A water is poured into an inverted cone at the rate of 270 cc/sec. The radius of the cone is equal to the depth of water in it. If the depth of water in the cone is 18 cm, then the rate at which the water level is rising, is

Water is running into an inverted cone at the rate of 270dm^(3)//min . The radius of the cone is equal to the depth of water in it .When the water is 18 dm deep, water level is rising at the rate of

Water is poured into an inverted cone of semi-vertical angle 30^(@) at the rate of 2 cu.ft//min .When the depth of water in the cone is 1 foot, the surface of water in the cone is rising at the rate of

Water is poured into an inverted cone of semi-vertical angle 30^(@) at the rate of 2 cu.ft//min .When the depth of water in the cone is 1 foot, the surface of water in the cone is rising at the rate of

Whater is poured into an inverted cone of semi-vertical angle 45^(@) at rate of 2 cu. in . /min .The rate at which the depth of water in the cone is increasing when the depth is 4 in. is

A water is poured into an inverted cone whose semi-vertical angle is 45^(@) so that the level of water increases at the rate of 1 cm/sec. then the rate at which the volume of water is increasing when height of water in cone is 2 cm is

Water is poured into an inverted conical vessel of which the radius of the base is 2m and height 4m, at the rate of 77 lit/min.The rate at which the water level is rising at the instant when the depth is 70cm is

Water is running into an inverted cone at the rate of pi cubic metres per minute.The height of the cone is 10 metres,and the radius of its base is 5m. How fast the water level is rising when the water stands 7.5m below the base.

Water is pound into an empty cylindrical tank at a constant rate for 5 minutes. After the water has been poured into the tank, the depth of the water is 7 feet. The radius of the tank is 100 feet. Which of the following is the best approximation for the rate at which the water was poured into the tank? (a) 140 cubic feet/sec (b) 440 cubic feet/sec (c) 700 cubic feet/sec (d) 2200 cubic feet/sec

Height of a tank in the form of an inverted cone is 10 m and radius of its circular base is 2 m. The tank contains water and it is leaking through a hole at its vertex at the rate of 0.02m^(3)//s. Find the rate at which the water level changes and the rate at which the radius of water surface changes when height of water level is 5 m.

Sand is pouring at the rate of 12 cm^(3)"/sec" . The falling sand forms a cone on the ground in such a way that the height of the cone is always ((1)/(6))^(th) of the radius of the base. If the height of sand is 4 cm, then the rate at which height of sand increasing, is