Chapter 4.1:Shear and

Moment Diagram

Chapter 5:

Stresses in

Beams

Chapter 6:

Classical

Methods

Beam Types

Generally, beams are classified according to how the

beam is supported and according to cross-

section variance.

A beam maybe determinate or indeterminate

depending on the support conditions.

Determinacy pertains to the complexity of analysis of

a particular beam with loadings.

Determinate beams are beams whose support

reactions may easily be determined from

equations of equilibrium.

Indeterminate beams are beams whose support

reactions cannot all be determined from conditions

of equilibrium.

“Determinate Beams”

1. Simply Supported

2. Cantilever

3. Overhanging Beams

“Indeterminate Beams”1. Propped Beams

2. Restrained Beams

3. Continuous Beams

“Beam Shear and Bending Moment”

Beam shear simply relates the transverse loads and reactions

along the beam.

Bending Moment is the moment reaction of the beam against

flexure or bending.

To determine the beam shear and bending moment along any

part of the beam, pass a cutting plane normal to the beam.

Shear and Moment Equations and Diagrams

Shear and Moment on beams can be determined from using

equations or from diagrams – the latter being the preferred

option.

Again, in order to determine the shear and moment for specific

parts or segments of the beam, a cutting plane must be

passed through beam.

To determine the shear at the cut section, employ summation

of forces. To determine moment at the cut section, take

summation of moment about the cut section itself.

For the diagrams, it is important to remember that the shear

diagram is higher than the load diagram by one

mathematical degree.

Consequently, the moment diagram is also higher than the

shear diagram by one mathematical degree.

“Beam Shear and Bending Moment”

However, some conventions must be established:

( + ) Positive

( - ) Negative

Conventions and other rules regarding the shear and moment

diagram are best discussed in the proceeding examples.

For Positive (+) Conventions, (1) Shear Forces that tend to bend a beam element clockwise.(2) Bending moments that tend to bend a beam element

concave upward (the beam “smiles”).

( + ) Positive

Conventions and other rules regarding the shear and moment

diagram are best discussed in the proceeding examples.

( - ) Negative

For Negative (-) Conventions, (1) Shear Forces that tend to bend a beam element counter clockwise.(2) Bending moments that tend to bend a beam element

concave downward (the beam “sad face”).

Example : Determine the shear and moment equations of

the beam given below and draw the shear andmoment diagrams.

A CB

14 kN

2 m 3 m 2 m

D

28kN

Example : Determine the shear and moment equations of

the beam given below and draw the shear andmoment diagrams.

A B

16 kN.m

3 m 1 m

C

Example : Determine the shear and moment equations of

the beam given below and draw the shear andmoment diagrams.

A CA

20 kN

2 m 4 m

15 kN/mB

Example : Determine the shear and moment equations of

the beam given below and draw the shear andmoment diagrams.

A B

20 kN/m

3m

Example : Determine the shear and moment equations of

the beam given below and draw the shear andmoment diagrams.

A B

20 kN/m

3m

10 kN/m

Example : Determine the shear and moment equations of

the beam given below and draw the shear andmoment diagrams.

10 kN/m

A B

2m

10 kN.m

1m

Example : Determine the shear and moment equations of

the beam given below and draw the shear andmoment diagrams.

A DA

2 m 4 m

20 kN/mB C

2 m

Example : Determine the shear and moment equations of

the beam given below and draw the shear andmoment diagrams.

20 kN/m

A B

2m

10 kN

2m

10kN/m1m 1m

C

D E

Example : Determine the shear and moment equations of

the beam given below and draw the shear andmoment diagrams.

10 kN/m

10 kN/m5 kN

4m 3m 3m1m1m

AB

C

D

E F

Example : Determine the shear and moment equations of

the beam given below and draw the shear andmoment diagrams.

10 kN/m

A B

2m

1m

20 kN/m

Example : Draw the load and the bending moment

diagrams that correspond to the given shear forcediagram. Assume that no couples are applied to thebeam.

48 kN

-20 kN

28 kN

8 kN

-32 kN

X (m)

V (kN)

2m 2m 2m1m1m

Example : Draw the load and the bending moment

diagrams that correspond to the given shear forcediagram.

10 kN

20 kN

-30 kN

X (m)

V (kN)

2m 1m1.5 m

0.5 m1m