A closed rectangular tank is completely filled with water and is accelerated horizontally with an acceleration a towards right. Pressure is (i) maximum at, and (ii) minimum at
1. (i) B (ii) D
2. (i) C (ii) D
3. (i) B (ii) C
4. (i) B (ii) A
A vertical \(\mathrm{U}\)-tube of uniform inner cross-section contains mercury in both its arms. A glycerin (density\(=1.3\) g/cm3) column of length \(10\) cm is introduced into one of its arms. Oil of density \(0.8\) g/cm3 is poured into the other arm until the upper surfaces of the oil and glycerin are at the same horizontal level. The length of the oil column is:
(density of mercury \(=13.6\) g/cm3)
1. \(10.4\) cm
2. \(8.2\) cm
3. \(7.2\) cm
4. \(9.6\) cm
A triangular lamina of area A and height h is immersed in a liquid of density in a vertical plane with its base on the surface of the liquid. The thrust on the lamina is:
1.
2.
3.
4.
If two liquids of same masses but densities and respectively are mixed, then density of mixture is given by
1.
2.
3.
4.
The density of water of bulk modulus B at a depth y in the ocean is related to the density at surface by the relation
1.
2.
3.
4.
With rise in temperature, density of a given body changes according to one of the following relations
(a) (b)
(c) (d)
For the figures given below, the correct observation is:
1. | pressure at the bottom of the tank (a) is greater than at the bottom of the tank (b). |
2. | pressure at the bottom of the tank (a) is lesser than at the bottom of (b). |
3. | pressure depends upon the shape of the container. |
4. | pressure at the bottom of (a) and (b) are the same. |
A given shaped glass tube having uniform cross section is filled with water and is mounted on a rotatable shaft as shown in figure. If the tube is rotated with a constant angular velocity then
1. Water levels in both sections A and B go up
2. Water level in Section A goes up and that in B comes down
3. Water level in Section A comes down and that in B it goes up
4. Water levels remains same in both sections
An iceberg of density \(900 ~\text{kg/m}^ 3\) is floating in the water of density \(1000 ~\text{kg/m}^ 3.\) The percentage of the volume of ice cube outside the water is:
1. \(20\% \)
2. \(35\% \)
3. \(10\% \)
4. \(25\% \)
A log of wood of mass 120 Kg floats in water. The weight that can be put on the raft to make it just sink, should be (density of wood = 600 Kg/)
1. 80 Kg
2. 50 Kg
3. 60 Kg
4. 30 Kg