a computer program for flow calculations
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COPY NO. - %Y
DATE - February 3, 1965
A COMPUTER PROGRAM FOR FLOW CALCULATIONS
E.G. Davisson
1. ABSTRACT
a computer program f o r prec ise calcu: vapor flows f o r flange, pipe, corner.
3. ventur i t aps when used with a dry me ?tees, a wet-calibrated mercury meter, gam provides an option o f specifying
?\
u_L.uIIIIb ,,,2 maximum flow desired.
The program assumes t h a t the pipe s i z e and meter range havt Also required as input data a r e the physic se lec ted i n advance.
proper t ies and flowing conditions of t he f l u i d .
Lat ion
: ter , o r a e i t h e r
I
? been :a1
\
b TI pr
- to revision or correction ana merelore uues iiui r e p r e a e r t r u ~ S C ~ U , c = ~ v , , . information i s not to be abstracted, reprinted or otherwise given public dis- semination without the approval of the ORNL potent branch, Legal and Infor- mation Control Deportment.
i
-1 .
L E G A L NOTICE
T h i s report was prepared as an account o f Government sponsored work.
nor the Commission, nor any person ac t ing on beholf of the Commission:
A. Makes nny warranty or representation, expressed or implied, w i t h respect t o the accuracy,
completeness, or usefulness of the information contained i n th is report, or that the use of
any information, apparatus, method, or process d isc losed in th i s report may not infr inge
pr ivate ly owned r ights; or
any information, apparatus, method, or process disclosed i n th is report.
As used i n the above, "person ac t ing on behalf of the Commission" includes any employee or
contractor of the Commission, or employee of such contractor, to the extent that such employee
or contractor of the Commission, or employee of such contractor prepares, disseminates, or provides access to, any information pursuant t o h is employment or contract w i t h the Commission,
or h i s employment w i t h such contractor.
Neither the Un i ted States,
6. Assumes ony l i ab i l i t i es w i t h respect t o the use of, or for damoges resul t ing from the use of
3 J
3
CONTENTS
m3e
1 . Abstract .................................................... 1
2 . Iatcoduction ................................................ 4
3 . Data Card Keypunch Format ................................... 4
4 . Definit ion of Variables ..................................... 5
5 . Defini t ions of Factors ...................................... 5.1 FB, Basic Orif ice Factor ............................ 5.2 FR, Reynolds Number Factor .......................... 5.3 FA, P la te Expansion Factor .......................... 5.4 FM, Manometer Factor ................................
5.7 FPB, Pressure Base Factor ........................... 5.8 FTB, Temperature Base Factor ........................ 5.9 FTF, Flowing Temperature Factor ..................... 5.10 Fc, Specif ic Gravity Factor ......................... 5.11 FPV, Supercompressibility Factor .................... 5.12 Y2, .Expansion Factor ................................ 5.13 EXT, Extension Factor ...............................
5.5 E T , Specif ic Gravity-Temperature Factor + . e e. e
5.6 FS, Steam Factor ....................................
6 6 8 9 9 10 10 10 10 10 10 11 11 12
6 . Flow Calculation Output Sheet ............................... 12
3 4456 0549204 4
2 . INTRODUCTION
With t h i s Fortran program, flow 01' l iqu id , gas, steam, o r vapor can be calculated prec ise ly (six or' more s i g n i f i c a n t d i g i t s versus 1 r d $ f o r s l i d e -rule calculat ions of empirical equations ) f o r flange, pipe, corner, radius, \era contracta, o r ventur i t a p s . -
The bas ic empirical equations a r e those proposed by Bhe American G a s Associatiori (AGA)l and the ASME: Research Committee on Fluid Meters.* 'The def in i t ions of t h e fac tors for. a p a r t i c u l a r f l u i d ca lcu la t ion repre- sen t a compromise among those proposed by the American Meter Company i n t h e i r E 2 andbook,3 by Spink i n Pr inciples and Pract ice of' Flow Meter Engineering,' and i n the AGA and ASME reports previously mentioned. The def in i t ions of t h e fac tors used herein a r e common t o a l l ty-pes of c a l - culat ions and make computation e a s i e r .
The program w i l l compute flows a t 100 points equidis tant along the d i f f e r e n t i a l pressure scale , applying the exact Reynolds number f a c t o r and expansion factor a t each point . The pmgram provides an option of specifying e i t h e r the o r i f i c e diameter o r the maximum flow desired i n pounds per hour.
3. DATA CARD KEYPUNCH FOKMAT 4
The input data a r e punched on S$M cards according t o t h e Data Card Kkypunch Format (Figs. 1-5) . No., and Dept. i n Figs. 1 -5 w i l l accept alphanumeric d a t a ; a l l o ther e n t r i e s a r e numeric ( 1
The e n t r i e s labeled T i t l e , F i l e No., Bldg.
