV tij 6A.6triti 'tOU.
customer analysis, OIK. , ni::A.a-ri::tuKi] O.vaA.ucric;.
cut, MA0., urrot0~1ij. Dedekind cut, 0£0£K1vomvi] ci7torn
µir f a1towµiJ wu NttvteK1vt].
cut line, MA0., ypu~tµi] anot0µfjc; ( cruv6!vou ).
cut of a set
cut of a set, MA0., cinowµi] cruv6-A.ou.
cut off, &.notf:~tvffi· [ unoK6mffi ]. branch cut off a Riemannian sur
face, KA.6.8oi;; O.nomµi'ji;; [Kl.Moc; &.7totµT]0£ii;; EK] (µuli;;) piµavviavfii;; tmcpavf:iac;.
cut point, MA0. , CTT]µdov unowµf'jc;" [anotoµi}}.
noncut point, crri~ii:i:ov µ1'J Ct1tO'tOµfii;;.
cut sections, MA0., uno-ri::µv6µi::va [urcotµT]9f:vrn} -r~n'Jµutu .
cut set, MA0., avaKpov [&.Kpotoµ110tv] cruvo/.ov.
fundamental cut set, Si:µef.iCbosc; UVOKPOV CJDVOAOV.
oriented cut set, rcpocravatof.tcrOtv [ t00£tTJ0tv] iivctKpov cr0voA.ov.
cut set matrix, MA0. , µT]tpdov &.vaxpou cruv61vou.
cutaway diagram, ~XE.1. , cinoKom6v ou:iypaµµa.
cutoff, TEXN., cinoKonij· { crriµi::fov UTrOKOTI:fj<;).
cutthroat competition, OIK., mpuy1ucrttK6<; cruvayffivtcrµ6c;.
cutthroat game, MA0., crcpaytacrnK6v naiyvtov.
cutting of a set, MA0., un6Koµµa [ a:rrotoµi] l cruv6A.ou.
cutting off (an area), MA0., anoKoni] [ an:6-rµT]crt<;} (XffiPLOl.l fatcpuveiuc;).
cybernate, MA0., Kupi::pvoA.07&.
cybernation, MA0., Kupi::pvoMncrtc;.
cybernetics, KupspvfJnKi]· [Kupi::pvoA.oyia].
cycle
cyborg, AOril:M., Kupopyov ( = KoPi::pvoA.oyucoc; opyavtcrµ6r;).
cycle, 1, MA0., KUKAT]µa· [KuKA.t0v]. 2, OIK., KuKlvoc;. 3, <l>YL., KUKAT]µa· [ rci::ptoooc;· cp6.cr1c;· KUK"Aoc;]. 4, AlTP., KUKlvoc;.
business cycle, OIK., olKovoµtK6c; KUKAOi;;.
Callippic cycle, KaA.A.i7tm:wv K0-KA riµa· [ KaA.A.i1tni:wi;; 7tEpioooi;;].
Carnot cycle, Kapvonavov KDKATJµa· [KUKATjµa toU Kapv6].
Clausius's cycle, tlaoucnoucrtilvov KuKA.TJµa· [ KUKA.tiµa 10u Kl.uoui:1-oui;;· KUKl.riµa wu PaVKiv ] . .
cosmic cycle, Kocrµ1K6i;; KUKA.oi;;· [ Kocrµ1K6i;; tviaut6i;;}.
degree of a cycle, ~a0µ6c; Kutli)µatoi;;.
grandfather cycle, AOrIIM., KuKAT]µa (tatVLUKf}i;;) i:~U7tflp£ti]creroi;;.
hysteresis cycle, l'lcrtEpflttKOV K0-K?c1wa· {KUKATjµa ucrtspi]creroi;;j.
index of a limit cycle, oi:iKtTJi;; 6piaaKou KUKA. i]µawi;;.
