Two springs of constants `k_1` and `k_2` have equal maximum velocities, when executing simple harmonic motion. The ratio of their amplitudes (masses are equal) will be

The phase of a particle executing simple harmonic motion is pi/2 when it has

A spring has a natural length of 50 cm and a force constant 2 xx 10^3N/m . A body of mass 10 kg is suspended from it and the spring is stretched . If the body is pulled down further stretching the string to a length of 58 cm and released, it executes simple harmonic motion. The force on the body when it is at its lowermost position of oscillation will be

The resultant of two rectangular simple harmonic motion of the same frequency and unequal amplitude but differing in phase by pi//2 is

Two charged sphere of radii R_1 and R_2 have equal surface charge density. The ratio of their potential is

Two particles P and Q start from origin and execute simple harmonic motion along X-axis with same amplitude but with periods 3s and 6s respectively. The ratio of the velocities of P and Q when they meet is

The ratio of the radii of the planets R_(1) and R_(2) is k. the ratio of the accelerationn due to gravity is r. the ratio of the escape velocities from them will be

A particle moving along the X-axis executes simple harmonic motion, then the force acting on it is given by where, A and K are positive constants.

Two strings A and B have force constants k_1 and k_2 respectively. The ratio of the work done on A to that done on B when they are stretched by the same force is

The ratio of the acceleration due to gravity on two planets P_1 and P_2 is k_1. The ratio of their respective radii is k_2 . The ratio of their respective escape velocities is

If the displacement (x) and velocity (v) of a particle executing simple harmonic motion are related through the expression 4v^2=25-x^2 , then its time period is given by