The relationship between the rates of change can be found by taking the derivative of area with respect to time.
... a(t) = π·r(t)²
... a'(t) = 2π·r(t)·r'(t)
At the time of interest, we have
... a'(t) = 2π·(6 ft)·(5 ft/min) = 60π ft²/min
The rate of change of area at that time is 60π ≈ 188.5 ft²/min.
We have the area of the circle [tex] a(t)=\pi r(t)^{2} [/tex]. Differentiating with respect to time t,
[tex] \frac{d}{dt} a(t)=\frac{d}{dt} \pir(t)^2=2\pi r(t)\frac{dr(t)}{dt} [/tex]
Give that [tex] \frac{dr(t)}{dt}=5, r(t)=6 [/tex].
Substituting the numerical values, the rate of change of area at [tex] r(t)=6 [/tex] is
[tex] \frac{d}{dt} a(t)=2\pi (6)(5)=60 ft/min \pi [/tex]
