The equation of the process for an one mole of ideal gas in terms of the variables T and V. if the molar heat capacity varies as `c=c_(v)+aP`is `V*T^(-B)=a` (where a is a constant) then B=

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

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

For an ideal gas the molar heat capacity varies as C=C_V+3aT^2 . Find the equation of the process in the variables (T,V) where a is a constant.

Find the relatio between volume and temperature of a gas in a process, in which the molar heat capacity C varies with temperature T as C=C_(V)+alphaT . [ alpha is a constant] .

For an ideal gas the equation of a process for which the heat capacity of the gas varies with temperatue as C=(alpha//T(alpha) is a constant) is given by

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

For certain process the molar heat capacity of an ideal gas is found to be (C_v+R/2) , where C_v is the molar heat capacity of the same gas at constant volume. For the given process, it can be concluded that

An ideal gas whose adiabatic exponent equals gamma expands so that the amount of heat transferred to it is equal to the decrease of its internal energy. Find a. the molar heat capacity of the gas, and b. the T -V equation for the process.

The ratio of P to V at any instant is constant and is equal to 1 , for a monoatomic ideal gas under going a process. What is the molar heat capacity of the gas

The ratio of P to V at any instant is constant and is equal to 1. for a monoatomic ideal gas under going a process. What is the molar heat capacity of the gas