The molar heat capacity for an ideal gas cannot

Which of the following is true for the molar heat capacity of an ideal gas? 1.It cannot be negative 2.It has only two values (C_(P) and C_(V) ) 3.It can have any value 4.It cannot be zero

Find the value of molar heat capacity for an ideal gas in an adiabatic process.

Find the value of molar heat capacity for an ideal gas in an adiabatic process.

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

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

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.

The molar heat capacity for an ideal monatomic gas is 3R.If dQ is the heat supplied to the gas and dU is the change in its internal energy then for the process the ratio of work done by the gas and heat supplied is equal to