From the relation Cp - Cv= R show that t...

From the relation `C_p - C_v= R` show that the ratio of two specific heats `(gamma)`of an ideal' gas is given by `gamma = 1+ 2/ f`, where f is the degrees of freedom of a molecule.

Similar Questions

Explore conceptually related problems

From the relation C_p-C_v=R show that the ratio of two specific heats (gamma) of an ideal gas is given by gamma=1+2/f where f is the degrees of freedom of the molecule.

Show that for ideal gas C_(P ) - C_(v ) = R and gamma =1 +(2)/(f ) , where f is the degrees of freedom of the molecule .

The ratio between the specific heats of an ideal gas is gamma . Show that the number of degrees of freedom of the gas molecules is n=2/(gamma-1) .

The ratio between the specific heats of an ideal gas is y. show that the number of freedom of the gas molecules is n=2/(y-1)

The ratio of the specific heats C_p/C_v=gamma in terms of degrees of freedom(n) is given by

If gamma be the ratio of specific heats at cosntant pressure & constant volume, then show that the degree of freedom Is n = 2/(gamma-1)

Find out the molar specific heat C_p and C_v of an ideal gas having gamma =1.67, given R=2 cal mol^-1^@ c^-1

Find out the molar specific heats C_(p) an C_(v) of an ideal gas having gamma = 1.67 . Given, R = 2 cal cdot mol^(-1) cdot^(@)C^(-1) .

From the relation `C_p - C_v= R` show that the ratio of two specific heats `(gamma)`of an ideal' gas is given by `gamma = 1+ 2/ f`, where f is the degrees of freedom of a molecule.

Similar Questions

Recommended Questions