mechanical properties of solids is an important topic in the Physics section in MHT CET exam. Practising this topic will increase your score overall and make your conceptual grip on MHT CET exam stronger.
This article gives you a full set of MHT CET PYQs for mechanical properties of solids with explanations for effective preparation. Practice of MHT CET Physics PYQs including mechanical properties of solids questions regularly will improve accuracy, speed, and confidence in the MHT CET 2026 exam.
Also Read
MHT CET PYQs for mechanical properties of solids with Solutions
1.
The increase in pressure required to decrease the $ 200 \,L $ volume of a liquid by $ 0.008\% $ in $ kPa $ is (Bulk modulus of the liquid $ = 2100 \,MPa $ is)- $ 8.4 $
- $ 84 $
- $ 92.4 $
- $ 168 $
2.
A lift of mass $m$ is connected to a rope which is moving upward with maximum acceleration $a$. For maximum safe stress, the elastic limit of the rope, is $T$. The minimum diameter of the rope is (g = gravitational acceleration)- $\left[ \frac{2m (g + a)}{\pi T } \right]^{\frac{1}{2}}$
- $\left[ \frac{4m (g + a)}{\pi T } \right]^{\frac{1}{2}}$
- $\left[ \frac{m (g + a)}{\pi T } \right]^{\frac{1}{2}}$
- $\left[ \frac{2m (g + a)}{2 \pi T } \right]^{\frac{1}{2}}$
3.
If in a wire of Young�s modulus $ Y $ , longitudinal strain $ X $ is produced then the potential energy stored in its unit volume will be- $ 0.5 \,Y \,X ^2 $
- $ 0.5 \,Y^2 X $
- $ 2\,Y\,X^2 $
- $ Y\,X^2 $
4.
According to Hooke�s law of elasticity, if stress is increased, then the ratio of stress to strain- becomes zero
- remains constant
- decreases
- increases
5.
Which of the following relation is true?- $ Y = 2\eta\, \left(1 - 2\sigma\right) $
- $ Y = 2\eta\, \left(1 + 2\sigma\right) $
- $ Y = 2\eta\, \left(1 - \sigma\right) $
- $ \left(1 + 2\sigma\right) \,2\eta = Y $
6.
A 2 $\text{kg}$ mass is attached to a spring with spring constant $ k = 200, \text{N/m} $. If the mass is displaced by $ 0.1, \text{m} $, what is the potential energy stored in the spring?
- \( 1 \, \text{J} \)
- \( 0.5 \, \text{J} \)
- \( 2 \, \text{J} \)
- \( 0.2 \, \text{J} \)
Comments