Two particles (A) and (B) of equal masses are suspended from two massless spring of spring of spring constant `k_(1)` and `k_(2)`, respectively, the ratio of amplitude of (A) and (B) is.

Two particles x and y having same masses are suspended by two massless springs of spring constants k_(1) = 4 N/m and k_(2) = 9 N/m respectively. Find the ratio of amplitude of x and y if maximum velocites during oscillation are equal.

Two particle A and B of equal masses are suspended from two massless springs of spring constants k_(1) and k_(2) , respectively. If the maximum velocities, during oscillations are equal, the ratio of amplitude of A and B is (4//3) xx 1000 kg//m^(3) . What relationship betwen t and t_(0) is ture?

Two particle A and B of equal masses are suspended from two massless springs of spring constants k_(1) and k_(2) , respectively. If the maximum velocities, during oscillations are equal, the ratio of amplitude of A and B is (4//3) xx 1000 kg//m^(3) . What relationship betwen t and t_(0) is ture?

Two particle A and B of equal masses are suspended from two massless springs of spring constants k_(1) and k_(2) , respectively. If the maximum velocities, during oscillations are equal, the ratio of amplitude of A and B is (4//3) xx 1000 kg//m^(3) . What relationship betwen t and t_(0) is ture?

Two particles A and B of equal masses are suspended from two massless springs of spring constants K_(1) and K_(2) respectively. If the maximum velocities during oscillations are equal. the ratio of the amplitude of A and B is

Two particles A and B of equal masses are suspended from two massless springs of spring constants k_(1)=4N//m and k_(2)=8 N//m respectively. If maximum velocities during oscillation are equal, fing the ration of amplitudes of A and B.

Two bodies (M) and (N) of equal masses are suspended from two separate massless springs of spring constants (k_1) and (k_2) respectively. If the two bodies oscillate vertically such that their maximum velocities are equal, the ratio of the amplitude of vibration of (M) to the of (N) is.

Two bodies (M) and (N) of equal masses are suspended from two separate massless springs of spring constants (k_1) and (k_2) respectively. If the two bodies oscillate vertically such that their maximum velocities are equal, the ratio of the amplitude of vibration of (M) to the of (N) is.

Two particles P_(1) and P_(2) having identical masses are suspended from two massless springs of spring constant k_(1) = 5 N/m and k_(2) = 8 N/m respectively. If maximum velocity of oscillation for particle P_(1) is twice than for particle P_(2) , then find the ratio of amplitudes for P_(1) and P_(2) .