An ideal gas whose adiabatic exponent equals `gamma` goes through a cycle consisting of two isochoric and two isobaric lines. Find the efficiency of such a cycle, if the absolute temperature of the gas rises `n` times both in a isochoric heating and in the isobaric expansion.

An ideal monoatomic gas (gamma=(5)/(3)) goes through a cyclic process consisting two isochoric and two isobaric lines. The absolute temperature of the gas rises two times both in isochoric heating and isobaric expansion. If number of moles are three, find efficiency of cyclic process.

Helium gas goes through a cycle ABCDA (consisting of two isochoric and isobaric lines) as shown in figure Efficiency of this cycle is nearly: (Assume the gas to be close to ideal gas)

Helium gas goes through a cycle ABCDA (consisting of two isochoric and isobaric lines) as shown in figure Efficiency of this cycle is nearly: (Assume the gas to be close to ideal gas)

Helium gas goes through a cycle ABCDA (consisting of two isochoric and isobaric lines) as shown in figure Efficiency of this cycle is nearly: (Assume the gas to be close to ideal gas)

Helium gas goes through a cycle ABCDA (consisting of two isochoric and isobaric lines) as shown in figure Efficiency of this cycle is nearly: (Assume the gas to be close to ideal gas)

An ideal gas with the adiabatic exponent gamma goes through a cycle (Fig. 2.3) within which the absolute temperature varies tau-fold . Find the efficiency of this cycle. .

An ideal gas with the adiabatic exponent gamma goes through a direct (clockwise) cycle conisting of adiabatic, isobaric, and isochoric lines. Find the efficiency of the cycle if in the adiabatic process the volume of the ideal gas. (a) increases n-fold , (b) decreases n-fold.