Shear Force and Bending Moments
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Shear Force and Bending Moments Consider a section x-x at a distance 6m from left hand support A 5kN 10kN 8kN 4m 5m 5m 1m A C D B R A = 8.2 kN R B =14.8kN E x x 6 m Imagine the beam is cut into two pieces at section x-x and is separated, as shown in figure
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6 m. x. x. R A = 8.2 kN. R B =14.8kN. Shear Force and Bending Moments. Consider a section x-x at a distance 6m from left hand support A. 10kN. 5kN. 8kN. B. A. C. E. D. 4m. 5m. 5m. 1m. - PowerPoint PPT Presentation
Transcript of Shear Force and Bending Moments
Shear Force and Bending Moments
Consider a section x-x at a distance 6m from left hand support A
5kN 10kN 8kN
4m 5m 5m 1m
AC D
B
RA = 8.2 kN RB=14.8kN
Ex
x
6 m
Imagine the beam is cut into two pieces at section x-x and is separated, as shown in figure
To find the forces experienced by the section, consider any one portion of the beam. Taking left hand portion
Transverse force experienced = 8.2 – 5 = 3.2 kN (upward)
Moment experienced = 8.2 × 6 – 5 × 2 = 39.2 kN-m (clockwise)
If we consider the right hand portion, we get
Transverse force experienced = 14.8 – 10 – 8 =-3.2 kN = 3.2 kN (downward)
Moment experienced = - 14.8 × 9 +8 × 8 + 10 × 3 = -39.2 kN-m = 39.2 kN-m
(anticlockwise)
5kNA
8.2 kN
10kN 8kN B
14.8 kN
4 m
6 m
9 m
1 m5 m
5kNA
8.2 kN10kN 8kN B
14.8 kN
3.2 kN
3.2 kN
39.2 kN-m
39.2 kN-m
Thus the section x-x considered is subjected to forces 3.2 kN and moment 39.2 kN-m as shown in figure. The force is trying to shear off the section and hence is called shear force. The moment bends the section and hence, called bending moment.
Shear force at a section: The algebraic sum of the vertical forces acting on the beam either to the left or right of the section is known as the shear force at a section.
Bending moment (BM) at section: The algebraic sum of the moments of all forces acting on the beam either to the left or right of the section is known as the bending moment at a section
3.2 kN
3.2 kN
F
F
Shear force at x-x
M
Bending moment at x-x
39.2 kN
Moment and Bending moment
Bending Moment (BM): The moment which causes the bending effect on the beam is called Bending Moment. It is generally denoted by ‘M’ or ‘BM’.
Moment: It is the product of force and perpendicular distance between line of action of the force and the point about which moment is required to be calculated.
Sign convention for bending moments:
The bending moment is considered as Sagging Bending Moment if it tends to bend the beam to a curvature having convexity at the bottom as shown in the Fig. given below. Sagging Bending Moment is considered as positive bending moment.
Fig. Sagging bending moment [Positive bending moment ]
Convexity
Sign convention for bending moments:Similarly the bending moment is considered as
hogging bending moment if it tends to bend the beam to a curvature having convexity at the top as shown in the Fig. given below. Hogging Bending Moment is considered as Negative Bending Moment.
Fig. Hogging bending moment [Negative bending moment ]
Convexity
Shear Force and Bending Moment Diagrams (SFD & BMD)Shear Force Diagram (SFD):
The diagram which shows the variation of shear force along the length of the beam is called Shear Force Diagram (SFD).
Bending Moment Diagram (BMD):
The diagram which shows the variation of bending moment along the length of the beam is called Bending Moment Diagram (BMD).
Point of Contra flexure [Inflection point]: It is the point on the bending moment diagram
where bending moment changes the sign from positive to negative or vice versa.
It is also called ‘Inflection point’. At the point of inflection point or contra flexure the bending moment is zero.
Example Problem 1
E
5N 10N 8N
2m 2m 3m 1m
AC D
B
1. Draw shear force and bending moment diagrams [SFD and BMD] for a simply supported beam subjected to three point loads as shown in the Fig. given below.
E
5N 10N 8N
2m 2m 3m 1m
AC D
B
Solution:
Using the condition: ΣMA = 0
- RB × 8 + 8 × 7 + 10 × 4 + 5 × 2 = 0 RB = 13.25 N
Using the condition: ΣFy = 0
RA + 13.25 = 5 + 10 + 8 RA = 9.75 N
RA RB
[Clockwise moment is Positive]
Shear Force at the section 1-1 is denoted as V1-1
Shear Force at the section 2-2 is denoted as V2-2 and so on...
V0-0 = 0; V1-1 = + 9.75 N V6-6 = - 5.25 N
V2-2 = + 9.75 N V7-7 = 5.25 – 8 = -13.25 N
V3-3 = + 9.75 – 5 = 4.75 N V8-8 = -13.25
V4-4 = + 4.75 N V9-9 = -13.25 +13.25 = 0
V5-5 = +4.75 – 10 = - 5.25 N (Check)
5N 10N 8N
2m 2m 3m 1mRA = 9.75 N RB=13.25N
11
12
2
3
3
4
4
5
5
6
6
7
7
8 9
8 9
0
0
Shear Force Calculation:
5N 10N 8N
2m 2m 3m 1m
AC D E
B
9.75N 9.75N
4.75N 4.75N
5.25N 5.25N
13.25N 13.25N
SFD
5N 10N 8N
2m 2m 3m 1m
AC D E
B
9.75N 9.75N
4.75N 4.75N
5.25N 5.25N
13.25N 13.25N
SFD
Bending moment at A is denoted as MA
Bending moment at B is denoted as MB
and so on…
MA = 0 [ since it is simply supported]
MC = 9.75 × 2= 19.5 Nm
MD = 9.75 × 4 – 5 × 2 = 29 Nm
ME = 9.75 × 7 – 5 × 5 – 10 × 3 = 13.25 Nm
MB = 9.75 × 8 – 5 × 6 – 10 × 4 – 8 × 1 = 0
or MB = 0 [ since it is simply supported]
Bending Moment Calculation
5N 10N 8N
2m 2m 3m 1m
19.5Nm
29Nm
13.25Nm
BMD
A B
C D E
E
5N 10N 8N
2m 2m 3m 1m
AC D
B
BMD
19.5Nm
29Nm13.25Nm
9.75N 9.75N
4.75N 4.75N
5.25N 5.25N
13.25N 13.25N
SFD
Example Problem 1
VM-34
BMD
19.5Nm
29Nm13.25Nm
E
5N 10N 8N
2m 2m 3m 1m
AC D
B
9.75N 9.75N
4.75N 4.75N
5.25N 5.25N
13.25N 13.25N
SFD
10kN 16kN
1m
A B
2. Draw shear force and bending moment diagrams [SFD and BMD] for a simply supported beam subjected to loading as shown in the Fig. given below. Also locate and determine absolute maximum bending moment.
4kN/m
1m 1m 1m2m
600
[Ans: Absolute maximum bending moment = 22.034kNm
Its position is 3.15m from Left hand support ]
Exercise Problems VM-74
