2 mole of an ideal monoatomic gas undergoes a reversible process for which `PV^(2)=C`. The gas is expanded from initial volume of 1 L to final volume of 3 L starting from initial temperature of 300 K. Find `DeltaH` for the process :

2 moles of an ideal monoatomic gas undergo a reversible process for which PV^(2)= constant. The gas sample is made to expand from initial volume of 1 litre of final volume of 3 litre starting from initial temperature of 300 K. find the value of DeltaS_("sys") for the above process. Report your answer as Y where DeltaS_("sys")=-YRIn3

1 mole of an ideal diatomic gas undergoes a reversible polytropic process (PV^(2)="constant") . The gas expand from initial volume of 1 litre and temp 300 K to final volume 3 lit. Claculate change in internal energy (approx).

1 mole of an ideal gas A(C_(v.m)=3R) and 2 mole of an ideal gas B are (C_(v,m)=(3)/(2)R) taken in a container and expanded reversible and adiabatically from 1 litre of 4 litre starting from initial temperature of 320 K. DeltaE or DeltaU for the process is :

1 mole of an ideal gas A ( C_(v,m)=3R ) and 2 mole of an ideal gas B are (C_(v.m)= (3)/(2)R) taken in a constainer and expanded reversible and adiabatically from 1 litre of 4 litre starting from initial temperature of 320K. DeltaE or DeltaU for the process is (in Cal)

What will be the entropy change when two moles of an ideal gas expand reversibly from initial volume of 1 litre to 10 litre at constant temperature of 300 K?

Calculate the entropy change when 1mole of an ideal gas expands reversibly form an initial volume of 2 L to a final voluume of 20L at 25^(@)C .

One mole of an ideal monoatomic gas expands reversibly and adiabatically from a volume of x litre to 14 litre at 27^(@) C. Then value of x will be [Given, final temperature 189 K and C_(V) = 3/2 R].

One mole of an ideal monoatomic gas expands isothermally against constant external pressure of 1 atm from initial volume of 1l to a state where its final pressure becomes equal to external pressure. If initial temperature of gas is 300K then total entropy change of system in the above process is: [R =0.082L atm mol^(-1)K^(-1)= 8.3J mol^(-1) K^(-1) ]

RMS speed of a monoatomic gas is increased by 2 times. If the process is done adiabatically then the ratio of initial volume to final volume will be

A certain amount of an ideal monoatomic gas undergoes a thermodynamic process such that VT^(2)= constat where V= volume of gas, T= temperature of gas. Then under process