A `25xx10^(-3)m^(3)` volume cylinder is filled with 1 mol of `O_2` gas at room temperature (300 K).The molecular diameter of `O_2`, and its root mean square speed, are found to be 0.3 nm and `200 m//s`, respectively.What is the average collision rate (per second) for an `O_2` molecule ?

At what temperature most probable speed of SO_(2) molecule have the same value as root mean square speed of O_(2) molecules at 300 K?

A container is filled with a simple of gas having molecules with speed alpha, 2 alpha, 3alpha, ….nalpha. The ratio of average speed to root mean square speed is

Four molecules of gas have speeds 1,2,3 and 4 km//s .The value of the root mean square speed of the gas molecules is

A gas bulb of 1 litre capacity contains 2.0 xx 10^(21) molecules of nitrogen exerting a pressure of 7.57 xx 10^3 Nm^(-2) . Calculate the root mean square speed and the temperature of gas molecules. If the ratio of most probable speed to the root mean square speed is 0.82, calculate the most probable speed for the molecules at this temperature.

At what temperature do the average speed of CH_(4)(g) molecules equal the average speed of O_(2) molecules at 300 K ?

At room temperature (300K) , the rms speed of the molecules of a certain diatomic gas is found to be 1930 m//s . Can you gusess name of the gas? Find the temperature at which the rms speed is double of the speed in part one (R = 25//3 J// mol -K)

A vessel contains a mixture of 2 moles o hydrogen and 3 moles of oxygen at a constant temperature. The ratio of average translational kinetic energy per H_2 molecule to that per O_2 molecule is

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

A gas bulb of 1 L capacity contains 2.0xx10^(11) molecules of nitrogen exerting a pressure of 7.57xx10^(3)Nm^(-2) . Calculate the root mean square (rms) speed and the temperature of the gas molecules. If the ratio of the most probable speed to the root mean square is 0.82 , calculate the most probable speed for these molecules at this temperature.

A gas bulb of 1 L capacity contains 2.0xx10^(11) molecules of nitrogen exerting a pressure of 7.57xx10^(3)Nm^(-2) . Calculate the root mean square (rms) speed and the temperature of the gas molecules. If the ratio of the most probable speed to the root mean square is 0.82 , calculate the most probable speed for these molecules at this temperature.