A particle starts its motion from rest under the action of a constant force. If the distance covered in first 10 s is and that covered in the first 20 s is then
1.
2.
3.
4.
The distance travelled by a particle starting from rest and moving with an acceleration in the third second is
1. 6m
2. 4m
3.
4.
A particle shows a distance-time curve as given in this figure. The maximum instantaneous velocity of the particle is around the point:
1. B
2. C
3. D
4. A
A particle moves in a straight line with a constant acceleration. It changes its velocity from 10 to while passing through a distance of 135 m in t seconds. The value of t is:
1. 10
2. 1.8
3. 12
4. 9
A particle moves a distance x in time t according to equation The acceleration of the particle is proportional to,
1.
2.
3.
4.
A ball is dropped from a high rise platform at t=0 starting from rest. After 6s another ball is thrown downwards from the same platform with a speed v. The two balls meet at t=18 s. What is the value of v? (take g=10 )
1. 2.
3. 4.
A particle covers half of its total distance with speed and the rest half distance with speed Its average speed during the complete journey is
(1)
(2)
(3)
(4)
A boy standing at the top of a tower of \(20\) m height drops a stone. Assuming \(g=10\) m/s2, the velocity with which it hits the ground will be:
1. \(20\) m/s
2. \(40\) m/s
3. \(5\) m/s
4. \(10\) m/s
The motion of a particle along a straight line is described by the equation; \(x=8+12 t-t^3,\) where \(x\) is in metre and \(t\) is in second. The retardation of the particle when its velocity becomes zero is:
1. | \(24 ~\text{ms}^{-2} \) | 2. | zero |
3. | \( 6 ~\text{ms}^{-2} \) | 4. | \(12 ~\text{ms}^{-2} \) |
A stone falls under gravity. It covers distances h1, h2 and h3 in the first 5 seconds, the next 5 seconds and the next 5 seconds respectively. The relation between h1, h2, and h3 is
1. h1=2h2=3h3
2. h1=h2/3=h3/5
3. h2=3h1 and h3=3h2
4. h1=h2=h3