Kinetic energy of a particle moving along elliptical trajectory is given by `K=alpha s^(2)` where s is the distance travelled by the particle. Determine dimensions of `alpha`

The variation of velocity of a particle moving along a straight line is as shown in the figure given below. The distance travelled by the particle in 5 s is

The variation of velocity of a particle moving along straight line is shown in the figure. The distance travelled by the particle in 4 s is

The instantaneous velocity of a particle moving in a straight line is given as v = alpha t + beta t^2 , where alpha and beta are constants. The distance travelled by the particle between 1s and 2s is :

The position versus time graph of a particle moving along a straight line is shown. What is the total distance travelled by the particle from t=0s to t=10s?

The kinetic energy K of a particle moving along a circle of radius R depends upon the distance s as K=as^2 . The force acting on the particle is

Kinetic energy of a particle moving along a circle of radisu R depends on the distance covered as K =as^(2) where a is a constant . Find the force acting on the particle as a function of s.

The kinetic energy of a particle moving along a circle of radius R depends on the distance covered s as K=lambdas^(2) , where lambda is a constant. Find the force acting on the particle as a function of s .

The kinetic energy K of a particle moving along a circle of radius R depends on the distance covered a as K=as^(2) . The force acting on the particle is

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 position of a particle along x-axis at time t is given by x=1-t+t^(2) . The distance travelled by the particle (in 'm') in first 2 seconds is 's'. Fill '2s' in OME sheet.