One mole of an ideal gas with adiabatic exponent `gamma` undergoes the process
(a) `P=P_0+(alpha)/(V)`
(b) `T=T_0+alphaV`
Find Molar heat capacity of the gas as a function of its volume.

One mole an ideal gas whose adiabatic exponent equals gamma undergoes a process p = p_0 + alpha//V , where p_0 and alpha are positive constants. Find : (a) heat capacity of the gas as a function of its volume , (b) the internal energy of heat transferred to the gas, of its volume increased from V_1 to V_2 .

One mole of an ideal gas with heat capacity at constant pressure C_p undergoes the process T = T_0 + alpha V , where T_0 and alpha are constants. Find : (a) heat capacity of the gas as a function of its volume , (b) the amount of heat transferred to the gas, if its volume increased from V_1 to V_2 .

An ideal gas with adiabatic exponent gamma = 4/3 undergoes a process in which internal energy is related to volume as U = V^2 . Then molar heat capacity of the gas for the process is :

An ideal gas with adiabatic exponent gamma = 4/3 undergoes a process in which internal energy is related to volume as U = V^2 . Then molar heat capacity of the gas for the process is :

One mole of an ideal monoatomic gas undergoes the process T=T_(0)+4V , where T_(0) is initial temperature. Find (i) Heat capacity of gas as function of its volume. (ii) The amount of heat transferred to gas if its volume increases from V_(0) to 4V_(0) .

One mole of an ideal monoatomic gas undergoes the process T=T_(0)+4V , where T_(0) is initial temperature. Find (i) Heat capacity of gas as function of its volume. (ii) The amount of heat transferred to gas if its volume increases from V_(0) to 4V_(0) .

Find the molar heat capacity of an ideal gas with adiabatic exponent gamma for the polytorpic process PV^(n)= Constant.

Find the molar heat capacity of an ideal gas with adiabatic exponent gamma for the polytorpic process PV^(n)= Constant.

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 .