A particle moves in a circular path with a continuously increasing speed. Its motion is:
1. periodic
2. oscillatory
3. simple harmonic
4. none of them
1. | \(e^{-\omega t}\) | 2. | \(sin\omega t\) |
3. | \(sin\omega t+cos\omega t\) | 4. | \(sin(\omega t+\pi/4)\) |
Trains travel between station A and station B: on the way up (from A to B) - they travel at a speed of \(80\) km/h, while on the return trip the trains travel at twice that speed. The services are maintained round the clock. Trains leave station A every \(30\) min for station B and reach B in \(2\) hrs. All trains operate continuously, without any rest at A or B.
1. | the frequency of trains leaving B must be twice as much as A. |
2. | the frequency of trains leaving B must be half as much as A. |
3. | the frequency of trains leaving B is equal to that at A |
4. | the situation is impossible to maintain unless larger number of trains are provided at A. |
1. | circular motion |
2. | \(x\)-axis | SHM along
3. | \(y\)-axis | SHM along
4. | \(x\) or \(y\)-axis | SHM, but along a direction other than
Statement-I: | A graph of its acceleration vs displacement (from mean position) is a straight line. |
Statement-II: | A graph of its velocity vs displacement (from mean position) is an ellipse. |
1. | Statement-I is incorrect and Statement-II is correct. |
2. | Both Statement-I and Statement-II are correct. |
3. | Both Statement-I and Statement-II are incorrect. |
4. | Statement-I is correct and Statement-II is incorrect. |
The maximum speed and acceleration of a particle undergoing SHM are \(v_0\) and \(a_0,\) respectively. The time period of the SHM is:
1. \(\frac{2\pi v_0}{a_0}\)
2. \(\frac{2\pi a_0}{v_0}\)
3. \(\frac{v_0}{a_0}\)
4. \(\frac{2v_0}{a_0}\)
If the time of mean position from amplitude (extreme) position is 6 seconds, then the frequency of SHM will be:
1. | \(0.01\) Hz | 2. | \(0.02\) Hz |
3. | \(0.03\) Hz | 4. | \(0.04\) Hz |
The time period of a particle in simple harmonic motion is equal to the time between consecutive appearances of the particle at a particular point in its motion. This point is:
1. | the mean position |
2. | an extreme position |
3. | between the mean position and the positive extreme |
4. | between the mean position and the negative extreme |
1. | uniform circular motion |
2. | elliptical motion |
3. | linear SHM |
4. | angular SHM along a circle |