The density `(rho)` versus pressure (p) graph of one mole of an ideal monoatomic gas undergoing a cyclic process is shown in figure. Molecular mass of gas is M. (a) Find work done in each process. (b) Find heat rejected by gas in one complete cycle. (c) Find the efficiency of the cycle.

The density `(rho)` versus pressure (p) graph of one mole of an ideal

1.	The density `(rho)` versus pressure (p) graph of one mole of an ideal monoatomic gas undergoing a cyclic process is shown in figure. Molecular mass of gas is M. (a) Find work done in each process. (b) Find heat rejected by gas in one complete cycle. (c) Find the efficiency of the cycle.
Answer» Correct Answer - A::B::C For Process 1-2 `rho prop p` `:.` `1/Vprop p` `:.` Process is isothermal. `DeltaU_1=0` `Q_1=W_1=nRTIn((p_i)/(p_f))` `=(p_0M)/(rho_0)In(1/2)` (as `n=1` and `RT=(PM)/(rho)`) `=-(p_0M)/(rho_0)In(2)` For Process 2-3 `Q_2=Q_p=nC_pDeltaT` `=(1)(5/2R)(T_3-T_2)` `=5/2((p_3M)/(rho_3)-(p_2M)/(rho_2))` `=5/2((2p_0M)/(rho_0)-(2p_0M)/(2rho_0))` `=2.5(p_0M)/(rho_0)` `DeltaU_2=nC_VDeltaT` Substituting the values like above we get, `Delta_2=(1.5p_0M)/(rho_0)` `W_3=Q_2-DeltaU_2=(p_0M)/(rho_0)` For Process 3-1 Density is constant. Hence, volume is constant. `:.` `W_3=0` `:.` `Q_3=DeltaU_3=nC_VDeltaT` `=(1)(3/2R)(T_1-T_3)` `=3/2((p_0M)/(rho_0)-(2p_0M)/(rho_0))` `=-(1.5p_0M)/(rho_0)` `sumQ_(-ve)=\|Q_1+Q_3\|` `=(p_0M)/(rho_0)(3/2+In2)(+p_0M//rho_0)+((-p_0M)/(rho_0)In2)` (c) `eta=(W_(n et))/(sumQ_(+ve))=((+p_0M//rho_0)+((-p_0M)/(rho_0)In2))/((2.5p_0M//rho_0))` `=2/5(1-In2)`

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The density `(rho)` versus pressure (p) graph of one mole of an ideal monoatomic gas undergoing a cyclic process is shown in figure. Molecular mass of gas is M. (a) Find work done in each process. (b) Find heat rejected by gas in one complete cycle. (c) Find the efficiency of the cycle.

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