The molar specific heats of an ideal gas...

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

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The molar specific heats of an ideal gas at constant pressure and volume arc 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 a constant pressure & volume are denoted by C_(P ) & C_(v ) if r = (C_(p))/(C_(v )) & R the universal gases constant then C_(v ) is equal

The molar specific heat of an ideal gas at constant pressure and constant volume is C_(p) and C_(v) respectively. If R is the universal gas constant and the ratio of C_(p) to C_(v) is gamma , then C_(v) .

C_(p) and C_(v) denote the molar specific heat capacities of a gas at constant pressure and volume respectively. Then :

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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

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