The equation for real gas is given by $ \left( P + \frac{a}{V^2} \right)(V - b) = RT $, where $ P $, $ V $, $ T $, and $ R $ are the pressure, volume, temperature and gas constant, respectively. The dimension of $ ab $ is equivalent to that of:

Question

If angular position of a particle is given by $\theta = \frac{t^4}{4} + t^2$. Find angular acceleration at $t = 1s$:

Answer 1

Given the equation $ \left( P + \frac{a}{V^2} \right)(V - b) = RT $, the dimensions of each variable are determined as follows: \[ [a] = \left[ P \right] \left[ V \right]^2 = ML^{-1}T^{-2}L^2 = M L T^{-2} \] \[ [b] = [V] = L^3 \] Consequently, $ [ab] = (M L T^{-2})(L^3) = M L^4 T^{-2} $.
Therefore, the dimensions of $ ab $ are equivalent to the dimension of compressibility.

The equation for real gas is given by $ \left( P + \frac{a}{V^2} \right)(V - b) = RT $, where $ P $, $ V $, $ T $, and $ R $ are the pressure, volume, temperature and gas constant, respectively. The dimension of $ ab $ is equivalent to that of:

Show Hint

The Correct Option is B

Solution and Explanation

Top Questions on Dimensional analysis

Questions Asked in JEE Main exam