The frequency `f` of vibrations of a mass `m` suspended from a spring of spring constant `k` is given by `f = Cm^(x) k^(y)` , where `C` is a dimensionnless constant. The values of `x and y` are, respectively,

A block of mass m suspended from a spring of spring constant k . Find the amplitude of S.H.M.

A block of mass m is suspended by different springs of force constant shown in figure.

The frequency of oscillations of a mass m connected horizontally by a spring of spring constant k is 4 HZ. When the spring is replaced by two identical spring as shown in figure. Then the effective frequency 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.

The spring force is given by F=-kx , here k is a constant and x is the deformation of spring. The F-x graph is

A body of mass 20 g connected to a spring of spring constant k, executes simple harmonic motion with a frequency of (5//pi) Hz. The value of spring constant is

Two springs of spring constants K_(1) and K_(2) are joined in series. The effective spring constant of the combination is given by

Two springs of spring constants K_(1) and K_(2) are joined in series. The effective spring constant of the combination is given by

When a mass of 5 kg is suspended from a spring of negligible mass and spring constant K, it oscillates with a periodic time 2pi . If the mass is removed, the length of the spring will decrease by

A block of mass m hangs from a vertical spring of spring constant k. If it is displaced from its equilibrium position, find the time period of oscillations.