Time Period of SHM

A particle starts from a point P at a distance of A//2 from the mean position O & travels towards left as shown in the figure. If the time period of SHM , executed about O is T and amplitude A then the equation of motion of particle is :

A particle starts from a point P at a distance of A//2 from the mean position O and travels towards left as shown in the figure. If the time period of SHM, executed about O is T and amplitude A then the equation of the motion of particle is

A cuboidal piece of wood has dimensions a, b and c. its relatively density is d. it is floating in a large body of water such that side a is vertical. It is pushed down a bit and released. The time period of SHM executed by it is

A partical executes SHM on a straigh line path. The amplitude of oscillation is 2cm. When the displacement of the particle from the mean position is 1cm, the magnitude of its acceleration is equal to that of its velocity. Find the time period of SHM, also the ms. velocity and ms. acceleration of SHM.

A small block is kept on a platform executing SHM in the horizontal plane, described by x=A sin omegat . The time period of SHM is T and the coefficient of friction between the block and the platform is mu . The condition that the block does not slip on the platform at any instant is mu ge (x pi^(2)A)/(gT^(2)) then write the value of 'x'

A uniform semi circular ring of radius R and mass m is free to oscillate about its one end in its vertical plane as shown in the figure. Find time period of SHM of its centre of mass of the ring (take pi^(2)=10 )

A particle of mass 1.5 kg moves along x-axis in a conservative force field. Its potential energy is given by V(x)=2x^(3)-9x^(2)+12x, where all quantities are written in SI units. The plot of this potential energy is given below. It is seen that the particle can be in stable equilibrium at a point on x-axis, x_(0). When it is displaced slightly from this equilibrium position, It executes SHM with time period T. What is the time period of SHM mentioned in the paragraph?

X_(1) and X_(2) are two points on the path of a particle executing SHM in a straight line, at which its velocity is zero. Starting from a certain point X(X_(1)XltX_(2)X) then particle crosses this point again at successive intervals of 2s and 4s with a speed of 5m//s . The time period of SHM is

A simple harmonic motion of acceleration 'a' and displacement 'x' is represented by a+4pi^(2)x = 0 What is the time period of S.H.M ?