statically determinate plane truss
TRANSCRIPT
1
2 STATICALLY DETERMINATE
PLANE TRUSS
OBJECTIVES:
This chapter starts with the definition of a truss and briefly explains various
types of plane truss. The determinacy and stability of a truss also will be
discussed. The procedures of analyzing statically determinate trusses will be
developed using the method of joints and the method of sections. For
advance, the alternative computation using joint equilibrium method will be
included in this topic.
2.1 INTRODUCTION
A truss is defined as a structure composed of slender elements joined together
at their end points. The members commonly used in construction consist of
wooden struts, metal bars, angles or channels.
Plane or planar truss composed of members that lie in the same plane and
frequently used for bridge and roof support.
Loads that cause the entire truss to bend are converted into tensile and
compressive forces in the members.
compression
tension
Fig. 2-1
Loading causes bending of
truss, which is develops
compression in top
members, tension in
bottom members.
2
2.2 TYPES OF TRUSSES AND ITS APPLICATION
2.2.1 Roof trusses
Often used as part of an industrial building frame as shown in Fig. 2-2.
Fig. 2-2
The roof load is transmitted to the truss at the joints by series of purlins.
Generally, the roof trusses are supported either by columns of wood, steel or
reinforced concrete.
The roof truss along with its supporting columns called as a bent.
To keep the bent rigid and capable of resisting horizontal wind forces, knee
braces are sometimes used at the supporting columns.
The space between adjacent bents is called a bay. Bays are often tied
together using diagonal bracing to maintain rigidity of the structure.
The gusset plate is the connections which formed by bolting or welding at
the ends of the members to a common plate.
Fig. 2-3 : Gusset plate
Trusses used to support roofs are selected on the basis of the span, the slope
and the roof material.
Some of common types of trusses are displayed in the Fig. 2-4.
3
Fig. 2-4: Common types of plane trusses
2.2.2 Bridge trusses
The main structural elements of a typical bridge truss are shown in Fig. 2-5.
Fig. 2-5 : The structure elements of typical bridge truss
The load on the deck is first transmitted to stringers then to floor beam and
finally to the joints of the two supporting side trusses.
4
The top and bottom cords are connected by top and bottom lateral bracing
which serves to resist the lateral forces caused by wind and the sidesway
caused by moving vehicles.
Additional stability is provided by the portal and sway bracing.
The typical forms of bridge trusses currently used for single span are shown
in Fig. 2-6.
Fig. 2-6 : The forms of bridge trusses
2.3 ASSUMPTIONS IN ANALYSIS
The assumptions are necessary to determine the force developed in each
member when the truss is subjected to a given loading.
Fig. 2-7 : Truss member
C A to C,
C to B,
B to A
the connection
between them
is called as
truss member
5
the assumptions are;
i) All members are connected at both ends by smooth frictionless pins.
ii) All loads are applied at joints (member weight is negligible).
ASK STUDENTS:
Why the analysis assume that the smooth pin is frictionless?
Why the analysis assume that the member weight is negligible?
Because of these two assumptions, each truss acts as an axial force member
and the forces acting at the ends of the member must be directed along axis of
the member.
If the force tends to elongate the member, it is tensile force (T) as shown in
Fig. 2-8.
If the force tends to shorten the member, it is compressive force (C).
In analysis it is important to state whether the force is tensile or compressive.
The forces inside the member and outside should opposite
Fig. 2-8 : The tensile and compressive force
2.4 STABILITY AND DETERMINACY
2.4.1 General
The structures mechanics involves determination of unknown forces on the
structures.
Some of these structures can be completely analyzed by using the equations
of equilibrium.
ΣFx = 0 (F = F)
ΣFy = 0 (F = F )
ΣMz =0 (M = M)
On the other hand, if there exist extra redundant reaction components, then
the structure is said to be statically indeterminate.
T T
C C
Smooth pin
The structures are known as statically determinate.
6
2.4.2 Determinacy Criteria for Structures
To be in a state of static equilibrium, a structure must meet the requirements
of stability.
