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

The velocity of a particle at an instant "t" is v=u+at ,where u is initial velocity and a is constant acceleration.The v -t graph are

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 :-

The velocity v of a particle at any instant t moving in a straight line is given by v=s +1 where s meter is the distance travelled in t second what is the time taken by the particle to cover a distacne of 9m ?

The velocity of a particle of mass 2 kg is given by vec(v)=at hat(i)+bt^(2)hat(j) . Find the force acting on the particle.

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

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

The velocity upsilon of a particle is given by upsilon = A t^2 +Bt. What are the dimensions of A and B ?

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.