Ask Question
7 February, 06:16

At a sand and gravel plant, sand is falling off a conveyor and onto a conical pile at a rate of 8 cubic feet per minute. The diameter of the base of the cone is approximately three times the altitude. At what rate (in ft/min) is the height of the pile changing when the pile is 12 feet high? (Hint: The formula for the volume of a cone is V = 1 3 πr2h.)

+3
Answers (1)
  1. 7 February, 09:11
    0
    dh/dt = 0,008 ft/min

    Step-by-step explanation:

    The volume of the cone is:

    V (c) = (1/3) * π*r²*h (1)

    Where r is radius of the base

    We know from problem statement

    dV/dt = 8 ft³/min

    And d = 3*h ⇒ 2*r = 3*h ⇒ r = (3/2) * h

    Plugging the value of r in equation (1) we get

    V = (1/3) * π*[ (3/2) * h ]²*h

    V = (3/4) * π*h³

    Now we differentiate relation to time, on both sides of the equation to get

    dV/dt = (3/4) * π*3*h²*dh/dt

    dV/dt = (9/4) * π*h²*dh/dt

    The question is dh/dt when h = 12 ft. Therefore

    8 = (9/4) * 3,14 * (12) ² * dh/dt ⇒ dh/dt = 8 / 1017,36

    dh/dt = 0,008 ft/min
Know the Answer?
Not Sure About the Answer?
Find an answer to your question ✅ “At a sand and gravel plant, sand is falling off a conveyor and onto a conical pile at a rate of 8 cubic feet per minute. The diameter of ...” in 📘 Mathematics if you're in doubt about the correctness of the answers or there's no answer, then try to use the smart search and find answers to the similar questions.
Search for Other Answers