Show that the entropy of a perfect gas is given by `S=C_(V) In T+R In V+S_(0)`

The internal energy of a gas is given by U = 3 pV. It expands from V_(0) to 2V_(0) against a constant pressure p_(0) . What is the value of gamma(=C_(P)//C_(V)) for the given gas?

One mole of an ideal gas goes through a process in which the entropy of the gas changes with temperature T as S = aT + C_V 1n T , where a is a positive constant. C_V is the molar heat capacity of this gas at constant volume. Find the volume dependence of the gas temperature in this process if T = T_0 at V = V_0 .

The voltage supplied to a circuit is given by V=V_(0)t^(3/2) , where t is time in second. Find the rms value of voltage for the period, t=0 to t=1s.

For a sample of n mole of a perfect gas at constant temperature T (K) when its volume is changed from V_1 to V_2 the entropy change is given by

Entropy is a measure of randomess of system. When a liquid is converted to the vapour state entropy of the system increases. Entropy in the phase transformation is calculated using Delta S = (Delta H)/(T) but in reversible adiabatic process Delta S will be zero. The rise in temperature in isobaric or isochoric process increases the randomness of system, which is given by Delta S = "2.303 n C log"((T_(2))/(T_(1))) C = C_(P) or C_(V) Entropy change in a reversible adiabatic process is

A particle in moving in a straight line such that its velocity is given by v=12t-3t^(2) , where v is in m//s and t is in seconds. If at =0, the particle is at the origin, find the velocity at t=3 s .