Find the value of `C_(V)` and `C_(P)` for nitrogen `R = 8.3 J" mole"^(-1) K^(-1)`, also for a diatomic gas `C_(V) = (5//2)R`

A cylinder of fixed capacity 44.8 litres constains helium gas at standard temperature and pressure. What is the amount of heat needed to raise the temperature of the gas in the cylinder by 15^(@)C ? Given R=8.31 j mol e^(-1) K^(-1) . (For monoatomic gas, C_(v)=3 R//2 )

What is the value of R/(C_v) for diatomic gas?

Find the kinetic energy of 1 g of nitrogen gas at 77^(@)C . Given R=8.31" J "mol^(-1)K^(-1)

The value of C_(V) for monatomic gas is (3)/(2)R , then C_(P) will be

Molar heat capacity of an ideal gas in the process PV^(x) = constant , is given by : C = (R)/(gamma-1) + (R)/(1-x) . An ideal diatomic gas with C_(V) = (5R)/(2) occupies a volume V_(1) at a pressure P_(1) . The gas undergoes a process in which the pressure is proportional to the volume. At the end of the process the rms speed of the gas molecules has doubled from its initial value. Heat supplied to the gas in the given process is :

Molar heat capacity of an ideal gas in the process PV^(x) = constant , is given by : C = (R)/(gamma-1) + (R)/(1-x) . An ideal diatomic gas with C_(V) = (5R)/(2) occupies a volume V_(1) at a pressure P_(1) . The gas undergoes a process in which the pressure is proportional to the volume. At the end of the process the rms speed of the gas molecules has doubled from its initial value. The molar heat capacity of the gas in the given process is :-

The kinetic energy of two moles of N_(2) at 27^(@) C is (R = 8.314 J K^(-1) mol^(-1))

One mole of a monoatomic gas is mixed with 3 moles of a heat of the mixture at constant volume ? Take R=8.31 j mol e//K . For monoatomic gas, C_(v)=3 R//2 and for diatommic gas, C_(p)=5 R//2 .