The velocities of ten particles in `ms^(-1)` are `0,2,3,4,4,4,5,5,6,9`. Calculate
(i)average speed and
(ii)rms speed
(iii) most probable speed.

The speed of ten particles in metre/sec are 0, 1, 2, 3, 3, 4, 4, 5 and 6. find (a) average speed (b0 the root mean square speed (c) most probable speed

Five molecules of a gas have speed 2, 4, 6, 8 km//s . Calculate average speed. Rms speed and most probable speed of these molecules.

Calculate (i) and root mean square speed (ii) average speed and (iii) most probable speed of CO_(2) molecules at 700 K.

At 27^(@)C a gas contains 10 molecules travelling with a speed of 4 ms^(-1) , 20 molecules travelling with a speed of 5 m s^(-1) and 40 molecules travelling with a speed of 8 m s^(-1) . Calculate the average speed, root mean square speed and most probable speed of the gas at 27^(@)C .

The speeds of 11 molecules are 2.0, 3.0, 4.0, ..., 12 km/s. What are their (a) average speed and (b) rms speed?

Calculate the average rms and most probable speed of SO_(2) molecules at 27^(@)C

Most probable speed, average speed and RMS speed are related as -

Your are given the following group of particles, n_(i) represents the number of molecules with speed v_(i) (P_(2))/(P_(1))=(m_(2))/(m_(1)) : (p_(2))/(76)=(m_(1)+(50)/(100)m_(1))/(m_(1))=(3)/(2) calculate (i) average speed (ii) rms speed (iii) most probable speed.

Four molecules of a gas have speeds 2, 4, 6 and 8 kms^(-1) respectively. Calculate their average speed and root mean square speed.