$\begin{aligned}
& y=\frac{5-x}{x^2-3 x+2} \
& y x^2-3 x y+2 y+x-5=0 \
& y z^2+(-3 y+1) x+(2 y-5)=0
\end{aligned}$
Case I : If y=0 (Accepted)
⇒x=5
Case II : If y=0
$\begin{aligned}
& \mathrm{D} \geq 0 \
& (-3 y+1)^2-4(y)(2 y-5) \geq 0 \
& 9 y^2+1-6 y-8 y^2+20 y \geq 0 \
& \mathrm{y}^2+14 y+1 \geq 0 \
& (y+7)^2-48 \geq 0 \
& |y+7| \geq 4 \sqrt{3} \
& \Rightarrow y+7 \geq 4 \sqrt{3} \text { or } \mathrm{y}+7 \leq-4 \sqrt{3} \
& \Rightarrow \mathrm{y} \geq 4 \sqrt{3}-7 \text { or } \mathrm{y} \leq-4 \sqrt{3}-7
\end{aligned}$
From Case I and Case II
y∈(−∞,−43−7]∪[43−7,∞)
So α=−43−7
β=43−7
$\begin{aligned}
\Rightarrow a^2+b^2 & =(-4 \sqrt{3}-7)^2+(4 \sqrt{3}-7)^2 \
& =2(48+49) \
& =194
\end{aligned}$