2. Suppose that the bottom of a conical shaped tank of water has been ruptured. At the instant when the depth of water is 4 ft, it is decreasing at a rate of 2 ft per minute. How fast is the volume of water in the tank being depleted at that instant if the radius of the tank is twice its height?

2. Suppose that the bottom of a conical shaped tank of water has been ruptured. At the instant when the depth of water is 4 ft, it is decreasing at a rate of 2 ft per minute. How fast is the volume of water in the tank being depleted at that instant if the radius of the tank is twice its height?

College Algebra

10th Edition

ISBN:9781337282291

Author:Ron Larson

Publisher:Ron Larson

Chapter3: Polynomial Functions

Section3.5: Mathematical Modeling And Variation

Problem 7ECP: The kinetic energy E of an object varies jointly with the object’s mass m and the square of the...

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Question

2. Suppose that the bottom of a conical shaped tank of water has been ruptured. At
the instant when the depth of water is 4 ft, it is decreasing at a rate of 2 ft per minute.
How fast is the volume of water in the tank being depleted at that instant if the radius
of the tank is twice its height?

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