A conical container of radius 5ft and height 30ft is filled to a height of 16ft...

A conical container of radius 6 ft and height 24 ft is filled to a height...

A conical container of radius 6 ft and height 24 ft is filled to a height of 22 ft with a liquid weighing 62.4 lb/ft3. How much work will it take to pump the liquid to a level of 2 ft above the​ cone's rim?

A conical container having a top radius of 6 meters and a height of 9 meters...

A conical container having a top radius of 6 meters and a height of 9 meters is filled with a liquid weighing 30 N/m3. Find the work done in pumping all the liquid to a point 3 meters above the top of the liquid.

. A conical tank of with radius 5 m and height 10 m is filled with...

. A conical tank of with radius 5 m and height 10 m is filled with water. Calculate the work against gravity required to pump water (with density 1000 kg/m3 ) through a spout of 1 meter in height located at the top of the tank.

Water is poured into a conical container with height 4 in. and base radius 4 in....

Water is poured into a conical container with height 4 in. and base radius 4 in. When the height of the water in the container is 2.5 inches it is increasing at 3 in/min. At what rate is the lateral surface area of the water changing when the height is 2.5 inches? The formula for the lateral surface area of the cone is Slateral = πrs where s is the slant or lateral length.

A conical tank of diameter 6 m and height 10 m is filled with water. Compute...

A conical tank of diameter 6 m and height 10 m is filled with water. Compute for the work needed to pump all the water 2 m above the tank. The water has a density of 1000 kg per cubic meter.

A liquid is poured into a conical container with a base radius of 6 inches and...

A liquid is poured into a conical container with a base radius of 6 inches and a height of 6 inches. When the water is 3 inches deep it is increasing at a rate of 4 inches/min. What rate is the lateral surface area of the water changing when the depth is 3 inches?

a cylindrical tank or radius 2 meters and height 7 meters is filled with water to...

a cylindrical tank or radius 2 meters and height 7 meters is filled with water to a depth of 4 meters. how much work does it take to pump all the water over the top edge of the tank?

Consider the following container. It is a cut cone with a top radius of 7 ft...

Consider the following container. It is a cut cone with a top radius of 7 ft and a bottom radius of 3 ft. It has a height of 12 ft and water (density 62.5 lb/ft^3) is currently in the container to a depth of 5 ft. There is a spout on this container at the top. Write down but DO NOT EVALUATE an integral to find the work necessary to pump all the water in this container up out of...

A tank in the shape of a circular paraboloid with top radius 3m and height 9...

A tank in the shape of a circular paraboloid with top radius 3m and height 9 m is filled with water. How much work is required to pump all the water out over the side?

A hemispherical tank of water (radius 10 ft) is being pumped out. Find the work done...

A hemispherical tank of water (radius 10 ft) is being pumped out. Find the work done in lowering the water level from 2 feet below the top of the tank to 4 feet below the tank given that the pump is placed a) at the top of the tank and b) the pump is placed 3 feet above the top of the tank. Clearly indicate how force and distance are represented and indicate where the 0 position is on the...