Solve the initial value problem. ds 36t(91²-7)³, s(1)=1 dt The solution is s =

DaveCrawford asked Aug 17, 2023

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19 votes

Solve the initial value problem.
ds 36t(91²-7)³, s(1)=1
dt
The solution is s =

DaveCrawford asked Aug 17, 2023

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19 votes

Integrate both sides.

$\displaystyle \int (ds)/(dt) \, dt = \int 36t (9t^2 - 7)^3 \, dt$

On the right side, substitute
u=9t^2-7 and
$du=18t\,dt$ , so that

$\displaystyle \int 36t (9t^2 - 7)^3 \, dt = 2 \int u^3 \, du = \frac12 u^4 + C = \frac12 (9t^2 - 7)^4 + C$

Use the initial value to solve for
.

$s(1) = 1 \implies 1 = \frac12 (9 - 7)^4 + C \implies 1 = 8 + C \implies C=-7$

Then the particular solution is

$s(t) = \boxed{\frac12 (9t^2 - 7)^4 - 7}$

Wwwclaes answered Aug 23, 2023

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