The ideal gas equation for an adiabatic process is
The work done in adiabatic process is given by
Define an adiabatic process and state essential conditions for such a process to take place. Write its process equations in terms of , and . Show analytically that work done by one mole of an ideal gas during adiabatic expansion from temperature T_1 to T_2 is given by = (R(T_1 - t_2))/(1-lamda ) .
Work Done In Adiabatic Process
An ideal gas undergoes a cyclic process, in which one process is isochoric, one process is isothermal and one process is adiabatic. During the isothermal process, 40 J heat is released by the gas, and during the isochoric process, 80 J heat is absorbed by the gas. if work done by the gas during adiabatic process is W_(1) and during isothermal process is W_(2) then the magnitude of (W_(1))/(W_(2)) will be equal to:
Work Done In Adiabatic Processes
Three moles of an ideal gas undergo a cyclic process shown in figure. The work done by the gas during the process is ["Take ln (2)" = 0.693]
The P-V diagram of a diatomic ideal gas system going under cyclic process as shown in figure. The work done during an adiabatic process CD is (use gamma=1.4 ):
NARENDRA AWASTHI-THERMODYNAMICS-Level 3 - Match The Column
