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

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

The ratio of specific heats ( C_(p) and C_(v) ) for an ideal gas is gamma . Volume of one mole sample of the gas is varied according to the law V = (a)/(T^(2)) where T is temperature and a is a constant. Find the heat absorbed by the gas if its temperature changes by Delta T .

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

Compare the formula C_p - C_v = R for an ideal gas with the thermodynamics relation Delta U = Delta Q - P Delta V .

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

Define C_p and C_V . Why is C_P gt C_V ? For an ideal gas, prove that C_P - C_V = R .

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.