The pressure `(10^(5) Nm ^(-2))` of air filled in a vessel is decreased adiabatically so as to increase its volume three times. Calculate the pressure of air. Given `gamma-`for air = 1.4

The volume of a given mass of gas at NTP is compressed adiabatically to 1/5th of its original volume. What is the new pressure ? gamma =1.4.

2m^(3) volume of a gas at a pressure of 4xx10^(5) Nm^(-2) is compressed adiabatically so that its volume becomes 0.5m^(3) Find the new pressure . Compare this with the pressure that would result if the compression was isothermal. Calculate work done in each gamma = 1.4

If a gas of a volume V_(1) at pressure p_(1) is compressed adiabatically to volume V_(2) and pressure p_(2) , calculate the work done by the gas.

By what percentage should the pressure of a given mass of a gas be increased so as to decrease its volume by 10% at a constant temperature?

An ideal gas at pressure 4 xx 10^(5)Pa and temperature 400K occupies 100cc . It is adiabatically expanded to double of its original volume. Calculate (a) the final pressure (b) final temperature and (c ) work done by the gas in the process (gamma = 1.5)

An ideal gas at pressure 2.5 xx 10^(5) pa and temperature 300k occupies 100 cc. It is adiabatically compressed to half its original volume. Calculate (a) the final pressure, (b) the final temperature and ( c) the work done by the gas in the process. Take (gamma = 1.5) .

There is a soap bubble of radius 2.4xx10^(-4)m in air cylinder which is originally at a pressure of 10^(5)(N)/(m^(2)) . The air in the cylinder is now compressed isothermally until the radius of the bubble is halved. (the surface tension of the soap film is 0.08Nm^(-1)) . The pressure of air in the cylinder is found to be 8.08xx10^(n)(N)/(m^(2)) . What is the value of n?

The volume of a certain mass of gas at a pressure of 5 xx 10 ^(4) Pa is doubled adiabatically. What is the final pressure of the gas ? [ gamma = 1.4]

An ideal gas of volume 1 litre and at a pressure 8 atm undergoes an adiabatic expansion until its pressure drops to 1 atm and volume increase to 4 liters. Calculate the work done in the process (y = 1.5).

300K a gas (gamma = 5//3) is compressed adiabatically so that its pressure becomes 1//8 of the original pressure. The final temperature of the gas is :