Laguerre cycle, A.ayK£p1av6v Ki>. K'·riµa· {KuKA.T]µa 100 AayKtp].
lunar cycle, crEAT]Vtatcoi;; KuKA.oi;;. major cycle, AOrIIM., µi;i:~ov K0-
tl11µa. Metonic cycle, µi:<rmv1K6v KUKA.T]µa·
[ µEt(l)VIKOi;; EVLUUt6i;;]. minor cycle, AOrIIM., ltf.acrcrov
KUKlT]µa. Rankine cycle, pav1Clv1av6v KUKATJ
µa· [KuKA.Tjµa 100 PaVK.iv ]. reset cycle, AOrIIM., KUKAT]µa a
vat6.~i;roi;;· [ O.vataT.nKov Kotlriµa]. solar cycle, i]A.mKoc; KUKA.oi;;. spurious bu!!iness cycles, OIK., v6-
901 olKovoµtKoi Koic>.ot. Stirling cycle, onpi..tvy1C1av6v Ku
KA.1iµa· [KuKA.riµa: toO E-r:tpA.ivyK]. storage cycle, AOIU:M., a7to9T]KW
t1K6v KUKAT]µa. stress cycle, MHXT., -r:anKov ril
KA.T]µa· [KUKAT]µa t6.crsroi;;].
227
cycle index
sunspot cycle, fiA.t0KriA.101Kov KuKA.riµa"[ KUKA.oc; fiA.taKfjc; op6.cri:ox,].
theory of cycles, MAE>., 9ecopla "'t"WV KUKA llµUl"COV.
typical cycle, 1"U1t1Kov KuKA.riµa.
variable cycle, AonrM., ~1 1:-ra~A.ri'ov KuKA.1wa.
cycle index, AOrlIM., icuKA.1iµanKO<; oeiKTlK fo i>iK111<; KuKA.iJ µa1o<;J .
cycle of values, MA0., KUKATJ !.W. {KUKAO<;} Tt~LWV.
cycle of vibration, M HX., KUKA.rn1a [ ni;p looo<;} Kpaoa. cr~iou.
energy dissipated per cycle ot vibration, €vi;pys1a crKco.ucr6ctcra [ crK.t oamc; €vcpytiac;j K<l'tU KUKA.llµ<l Kpaoacrµoii.
cyclic, lCUKAlUK6<;,i],6v· [ KUKA.1iµanK6<;,i],6v· Kl)KAlKO<;,i],6v ).
cyclic change of objects, KUKAtUKTf [ 1(\)l(AllCTJ 1 aUayij UVTlKetµi:V<ilV.
cyclic change of variables, Kt>KA.tuKij {Kt>KAtKT]j aUayij µetaPA.TJTWV.
cyclic code, AOrIIM., Kt>KAt0K&S1s· fKuKA.1wanico<; Kroo1sJ.
cyclic constant, Kt>KA.taKTj [ KUKAticij) crta9i::pci.
cyclic coordinates, Kt>KA.taicai cruvteTayµi:vm.
cyclic curve, icuicA.taKT] Kaµn:uA.TJ · {KUKAlWUTLKTJ Ka~muA.11).
plane cyclic curve, Eit[m;oo<; KUKAl<lKll KaµrruA.ri.
spherical cyclic curve, cr<pmp11cit KUKA.taKit KaµituA.ri.
cyclic determinant, KUKAtUKTJ [ icuKt.tKij} 6pii;oucra· [ KUKAO<pOpoucra).
228
cyclide
cyclic equation, icu!CA.taKT] [ KUKA.tKTJ} £sfcrffim<;.
cyclic function, KUKAIUKTJ [ KUKAlKTJ] cruvapt11m<;.
cyclic group, l(l)KAlUKTJ [KUKATJ~LaTlKTJ} O~La<; .
cyclic interchange, KUKAtUKTJ [ icuK).1ici] / £vaHay~.
cydic number, KUKJ,tKO<; [ Kt>KtdaKo;} ap1e~16<;.
cyclic permutation, KDd.taKT] [KuKJ.tKTJ} µnarn~i; .
cyclic points, l(l)l().LUKa [ Kl)KAlKU J mwi::ta.
cyclic polygon, £n:iicudov [ KuKA.taKov J 1t:oAUYffiVOV.
cyclic projecti vity, KUKA ta Kl) [KUKAt KiJJ n:popoA.tK6n1<;.
cyclic sections, KDK),11Cai [ KUKAtaxal j TO~tai.
cyclic shift, AOrIIM., KDKAtUKTJ [KUKAlKTJ] µi::rai:6mcrt<;.
cyclic surface, KDKAtaKT] £m<paveta.
cyclic symmetry, KUKAlKTJ [icuKA.taKTJ j (jl)~LµETp[a.
cyclical, 1, = cyclic. 2, KDKAffinK6<;, T],ov.
cyclical inversion, KDKAffinKi] {cr<patptKTJ} avncrTpO<pl] .
cyclide, KUK)ctOT]<;" [ KUKAtOll<; ETI:l<pavi;tu}.
