Two identical containers A and B having same volume of an ideal gas at same temperature have mass of the gas as `m_(1)` and `m_(2)` respectively and `2m_(1) = 3m_(2)`. The gas in each cylinder expands isomthermally to double of its volume. If change in pressure in A is `300 Pa`, then the change in pressure in B is

Two identical constaners A and B having same volume of an ideal gas at same temperature hace mass of the gas as m_(1) and m_(2) respectively and 2m_(1) = 3m_(2) . The gas in each cylinder expands isomthermally to double of its voume. If change in pressure in A is 300 Pa , then the change in pressure in B is

Two identical containers A and B having volume of ideal gas at the same temperature have mass of the gas as m_(A) and m_(B) respectively. 2 m_(A) = 3 m_(B) . The gas in each cylinder expand isothermally to double its volume. If the change in pressure in A is Delta p , find the change in pressure in B :

Two identical containers A and B have frictionaless pistons. They contain the same volume of an ideal gas at the same temperature. The mass of the gs in A is m_(A) and that B is m_(B) . The gas in each cylinder is now allowed to expand isothermally to double the intial volume. The chages in the pressure in A and B are fopund to be Delta and 1.5Deltap respectively.

An ideal gas at 300K is expanded isothermally to double its volume, then pressure of the gas will be

Two identical containers A and B with frictionless pistons contain the same ideal gas at the same temperature and the same velocity V. The mass of the gas in A is m_A, and that in B is m_B . The gas in each cylinder is now allowed to expand isothermally to the same final volume 2V. The changes in the pressure in A and B are found to be DeltaP and 1.5 DeltaP respectively. Then

Two vessels of the same volume contain the same gas at same temperature. If the pressure in the vessels is in the ratio of 1 : 2, then

One cubic meter of an ideal gas ia at a pressure at 10^(5)N//m^(2) and temperature 300K. The gas is allowed to expand at constant pressure to twice its volume by supplying heat. If the change in internal energy in this process is 10^(4)J , then the heat supplied is

Two monatomic ideal gases 1 and 2 of molecular masses m_(1) and m_(2) repectively are enclosed in separate containers kept at the same temprature. The ratio of the of sound in gas 1 to that in gas 2 is given by

If one mole of an ideal gas (C_(p.m.)=(5)/(2)R) is expanded isothermally at 300K until it’s volume is tripled, then change in entropy of gas is: