"Use the method of variation of parameters to..." was answered by our community

Yasmin

Answered question

2021-10-26

Use the method of variation of parameters to find a particular solution of the given differential equation.

y + y = \csc^{2} x

Answer & Explanation

pierretteA

Skilled2021-10-27Added 102 answers

Take a look at the differential equation.
$y^{″} + y = \csc^{2} x$
Finding a certain solution is the goal. $y_{p}$ of the given equation.
The homogeneous equation connected to the previous equation is
$y^{″} + y = 0$
Equation that is auxiliary to the homogeneous differential equation is
$r^{2} + 1 = 0$
$r^{2} = - 1$
$r = \pm \sqrt{- 1}$
$r = \pm i$
Consequently, the auxiliary equation's roots are
$r_{1} = i, r_{2} = - i$
Consequently, the complimentary role is
$y_{c} (x) = c_{1} \cos x + c_{2} \sin x$
We have
$y_{1} (x) = \cos x y_{2} (x) = \sin x$
$y_{1}^{'} (x) = - \sin x y_{2}^{'} (x) = \cos x$
Hence,
$W = W (y_{1}, y_{2})$
$W = [\begin{matrix} \cos x & \sin x \\ - \sin x & \cos x \end{matrix}]$
$W = \cos^{2} x + \sin^{2} x$
W=1
Here,
$f (x) = \csc^{2} x$
The specific response is provided by
$y_{p} (x) = (- \int \frac{y_{2} (x) f (x) d x}{W (x)}) y_{1} (x) + (\int \frac{y_{1} (x) f (x) d x}{W (x)}) y_{2} (x)$
$y_{p} (x) = (- \int \sin x \csc^{2} x d x) \cos x + (\int \cos x \csc^{2} x d x) \sin x$
$y_{p} (x) = (- \int \frac{\sin x}{\sin^{2} x} d x) \cos x + (\int \frac{\cos x}{\sin^{2} x} d x) \sin x$

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