The e n t r i e s labeled Meter Type, Tap Type, and Fluid Type are in teger e n t r i e s and a r e selected from t h e key shown a t the bottom of the format sheet .
'Orifice Metering of Natural G a s , Gas Measurement Assoc. Rept. No. 3, Am. Gas Assoc., April, 1955.
*Fluid Meters, Their Theory and Application, Rept. of ASME Research Corn. on Fluid Meters, 5th ed., Am. Soc. Mech. Engr., New York, 1959.
3 J . C . Diehl, Co., b c . , 1955.
L.K. Spink, 8 t h ed., Pli.mpton
4
Orif ice Meter Constants, Handbook E-2, American Meter
Principles and Pract ice of Flow Meter Engineering, Press, Norwood, Mass,, 1.958.
5
R
The arrangements of fac tors f o r the l iqu id , gas, steam, and vapor calculat ions a r e :
1. For l iqu id
2. For gas
3. For steam and vapor
rT'kie steam and vapor calculat ions a r e ident ica l ; the only difference i s t h e l a b e l . Vapor calculat ions may be dccommodated within the Prame- work of the gas calculat ions; however, the gas calculat ion requires a su i tab ly defined supercompressibility fac tor , which i s d i f l ' i cu l t t o de- termine i f the vapor i s w e t . It is , p e r h a p , a l i t t l e more straightforward i n such cases t o use t h e vapor calculat ion, which requires a knowledge of t h e s p e c i f i c volume of t h e saturated vapor and the q u a l i t y fac tor of the wet gas. If the steam or vapor i s sa tumted o r superheated, the spec i f ic volume of the steam o r vapor a t downstream conditions i s entered as input data . If t h e steam o r vapor i s w e t , the spec i f ic volume of the saturated steam o r vapor a t downstream conditions is f i r s t multiplied by the q u a l i t y f a c t o r and t h i s "adjusted spec i f ic volume" i s entered as input data .
Dl
D2
B
R
Ii
Y2
TF
Vd
SG
GB
4. DEFINITION OF VARIABLES
pipe ID, i n .
o r i f i c e I D , i u .
E / D 1
meter reading, i n .
d i f f e r e n t i a l pressure, i n . 50 a t 60 '~
downstream pressure, ps ig
temperature of f l u i d a t flowing conditions,
downstream spec i f ic volume, f t 3 / l b
s p e c i f i c gravi ty of gas, re la t ive t o a i r
base s p e c i f i c gravi ty 01 l iquid a t 60°F, r e l a t i v e t o €$O a t 60 '~
0 F
6
G F
GM
GS
VIS
K
PA
PB
TB
KDL
w2
PPH
GPH
SCFH
%O s p e c i f i c gravi ty of' f l u i d a t flowing conditions, r e l a t i v e t o a t 60O~
s p e c i f i c gravi ty ot' rrianorneter f l u i d , r e l a t i v e t o H20 a t 60 0 F
s p e c i f i c gravi ty of scad ing f l u i d i n contact w i t h manometer f l u i d , r e l a t i v e t o H20 rlt 60'~
v i s c o s i t y of f l u i d a t flowing conditions, centipoises
s p e c i f i c heat r a t i o o f gas, steam, OF vapor
average barometric pressure, p s i a
pressure base, psia
temperature base, 0 F
pipe Reynolds number
o r i f i c e Reynolds number, W l / B
pounds per hour
gallons per hour
standard cubic f e e t per hour a t pressure base and temperature base
5. DEFINITIONS OF FACTORS
5.1 %B, Basic Orif ice Factor
where K i s defined by the following equations f o r various t a p types. 0
For flange t a p s
5/2 - (0.009 + 0 - - O . j j 03P - By'' f r- L------ 65 4- 3 B - 0.7) } (D1 l2 D1 .
d
7
where
For pipe taps
0.0182 4- (0.44 - -53 (0.935 + 0 . 2 2 p 5 14 - 1.35B o 06. 2 ’
D1 D1 D1 1 K 0 = 10.5925 f
where
E = D;1 (905 - 5000B + 90008 - k‘00B + - “73 D ’
For corner taps
KO = 0.6004 f 0.35B 4 - 0.052 (0.5 - B)3/2 0.62 ( B - 0.7) 5/3
where
For vena contracta t a p s
1 0.0006 4 16 1 1) + B i- 1 . 2 5 B KO = 0.5922 + 0.4252 L(Dl)2B2 4- O.01Dl
4 16 where E 0.00022i1 + 0.002325 (B + 1.‘75B l 0BI2 4- 2 D l B ) .
For radius tam
R
e
0.01352 0.072 57- 0.00025
(D1 )2132 + 0.002 5 D l K = 0.6014 -
0
where
8
For ventur i t a p s
' B
L
KO = 0.984/ (I - B 4 ) l / 2 .
