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 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 spring of spring of spring constant k_(1) and k_(2) , respectively, the ratio of amplitude of (A) and (B) is.

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 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) .

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 bodies A and B of equal mass are suspended from two separate massless springs of spring constant k_1 and k_2 respectively. If the bodies Oscillate vertically such that their maximum velocities are equal, the ratio of the amplitude of A to that of B is