A man standing on the roof of a house of height h throws one particle vertically downwards and another particle horizontally with the same velocity \(u.\) The ratio of their velocities when they reach the earth’s surface will be
1. \(\sqrt{2 g h+u^2}: u\)
2. \(1: 2\)
3. \(1:1\)
4. \(\sqrt{2 g h+u^2}: \sqrt{2 g}\)
A ball rolls off top of a staircase with a horizontal velocity u . If the steps are h metre high and b mere wide, the ball will just hit the edge of nth step if n equals to
1. \(\dfrac{h u^2}{g b^2}\)
2. \(\dfrac{u^2 8}{g b^2}\)
3. \(\dfrac{2 h u^2}{g b^2}\)
4. \(\dfrac{2 u^2 g}{h b^2}\)
A man weighing 80 kg is standing in a trolley weighing 320 kg. The trolley is resting on frictionless horizontal rails. If the man starts walking on the trolley with a speed of 1 m/s, then after 4 sec his displacement relative to the ground will be
1. 5 m
2. 4.8 m
3. 3.2 m
4. 3.0 m
A particle is projected at an angle with horizontal with an initital speed u. When it makes an angle with horizontal, its speed v is-
1.
2.
3.
4.
A particle is moving along the path y = from x = 0 m to x = 2 m. Then the distance traveled by the particle is:
1. 4 m
2.
3.
4.
Six particles situated at the corners of a regular hexagon of side \(a\) move at constant speed \(v\). Each particle maintains a direction towards the particle at the next. The time which the particles will take to meet each other is:
1. \(\frac{2 a}{v}~\text{sec}\)
2. \(\frac{a}{v}~\text{sec}\)
3. \(\frac{2 a}{3v}~\text{sec}\)
4. \(\frac{3 a}{v}~\text{sec}\)
A body is projected with velocity m/s with an angle of projection 60 with horizontal. Calculate velocity on that point where body makes an angle 30 with the horizontal.
1. 20 m/s
2.
3.
4. 10 m/s
In a uniform circular motion, which of the following quantity is not constant
1. Angular momentum
2. Speed
3. Kinetic energy
4. Momentum
A particle is moving with veocity ; where k is constant. The general equation for the path is:
1.
2.
3.
4. xy=constant
A particle is projected with a velocity u making an angle with the horizontal. At any instant, its velocity v is at right angles to its initial velocity u; then v is:
1. ucos
2. utan
3. ucot
4. usec