5.2 FR, Reynolds Number Factor
To ca lcu la te t h e Reynolds number ractor, an intermediate quant i ty i s f i r s t calculated, which is the quot ient of' t h e pipe Reynolds number divided by the Reynolds number f a c t o r . This inteimediate quant i ty i s defined f o r l iqu id , gas, steam, and vapor i n the following equations.
For l i q u i d
l'(,g20Dl K B'(W GF) I /2 0
VIS R D ~ / F R =
For gas
3730131 FPV KO B2 [H(P;I + PA) %I1/' RDl/FR =
VIS(TF + 459.671~1~
For steam and vaoor
2 112 2268.07D1 KoB H RDl/FH =
V I S (v2 )1'2
The Reynolds number f a c t o r i s then calculated f o r t h e various types of taps as defined i n the following equations. t o -the equations given i n Sect 5.1, "FB, %sic Orif ice Factor.")
(E is calculated according
For flange and pipe taps
For corner, vena contracta, and radius taps
These two equations f o r FR are inaccurate for Reynolds numbers less than approximately 15,000. f o r flange and corner taps . 15,000 ( f u l l s c a l e ) , a spec ia l sLbroutine is entered t o ca lcu la te the Reynolds number fac tor .
The program does not consider t h i s f a c t except For these t a p s a d Reynolds numbers less than
?
4
9
For ventur i t aw P
FR = 1 ( f o r a l l Reynolds numbers).
This condition (F'R = 1) i s not t r u e f o r Reyriolds numbers l e s s than 250,000, but t h i s program does not consider t h i s f a c t .
5.3 FA, Plate Ekpnsion Fdctor
This fac tor corrects lor o r i f i c e p l a t e expansion due t o temperature. The f a c t o r i s entered as input data . It may be evaluated from t h e equation FA = 1 -t- 2a@t , where Q: i s t h e coef f ic ien t of l i n e a r expansim of the o r i f i c e p l a t e mater ia l and At i s the difference between t h e flowing stream temperature and the ambient temperature.
5.4 FM, Manometer Factor
This f a c t o r corrects l o r the difference between t h e meter reading i n inches and the d i f fe ren t ia l - pressure i n inches of water a t the taps . The def in i t ions , each d i f f e r e n t f o r t h e various types of meters used t o measure d i f f e r e n t i a l pressure, a r e given by the following equations.
For dry-type meters
m = 1 .
For mercurv meters. drv cal ibrated
For mercury meters, wet ca l ibra ted
F M = 1 .
For U-tube manometers
FM" (GM - G S ) 1/* .
Iki these def in i t ions , t h e re la t ionship between the meter reading R and the d i f f e r e n t i a l pressure H i s i n a l l cases
For meters i n s t a l l e d v e r t i c a l l y on l i q u i d service and having gas- puxged leads, an addi t iona l correct ion must be made, This correct ion amounts t o a zero s h i f t , which is not accounted f o r i n t h e equations f o r marlometer fac tors . The zero-shif t correct ion i s equal t o t h e a c t u a l v e r t i c a l difference ( i n inches) between the t a p s multiplied by the s p e c i f i c gravi ty of the flowing l iqu id .
10
5.5 FGT, Specific Gravity-Temperature Factor
For l i q u i d only, the s p e c i f i c gravity-temperature f a c t o r i s
(GF)I/* E T = 1.0057 GB .
5.6 FS, Stearn Factor
For steam and vapor only, the steam f a c t o r i s
5.7 FPB, Pressure Ease B c t o r
For gas only, t h e pressure base f a c t o r i s
14.73 FPB = p~
5.8 FTB, Temperature Base Factor
For gas only, the temperature base f a c t o r i s
459.67 -t TB 519 67 FTB =
5.9 FTF, Flowing Temperature Fdctor
For gas only, t h e flowing temperature f a c t o r is
5.10 FG, Specific Gravity Factor
For gas only, the specii'ic gravity f a c t o r i s
5.11 FPV, Supercorripress i b i l i t y Factor
This f ac to r i s for gas only, and i s novmally entered ds input data. For na tura l gas, a spec ia l subroutine i s opt ional , by which the super- compressibi l i ty f ac to r i s cttlculated Prom fo.rmulas developed by the Cal i fornia Natural Gas Association.5 For t h i s option, t h e value 9.0 i s entered as input fo r t h e supercompressibil i ty f ac to r . The program w i l l ca lcu la te a supercompressibil i ty f ac to r based on t h e t’ollowing formulas:
I. for. SG 4 0.75 -
2. f o r SG 3 0.75 1/2
e (9.16 x io5)lo (TF + 459.67) 3.825
5.Y2 Y2, Expansion Factor
For gas, steam, and vapor only,
where
and y1 is defined f o r t he various types of taps i n the following equations.
