The radius of a sphere is increasing at the rate of 2 m/sec. find the rate of change of the volume with respect to time when radius is 4m?

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The radius of a sphere is increasing at the rate of 2 m/sec. find the rate of change of the volume with respect to time when radius is 4m?

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Answer 1 · 2018-03-06T11:34:12

Sphere Volume is given by $V = \frac{4}{3} π r^{3}$ $V=4/3pir^3$ where r is given in meters for example (whichever linear unit can be used)

Radius varies in function of time $r = 2 t$ $r=2t$

If radius increase at rate of $2 \frac{m}{sec}$ $2m/sec$ in t seconds it will be $2 \frac{m}{sec} t sec = 2 t$ $2m/(sec) t sec=2t$ meters in t seconds

In our volume equation $V = \frac{4}{3} π {(2 t)}^{3} = \frac{32}{3} π t^{3}$ $V=4/3pi(2t)^3=32/3pit^3$

The volume varies each t seconds acording to this formula

Answer 2 · 2018-03-07T15:18:30

$sf(128picolor(white)(x)m^3"/s")$

Explanation:

The volume of a sphere is given by:

$sf(V=4/(3)pir^3)$

We are told that:

$sf((dr)/(dt)=2color(white)(x)"m/s")$

Differentiating implicitely with respect to t::

$sf((dV)/(dt)=4/(3)pi.3r^2.(dr)/dt)$

When $sf(r=4color(white)(x)m)$ this becomes:

$sf((dV)/(dt)=4/(cancel(3))picancel(3)xx16xx2=128picolor(white)(x)m^3"/s")$

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The radius of a sphere is increasing at the rate of 2 m/sec. find the rate of change of the volume with respect to time when radius is 4m?

2 Answers

Explanation:

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