A statically indeterminate structure is a structure that had more unknown
forces.
Eg; ( to determine whether the truss is determinate or indeterminate)
For a pinned joint frame (trusses);
i) m+r = 2j ……just stiff (statically determinate)
ii) m+r < 2j ……under stiff (form a mechanism)…unstable
(it will collapse since there will be an insufficient number of bars @
reactions to constraint all the joints).
iii) m+r > 2j ……over stiff (statically indeterminate)
A truss can be unstable if it is statically determinate or statically
indeterminate.
A truss is externally unstable if all of its reaction is concurrent or parallel.
7
EXAMPLE 2.1
Determine number of redundant and state the determinacy criteria for the truss as shown
below;
a)
m=10
r =3
j =6
n= m + r – 2j
= 10 + 3 – 2(6)
m + r = 13 = 1…..has a redundancy of 1th degree
2j = 12
=m+r > 2j ….over stiff (statically indeterminate)
b)
EXAMPLE 2.2
Define whether the truss is statically determinate or indeterminate
m = 7 m+r = 2j
r = 3 7 + 3 = 2(5)
j = 5 10 = 10 …….statically determinate truss
But this truss is unstable since the support reactions are parallel.
m = 7 m+r = 2j
r = 3 7 + 3 = 2(5)
j = 5 10 = 10 …….statically determinate truss
But this truss unstable since the support reactions are concurrent.
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2.5 METHOD OF JOINTS
Determine whether the truss is determinate or indeterminate.
m = 3
r = 3
j = 3
m+r =2j
3+3 = 2(3)
6 = 6 ……the truss is determinate and stable.
EXERCISE 2.1
EXAMPLE 2.3
Calculate all member forces
by using method of joints.
VC VA
HA
(a)
(b)
(c)
(d)
9
Calculate the support reactions.
change the direction;
Calculate all member forces
Joint A
Joint C
F = F H = H
0 kN = VA + VC 500 N = HA
+ M = 0
MA = VC ( 2) + 500 (2)=0
VC = - 500N ( )
VA -500 = 0
VA = 500N( )
-ve sign indicated that the original direction is upward
VC = 500N ( )
FAB
FCB
500
500
↑ ΣFy = ↓ ΣFy
500 + FCB sin 45 = 0
= - 707 N (C)
ΣFx → = ← ΣFx
↑ ΣFy = ↓ ΣFy
FAB = 500N (T)
10
NOTES:
-ve sign indicated the force tends to shorten the member,
so the force is compression.
How? All loads are assumed moved outward from the
joint.
B The calculation shows the force is
compression, so;
C
Change the direction;
To stabilize inside the member;
To stabilize inside and outside the member;
The loads should be
opposite at joint
CHECKING :
(707)
500
Joint B:
ΣFx → = ← ΣFx
500 =707 sin 45
0 = 0 (BALANCE)
500
11
Procedure for Analysis:
The following procedures can be used as the guidance to solve the problems using the
method of joints.
Determine the truss is determinate or indeterminate by using the stability and
determinacy equation.
Calculate the support reactions if necessary.
Draw the free-body diagram of a joint having at least one known force and at most
two unknown forces. If the joint is located at the supports, it may be necessary to
find the external reactions at the support.
All loads are assumed moved outward from the joint.
The x and y axes can be resolved into their x and y components. Two force
equilibrium equations ΣFx =0 and ΣFy =0 are applied.
Continue to analyze the member forces at the other joints where again it is
necessary to choose a joint having at most two unknowns and at least one known
force.
Indicate whether the member in compression or tension.
EXAMPLE 2.4
Determine the support reactions and member forces using method of joints. All members
are connected at both ends by smooth frictionless pins.
A
C D
E
B
F
8 kN
6 kN
VA VB
HA
4m 5m 4m
5m
12
Solution;
Determine the truss is determinate.
Calculate the support reactions.
