[" nabole,the answer for a particular question is "],[" cesed os b- "(ma)/(k)[sqrt(1+(2w)/(ma))]" here "m" represents "]

In a book, the answer for a particular question is expressed as b=(ma)/(k)[sqrt(1+(2kl)/(ma))] here m represents mass, a represent acceleration, l represent length. The unit of b should be :-

In a book, the answer for a particular question is expressed as b=(ma)/(k)[sqrt(1+(2kl)/(ma))] here m represents mass, a represent acceleration, l represent length. The unit of b should be :-

In a book, the answer for a particular question is expressed as b=(ma)/(k)[sqrt(1+(2kl)/(ma))] here m represents mass, a represent acceleration, l represent length. The unit of b should be :-

In a book, the answer for a particular question is expressed as. b=(ma)/(l)[sqrt(1+(2kl)/(ma)] . Here m represents mass, 'a' represents acceleration, l represents length. The unit of 'b' should be in SI system)

A particle of mass m is subjected to an attractive central force of magnitude k//r^(2) , k being a constant. If at the instant when the particle is at an extreme position in its closed orbit, at a distance a from the centre of force, its speed is sqrt(k//2ma) , if the distance of other extreme position is b. Find a//b .

A particle of mass m is subjected to an attractive central force of magnitude k//r^(2) , k being a constant. If at the instant when the particle is at an extreme position in its closed orbit, at a distance a from the centre of force, its speed is sqrt(k//2ma) , if the distance of other extreme position is b. Find a//b .

An unknown quantity ''alpha'' is expressed as alpha = (2ma)/(beta) log(1+(2betal)/(ma)) where m = mass, a = acceleration l = length, The unit of alpha should be

An unknown quantity ''alpha'' is expressed as alpha = (2ma)/(beta) log(1+(2betal)/(ma)) where m = mass, a = acceleration l = length, The unit of alpha should be

If pressure can be expressed as P=(b)/(a)sqrt(1+(kthetat^(3))/(ma)) where k is the Boltzmann's constant, theta is the temperature, t is the time and a and b are constants, then dimensional formula of b is equal to the dimensional formula of