At same temperature, calculate the ratio of average velocity of `SO_(2) " to " CH_(4)`:

At a given temperature the ratio of RMS and average velocities is

The ratio of rates of diffusion of SO_(2) , O_(2) and CH_(4) is

The ratio of rates of diffusion of SO_(2) , O_(2) and CH_(4) is

At what temperature, the root-mean-square velocity of SO_(2) will be the same as that of CH_(4) at 27^(@)C ?

At what temperature will the rms velocity of CO_(2) be same as the average velocity of SO_(2) at 500K?

At what temperature will the rms velocity of CO_(2) be same as the average velocity of SO_(2) at 500K?

The ratio of the rates of diffusion of SO_(2), O_(2) and CH_(4) is :

Calculate the temperature at which root mean square velocity of SO_(2) molecules is the same as that of O_(2) molecules at 127^(@)C . Molecular weights. Of O_(2) and SO_(2) are 32 and 64 respectively.

At what temperature will the rms velocity of SO_(2) be the same as that of O_(2) at 303 K ?

At what temperature will the r.m.s. velocity of SO_(2) be the same as the O_(2) at 303 K ?