The velocity of a body is given by `v=At^2+Bt+C`. If v and t are expressed in SI, what are the units of A,B and C?

The velocity of a particle is given by v=12+3(t+7t^2) . What is the acceleration of the particle?

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

The position of a particle moving on X-axis is given by x =At^(2) + Bt + C The numerical values of A, B and C are 7, -2 and 5 respectively and SI units are used. Find (a) The velocity of the particle at t= 5 (b) The acceleration of the particle at t =5 (c ) The average velocity during the interval t = 0 to t = 5 (d) The average acceleration during the interval t = 0 to t = 5

The velocity v of a particle is given by the equation v=6t^2-6t^3 , where v is in ms^-1 , t is the instant of time in seconds while 6 and 6 are suitable dimensional constants. At what values of t will the velocity be maximum and minimum? Determine these maximum and minimum values of the velocity.

If V=(1)/(3)Bh , what is h expressed in terms of B and V?

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 :-

If velocity of particle is given by v=2t^4 , then its acceleration ((dv)/(dt)) at any time t will be given by..

The velocity of a paritcle (v) at an instant t is given by v=at+bt^(2) . The dimesion of b is

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

If the velocity of a particle is v = At + Bt^2 , where A and B are constant, then the distance travelled by it between 1 s and 2 s is :