[Ans: VA = 3.2 kN( ), VB = 4.8kN( ), HA = 6 kN( )]
Calculate the member forces
Joint A
Joint F
FFE = 8.6 kN (T)
FFC = 8 kN (T)
Joint C
FAF
FAC
θ
3.2
6
tan θ = 5/4
θ = 51.34°
↑ ΣFy = ↓ ΣFy
3.2 + FAC sin 51.34 = 0
FAC = - 4.1 kN (C)
ΣFx → = ← ΣFx
FAF + FAC cos 51.34 = 6
FAF = 8.6 kN (T)
-4.1
8.6
8
FFC
FFE
θ1
θ2
FCD
FCE
8 -4.1
6
tan θ2 = 4/5
θ = 38.66°
tan θ1 = 5/5
θ = 45°
↑ ΣFy = ↓ ΣFy
0 = 8 + FCE sin 45 + (-4.1) cos 38.66
0.707 FCE = -4.8
FCE = -6.8 kN (C)
ΣFx → = ← ΣFx
FCD + FCE cos 45 + 6 = (-4.1) sin 38.66
FCD + 1.19 = -2.56
FCD = -3.75 kN (C)
-6.8
13
Joint B
Joint D
CHECKING:
FBD
tan θ= 5/4
θ= 51.34°
θ
FBE
4.8
↑ ΣFy = ↓ ΣFy
4.8 + FBD sin 51.34 = 0
FBD = - 6.15 kN (C)
ΣFx → = ← ΣFx
0 = FBE + FBD cos 51.34
FBE = 3.84 kN (T)
-6.15
-3.75
θ
θ = 180-90
-51.34
=38.66° -6.15
FDE
↑ ΣFy = ↓ ΣFy
0 = FDE + (-6.15) cos 38.66
FDE = 4.8 kN (T)
A
C D
E
B
F
8 kN
6 kN
(3.75)
8.6 8.6 3.84
(6.15)
8
(4.1) (6.8)
4.8
Checking:
Joint E
ΣFx → = ← ΣFx
3.84 + 6.8 cos 45 = 8.6
8.6 = 8.6
(BALANCE)
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EXERCISE 2.2
Determine the support reactions and member forces of GF, EF, GE, HG, HD, GD and HI.
The method of joints is selected to solve the problem.
[VK = 0kN, VA = 7kN (↑), HK = 9.6kN (←), HA = 9.6kN (→)]
EXERCISE 2.3
A pin-connected truss is loaded and supported as shown in figure;
a) prove that the plane truss is a statically determinate structure.
b) determine all member forces by using Method of Joint.
[Ans: FAC = 33.33kN (T), FAB = 6.66kN (C), FDC =26.67kN (T), FBC = 20kN (T)]
HK
HA
VK
VA
15
5
HD: ?
15 = 6
5 ?
? = 2m
6
3m
15
2.6 METHOD OF SECTIONS
EXAMPLE 2.6
Solution;
Prove the truss is statically determinate.
Calculate the support reaction if necessary.
Cut the section of the truss through the members where forces are to be determined.
Choose one section whether left or right sections. If choose right section, the
external reactions at support have to calculate.
Determine the forces of member BC, CG and FG by using method of section. Prove
the truss is statically determinate. State whether the members are in tension or
compression.
C
2m
All member loads
are assumed
moved outward
from the ‘cut’.
FBC
FGC
FGF
16
Calculate the member forces.
Procedure for Analysis:
The following procedure provides the guidance to determine the forces in the members of a
truss by using the method of sections.
Determine the truss is determinate or indeterminate by using the stability and
determinacy equation.
Calculate the support reactions if necessary.
Make a decision as to how to ‘cut’ the truss through the members where forces are
to be determined.
Draw the free-body diagram of the part of the section truss whether left or right
section which has the least number of forces on it.
Moments should be summed about a point that lies at the intersection of the lines of
action of two unknown forces. The third unknown force is determined directly from
the equation.
