A particle moves in a circular path such that its speed v varies with distance as `V= alphasqrt(s)` where `alpha` is a positive constant. Find the acceleration of the particle after traversing a distance s.

A particle moves in a circular path such that its speed v varies with distance s as v=alphasqrt(s) where alpha is a positive constant. If the acceleration of the particle after traversing a distance s is [alpha^2sqrt(x+s^2/R^2)] find x.

A particle moves in a circular path such that its speed v varies with distance as v=alphasqrts where alpha is a positive constant. Find the acceleration of particle after traversing a distance S?

A particle moves in a circular path such that its speed 1v varies with distance s as v = sqrt(s) , where prop is a positive constant. Find the acceleration of the particle after traversing a distance s .

A particle moves in a circular path with a uniform speed. Its motion is

A particle is moving on a circular path with speed given by v= alphat , where alpha is a constant. Find the acceleration of the particle at the instant when it has covered the n^("th") fraction of the circle.

A particle moves in a circular path with a continuously increasing speed. Its motion is

A particle moves in a circular path of radius R with an angualr velocity omega=a-bt , where a and b are positive constants and t is time. The magnitude of the acceleration of the particle after time (2a)/(b) is

A particle having a velocity v = v_0 at t= 0 is decelerated at the rate |a| = alpha sqrtv , where alpha is a positive constant.

A particle of unit mass is moving along x-axis. The velocity of particle varies with position x as v(x). =alphax^-beta (where alpha and beta are positive constants and x>0 ). The acceleration of the particle as a function of x is given as

The v-s and v^(2)-s graph are given for two particles. Find the accelerations of the particles at s=0 . .