A tanker truck has overturned and is spilling oil onto the highway. Amazingly, the region covered by the oil spill maintains a perfectly circular shape. The area covered by the spill is growing at a rate of 40π square feet per minute. How quickly is the radius of the oil spill growing when it covers an area of 100π square feet?

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adelekeademolu adelekeademolu · Answer 1 · 2020-04-02T03:35:59+02:00

Answer:

The radius of the oil spill growing at 2 feet per minute

Step-by-step explanation:

Area of a circle is

[tex]A=\pi r^2[/tex]

Differentiating A with respect to r,

[tex]\dfrac{dA}{dr} = 2\pi r[/tex]

When [tex]A=100\pi[/tex],

[tex]100\pi = \pi r^2[/tex]

[tex]r = 10[/tex]

The rate of growth of the spill is

[tex]\dfrac{dA}{dt} = 40\pi[/tex]

This is equivalent to

[tex]\dfrac{dA}{dt} = \dfrac{dA}{dr} \times \dfrac{dr}{dt}[/tex]

[tex]\dfrac{dr}{dt} = \dfrac{dA}{dt}/\dfrac{dA}{dr} = \dfrac{40\pi}{2\pi r} = \dfrac{20}{r}[/tex]

[tex]\dfrac{dr}{dt} = \dfrac{20}{10} = 2[/tex]

xero099 xero099 · Answer 2 · 2020-04-02T03:59:35+02:00

Answer:

[tex]\frac{dr}{dt} = 2\,\frac{ft}{min}[/tex]

Step-by-step explanation:

The area of a circle is:

[tex]A = \pi\cdot r^{2}[/tex]

The rate of change of the oil spill is:

[tex]\frac{dA}{dt} = 2\pi\cdot r \cdot \frac{dr}{dt}[/tex]

The radio of the oil spill is:

[tex]r =\sqrt { \frac{100\pi\,ft^{2}}{\pi}}[/tex]

[tex]r = 10\,ft[/tex]

The rate of change of the oil spill is:

[tex]40\pi\,\frac{ft^{2}}{min} = \left(20\pi\,ft\right)\cdot \frac{dr}{dt}[/tex]

[tex]\frac{dr}{dt} = 2\,\frac{ft}{min}[/tex]