+ MG = 0
FBC (2) – 100 (2) = 0
FBC = 100 N (T)
↑ ΣFy = ↓ ΣFy
FGC sin 45 = 100
FGC = 141.42 N (T)
+ MC = 0
-FGF (2) – 100 (4) = 0
FGF = - 200 N (C)
Checking:
↑ ΣFy = ↓ ΣFy
FGC sin 45 = 100
100 = 100 (BALANCE)
141.42
17
EXAMPLE 2.7
Determine the force in members CA, CF and FE of the bridge truss by using method of
section. State whether the members are in tension of compression. The support reactions
have been calculated.
4m 4m 4m
Solution:
6kN
3.2kN 4.8kN
A
C D
E
B F
8 kN
6 kN
A
C D
E B
F
8
kN
6
kN
Choose the left section
+ MC = 0
-FFE (5) + 3.2 (4)+ 6(5) = 0
FFE = 8.6kN (T)
+ MA = 0
-FFC (4) + 8 (4) = 0
FFC = 8 kN (T)
↑ ΣFy = ↓ ΣFy
3.2 + 8 + FAC sin 51.34 = 8
FAC = - 4.1 kN (C)
5m
C
FAC
FFC
6
A FFE
3.2 8
18
EXAMPLE 2.8
Determine the member forces of HI, ID and CD by using the method of sections.
Solution:
I
Choose right section
tan θ = 5/15
θ = 18.43°
tan θ = 2/3
θ =33.7°
FHI
FDI
FDC
+ MI = 0
FDC sin 18.43(9) + 1(6) + 2(3)= 0
FDC = -4.22 kN (C)
↑ ΣFy = ↓ ΣFy
FDI cos 56.3 = 1+2 + FDC cos 71.6
0.55 FDI = 1.668
FDI = 3kN(T)
+
MD = 0
-FHI (2) + 1(3) = 0
FHI = 1.5 kN (T)
-4.22
15 = 6 = 9
5 HD IC
HD = 2m, IC = 3m
tan θ = 3/1
θ =71.6º
19
EXAMPLE 2.9
Determine the force in members HG, BC and BG of the truss. State whether the members
are in tension or compression.
6 kN 8 kN 2 kN
3m 3m 3m 3m
Solution;
Determine the truss is statically determinate.
Calculate the support reactions.
[Ans: VA = 9 kN (↑),VE = 7 kN (↑)]
Cut the section of the truss through the members where forces are to be determined.
6 kN 8 kN 2 kN
3m 3m 3m 3m
20
Choose one section whether left or right sections.
G
A B
9kN 6kN
Calculate the member forces.
+ MB = 0
(9) 3 + FHG cos 26.6(3) = 0
2.68 FHG = -27
FHG = - 10.1 kN (C)
↑ ΣFy = ↓ ΣFy
9 + FHG sin 26.6 + FBG sin 56.3 = 0
9-4.5-6 = -0.832 FBG
FBG = 1.8 kN(T)
+
MG = 0
9(6) – 6(3) –FBC (4.5) = 0
FBC = 8 kN (T)
FHG
FBG
FBC
θ2
θ3= θ2
tan θ1 = 4.5/3
= 56.3º
tan θ2 = 1.5/3
= 26.6º
-10.1
θ1
21
EXERCISE 2.4
A pin-connected compound truss is loaded and supported shown in figure, calculate the
member forces of HG, JC and BC by using the method of section
[Ans: FJC = 1.15kN (T), FBC = 2.9kN (T), FHG = 3.47kN (C)]
2.7 ALTERNATIVE COMPUTATION USING JOINT EQUILIBRIUM METHOD
An alternative method can be applied to determine the member forces. The purpose is
to reduce the time calculation. If the problems stated need to solve by using the
method of joint or method of section, please follow the instruction.
EXAMPLE 2.10
Calculate all member forces.
A
D
E
B
8 kN
6 kN
VA VB
HA
4m 5m 4m
5m
22
A
C D
E
B
F
8 kN
6 kN
Solution;
The calculation can be started at joint A or B.
