For gaseous state, if most probable speed is denoted by `C^(**)`, average speed by `bar( C )` and mean square speed by C, then for a large number of molecules the ratios of these speeds are `:`

Explain root mean square speed (C or U_(rms))

The root mean square speed of gas molecules

The ratio of average speed and most probable speed is :

Which of the following gas molecules has the lowest average speed at 0^(@)C ?

The temperature at which most probable speed of CO molecules is twice that at 27^(@)C is :

Explain this statement clearly : "To call a dimensional quantity 'large' or 'small' is meaningless without specifying a standard for comparison". In view of this, reframe the following statements wherever necessary: (a) atoms are very small objects (b) a jet plane moves with great speed (c) the mass of jupiter is very large (d) the air inside this room contains a large number of molecules (e) a proton is much more massive than an electron (f) the speed of sound is much smaller than the speed of light.

The numerical ratio of average velocity to average speed is

A gas container observes Maxwell distribution of speeds. If the number of molecules between the speed 5 and 5.1 km sec^(-1) at 25^(@)C be 'n', what would be the number of molecules between this range of speed if the total number of molecules in the vessel are doubled ?

The ratio of average speed of an oxygen molecular to the r.m.s. speed of a N_(2) molecular at the same temperature is :