
$\begin{aligned}
& \because \mathrm{PM}=\mathrm{QM} \
& \text { So, } \mathrm{M}\left(\frac{\frac{57}{13}+1}{2}, \frac{\frac{-40}{13}+2}{2}\right) \
& =\left(\frac{35}{13}, \frac{-7}{13}\right)
\end{aligned}\becauseMliesontheline\begin{gathered}2 x-3 y+\lambda=0 \ 2\left(\frac{35}{13}\right)-3\left(\frac{-7}{13}\right)+\lambda=0 \ \lambda=-\frac{70}{13}+\frac{21}{13} \ =\frac{-91}{13}=-7 \ \left|\begin{array}{ccc}3 & -4 & -\alpha \ 8 & -11 & -33 \ 2 & 3 & \lambda\end{array}\right|=0\end{gathered}\begin{aligned}
& \Rightarrow 3(-11 \lambda-99)+4(8 \lambda+66)-\alpha(-24+22)=0 \
& \Rightarrow 33 \lambda-297+32 \lambda+264+24 \alpha-22 \alpha=0 \
& \Rightarrow-\lambda+2 \alpha-33=0 \
& \therefore \lambda=-7 \
& -(-7)+2 \alpha-33=0 \
& 2 \alpha=26 \
& \alpha=13 \
& \therefore|\alpha \lambda|=|13 \times(-7)| \
& =91
\end{aligned}$