A simple pendulum has a time period when on the earth’s surface, and when taken to a height R above the earth’s surface, where R is the radius of the earth. The value of is:
1. 1
2.
3. 4
4. 2
A particle executes linear simple harmonic motion with an amplitude of of 3 cm. When the particle is at 2 cm from the mean position, the magnitude of its velocity is equal to that of its acceleration. Then, its time period in seconds is
(a)
(b)
(c)
(d)
A body mass m is attached to the lower end of a spring whose upper end is fixed. The spring has neglible mass. When the mass m is slightly pulled down and released, it oscillates with a time period of 3s. When the mass m is increased by 1 kg, the time period of oscillations becomes 5s. The value of m in kg is-
(1)
(2)
(3)
(4)
When two displacements represented by y1=asin(ωt) and y2=bcos(ωt) are superimposed,the motion is -
(1) not a simple harmonic
(2) simple harmonic with amplitude a/b
(3) simple harmonic with amplitude
(4) simple harmonic with amplitude (a+b)/2
The damping force on an oscillator is directly proportional to the velocity.The units of the constant of proportionality are
(1)
(2)
(3)
(4)
The displacement of a particle along the x-axis is given by . The motion of the particle corresponds to:
1. | simple harmonic motion of frequency ω / π. |
2. | simple harmonic motion of frequency 3 ω / 2 π. |
3. | non-simple harmonic motion. |
4. | simple harmonic motion of frequency ω / 2 π. |
The period of oscillation of a mass \(M\) suspended from a spring of negligible mass is \(T.\) If along with it another mass \(M\) is also suspended, the period of oscillation will now be:
1. \(T\)
2. \(T/\sqrt{2}\)
3. \(2T\)
4. \(\sqrt{2} T\)
A body performs simple harmonic motion about x=0 with an amplitude a and a time period T. The speed of the body at will be:
1.
2.
3.
4.
Which one of the following equations of motion represents simple harmonic motion? (where \(k\), \(k_0\), \(k_1\) and α are all positive.)
1. Acceleration = -\(k_0\)
2. Acceleration = -
3. Acceleration = k
4. Acceleration = kx
Two simple harmonic motions of angular frequency 100 rad s -1 and 1000 rad have the same displacement amplitude. The ratio of their maximum acceleration will be:
1. 1:10
2. 1:102
3. 1:103
4. 1:104