A steady-flow system operating on the ideal Ericsson cycle can achieve the Carnot efficiency. One of the salient features of this cycle is the isothermal expansion through a heated turbine, as shown in Fig. a. Heat is added to the turbine such that the outlet temperature is equal to the inlet temperature, i.e. T₁=T₂, and the overall pressure ratio for this process is rₚ=P₁/P₂.
However, an isothermal expansion through a heated turbine is very difficult to achieve in practical engineering applications. An alternate approach is two use a multi-stage expansion process with reheating. In this approach, the gas expansion process is carried out in multiple stages with reheating in between each stage. Consider the two-stage turbine expansion with reheating shown in Fig. b. The gas enters the first stage of the turbine at state A1, is
expanded isentropically
to an intermediate pressure Pₐ₂, is
reheated at constant pressure to state B1, and isexpanded in the second stage isentropically
to the final pressure Pᵦ₂. The overall pressure ratio remains Pₐ₁/Pᵦ₂=rₚ. In this concept, the work output is minimized if the gas is reheated to the initial temperature Tᵦ₁=Tₐ₁, and the pressure ratio is equal across each turbine stage such that Pₐ₁/Pₐ₂=Pᵦ₁/Pᵦ₂=√rₚ.
For the same inlet temperature T₁=Tₐ₁, the same mass flow rate m˙, the same overall pressure ratio rₚ, and an ideal monoatomic gas as the working fluid
for both scenarios.
Show that for the conditions given, the ratio of the total power output of the ideal two-stage expansion to the total power output of the ideal isothermal expansion is given as: (Picture 2)
Extracted text: Qreheat Reheater 士。 - PA2, TA2 PB1, TB1 PB2, TB2 P2, T2 = T1 PA1, TA1" P1, T1 WT.B WTA Turbine B Turbine Turbine A T=const. Qin b) Two-stage turbine expansion with reheating a) Isothermal turbine
Extracted text: 1/5 WTA + W T,B WT! ()") 1. InTp r. P