For flange, corner, vena contracta , and radius t aps
4 x1 yI = 1 - ( O . l + l i- 0.35B ) .
’Bulletin TS-402, Cal i fornia Natural Gasoline Assoc .
12
For pipe t aps
For ventur i t aps
where
5.13 EXT, Extension Factor
For l i q u i d
112 E X T = R , and f o r gas, steam, and vapor
EXT = [ R ( E + .
6. FLOW CALCULATION OUTPUT SHEET
A flow ca lcu la t ion output sheet for each problem described i n Figs. 1-5 is given i n Figs. la-5a. understood from t h e discussion i n the previous sec t ions of th i s report, t h e a u x i l i a r y readouts a r e described i n the following discussion.
Although t h e normal readouts a r e r e a d i l y
The 'IC Factor" is the product of a l l f ac to r s making up a given flow ca lcu la t ion except t h e extension f ac to r .
T h ~ ~ 7 R l - o Factor" f o r l i qu id flows i s the midscale flow mult ipl ied
This f a c t o r i s usefu l when square root char t s graduated i n t o by ( 2 ) divis ion. 10 chart d iv is ions are used.
10 a d is expressed i n u n i t s of PPH per d iv i s ion and GPH per
The "Conversion B c t o r " f o r l i qu id flows i s the base grav i ty mult i - p l i ed by 8.3282607 and is expressed i n u n i t s of pounds per gal lon.
The "Conversion F1Etctor" for gas flows i s 0.370214 (TB + 459.67)/PB*SG and is expressed i n u n i t s of standard cubic f e e t per pound.
13
Since the def in i t i on f o r the gds conversion f a c t o r used by the computes t o provide an aux i l i a ry readout i n weight u n i t s (PPH) w i l l be i n e r r o r a t times because of t h e d i f f e r e n t de f in i t i ons used f o r SG and FPV, t h e fo l - lowing discussion i s presented.
Let Z = compressibi l i ty i n general b = base conditions i' = flowing conditions Kw = average molecular weight of gas mixture
then
and
where
P = psy V = f t /lb-mole T = O R R = 10.73, gas constant.
For volume u n i t s of measurement, o r SCFH,
For weight u n i t s of measurement, o r PPH,
If SG i s ca lcu la ted from molecular weight and mole f r a c t i o n da ta and i s entered i n the computer program, t h e FPV f a c t o r entered should be calculated from t h e corresponding Q S . 1 and 3. Since these formulas a r e no t t he sdme f o r both volume aid weight L t r i i t s , t he readout from the computer w i l l be exact only for those ca lcu la t ions f o r which the FPV f a c t o r en t ry i s appropriate . The readout for o the r ca lcu la t ions w i l l be i n error depending on the devia t ion of' zb from un i ty . un i ty i n cases dea l ing w i t h t he so ca l led "permanent" gases, the e r r o r w i l l be negl ig ib le i u these cases .
Since z b i s near ly equal t o
If SG is measured by use of' a gravitometer a t c lose t o base conditions, Eqs. 2 and 4 should be used. t he measurement of SG, as ShowrJ i n Eqs. 2 and 4. i d e n t i c a l f o r both volume and weight units. Die computer, which reads out both volume and weight un i t s , can be cor rec t t'or both cases only i f FPV i s defined as i n Eqs. 2 and 4 and SG is measured w i t h a gravitometer a t base condi t ions,
Compressibil i ty a t base conditions a f f e c t s These two equations are
The program w i l l automatically make c e r t a i n subs t i t u t ions i f ' a zero i s entered as an input . These subs t i t u t ions a r e
VIS = 1. cent ipoise ( f o r l i q u i d ) = o.olO3 cent ipoise ( f o r gas and vapor) = 0.0192 cent ipoise ( f o r steam)
= 1.298 ( f o r steam) K = 1.3 (for gas and vapor)
PB = 14.73 p s i g ( fo r gas ) TB = 60 '~ ( f o r gas) PA = 14.323
P
METEd = 4 T A P S = I
F L U I D = I
20 I 1 I I
9RY20 10264 M IIISCALF: 0 0 6 7 0 4 I 7 7 4 0 3 4 0 0
. .. .
3 4 - I 5 4 5 9
P P H GPH
6 = V E N T U R I
Fig. Id. Flow Calculation Output lbta Tor Liquid Flow (Viscous).
