MECHANICS OF MATERIALS
MECHANICS OF MATERIALS
11th Edition
ISBN: 9780137605521
Author: HIBBELER
Publisher: RENT PEARS
bartleby

Videos

Textbook Question
Book Icon
Chapter 10, Problem 1RP

In the case of plane stress, where the in-plane principal strains are given by ε1 and ε2, show that the third principal strain can be obtained from

ε 3 = v ( ε + ε 2 ) ( 1 v )

where v is Poisson’s ratio for the material.

Expert Solution & Answer
Check Mark
To determine

To show that: The third principal strain can be obtained from ε3=ν(ε1+ε2)(1ν).

Answer to Problem 1RP

The third principal strain can be obtained from ε3=ν(ε1+ε2)(1ν)_ is proved.

Explanation of Solution

Given information:

The third principal strain ε3=ν(ε1+ε2)(1ν)

Explanation:

For the case of plane stress σ3=0.

Apply the normal strain in x direction as shown below.

ε1=1E(σ1ν(σ2+σ3))

Here, E is the modulus of elasticity, σ1 is the normal stress in x direction, ν is the Poisson’s ratio, σ2 is the normal stress in y direction, and σ3 is the normal stress in z direction.

Substitute 0 for σ3.

ε1=1E(σ1ν(σ2+0))=1E(σ1νσ2)Eε1=σ1νσ2

Multiply both sides of the Equation by ν.

νEε1=(σ1νσ2)ν=νσ1ν2σ2 (1)

Apply the normal strain in y direction as shown below.

ε2=1E(σ2ν(σ1+σ3))

Substitute 0 for σ3.

ε2=1E(σ2ν(σ1+0))=1E(σ2νσ1)Eε2=σ2νσ1 (2)

Apply the normal strain in z direction as shown below.

ε3=1E(σ3ν(σ1+σ2))

Substitute 0 for σ3.

ε3=1E(0ν(σ1+σ2))=1E(ν(σ1+σ2)) (3)

Adding Equation (1) and (2).

νEε1+Eε2=(νσ1ν2σ2)+(σ2νσ1)=νσ1ν2σ2+σ2νσ1=σ2(1ν2)E(νε1+ε2)=σ2(1ν2)

σ2=E(1ν2)(νε1+ε2)

Substitute E(1ν2)(νε1+ε2) for σ2 in Equation (2).

Eε2=E(1ν2)(νε1+ε2)νσ1νσ1=E(1ν2)(νε1+ε2)Eε2

σ1=1ν(E(νε1+ε2)(1ν2)Eε2(1ν2))=Eν(1ν2)(νε1+ε2ε2+ν2ε2)=Eν(1ν2)(νε1+ν2ε2)=E(1ν2)(ε1+νε2)

Substitute E(1ν2)(νε1+ε2) for σ2 and E(1ν2)(ε1+νε2) for σ1 in Equation (3).

ε3=1E(ν(E(1ν2)(ε1+νε2)+E(1ν2)(νε1+ε2)))=νEE(1ν2)(ε1+νε2+νε1+ε2)=ν(1ν)(1+ν)((1+ν)ε1+(1+ν)ε2)=ν(1+ν)(1ν)(1+ν)(ε1+ε2)

ε3=ν(1ν)(ε1+ε2)

Therefore, the third principal strain can be obtained from ε3=ν(ε1+ε2)(1ν)_ is proved.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!
Students have asked these similar questions
الثانية Babakt Momentum equation for Boundary Layer S SS -Txfriction dray Momentum equation for Boundary Layer What laws are important for resolving issues 2 How to draw. 3 What's Point about this.
R αι g The system given on the left, consists of three pulleys and the depicted vertical ropes. Given: ri J₁, m1 R = 2r; απ r2, J2, m₂ m1; m2; M3 J1 J2 J3 J3, m3 a) Determine the radii 2 and 3.
B: Solid rotating shaft used in the boat with high speed shown in Figure. The amount of power transmitted at the greatest torque is 224 kW with 130 r.p.m. Used DE-Goodman theory to determine the shaft diameter. Take the shaft material is annealed AISI 1030, the endurance limit of 18.86 kpsi and a factor of safety 1. Which criterion is more conservative? Note: all dimensions in mm. 1 AA Motor 300 Thrust Bearing Sprocket 100 9750 เอ

Chapter 10 Solutions

MECHANICS OF MATERIALS

Ch. 10.5 - Determine (a) the principal strains at A, (b) the...Ch. 10.6 - For the case of plane stress, show that Hookes law...Ch. 10.6 - to develop the strain tranformation equations....Ch. 10.6 - Determine the associated principal stresses at the...Ch. 10.6 - Determine the applied load P. What is the shear...Ch. 10.6 - If a load of P = 3 kip is applied to the A-36...Ch. 10.7 - A material is subjected to plane stress. Express...Ch. 10.7 - A material is subjected to plane stress. Express...Ch. 10.7 - Solve Prob. 1061 using the maximum distortion...Ch. 10.7 - Solve Prob.1063 using the maximum distortion...Ch. 10.7 - Prob. 70PCh. 10.7 - The plate is made of Tobin bronze, which yields at...Ch. 10.7 - If a machine part is made of titanium (TI-6A1-4V)...Ch. 10.7 - The components of plane stress at a critical point...Ch. 10.7 - If Y = 50 ksi, determine the factor of safety for...Ch. 10.7 - Prob. 82PCh. 10.7 - If the yield stress for steel is Y = 36 ksi,...Ch. 10.7 - Prob. 84PCh. 10.7 - The state of stress acting at a critical point on...Ch. 10.7 - The shaft consists of a solid segment AB and a...Ch. 10 - In the case of plane stress, where the in-plane...Ch. 10 - The plate is made of material having a modulus of...Ch. 10 - If the material is machine steel having a yield...Ch. 10 - Determine if yielding has occurred on the basis of...Ch. 10 - The 60 strain rosette is mounted on a beam. The...Ch. 10 - Use the strain transformation equations to...Ch. 10 - If the strain gages a and b at points give...Ch. 10 - Use the strain-transformation equations and...Ch. 10 - Use the strain transformation equations to...Ch. 10 - Specify the orientation of the corresponding...
Knowledge Booster
Background pattern image
Mechanical Engineering
Learn more about
Need a deep-dive on the concept behind this application? Look no further. Learn more about this topic, mechanical-engineering and related others by exploring similar questions and additional content below.
Similar questions
SEE MORE QUESTIONS
Recommended textbooks for you
Text book image
Mechanics of Materials (MindTap Course List)
Mechanical Engineering
ISBN:9781337093347
Author:Barry J. Goodno, James M. Gere
Publisher:Cengage Learning
An Introduction to Stress and Strain; Author: The Efficient Engineer;https://www.youtube.com/watch?v=aQf6Q8t1FQE;License: Standard YouTube License, CC-BY