Cartesian cyclide, icap-ri:crtavit KUicA.tofic;"/KuKA.t8i]c; wii Kap-rccr iouj.
Dupin's cyclide, 8oumvtav1i KUKA.1-ofis· I KUKA.toitr; rnii Nrnrrev }.
parabolic cyclide, rrapa~oA.tKit KUic.l,18!1;.
cycloid
cycloid, l(l)l(A0Et01'1<;' [ KUKAOElOTJ<; icaµ7tuA.11 · icuKA.oi;ioi:<;].
common cycloid, icoivi] KUKA.oeLofic;· [ KOlvOV KUK'Af}Etoec;].
base of a cycloid, ~amc; rnii [Bacru;; •i'K.] KUKA.OElOOiic;.
curtate cycloid, trriBpaxu KuKA.oct-8{;c;· [B&~pa;r:uµtv11 KUKAOEloi]c;J.
prolate cycloid, b;iµT)KEc; KUKA.OElotc;· {tmµcµriicucrµEVll KUKA.Oeloi]c;j.
cycloid curve, icuKA.oetOTJ<; Ka~muA.11.
cyclosymmetric function, Kt>KA.o-cruµ~LetptKTJ cruvapTTJcrtt;.
cyclosymmetry, KDK).ocrnµ~ti::Tpia.
cyclotomic, KUKAOTO~ttKO<; , ~ ,6v.
cyclotomic divisor, KDKA.oi:oµtico<; 01mpi:T11<;.
extrinsic cyclotomic divisor, arrpocrqml)<; icuKA.ornµticoc; 8tatpe-rric;.
intrinsic cyclotomic divisor, rrpocrqiuit<; Kuic'Af)wµ1Koc; otatp€-rri<; .
cyclotomic equation, KUKAOTO~ttKTJ ts icroxrn;.
cyclotomic field, l(l)KAOTO~llKOV n;eoiov.
cyclotomic function, KDKA.oto~ntei] cruv6.pt11cr1r;.
cyclotomy, KDKl,oto~tia .
cyclotron, <l>YI., KD1C),0Tp6v11. frequency modulated cyclotron,
crurxpoKUKAOtp6VT] .
cyclotron frequency, KuKA.01povt11:i} crux,v6tTJ<;.
cyclotron radiation, xuteA.otpovite·~ aKtivopoA.ia.
cyclotron resonance, Kt>K/,otpovtKo.; cruv11x1crµ6<;.
cyclus, = cycle.
cylinder
cylinder, KUAtvopo<;. altitude of a cylinder, UIJIO<; (rnii)
KUl.i VOpOU. axis Of a cylinder, t'i~COV (Wii) KU•
/-ivopou. base of a cylinder, ~acrtc; (wii) icu
A.ivopou. center of gravity (for the cylinder),
KEv-rpov Bapou<; ('roll KuA.ivSpou). circular cylinder, KUKA.tK<'><; icuA.tv
Spoc;. circumscribed cylinder, rrcp1ycypaµ
~1 evoc; KuA.ivopo<;. circumscribed prism of a cylinder,
lteptyEypaµµEVOV itpicr~La KUA.ivSpmr [Eir::, Ku/,1v8pov rr&ptyEypqµµtvov rrplcrµa].
element of a cylinder, crrnt;r:Eiov (rnu) t<uA.ivopou.
elliptic cylinder, eA.A.wtnKO<; KUA.1 vopo<;.
· equation of a cylinder, €~lcrrocrtc; ( TOU) KUA.l vopou.
hyperbolic cylinder, urr&pBoA.tico<; icu:>.1 vopoc;.
inscribed cylinder, EyyEypaµµevo<; Kul.wopoc;.
lateral area of a cylinder, i:µBaoov naparrA.eupou €mqiavelac; (wii) icu/,[vopou.
oblique circular cylinder, A.o~o<; [ ltA.U.ywc;] KUKALKO<; KuA.1v8poc;.
parabolic cylinder, napaBoA.tico<; tcu/.t vopo<;.
perimeters of the bases of the cylinder, lt&pi~tE'tpot "'t"fuv Bacr&cov wii icuA.i vopou.
projecting cylinder, rrpoBaA.A.cov icU/.1vopoc;.
quadric cylinder, 8i;mspocr-roc; [8eun:poBa9µto<;} KUAl vopo<;.
right circular cylinder, 6p9oc; KUKA.tKO<; KUAl vopo<;.
right cylinder, Op9o<; KlJf..tVOpO<;.
right section of a cylinder, 6p0·it wµ 1i [owtoµi]j KuA.ivopou.
rigid cylinder, crteppoc; KuA.tvopoc;.
rulings of a cylinder, ;r:apayai [ c'oc-rivix,j rnii KuA.ivopou.
