One mole of an ideal gas undergoes a process
` p=(p_(0))/(1+((V)/(V_(0)))^(2))`
where `p_(0)` and `V_(0)` are constants. Find temperature of the gaas when `V=V_(0)`.

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

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)-alphaV^(2) where alpha and P_(0) are positive constant and V is the volume of one mole of gas Q. When temperature is maximum, volume is

One mole of an ideal gas undergoes a process P=P_(0)-alphaV^(2) where alpha and P_(0) are positive constant and V is the volume of one mole of gas Q. When temperature is maximum, volume is

One mole of an ideal gas undergoes a process P=P_(0)-alphaV^(2) where alpha and P_(0) are positive constant and V is the volume of one mole of gas Q. The maximum attainable temperature is

One mole of an ideal gas undergoes a process in which T = T_(0) + aV^(3) , where T_(0) and a are positive constants and V is molar volume. The volume for which pressure with be minimum is

One mole of an ideal gas undergoes a process in which T = T_(0) + aV^(3) , where T_(0) and a are positive constants and V is molar volume. The volume for which pressure with be minimum is

If n moles of an ideal gas undergoes a thermodynamic process P=P_0[1+((2V_0)/V)^2]^(-1) , then change in temperature of the gas when volume is changed from V=V_0 to V=2V_0 is [Assume P_0 and V_0 are constants]

An ideal gas is made to undergo a process T = T_(0)e^(alpha V) where T_(0) and alpha are constants. Find the molar specific heat capacity of the gas in the process if its molar specific heat capacity at constant volume is C_(v) . Express your answer as a function of volume (V).

One mole of an ideal gas passes through a process where pressure and volume obey the relation P=P_0 [1-1/2 (V_0/V)^2] Here P_0 and V_0 are constants. Calculate the change in the temperature of the gas if its volume changes from V_0 to 2V_0 .