Selvis house has an overhead tank in the shape of a cylinder. This is filled by pumping water from a sump (an underground tank) which is in the shape of a cuboid. The sump has dimensions `1. 57 mxx1. 44 mxx95 c m`. The overhead tank has its radius

A overhead tank of capacity 1000 liter has to be filled in (1)/(2) hour using water pump. Tank is kept at a height 10 m above ground and water level is 10 m below ground. The opening of inlet pipe inside tank is 1.11 cm^(2) . Assuming the efficiency of motor to be 60%, the electric power used is (Neglect viscosity)

T=(R^(2))/(r^(2))sqrt((2h)/(g)) Suppose an open cylindrical tank has a round drain with radius t in the bottom of the tank. When the tank is filled with water to a depth of h centimeters, the time it takes for all the water to drain from the tank is given by the formula above, where R is the radius of the tank (in centimeters) and g=980"cm/"s^(2) is the acceleration due to gravity. Suppose such a tank has a radius of 2 meters and is filled to a depth of 4 meters. About how many minutes does it take to empty the tank if the drain has a radius of 5 centimeters? (1 meter=100 centimeter).

In the adjoining line diagram, a birds is shwon having its one eye, two legs and one tail in shaded portions. Head and lower part are formed with two quarter circles A and B with diameters 10 cm each and two semicircles C and D with diameters 4 cm each. An eye has a radius 0.5 cm. Each leg is in the shape of equilateral Delta with sides 1 cm each and a tail is a trapezium with parallel sides 1 cm and 3 cm and the distance between these sides is 1.5 cm. Find the area covered by this bird. (Take pi = 3.14, sqrt3 = 1.732 )

A tank, with a square base of area 1 .0 m^(2) is divided by a vertical partition has a small hinged door of aren 20 cm^(2) . The tank is filled with water in one compartment, and an acid (of relative density 1.7) in the other, both to the height of 4.0 m. Compute the force necessary to keep the door closed

A solid iron pole consists of a cylinder of height 220 cm and base diameter 24 cm, which is surmounted by another cylinder of height 60 cm and radius 8 cm. Find the mass of the pole, given that 1\ c m^3 of iron has approximately 8g mass.

A particle lies on the bottom of a tank T filled with water upto s height of 90 cm . The medium above the surface of water is of R.I = 1.2 above which there is mirror M . Beyond the mirror M the region contains air ( mu =1 ). The distance of the image formed by the mirrro after reflection of the rays coming from P is ____ cm (w.r.t mirror). .

We have a vessel in shape of a cuboid partially filled with water. It base is square wilth an area of 4.5dm^(2) (1dm=10cm) and a vessel contains water up to 2 cm height. Then we place wooden cube inside water. The wood has mass 4kg and specific gavity 0.5 . The base of the wooden cube is horizontal. Find the height of water level above the base of the wooden block.

A cylindrical tank of height H is open at the top end and it has a radius r . Water is filled in it up to a height of h . The time taken to empty the tank through a hole of radius r' in its bottom is

A long cylindrical tank of cross-sectional area 0.5m^(2) is filled with water. It has a small hole at a height 50cm from the bottom. A movable piston of cross-sectional area almost equal to 0.5m^(2) is fitted on the top of the tank such that it can slide in the tank freely. A load of 20 kg is applied on the top of the water by piston, as shown in the figure. Calculate the speed of the water jet with which it hits the surface when piston is 1m above the bottom. (Ignore the mass of the piston)