For the state of stress shown
a) Draw Mohr’s circle that describes this state of stress. b) Use Mohr’s circle to determine the principal stresses and show them on a properly oriented element. c) Use Mohr’s circle to determine the equivalent state of stress if the element is rotated 60° clockwise and show them on a properly oriented element The use of stress transformation equations is not accepted
The Correct Answer and Explanation is :
Step-by-step guide:
a) Draw Mohr’s Circle
- Identify the components of the stress tensor:
- For Mohr’s Circle, the stress components that you need are:
- Normal stresses: σ_x and σ_y
- Shear stress: τ_xy (or τ_yx since τ_xy = τ_yx by symmetry).
- Plot the center of Mohr’s Circle:
The center of Mohr’s circle is given by:
[
C = \frac{\sigma_x + \sigma_y}{2}
]
- This is the average normal stress on the element.
- Plot the radius:
The radius of the circle is given by:
[
R = \sqrt{\left( \frac{\sigma_x – \sigma_y}{2} \right)^2 + \tau_{xy}^2}
] - Draw the circle:
The Mohr’s Circle is drawn on a coordinate plane with the horizontal axis representing normal stresses (σ), and the vertical axis representing shear stresses (τ). The circle is centered at (C) and has a radius (R).
b) Determine Principal Stresses
- The principal stresses, ( \sigma_1 ) and ( \sigma_2 ), are found where the Mohr’s Circle intersects the horizontal axis (σ-axis). These points correspond to:
[
\sigma_1 = C + R, \quad \sigma_2 = C – R
] - The principal stresses are shown on the element at the angles that make the shear stress zero.
c) Determine the Equivalent State of Stress after a 60° Clockwise Rotation
- The state of stress after rotation can be found by rotating the Mohr’s Circle by 2θ, where θ is the angle of rotation of the element.
- For a 60° clockwise rotation, the angle on Mohr’s Circle is 120° counterclockwise.
- This rotation will change the values of σ and τ at the new position.
Would you like me to create a Mohr’s Circle based on these instructions? If you can provide the stress components (σ_x, σ_y, and τ_xy), I can generate the circle and stress elements.