229
cylinder
similar right circular cylinders, oµolOl op9oi KUKAlKOi KUAlVOpOl."
simplified problem of the rotating rigid cylinder, aitA.01m1riµevov itp6-PA.riµa. ('tfi<;) m;p1cnpoqifi<; (wu) <HEPpou KuA.ivopou.
tangent plane to a cylinder, e<pa.itt6µEvov bciitEoov KuA.ivopou.
volume of a cylinder, oytcrn;; (tou) KuA.ivopou.
cylinder circumscribed about a prism, KuA.tvopoc; m::ptysypaµµevoc; de; rrpicrµa.
cylinder function, cruv<lprqmc; KUA.ivopou.
elliptic cylinder function, cruvaptT)cr1<; tA.A.wtt1Kou tcuA.ivopou.
parabolic cylinder function, cruvapt11m<; ita.pa.PoA.1tcou KuA.ivopou.
cylinder of revolution, KuA.tvoprn; EK rrspwrpo<pi'jc;.
cylindrical, KUA.tvopuc6c;,T] ,6v.
cylindrical coordinates, KUAtvoptKai cruv1srnn1evm.
transformation of cylindrical .into rectangular coordinates, µcta.crxriµa.t1crµ6<; tillv tcuA.1vop1tcillv . cuvtna.:yµtVO)V Et<; op9oyooviOU<;.
cylindrical equal-area projection, KUA.tvopti<11 icrqt~aotKl) rrpo~oA.Tj · [icroouvaµoc; KUAtvopm1 rrpo~oA.Tj}. · ·
cylindrical functions, KUA.tvoptrni [~scrcrsA.tavai J cruvaprT]crt:tc;.
cylindrical harmonics, KUA.tvoptKai apµovtKai ( cruvapn'1crstc;).(EYN.: Bessel functions).
cylindrical helix, KuA.tvoptK1) {cn·spsa) £A.ti;.
230
cylindroid
cylindrical map, MA0., KUA.tvoptKoc; sl.Kovtcrµ6c;.
cylindrical perspective, KUA.tvoptKl) · npoomtKTj.
cylindrical polar coordinates, KUA.tvoptKai 7r0AtKai {KUAtVOptKrii J CJUV'!Etayµtvm.
cylindrical projection, KUA.1voptK1) rrpo~oA.Tj.
cylindrical roller in space, KUA.tvoptK6c; EV T0 XWPQ) KUAtvoqrT]c;.
cylindrical spherical ma.p, MA0., KUA.tvoptK6c; mpatptK6c; · siKovtcrµ6c;.
cylindrical spiral, KUAtvoptKl) mrsipa· {KUAtVOptK1l 'EA.ti;}.
cyli'ndrical surface, KUA.tvoptKl) £m<p<lvsta.
directrix ·of a· cylindrical . surface, . 81w9Etoucra. (tf}<;) KuA.1vop1Kf}<; i:m
cpa.vEia.<;. element of a cylindrical surface,
CJtolXEloV (tf}<;) KUA.1vop1Kfj<; i:m<pa.vcia.<;.
elliptical cylindrical surface, E:A.A.E1-1tTLKTt KUA.1vop11cft lm<pUVElCI..
equation of a cylindrical surface, e~icroom<; ('tfi<;) KU'.A..lVOplKf\<; Em<pa.-VELCI.<;. . . .
generator [ gcneratrix] of a cylindrical surface, yEvttE1pa. i:fi<; KuA.1v-op1tcfi<; em<pavda<;. .
cylindrical ·symmetry, 1CuA.woptKi} cruµ~tsTpia .
cylindrical wave, KuA.tvSptKOV KUµa.
cylindroid, I, KuA.1vopoi::io£c;. 2, KuA.1vopos101) c; (Em<p<ivi::ia).