17
s 4 - J 54.3 14.5 54.3 1 4 . J 1 4 . 3 5 4 * 3 \5 4 . .I s 4 . d 54 ,s3 54 . 3 $ 4 . I 5 4 . J 34 .3 3 4 . 3 s 4 3 34.3 14.3 34.9 56.0 3 ? * U 5 8 . 0 ' 5 9 . 0 4 0 . (1 40.9 4 1 . 3 4 2 . 8 4.5. 7 44.6 45.4 46 .3 41.1 4 7 . 9 4n.c) 49.6 3 0 . 3 51.1 51 .9 52.6 55.4 5 4 . I 5 4 . 9 5 5 . 6 5 6 . 4 5 1 . 0 5 7 . 7 58.4 73. I 59, I 611.4
i n . 8 1 1 . 1 1 1 . 4 I 1 . 7
I 7 . 9
1 2 . 0 12.3 1 7 . 6
I d . I 13.4 1 3 . 7
1 4 . 2 14.4 14 .7 14.9 15.1 1 5 . 4 I b . 0 15.A
1 3 . 9
16. I 1 6 . 3 16.5 I h . ? 1h.Q 1 7 . 1 1 7 . 4 1 7 . 6 1 7 . M I '1 , 0 1 8 . 7
-0 - 0 -0 - -0 - n - (1 - 0 - I1 - 0 -0 - 0 - I) - 0 -!I - n - il - n - IJ - n - [I - f l - 0 - n - 0 -0 - 0 - n . - 0 - n - 0 -0 -0 - a -a - a _ ._
- 0 -0 - [I . 2-0. I._- _ _ -0 -El - Q - n - - -0 -0 - 0 -rl - 0 - n
. - 0 -0 - 0 - n - 0 - 0 - 0 -0 -0 -0
- n - - - f l - - - 0 - 0 - R - n -0 -0 - 0 - n - 0 - n
- 0 - 0 - __I __ - 0 -0 - [I - 0 - 0 -0 - I1 -0 - 0 - 0 - U - n -0 -0 - 0 - 0 - 0 - n " [I - 0 - 0 - 0 - L1 - 0
- 0 - a
pig. la (cor i t iui i rd)
d
18
2.2h 2 . 2 8 % . J O 2.57 2.3b 2 . 5 1 2.59 2.4 I 2 . 4 % 2.42 2 . 4 7 2 . 4 9 2 - 5 1 2.511 2.55 2 . 5 7 2 . 5 3 2,61 2.63 2.65 2 . 6 0 2.69 2 m 711 2 . 7 7 2.74 2.76 2.77 2.79 2 . 8 1 2.86 2.04 2.86
- 2.134 2.911 2.92 2.93 2.95 2.97 2.98 5.011 3 . 0 % 5,113
7 4 * 2 74.7 75.4 1 5 . 8 1 6 ~ 3 76.9 77.4 1 7 . 9 78.4 7 9 , u 7Y .5
- Q - 0 - 0 - R - n - 0 -
- 0 - n - I1 - n - n - n - 0 - n - 0 -n- - -0 - n - 0 - f l - 0 - 0 - 0 - n
- f l - o - 0 - 0- - 0 - 0 - 0 - 0 -0 - 0 - 0 - 0
.”
-0 -0 - a -0
- I1 -0
- I1 - 0 -0 -0
W f l - n
- 0 I_ - n . . - 0 - n -0 - n - a - n
- f l - (I * o - n -0 -t
- f l - [I -0 - 0 - - 0 - n
- 4 - 0 -0 - 0 - 0 - I!
Fig. Id (corltjriued)
19
I 2 3 4 5 6 7 (1 9
10 1 1 12 13 14 I!, 1 6 1 7 18 I ' , 7 0 2 1 2 2 23 24 7 5 2 6 ;7 28 1 9 3 0 ? I Jsr 3 3 3 4 3 5 3 6 3 7 .?B 39 4 0 4 1 42 43 44 4 5 46 47 4 8 49 50
58 5 9 6n 61 6 2 6 3 64 65
5 2 3 4 5 0 1 9 6259 6 5 n J h h I !J 6584 6 4 1 2 61 12
77.21)64 78,0325
79.56nB
77.21)64 78,0325
Pig. la (continued)
CARD $ 2
CARD
Flowing Temp Pipe 1.D Ori f ice 1.0. Max F low Meter Range Downstream Press Inches Inches PPH lncnes PSlG Deg. F
- I 1 1 (Optlon.al\ z i (Optional) 31 4 1 (Gos-Steam-Vapor) 51 (Gas-Steam-Vapor) 60
L 2'8 SI14 * 4 - I I ' I 1
' I I I / / I 1
I 1 , I
1 METER TYPES 1 = Dry 2 = H g - Wet Colibrated 3 = Hg - Dry Calibrated 4 = U . Tube Monometer
UCN-5801 I3 5-84]
CARD # 5
2 T A P TYPES 1 = Flange 2 = Pdpe 3 = Corner
4 = Vena Contract0 5 = Radlus 6 = Venturl
Fig. 2 . F l o w Calculation bput rata f o r Liquid F low ( H i g h ) .
