An ideal gas can be expanded form an initial state to a certain volume through two different processes `PV^(2) =` constant and (ii) `P = KV^(2)` where `K` is a positive constant. Then

An ideal gas can be expanded from an initial state to a certain volume through two different processes, (I) PV^(2)=K and (II) P=KV^(2) , where K is a positive constant. Then, choose the correct option from the following.

An ideal gas expands in such a way that PV^2 = constant throughout the process.

An ideal gas expands according to the law PV^(3//2) =constant We conclude that

An ideal gas expands in such a manner that its pressure and volume can be related by equation PV^(2) = constant. During this process, the gas is

An ideal gas is expanded such that PT^(2)=a constant. The coefficient of volume expansion of the gas is

In the process pV^2= constant, if temperature of gas is increased, then

Temperature of an ideal gas is 300 K . The final temperature of the gas when its volume changes from V " to " 2V in the process p=alphaV (here alpha is a positive constant) is

Temperature of an ideal gas is 300 K. The change in temperature of the gas when its volume changes from V to 2V in the process p = aV (Here, a is a positive constant) is