One mole of a diatomic gas undergoes a process `P = P_(0)//[1 + (V//V_(0))^(3)]` where `P_(0)` and `V_(0)` are constant. The translational kinetic energy of the gas when `V = V_(0)` is given by

One mole of an ideal gas undergoes a process p=(p_(0))/(1+((V_(0))/(V))^(2)) . Here, p_(0) and V_(0) are constants. Change in temperature of the gas when volume is changed from V=V_(0) to V=2V_(0) is

A gas has volume V and pressure p . The total translational kinetic energy of all the molecules of the gas is

One mole of an ideal monatomic gas undergoes the process P=alphaT^(1//2) , where alpha is constant . If molar heat capacity of the gas is betaR1 when R = gas constant then find the value of beta .

The pressure of an ideal gas varies according to the law P = P_(0) - AV^(2) , where P_(0) and A are positive constants. Find the highest temperature that can be attained by the gas

One mole of hydrogen, assumed to be ideal, is adiabatically expanded from its initial state (P_(1), V_(1), T_(1)) to the final state (P_(2), V_(2), T_(2)) . The decrease in the internal energy of the gas during this process will be given by

One mole of an ideal monoatomic gas at temperature T_0 expands slowly according to the law p/V = constant. If the final temperature is 2T_0 , heat supplied to the gas is

Heart leaks into a vessel, containing one mole of an ideal monoatomic gas at a constant rate of (R )/(4)s^(-1) where R is universal gas constatant. It is observed that the gas expands at a constant rate (dV)/(dt) = (V_(0))/(400("second")) where V_(0) is intial volume. The inital temperature is given by T_(0)=40K . What will be final temperature of gas at time t = 400 s .

Draw P-V curves for isothermal and adiabatic processes of an ideal gas.

Write the kinetic energy of a body of momentum p and velocity v.

Consider that an ideal gas (n moles) is expanding in a process given by p = f (V), which passes through a point (V_0, p_0) . Show that the gas is absorbing heat at (p_0, V_0) if the slope of the curve p =f (V) is larger than the slope of the adiabatic passing through (p_0,V_0) .