Manometer F lu id Seoling F lu id Gravity Gravity
5 (Meter Type 2 & 4) 60
Downstream Sp. Vcl . Sp. Grovlty Cu Ft./Lb. Relat ive to Air Base Gravity Flowing Gravity
I (Steam-Vopor) 3 1 (Gas) 21 (Liquid) 31 (L iqu id ) 141 (Meter Type 41 I I 1 1 / / I I
I I 1 I , I / l I I
3 F L U I D TYPES 1 = L iqu id 2 = Gas 3 = Steam 4 = Vapor
F lowing Viscosi ty Super Compress, bi I bty Plate Exponslon Press . Bose Factor Foctor PSIA ten t ipo ises Sp. Ht. Rat io
31 41 (Gas) CARD i 1 1 (Gas-Steam-Vapor) 21
I ,
Barometric Press Temp. Base Deg. F PSIA
51 (Gas) 61 70
1 I 1 l i I ~ l ~ ~ ~ ~ ' I 1 I / / ,
21
P
M E T E R H F A D I r J G r) I F 1- P R E S S INCHES l i N C t l t 5 W2W Pf'h Gl2H
Pig. 2a. Flow Cdlculd t ion Output Data f o r Liquid Flow (High).
22
P
I 2 3 4 5 h 7 h Y
10 I I I ? I J i 4 I 5 I 6 17 l e i 19 ;.' il 21
*?! 4 35 %< 6 37 3 8 $3 0 4 [I
4 2 4 >4
4 4 45 O h 47 4 8 49 5 n
4 1
- u -0 - ri ? e . - 11 - n - [I - 0 - il -0 - 0 -0 -0 - D - 0 - fl-.-- - -ti -0 - n - 0
- n - f l
- II - 0 - 0 -0 - 0 -!! - R - 0 - 0 - n - 0 - n
-8 - 0 - 0 - n - a -0 - 0 - " r l -0 - 0 - 0 - 0 - @ -0 - 0 - 0 - U - 0
-0 - 0 - 0 _ - n -
- 0 - n - f l - 0 - 0 - n - 0 - rr -0 .
r
Y i g . 2%. (continued)
23
P
g.
* I1 t i l
2.57 2.6'5 2 .75 2 . 8 1 2.89 2.94 5.04 5 . I I 3 , I O 5 .27 3 . 3 4 J . 4 2 5 . 4 9 5 . 3 6 5.64 4 .71 J.7A 5.8* J . 9 5 4 . 0 ' 1 4.117 4 . I 4
Y l
- n - 0 -0 .. I1 - 0
- 0 - 0 - f l - 0 - I1 - 0 - 0 - 0
-- 0 - 0 - 0 - 0 - U
- 0 - 0 - 0 - 0 - 0 - 0 -0 - 0 - 0 - 0 - 0 - 0
- 0 - 0
- 0 - 0
- 0
- 0-
- a
- n
Y Z
- 0 - f l - n - 0 - n - 0 - tl - 0 - 0 - n
- 0 - n - D - 0 - -
- @ - 0 - 0 - 0
- n
- n
- 0 - n - 0 - n - n - 0
-0 - 0
- n
-0-- - - n - 0 - n
- I1 - n
- n (1 - n - n
-0 - 0 - n - n - 0 - n
- 0 - n - [ I - - q ._
- a - 0 - n - n
,
24
e
I 2 5 4 5 6 7
9 I D I1 I C ! I 3
13 16 1 7 It3
2 U P I 2 2 9 3 2 4 2 5
--- e- 5 7 28 ? 9 3 0 3 1 2 2 J3 3 4 35 $ 6 3 7 38 3 9 40 4 1
4 3 44 45 46 4 7 48 4 9 5 0
a
1 4
1 9
4 2
z . 9 1 8 3 3 .9466 3 . 9 7 4 6 4 ,9024
4 ,0575 4 ,0848 4 I i-7-9 - "- 4. ( 3 8 8 4,16553 4 . 1 9 2 1
4,2_447
4.03111
4 .2185
4.2708 4 .2967 4 3 2 2 5 4 .5481 4 . 3 7 3 5 4 .3989 4 . 4 2 4 0 4 ,4490 4 .4739 4 .4987 4 ,5233 4 .5477 4,5721 4 . 5 9 b J
4 .6443
4 . 6 9 1 9
4 v 62114
4 t 6682
4 , 7 1 5 5
e
Pig. &. (coriti riurd) .
n
Q
1L
U
26
P
F l j = F l i i:
FA i
FM L
F P H = F T H 5
FTP : F t i = FPV = Y2 =
METFR a I TAPS = 3
F L U I D = 2
PPH S C F H
Pig. 3a. Flow Cdlculation Output Ddta l o r GdS Elow (FPV Option).
