A particle is executing SHM along a straight line. Its velocities at distances `x_(1)` and `x_(2)` from the mean position are `v_(1)` and `v_(2)`, respectively. Its time period is

A particle is executing S.H.M. If u_(1) and u_(2) are the velocitiesof the particle at distances x_(1) and x_(2) from the mean position respectively, then

A particle executing SHM while moving from one extremity is found at distance x_(1),x_(2) and x_(3) from the center at the end of three successive seconds. The time period of oscillation is Here theta=cos^(-1)((x_(1)+x_(3))/(2x_(2)) )

A particle moves along a straight line its velocity dipends on time as v=4t-t^(2) . Then for first 5 s :

The velocity of a particle in S.H.M. at positions x_(1) and x_2 are v_(1) and v_(2) respectively. Determine value of time period and amplitude.

A particle executing harmonic motion is having velocities v_1 and v_2 at distances is x_1 and x_2 from the equilibrium position. The amplitude of the motion is

A particle executes SHM on a line 8 cm long . Its KE and PE will be equal when its distance from the mean position is

A body executing S.H.M.along a straight line has a velocity of 3 ms^(-1) when it is at a distance of 4m from its mean position and 4ms^(-1) when it is at a distance of 3m from its mean position.Its angular frequency and amplitude are

The particle is executing SHM on a line 4 cm long. If its velocity at mean position is 12 m/s , then determine its frequency.

A particle is moving with shm in a straight line. When the distance of the particle from the equilibrium position has the value x_1 and x_2 the corresponding values of velocities are v_1 and v_2 show that period is T=2pi[(x_2^2-x_1^2)/(v_1^2-v_2^2)]^(1//2)

A particle moving with uniform acceleration from A to B along a straight line has velcities v_(1) and v_(2) at A and B respectively. If C is the mid-point between A and B then determine the velocity of the particle at C . .