Answer to Question #315590 in Calculus for Aune

Question #315590

A cone of radius 𝑟 centimeters and height ℎ centimeters is lowered point first at

a rate of 1 cm/s into a tall cylinder of radius 𝑅 centimeters that is partially filled with

water. How fast is the water level rising at the instant the cone is completely

submerged

Expert's answer

Potential energy is converted into kinetic energy of translational and rotational motion.

"m*g*h=m*v\u00b2\/2 + J*\u03c9\u00b2\/2"

moment of inertia of the cylinder

"J=m*r\u00b2\/2"

Angular velocity at the end of the inclined plane

"\u03c9=v\/r\\, \\\\\n\nm*g*h=m*v\u00b2\/2 + (m*r\u00b2\/2)*(v\u00b2\/(2*r\u00b2))\\\\\n\ng*h=v\u00b2\/2 + v\u00b2\/4=(3\/4)*v\u00b2\\\\\n\nv=2*\\sqrt{g*h\/3}"

Answer: "v=2*\\sqrt{g*h\/3}"

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Answer to Question #315590 in Calculus for Aune

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