Toronto Math Forum

For the left-hand side, we could write as $r^2+9=0$.Thus $r=3i$ or $r=-3i.
$
Now  $Y_{c}=C_{1}cos3t+C_{2}sin3t
$
For the Right-hand side, $Y_{1}(t)=cos3t$$.  Y_{2}(t)+sin3t$$. g(t)=9sec^2(3t)$
 $$W(t)=\left[
 \begin{matrix}
   cos3t & sin3t \\
   -3sin3t& 3cos3t
  \end{matrix}
  \right] \tag{3}=3
$$
$$W_{1}(t)=\left[
 \begin{matrix}
   0 & sin3t \\
   1 & 3cos3t
  \end{matrix}
  \right] \tag{3}=-sin3t
$$
$$W_{2}(t)=\left[
 \begin{matrix}
   cos3t & 0 \\
   -3sin3t& 1
  \end{matrix}
  \right] \tag{3}=cos3t
$$
We could check the integral table that $\int\tan(t)\sec(t)dt=sec(t)$. $\int\sec(t)dt=ln|sec(t)+tan(t)|$
So, the particular solution is $Y_{p}(t)=Y_{1}\int\frac{g(s)W_{1}(s)}{W(s)}\,ds+Y_{2}\int\frac{g(s)W_{2}(s)}{W(s)}\,ds=-3\cos(3t)\int\tan(3s)\sec(3s)ds+3\sin(3t)\int\sec(3t)ds=-3\cos3t*\frac{1}{3}sec(3t)+3\sin(3t)ln|\sec3t+tan3t|*\frac{1}{3}$
Thus, the general solution is $Y(t)=C_{1}\cos(3t)+C_{2}\sin(3t)+\sin(3t)ln|\sec(3t)+\tan(3t)|-1$

For the left-hand side, we could write as $r^2+9=0$.Thus $r=3i$ or $r=-3i.
$
Now  $Y_{c}=C_{1}cos3t+C_{2}sin3t
$
For the Right-hand side, $Y_{1}(t)=cos3t$, $Y_{2}(t)+sin3t$, $g(t)=9sec^2(3t)$
 $$W(t)=\left[
 \begin{matrix}
   cos3t & sin3t \\
   -3sin3t& 3cos3t
  \end{matrix}
  \right] \tag{3}=3
$$
$$W_{1}(t)=\left[
 \begin{matrix}
   0 & sin3t \\
   1 & 3cos3t
  \end{matrix}
  \right] \tag{3}=-sin3t
$$
$$W_{2}(t)=\left[
 \begin{matrix}
   cos3t & 0 \\
   -3sin3t& 1
  \end{matrix}
  \right] \tag{3}=cos3t
$$
So, the particular solution is $$Y_{p}(t)=Y_{1}\int\frac{g(s)W_{1}(s)}{W(s)}\,ds+Y_{2}\int\frac{g(s)W_2(s)}{W(s)}\,ds=-1+\sin(3t)\ln |\sec(3t)+\tan(3t)|$$
Thus, the general solution is $Y(t)=C_{1}cos(3t)+C_{2}sin(3t)+sin(3t)ln$||sec(3t)+tan(3t)||-1

$$
r=-\frac{1}{2}or-2
$$
$$
(r+\frac{1}{2})(r+2) = 0
$$
$$
r^2+ 2r+\frac{1}2r +1 = 0
$$
$$
r^2+\frac{5}{2}r+1 = 0
$$
$$
2r^2 + 5r +2 = 0
$$
Therefore
$$
2y'' + 5y' + 2y = 0
$$

in the attachment