The displacement of a particle in S.H.M. in one time period

The acceleration of a particle inS.H.M. is

The displacement of a particle is SHM is x=10 simn(2t-pi/6) meter.When its displacement is 6m,the velocit of the particle (in m s^(-1)) is :

Velocity and displacement of a particle executing S.H.M. are out of phase by pi/2 . Explain why?

A book with many printing errors contains four different formulas for the displacement y of a particle undergoing a certain periodic motion :- y=a sin 2pi t//T (a = maximum displacement of the particle, v = speed of the particle. T= time-period of motion). Rule out the wrong formulas on dimensional grounds.

A book with many printing errors contains four different formulas for the displacement y of a particle undergoing a certain periodic motion :- y=a sin vt (a = maximum displacement of the particle, v = speed of the particle. T= time-period of motion). Rule out the wrong formulas on dimensional grounds.

A book with many printing errors contains four different formulas for the displacement y of a particle undergoing a certain periodic motion :- y=(a//T)sin t//a (a = maximum displacement of the particle, v = speed of the particle. T= time-period of motion). Rule out the wrong formulas on dimensional grounds.

A book with many printing errors contains four different formulas for the displacement y of a particle undergoing a certain periodic motion :- y=(asqrt2)(sin2pit//T+cos2pit//T) (a = maximum displacement of the particle, v = speed of the particle. T= time-period of motion). Rule out the wrong formulas on dimensional grounds.

Define displacement of a particle in linear motion in one dimension. Does it depend upon the origin? Can actual distance travelled by object in the time interval t to t' be greater than or equal to the magnitude of the displacement?

The displacement of a particle varies with time according to the relation y = alpha sin omegat + b cos omegat .

Find the displacement of a particle after certain time in two dimensions moving with uniform velocity.