The differnetial equation of S.H.M is given by `(d^2x)/(dt^2)+propx=0`. The frequency of motion is

The equations of S.H.M. is represented by (d^2y)/dt^2 =_____

In SI units, the differential equation S.H.M is d^2x /dt^2 = -36 x . Find its frequency and period.

The differential equation of a particle performing a S.H.M. is (d^(2)x)/(dt^(2))+ 64x=0 . The period of oscillation of the particle is

The differential equation of a particle undergoing SHM is given by a a(d^(2)"x")/(dt^(2))+b"x"=0 ltbr.gt The particle starts from the extreme position The equation of motion may be given by :

A particle is executing a linear S.H.M. and its differential equation is (d^(2)x)/(dt^(2))+ alpha x=0 . Its time period of motion is

The differential equation for a freely vibrating particle is (d^2 x)/(dt^2)+ alpha x=0 . The angular frequency of particle will be

The differential equation m frac(d^2x)(dt^2)+b frac(dx)(dt) +k(x) = 0 represent

The equation of a damped simple harmonic motion is m(d^2x)/(dt^2)+b(dx)/(dt)+kx=0 . Then the angular frequency of oscillation is