If `alpha=F/v^(2) sin beta t`, find dimensions of `alpha` and `beta`. Here v=velocity, F= force and t= time.

( alpha)/( t^(2)) = Fv + ( beta)/(x^(2)) Find the dimension formula for [ alpha] and [ beta] ( here t = time , F = force , v = velocity , x = distance).

(a)/(t^(2)) = Fv = (beta)/(x^(2)) Find dimension formula for [a] and [beta] (here t = "time" ,F = "force", v = "velocity" , x = "distance")

Find the dimensions of alpha//beta in equation P=(alpha-t^2)/(betax) where P= pressure, x is distance and t is time.

The displacement x of a particle varies with time t as x = ae^(-alpha t) + be^(beta t) . Where a,b, alpha and beta positive constant. The velocity of the particle will.

(a) The displacement s of a particale in time t related as s = alpha + beta t + gamma t^(2) + delta t^(2) (b) The veloctiy v of particle varies with time as v = alpha t + beta t^(2) + (gamma )/(t + s) Findk the dimension fo alpha, beta, gamma and delta .

If A=[(1,-alpha),(alpha,beta)] and A A^T=I .Then find the value of alpha and beta

A partical moves in a straight line as s=alpha(t-2)^(3)+beta(2t-3)^(4) , where alpha and beta are constants. Find velocity and acceleration as a function of time.

If alpha+beta=90^(@),alpha=2beta , then find the value of cos^(2)alpha+sin^(2)beta .