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

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 for hydrogen C_(P) - C_(V) = m and for nitrogen C_(P) - C_(V) = n , where C_(P) and C_(V) refer to specific heats per unit mass respectively at constant pressure and constant volume, the relation between m and n is (molecular weight of hydrogen = 2 and molecular weight or nitrogen = 14)

If for hydrogen C_(P) - C_(V) = m and for nitrogen C_(P) - C_(V) = n , where C_(P) and C_(V) refer to specific heats per unit mass respectively at constant pressure and constant volume, the relation between m and n is (molecular weight of hydrogen = 2 and molecular weight or nitrogen = 14)

When water is heated from 0^(@)C to 4^(@)C and C_(P) and C_(V) are its specific heats at constant pressure and constant volume respectively , then :-

If C_(p) and C_(v) denote the specific heats (per unit mass of an ideal gas of molecular weight M ), then where R is the molar gas constant.

A Carnot engine cycle is shown in the Fig. (2). The cycle runs between temperatures T_(H) = alpha T_(L) = T_(0) (alpha gt T) . Minimum and maximum volume at state 1 and states 3 are V_(0) and nV_(0) respectively. The cycle uses one mole of an ideal gas with C_(P)//C_(V) = gamma . Here C_(P) and C_(V) are the specific heats at constant pressure and volume respectively. You must express all answers in terms of the given parameters {alpha, n, T_(0), V_(0) ?} and universal gas constant R . (a) Find P, V, T for all the states (b) Calculate the work done by the engine in each process: W_(12), W_(23),W_(34),W_(41) . (c) Calculate Q , the heat absorbed in the cycle.