Answer to Question #315591 in Calculus for Gaile

Question #315591

The Altitude of a triangle is increasing at a rate of 8cm/s while its area is increasing at the rate of 12cm^2/s. At what rate is the base of the triangle changing when the altitude is 20 cm and the area is 100 cm^2 ?

Expert's answer

Given;

"\\\\\\frac{da}{dt}=8cm\/min\\\\\\frac{dA}{dt}={12}cm^2\/min" with a=altitude, A=area, t=time

The question requires us to find "\\\\\\frac{db}{dt}" when a=20cm and A=100cm².

"A=\\frac{1}{2}ba\\\\\\frac{d}{dt}(A)=\\frac{d}{dt}(\\frac{1}{2}ba)\\\\\\frac{dA}{dt}=\\frac{db}{dt}a+\\frac{1}{2}b\\frac{da}{dt}"

Using the formula for area, we can tell that b=10cm.

Substituting ;

"12=\\frac{1}{2}\\frac{db}{dt}20+\\frac{1}{2}(10)(8)\\\\\\frac{db}{dt}=-2.8cm\/min"

The base is changing at a rate of -2.8cm/min

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Answer to Question #315591 in Calculus for Gaile

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