6
3.2 4.8
1st
4.8 x
EB
x
DE
8.4
45
8.4 x
x = 3.84
x =
FBD
FBD= 22 8.484.3
= 6.15 kN
Opposite direction
A
C D
E
B
F
8 kN
6 kN 2nd
A
C D
E
B
F
8 kN
6 kN
FBD
4.8
3.84
4.8
3.84
4.8
3rd
4th
3.84
5th
x
55
8.4 x
x = 4.8
x =
FCE
FCE= 22 8.48.4
= 6.8 kN
6th
= (to balance)
FEF= 8.6kN
3.84
4.8
7th
FEF= FFA =8.6kN
8th
FCF =8 kN
FE
x
DE
8.4
4.8
3.84
4.8
4.8
23
6
8.6
6 3.2
= 8.6
so
8.6 - 6 = 2.6
2.6 + 6
4.8
= (to balance)
FCD =3.8 kN
10th
9th
y
CF
y
AF
6.2
54
6.2 y
y = 3.25
x =
2.6
FAC= 22 6.225.3
= 4.16 kN
9th
4.8 2.6
10th FCD
A
C D
E
B
8 kN
6 kN
24
TUTORIAL 2.1
1. The pin-jointed truss shown in figure is subjected to a uniformly distributed load of
40kN/m along member CD and a vertical point load of 90kN at D.
a) Determine the reactions at A and F.
b) Determine the forces in member BC, BE and EF by using the method of joint.
c) Calculate the forces in member’s CD and DE using the method of section.
[Ans: VA = 98.89kN (↓),VF = 374.89kN (↑), FDE = 330 kN (C), FEF = 435 kN (C)]
2. The truss shown in figure is loaded with concentrated loads at B, D, E and G. The truss
is pinned to the foundation at A and supported on rollers at F. Determine the internal
forces in members LK, LC and BC using the method of joint and checks your answers
using the method of section. State if the forces are tensile or compressive.
[Ans: FBC = 36 kN (T)]
40kN/m
90kN
30kN 30kN 30kN 30kN
25
3. Figure shows a pin-jointed plane truss pinned at A and supported on rollers at B.
Determine the forces in each member of the truss by using the method of joint.
Recalculate the force in member BC by using the method of section.
[Ans: FAC = 117.24kN (C), FAB = 38.14kN (T), FDE = 141.5 kN (T), FBD = 88.8kN (T)]
4. A pin-jointed is supported on roller support and pinned support at A and Brespectively
as shown in figure. Determine the forces in each member of the truss by using the
method of joint. Recalculate the force in members AB and DE by using the method of
section.
[Ans: FAB= 5.3kN (C), FED = 20kN (C), FEB = 26.51 kN (C), FDC = 20kN (C)]
30kN
60kN
20kN
30kN
26
5. (a) List two assumptions of analysis to determine the member’s force of the truss.
(b) Identify each of the trusses in Figure Q5(a) to Q5(d) as a determinate or statically
indeterminate and stable or unstable.
(c) In Figure Q5(e), a statically determinate pin-jointed plane truss is pinned at A and
supported on rollers at B. It carries two loads of 5000kg at joints F and G.
(i) Prove that the plane truss is a statically determinate structure.
(ii) Using the method of joint determine all member forces.
(iii) Using the method of section, determine the member forces of CD and FG.
L= 5m for each member.
Figure Q5(a) Figure Q5(b)
Figure Q5(c) Figure Q5(d)
5000kg 5000kg
Figure Q5(e)
27
6. The pin-jointed plane frame shown in figure carries a vertical load 10 kN at D. The
frame is supported by a hinge at support A and by a roller support at B. The roller
support at B is designed to ensure that the raction at B is in the direction BC.
(a) Determine the reaction at support A and B.
(b) Determine the internal force in all member.
REFERENCES
1. R.C. Hibbeler, Structural Analysis, 10th Edition, 2020.
D
A B
C 10kN
4m
3m 8m
2m
2m