If `T_(1),T_(2)` and `T_(3)` are the temperatures at which the `u_("rms"),u_("average"),u_("mp")` of oxygen gas are all equal to 1500 m/s then the correct statement is :

Calculate the temperature at which the root mean square speed, average speed and most probable speed of oxygen gas are all equal to 1500 m s^(-1)

Calculate the temperature at which the root mean square velocity, the average velocity, and the most proable velocity of oxygen gas are all equal to 1500 m s^(-1) .

The r.m.s speed of oxygen molecule (O_(2)) at a certain temperature T is V. If on increasing the temperature of the oxygen gas to 2T, the oxygen molecules dissociate into atomic oxygen, find the speed of the oxygen atom.

At what temperature in ""^(@)C , the U_("rms") of SO_(2) is equal to the average velocity of O_(2) at 27^(@)C .

If or two gases of molecular weights M_(A) and M_(B) at temperature T_(A) and T_(B) , T_(A)M_(B)=T_(B)M_(A) , then which of the following properties has the same magnitude for both the gases? (a) Density (b) Pressure (c) KE per mole (d) u_(rms)

Prove the relation, s_t=u + at - 1/2 a.

The u_(rms) of a gas at 300K is 3R^(1//2) The molar mass of the gas in kg mo1^(-1) is .