The radius of a right circular cylinder increases at the rate of 0.1 cm/min, and the height decreases at the rate of 0.2 cm/min. The rate of change of the volume of the cylinder, in cm3/min, when the radius is 2 cm and the height is 3 cm, is
A
−2π
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B
8π5
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C
−3π5
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D
2π5
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Solution
The correct option is D2π5 Given that drdt=110 and dhdt=−210
Volume of the cylinder V=πr2h
Differentiating both sides dVdt=π(r2dhdt+2rdrdth) ⇒dVdt=πr(rdhdt+2hdrdt) ⇒dVdt=πr(r(−210)+2h(110)) ⇒dVdt=πr5(−r+h)
Thus, when r=2 and h=3, dVdt=π(2)5(−2+3)=2π5