A tank is filled with water up to a height \(H.\) The water is allowed to come out of a hole \(P\) in one of the walls at a depth \(D\) below the surface of the water. The horizontal distance \({x}\) in terms of \(H\) and \({D}\) is:
1. \(x = \sqrt{D\left(H-D\right)}\)
2. \(x = \sqrt{\frac{D \left(H - D \right)}{2}}\)
3. \(x = 2 \sqrt{D \left(H-D\right)}\)
4. \(x = 4 \sqrt{D \left(H-D\right)}\)
A streamlined body falls through air from a height h on the surface of a liquid. If d and D(D > d) represents the densities of the material of the body and liquid respectively, then the time after which the body will be instantaneously at rest, is
1.
2.
3.
4.
As the temperature of water increases, its viscosity
1. Remains unchanged
2. Decreases
3. Increases
4. Increases or decreases depending on the external pressure
If a small drop of water falls from rest through a large height h in air, then the final velocity is:
1. | \(\propto \sqrt{\mathrm{h}}\) |
2. | \(\propto \mathrm{h} \) |
3. | \(\propto(1 / h)\) |
4. | Almost independent of h |
Water flows in a streamlined manner through a capillary tube of radius a, the pressure difference being P and the rate of flow Q. If the radius is reduced to a/2 and the pressure increased to 2P, the rate of flow becomes
1.
2.
3.
4.
Water is flowing in a pipe of diameter 4 cm with a velocity 3 m/s. The water then enters into a tube of diameter 2 cm. The velocity of water in the other pipe is
1. 3 m/s
2. 6 m/s
3. 12 m/s
4. 8 m/s
What is the velocity v of a metallic ball of radius r falling in a tank of liquid at the instant when its acceleration is one-half that of a freely falling body ? (The densities of metal and of liquid are and respectively, and the viscosity of the liquid is ).
1.
2.
3.
4.
An incompressible fluid flows steadily through a cylindrical pipe which has radius 2r at point A and radius r at B further along the flow direction. If the velocity at point A is v, its velocity at point B is
1. 2v
2. v
3. v/2
4. 4v
A homogeneous solid cylinder of length L(L<H/2) . Cross-sectional area A/5 is immersed such that it floats with its axis vertical at the liquid-liquid interface with length L/4 in the denser liquid as shown in the fig. The lower density liquid is open to atmosphere having pressure . Then density D of solid is given by
1.
2.
3.
4.
A block of ice floats on a liquid of density 1.2 in a beaker. The level of liquid when ice completely melts-
1. Remains same
2. Rises
3. Lowers
4. (1), (2) or (3)