Solve the initial value problem (explicit solution). y y' - cot t = 0 y(pi/2) = -1

asked Jun 17, 2020 36.2k views

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This ODE is separable:

$yy'-\cot t=0\implies y\,\mathrm dy=\cot t\,\mathrm dt$

Integrate both sides to get

$\frac12y^2=\ln|\sin t|+C$

Given that
$y\left(\frac\pi2\right)=-1$ , we get

$\frac12(-1)^2=\ln|\sin\frac\pi2\right|+C\implies C=\frac12$

Then

$\frac12y^2=\ln|\sin t|+\frac12$

$y^2=2\ln|\sin t|+1$

$y^2=\ln\sin^2t+1$

$\implies\boxed{y(t)=\pm√(\ln\sin^2t+1)$

Dieseltime answered Jun 21, 2020

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