The molar heat capacity C for an ideal gas going through a process is given by `C=(a)/(T)`, where 'a' is a constant. If `gamma=(C_(p))/(C_(V))`, the work done by one mole of has during heating from `T_(0)` to `etaT_(0)` will be

The molar heat capacity C for an ideal gas going through a given process is given by C=a/T , where 'a' is a constant. If gamma=C_p/C_v , the work done by one mole of gas during heating from T_0 to eta T_0 through the given process will be

The molar heat capacity for a gas at constant T and P is

The temperature of n moles of an ideal gas is increased from T to 4T through a process for which pressure P=aT^(-1) where a is a constant .Then the work done by the gas is

An ideal gas has an adiabatic exponent gamma . In some process its molar heat capacity varies as C = alpha//T ,where alpha is a constant Find : (a) the work performed by one mole of the gas during its heating from the temperature T_0 to the temperature eta times higher , (b) the equation of the process in the variables p, V .

The molar heat capacity of an ideal gas in a process varies as C=C_(V)+alphaT^(2) (where C_(V) is mola heat capacity at constant volume and alpha is a constant). Then the equation of the process is

Temperature of two moles of an ideal gas is increased by 300K in a process V=a/T , where a is positive constant. Find work done by the gas in the given process.

Two moles of an ideal mono-atomic gas undergoes a thermodynamic process in which the molar heat capacity 'C' of the gas depends on absolute temperature as C=(RT)/(T_(0)) , where R is gas consant and T_(0) is the initial temperature of the gas. ( V_(0) is the initial of the gas). Then answer the following questions: The equation of process is

If one mole of an ideal gas goes through the process AtoB and Bto C . Given that T_(A)=400K , and T_(C)=400K . If (P_(A))/(P_(B))=(1)/(5) , then find the heat supplied to the gas.

One mole of an ideal gas undergoes a process such that P prop (1)/(T) . The molar heat capacity of this process is 4R.

The molar specific heats of an ideal gas at constant pressure and volume are denotes by C_(P) and C_(upsilon) respectively. If gamma = (C_(P))/(C_(upsilon)) and R is the universal gas constant, then C_(upsilon) is equal to