27
2 2 23 ? 4 2 5 P h 2 7 2 b 29 J II .5 I s 2 3 J 54 3 5 S 6 3 7 3 8 3 9 40 4 1 42 4d 4 4 4 5 4 6 4 / 4n 4 9 5 11
. I1 . I1 . II . I1 . I1
* iI . n
I . n
. n
I , l l U f l l I
I ,on345 I , f lu356 1,13u'f67 .
I ,00378 I , f lu389 I .OR480 ! .no41 I I , f ld422
Pig. ja. (continued)
s
I
Fig. ja. (continued)
29
2 1 - 22
I 'EH CkNT FI l I -1 S C A L P
5 1 5 2 5 5 54 5 3 5 6 67 56 5 9
6 s 61 h 2 63 6 4 6 5 6 6 6 7 6 8 69 70 7 1 72 7 3 74 7 5 7 6 77 70 79 * O R I
524,037 322 .555 425 .055 527,537 3 3 0 . 0 ~ l 532.448 334 .97a 337 .291 339.6R8
344 .434 34b.707 349 . I 2 3
353.752
3 4 2 U 7 U
35 1 ,444- - -
3 5 6 . 0 4 5 $ 5 8 * 3 3 5 360.59 1
365 ,084 S h 7 . 3 1 I 369 .526 571 .729 3 7 3 *9?0
362,844 -
376.098 3 7 8 . 2 6 6 3 8 0 . 4 2 I 3 6 2 . 5 h 6 JH4.7ne 386 .822 3 8 6 , 9 3 5 391,0375 3 9 3 . 1 7 8 395 .2 I1 9 397,280 SPY. $ 4 I 4 0 1 .SYJ_
Fig. ja. (contirlued)
54 9 3 '. ._
0 cyb
31
F I L E NO. 4
MFTkfl = 2 T A P S = 4
F L U l D = 4
-
Fig. Ita. Plow Cdlculdtion Output Djta f o r Vapor Flow (Bore Option).
32
b x r t i i . Y I Y 2
I 7 3
16 I 7 I H I Y 2 0 21 23 73 24 25 26 27 28 29 J O 31 $2 ST 3 4 35 56 37 d H 39 40 $ 1 42 4 3 44 45 4 6 4 7 411 49 5 0
,998 I 5 ,998 I 0 ,948116 . 9 9 8 n 1
.YQ787 ,907R3 ,997763 , 9 9 7 7 3
9 9 7 6 9
. 9 9 7 9 6
. 9 9 7 9 2
Fig. 4a. (cont inued )
33
h ? 7 1 4 2 . 4 h 3 1 2 I 3.2 b37CZ".R h 4 3 l t ) l . q 6 4 9 r) 87.9 h549ar i . J hh f l725 .7 6664711. { h 7 2 1 h 5 . 6 6 7 7 8 12.6 b R J 4 1 7 . 7 6 R H 9 5 6 . 9 6944 J h . 5
7 10147 .2 716( iUW. I 72 I J H 9 . 2 77665 I , .1 7 3 1 8 7 b . 5 737067.3 742212 .7 747329.3 7524117.0 7 5 7 4 5 7 . 4 762464 . I 767443 . fl 7 7 2 3 8 9 . 5 7773u4 .4 7 8 2 l n 4 . 2 78704 I .9 79 10O4,9 796658 .9
606 160.8 f l 1 ~ 8 6 9 . 8 8 1535 I , 4 n 2 n z i ) h . I 8 7 4 8 3 4 . 4 8TY436.7 8 '14 I7 I 5.5 8 3 0 5 6 5 . I 8 4 3 0 9 7 . [I 8 4 7 5 9 4 h 85207:3.z 0565pq. 3 H6C19hfl.7 H653b9 .S 8 6 9 7 5 5 . 9 A74 I 3n. 4
8 0 1424. n
.
-. .. ,.
vY9650 l i b 0 0 9 3 , 99s45
.." -.--1
,9964 I , 99436 ,9963 I , 9 9 6 2 7 , 99612 ,996-1 8 ,996 I 3
,99599 r,naloa , 99590 . 9 9 5 8 6 1,001la , 9 m 1 I , O O I I I .99577 l,nol12 , 99572 i , n o i 1 4
,99563 I . n i i i 1 6 , 99558 I , n o 1 1 7 , 99554 I " n a l l 8 ,90549 1.na12n , 99545 I " i IU121 ' 9 9 ??-L _LrQ!L!Z.?-
I . o n n 9 4 " --
, 99609 .996 f l4 I I n 4 105
, 9 9 5 9 5 I , fl0 I 0 7 I i a d I V---
, 9 9 5 6 0 11flU115
Fig. 4s. (continued)
34
PER CkNT F U L L SCACi -
I 2 3 4 5 6 7 8 9
10 I I 12 3 , 4 / h I 3 3 , 6 1 7 14 3.75s 15 - 3 .Rb4 16 4.01 I 17 4. 16.5
7 2 7 3 7 4 7 9 76 7 9
79 18
9 2 9 3 9 4 9 5 9b 9'1 8 b 9 9
I n u
Fig. 4a. (cont inued)
4 . 9 3 8 H , Y Y I 9. a 4 4
9. 159 9 . 2 1 3 9.267 9,32n 9 . 3 7 4 9 , 4 2 7 9 , 4 7 9 9 .537 9,!784 9. Ad6 9 . h 8 7 9 , 7 5 9 9.790 9.841
9 , 1 0 4
9, I49 9.94 9.99
'.<
,
35
n
E.- <
*
V
36
METER = I T A P S a 6
F L U I D = 3
c s 12ti. 5 0 7 0 3
FL Ah G E P I P & CORNER VENA C B W T H A C T A R A D I U S V t N T U H I
PPW
2577.29 5642,fO 4 4 4 7 . 7 9 5 1 4 3 , H 5 - --- 5747 .a4 6291.26 6 9 9 f l , 7 0 7 f r 5 4 . 6 3 7689.49
- 86)99,98
-
-.
