The displacement of the particle varies with time as `x=12sinomegat-16 sin^3omegat`. If its motion is SHM, then maximum acceleration is `a_0`. The value of `sqrta_0`is `Komega`. Find value of K.

The velocity of a particle moving along the positive direction of x-axis is v= Asqrt(x) , where A is a positive constant. At time t = 0 , the displacement of the particle is taken as x = 0 . (i) Express velocity and acceleration as functions of time , and (ii) find out the average velocity of the particle in the period when it travels through a distance s ?

The displacement x of a particle in rectilinear motion at time t is represented as x^(2) = at^(2) +2bt+c , where a ,b, and c are constants. Show that the acceleration of this particle varies (1)/(x^(3)) .

The equation x= A sin omega t gives the relation between the time t and the corresponding displacement x of a moving particle where A and omega are constant. Prove that the acceleration of the particle is proportional to its displacement and is directed opposite to it.

Find the value x xx 0= square

If the equation of motion of a particle executing SHM is x=Asin(omegat+alpha) , then determine the expression for velocity of the particle and also determine the value of its maximum acceleration.

The equation of motion of a particle executing SHM is x=asin(omegat+pi/6) with time period T. Find the time interval at which the velocity is being half of its maximum value.

The equation of motion of a particle executing SHM is x=Asin(omegat+theta) . Calculate the velocity and acceleration of the particle. If m is the mass of the particle, then what is the maximum value of its kinetic energy?

Time period of a particle executing SHM is T = 1 second and its amplitude of vibration is A = 0.04 m. Determine the maximum velocity and maximum acceleration of the particle.