1 Answer

MarkOfHall · Answer 1 · 2024-01-01T02:25:14+0000

Starting with the volume of a cube with side length
,

V(x) = x^3

differentiate both sides with respect to time
. By the chain rule,

(dV)/(dt) = 3x^2 (dx)/(dt)

We're given that
$(dx)/(dt) = 2(\rm in)/(\rm min)$ .

39. At the moment
$x=8\,\rm in$ , solve for
(dV)/(dt) .

$(dV)/(dt) = 3 (8\,\mathrm{in})^2 \left(2(\rm in)/(\rm min)\right) = 384 (\rm in^3)/(\rm min)$

41. Find
when
$V = 55\,\rm in^3$ .

$55\,\mathrm{in}^3 = x^3 \implies x = 55^(1/3) \,\rm in$

Solve for
(dV)/(dt) .

$(dV)/(dt) = 3 \left(55^(1/3) \,\mathrm{in}\right)^2 \left(2(\rm in)/(\rm min)\right) = 6\cdot55^(2/3)(\rm in^3)/(\rm min)$

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