Find the time required for a cylindrical tank of radius `r` and height `H` to empty through a round hole of area `a` at the bottom. The flow through the hole is according to the law `v(t)=ksqrt(2gh(t))` , where `v(t)` and `h(t)` , are respectively, the velocity of flow through the hole and the height of the water level above the hole at time `t ,` and `g` is the acceleration due to gravity.

A hemi-spherical tank of radius 2 m is initially full of water and has an outlet of 12c m^2 cross-sectional area at the bottom. The outlet is opened at some instant. The flow through the outlet is according to the law v(t)=0.6sqrt(2gh(t)), where v(t) and h(t) are, respectively, the velocity of the flow through the outlet and the height of water level above the outlet and the height of water level above the outlet at time t , and g is the acceleration due to gravity. Find the time it takes to empty the tank.

Find the time required for a cylindrical tank of radius 2.5 m and height 3 m to empty through a round hole of 2.5 cm with a velocity 2. 5sqrt(h) m/s, h being the depth of the water in the tank.

Find the time required for a cylindrical tank of radius 2.5 m and height 3 m to empty through a round hole of radius 2.5 cm with a velocity 2. 5sqrt(h) m/s, h being the depth of the water in the tank.

A large tank filled with water to a height h is to be emptied through a small hole at the bottom. The ratio of times taken for the level of water to fall from h to (h)/(2) and from (h)/(2) to zero is

A water tank has a hole at a distance of 7 m from free water surface. Find the velocity of water through the hole. If the radius of the hole is 2 mm what is the rate of flow of water?

A vessel is filled with two different liquids of densities rho and 2 rho respectively as shown in the figure. The velocity of flow of liquid through a hole at height (h)/(2) from bottom is

The contribution in the total current flowing through a semiconductor due to electrons and holes are 3/4 and 1/4 respectively. If the drift velocity of electrons is 5/2 times that of holes at this temperature, then the ratio of concentration of electrons and holes is

Water and mercury are filled in two cylindrical vessels up to same height. Both vessels have a hole in the wall near the bottom. The velocity of water and mercury coming out of the holes are v_1 and v_2 respectively. Then

A body is projected veritclaly upwards.The times corresponding to height h while ascending and while descending are t_(1) and t_(2) respectively. Then, the velocity of projection will be (take g as acceleration due to gravity)

A body is projected vertically upwatds at time t=0 and is it seen at a height H at time t_1 and t_2 second during its flight. The maximum height attainet is (g is acceleration due to garavity).