The molar specific heats of an ideal gas at constant pressure and volume are denoted by `C_(p)` and `C_(v)` respectively. If `gamma = (C_(p))/(C_(v))` and R is the universal gas constant, then `C_(v)` is equal to

The molar specific heats of an ideal gas at constant pressure and volume are denotes by C_(P) and C_(upsilon) respectively. If gamma = (C_(P))/(C_(upsilon)) and R is the universal gas constant, then C_(upsilon) is equal to

C_v and C_p denote the molar specific heat capacities of a gas at constant volume and constant pressure, respectively. Then

C_v and C_p denote the molar specific heat capacities of a gas at constant volume and constant pressure, respectively. Then

C_v and C_p denote the molar specific heat capacities of a gas at constant volume and constant pressure, respectively. Then

C_v and C_p denote the molar specific heat capacities of a gas at constant volume and constant pressure, respectively. Then

If C_(p) and C_(v) denoted the specific heats of unit mass of nitrogen at constant pressure and volume respectively, then

If C_(p) and C_(v) denoted the specific heats of unit mass of nitrogen at constant pressure and volume respectively, then

If C_P and C_V denote the specific heats of nitrogen per unit mass at constant pressure and constant volume respectively, then

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

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