- .
pig. Sa. flow Calculation O u t p u t k t d for Steam Flow (venturi) .
37
* a
,92842 ,92835 " 9 2fiZ9- ,92822 ,928 I 6 ,92809 "92RU3 ,92796 , 9 2 7 9 0 ;9 278 4-- ,92777 ,92971 ,92764 . 9 2 7 w , 9 2 7 5 I , 4277s -- ,92739 , Q 2 7 3 ? ,92726 ,92719
' ; 9 2 ? 0 6 , 9 2 9 0 0
,9268 I
,927 I 3
,92694 ,92607
,92675 ;Si 6 68 , 9266Z ,92655 , 9 2 6 4 9 ,92643 , Q 2 6 3 h
Fig. >a. (cont inued)
h
38 4
J
Y I
.Y r l5 fY
,Yf l479 .re111433
,91)543 r9f1298 . YfI263 "9D2R9
I 6 4 . 9 n l I 9 ,911074 9 I, CJ 3 0
. ~ ( 1 5 ~ 4
, V ~ I ~ R C I
, 6 9 9 8 5 ,6994-1 --- , 8 9 8 9 6 ,69892 , 8 9 8 0 7 ,897153 8 9 7 I 9
, 0 9 6 7 8 -
, 8 9 5 8 7 ,89543 .09499 .89455 ,894 I I
8 9 6 3 I
y 2
, 92630 ,92624 . (726 l-7-- , 9 2 0 1 I , 92605 ,9259H , 9 2 5 9 2 ,92585 I 92579 , 92573 ,92566 ,92560 , 9 2 5 5 4
,92535 I 9 2529 ,92522 ,925 I 6 ,925 I O ;(r25a3-- , 92497 ,9249 I ,92404 i9-2-4 78
,92466
,92548 - ; 82% TI--
.!9?"47_2_ -
.9239?
,92384 ,92376 ,92372 , 9 2 3 6 6 ,92359 , 9 2 5 5 3 ,92347 - 9 2 3 4 I
, 9 2 s - l -
?
Fig. >a. (continued)
I
0
- 0
!
12 I3
Fig. ?a. (corit inued )
4
0 . PL
1. 2 . 3 . 4 . 5 . 6 . 7 . 8. 9 . 10. 11. 12.
13-15. 16. 17. 18. 19. 20.
'h 21.
'L, 23. 24. 25 . 26. 27. 28.
1 3 22.
R. K. Adas A. H. Anderson S. J. Ball C. 5 . Borkowski C. Brashear N. H. Briggs G. H. Burger C. M. Burton L. H. Chase €I. E. Cochran 5. W. Cunningham D. G. Davis E. G. Davisson J. H. Day B. C. Duggins E. P. Epler 5. B. Frisbie T. M. Gayle G. W. Greene W. J. Greter E. W. Hagen C. S. Harrill P. G. Herndon 14. B. IIerskovitz P. W. Hill R. F. Hyland
41 I
..f . I
DISTRIBUTION
29. 30. 32 * 32. 33. 34. 35. 36. 37. 38. 39. 40. 41. 42. 43. 44. 45. 46. 47.
48-49. 50.
51-53. 54. 55.
56-70.
71.
w. E'. Johnson W. W. Johnston J \ W. Krewson B :',Lieberman 13. G t Linginfelter A. H."@alone C. D. M&x$in T. L. McLeAn H. J. Metz b!. R. Miller K. L. Moore C. A. Mossman G. S. Sadowski B. Squires L. H. Thacker B. C. Thompson R. E. Toucey R. E. Whitt P. P. Willims Central Research Library Document Reference Section Laboratory Records Department Laboratory Records, ORNL R.C. ORNL, Patent Office Division of Technical Information
Research and Development Division, Extens ion
OR0
R
J
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