An impulsive force gives an initial velocity of- `1.0 m s^(-1)` to the mass in the unstretched spring position [sec Fig. 16.2]. What is the amplitude of motion ? Give x as a function of time t for the oscillating mass. Given m=3 kg and `k=1200 Nm^(-1)`.

An impulsive force gives an initial velocity of -1.0 ms^(-1) to the mass in the unstretched spring position. What is the amplitude of motion ? Give x as a function of time for the oscillating mass. Given m=3 kg, k= 1200 Nm^(-1)

An impulsive force gives an intial velocity of 1.0 ms^(-1) to the mass m in the unstretched spring position. What is the amplitude of motion ? Given that x is a function of time to for the oscillating mass. Give m= 3kg and k=1200 Nm^(-1) .

In example 34, let us take the position of the mass, when the spring is unstretched, as x=0, and the direction from left to right as the positive direction of X-axis. Give x as a function of time t for the oscillating mass, if at the moment we start the stop watch (t=0), the mass is (i) at the mean position (ii) at the maximum stretched position (iii) at the maximum compressed position. In what do these different functions of SHM differ ? Frequency, amplitude or initial phase ?

In Exercise 9, let us take the position of mass when the spring is unstretched as x=0, and the direction from left to right as the positive direction of x-axis. Give x as a function of time t for the oscillating mass if at the moment we start the stopwatch (t=0), the mass is at the mean position.

In Exercise 9, let us take the position of mass when the spring is unstretched as x=0, and the direction from left to right as the positive direction of x-axis. Give x as a function of time t for the oscillating mass if at the moment we start the stopwatch (t=0), the mass is at the maximum streatched position.

Let us take the position of mass when the spring is unstreched as x = 0, and the direction from left to right as the positive direction of x-axis. Give x as a function of time t for the oscillating mass if at the moment we start the stopwatch (t = 0), the mass of the object is 3 kg, spring constant is 1200 N/m and the amplitude is 2 cm. (a) at the mean position, (b) at the maximum stretched position, and (c) at the maximum compressed position. In what way do these functions for SHM differ from each other, in frequency, in amplitude or the initial phase?

An object of mass 10 kg is moving with an initial velocity of 10 m s^(-1) . A constant force acts for 4 s on the object giving it a speed of 2 m s^(-1) in the opposite direction. Find the acceleration and force.

The velocity of the particle of mass m as a function of time t is given by v = Aomega.cos[sqrt(K/m)t] , where A is amplitude of oscillation. The dimension of A/K is