A conical container of radius 5 ft and height 20 ft is filled to a height of 16 ft of a liquid weighing 62.4 lb / ft.a. How much work will it take to pump the contents to the rim?b. How much work will it take to pump the liquid to a level of 4 ft above the cone's rim?a. Let y = 0 correspond to the bottom of the tank. Set up the integral that gives the work required, in ft-lb, to pump contents to the rim.w= OdyThe amount of work required to pump the liquid to the rim of the tank is(Round to the nearest whole number as needed.)b. Let y = 0 correspond to the bottom of the tank. Set up the integral that gives the work required, in ft-lb, to pump the liquid to a level of 4 ft above the cone's rim.W =|dyThe amount of work required to pump the liquid to a level 4 ft above the rim of the tank is(Round to the nearest whole number as needed.)

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A conical container of radius 5 ft and height 20 ft is filled to a height of 16 ft of a liquid weighing 62.4 lb / ft. a. How much work will it take to pump the contents to the rim? b. How much work will it take to pump the liquid to a level of 4 ft above the cone's rim? a. Let y = 0 correspond to the bottom of the tank. Set up the integral that gives the work required, in ft-lb, to pump contents to the rim. w= Ody W = The amount of work required to pump the liquid to the rim of the tank is (Round to the nearest whole number as needed.) b. Let y = 0 correspond to the bottom of the tank. Set up the integral that gives the work required, in ft-lb, to pump the liquid to a level of 4 ft above the cone's rin W = dy The amount of work required to pump the liquid to a level 4 ft above the rim of the tank is (Round to the nearest whole number as needed.)

A conical container of radius 5 ft and height 20 ft is filled to a height of 16 ft of a liquid weighing 62.4 lb / ft. a. How much work will it take to pump the contents to the rim? b. How much work will it take to pump the liquid to a level of 4 ft above the cone's rim? a. Let y = 0 correspond to the bottom of the tank. Set up the integral that gives the work required, in ft-lb, to pump contents to the rim. w= Ody W = The amount of work required to pump the liquid to the rim of the tank is (Round to the nearest whole number as needed.) b. Let y = 0 correspond to the bottom of the tank. Set up the integral that gives the work required, in ft-lb, to pump the liquid to a level of 4 ft above the cone's rin W = dy The amount of work required to pump the liquid to a level 4 ft above the rim of the tank is (Round to the nearest whole number as needed.)

Principles of Physics: A Calculus-Based Text

5th Edition

ISBN:9781133104261

Author:Raymond A. Serway, John W. Jewett

Publisher:Raymond A. Serway, John W. Jewett

Chapter15: Fluid Mechanics

Section: Chapter Questions

Problem 46P

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