2.1.1.2 Example
\begin{align*} y^{\prime \prime }+\frac {1}{x-1}y^{\prime }+3y & =x\\ y\left ( 1\right ) & =0\\ y^{\prime }\left ( 1\right ) & =1 \end{align*}
In standard form
\[ y^{\prime \prime }+py^{\prime }+qy=f \]
\(p\left ( x\right ) =\frac {1}{x-1}\) is not continuous at
\(x_{0}=1\). Hence theorem does not apply. It turns out that
there is no solution to this ode with these initial conditions. Changing
\(x_{0}\) to
\(0\) instead then a
solution exists and is unique.