The root mean square of gas molecules at 25 K and 1.5 bar is `"100 m s"^(-1)`. If the temperature is raised to 100 K and the pressure to 6.0 bar, the root mean square speed becomes

The root mean square speed of gas molecules

The root mean square speed of gas molecules

The root mean square velocity of a gas molecule at 100 K and 0.5 atm pressure is 106.4 m s^(-1) . If the temperature is rasied to 400 K and the pressure is raised to 2 atm, then root mean square velocity becomes

The root mean square velocity of a gas molecule at 100 K and 0.5 atm pressure is 106.4 m s^(-1) . If the temperature is rasied to 400 K and the pressure is raised to 2 atm, then root mean square velocity becomes

The root mean square velocity of a gas molecule at 100K and 0.5 atm pressure is 106.4 ms^(-1) . If the temperature is raised to 400k and the pressure is raised to 2 atm, the root mean square velocity becomes

The root mean square speed of gas molecules at a temperature 27K and pressure 1.5 bar is 1 xx 10^(4) cm//sec If both temperature and pressure are raised three times calculate the new rms speed of gas molecules .

The root mean square speed of gas molecules at a temperature 27K and pressure 1.5 bar is 1 xx 10^(4) cm//sec If both temperature and pressure are raised three times calculate the new rms speed of gas molecules .

The root mean square speed of the molecules of a diatomic gas is V. When the temperature is doubled ,the molecules dissociate into two atoms. The new root mean square speed of the atom is :