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 :-

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

Dimensions of an unknown quantity , phi = (ma)/(alpha) log (1 +(alpha l)/(ma)) where m = mass, a= acceleration and l = "length" are

Assertion: In the relation f = (1)/(2l) sqrt((T)/(m)) , where symbols have standard meaning , m represent linear mass density. Reason: The frequency has the dimensions linear of time.

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

If the equation |sqrt((x - 1)^(2) + y^(2) ) - sqrt((x + 1)^(2) + y^(2))| = k represents a hyperbola , then k belongs to the set

In two different system of unit an acceleration is represented by the same number, whilst a velocity is represented by numbers in the ratio 1:3 . The ratio of unit of length and time are

Find the name of the conic represented by sqrt((x/a))+sqrt((y/b))=1 .

A formula is given as P=(b)/(a)sqrt(1+(k.theta.t^(3))/(m.a)) where P = pressure, k = Boltzmann's constant, theta= temperature, t= time, 'a' and 'b' are constants. Dimensional formula of 'b' is same as

A unit vector is represented as (0.8hat(i)+bhat(j)+04hat(k)) . Hence, the value of b must be