Water enter in a turbine at a speed of 500 m/s and leaves at 400 m/s. If `2xx10^(3)kg//s` of water flows and efficiency is 75% then output power is

Water is falling on the blades of a turbine from a height of 25 m . 3 xx 10^(3) kg of water pours on the blade per minute. If the whole of energy is transferred to the turbine, power delivered is g = 9.8 m//s^(2)

A block of mass 2.00 kg moving at a speed of 10.0 m/s accelerates at 3.0 m/s^2 for 5.00 s. Compute its final kinetic enegy.

At a hydroelectric power plant, the water pressure head is at a height of 300 m and the water flow available is 100 m^(3) s^(-1) . If the turbine generator efficiency is 60%, estimate the electric power available from the plant (g = 9.8 ms^(-2)) .

A motor is to be used to lift water from a depth of 10 m & discharging it on ground level at a speed 10m//s if 2 kg of water is lifted per second & the efficiency of motor is 40% The minimum power of the motor should be nearly :

In Koyna hydroelectric power station, water stored at a height of 600 metre fall on the turbine blades and the water flow avilable is 100 m^(3)//s . The efficiency of the turbine generator is 50%. What is the power available from the power station? [g=10 m//s^(2)]

From a waterfall, water is falling down at the rate of 100kg / s on the blades of turbine. If the height of the fall is 100 m , then the power delivered to the turbine is approximately equal to

Water enters a horizontal pipe of non uniform cross section with a velocity of 0.5 m/s and leaves the other end with a velocity of 0.7 m/s. the pressure of water at the first end is 10^(3) N//m^(2) . Calculate pressure at the other end. (Density of water =1.0xx10^(3)kg//m^(3) )