f1(x)=log5(18x−x2−77)∴18x−x2−77>0x2−18x+77<0x∈(7,11)α=7,β=11f2(x)=log(x−1)(x2−3x−42x2+3x−2)x>1,x−1=1,x2−3x−42x2+3x−2>0x>1,x=2,(x−4)(x+1)(2x−1)(x+2)>0
$\begin{aligned}
& \therefore \quad x \in(4, \infty) \
& \therefore \quad \gamma=4 \
& \therefore \quad \alpha^2+\beta^2+\gamma^2=49+121+16 \
& =186
\end{aligned}$