Find `(C_(p))/(C_(v))` for monatomic ideal gas.

C_(P) -C_(V) for an ideal gas is………….. .

Each molecule of a gas has F degrees of freedom . The ratio (C_(p))/(C_(V))=gamma for the gas is

Assertion: C_(P)-C_(V)=R for an ideal gas. Reason: ((delE)/(delV))_(T)=0 for an ideal gas.

Assertion: C_(P)-C_(V)=R for an ideal gas. Reason: ((delE)/(delV))_(T)=0 for an ideal gas.

Calculate the difference between C_p and C_(V) for 10 mole of an ideal gas.

Two moles of gas A at 27^(@)C mixed with a 3 moles of gas at 37^(@)C. If both are monatomic ideal gases, what will be the temperature of the mixture ?

The difference between C_(p) " and " C_(v) can be derived using the empirical relation H = U + pV . Calculate the difference between C_(p) " and " C_(v) for 10 moles of an ideal gas.

Assertion: C_(p) can be less than C_(V) . Reason: C_(p)C_(V)=R is valid only for ideal gases.

The temperature of an ideal gas undergoing adiabatic expansion varies with volume as T prop V^(-(3)/(4)) , then the value of (C_(P))/(C_(V)) for the gas is

(a) Define two specific heats of a gas. Why is C_(p) gt C_(v) ? (b) Shown that for an ideal gas, C_(p) = C_(v) +(R )/(J)