The velocity v of a particle at time A is given by `v = at+ (b)/(l +c)` where a ,b and c are constant The dimensions of a,b and c are respectively

The velocity v of a particle at time t is given by v=at+b/(t+c) , where a, b and c are constants. The dimensions of a, b, c are respectively :-

Velocity v is given by v=at^(2)+bt+c , where t is time. What are the dimensions of a, b and c respectively?

When a wave transverses in a medium, the displacement of a particle located at distance x at time t is given by y=a sin (bt-cx) where a, b and c are constants of the wave. The dimension of b//c are same as that of:

If the velocity of a particle "v" as a function of time "t" is given by the equation,v=a(1-e^(-bt) ,where a and b are constants,then the dimension of the quantity a^2*b^3 will be

A wave is represented by - y=a sin (At-Bx+C) where A, B, C are constants. The Dimensions of A, B, C are

If the orbital velocity of a planet is given by v = G^(a) M^(b) R^(c ) then

The velocity (V) of a particle (in cm/s) is given in terms of time (t) in sec by the equation V=at+(b)/(c+t) . The dimensions of a, b and c are