
$\begin{aligned}
& \overrightarrow{\mathrm{PQ}} \cdot \overrightarrow{\mathrm{~b}}=0 \
& \Rightarrow 3(3 \lambda+5)+2(2 \lambda+5)-2(-2 \lambda+4) \
& \Rightarrow 17 \lambda=-17 \Rightarrow \lambda=-1 \
& \mathrm{Q}(3,5,9)
\end{aligned}$
Let A (3μ+6,2μ+7,−2μ+7)
(3μ+3)2+(2μ+2)2+(−2μ−2)2=68
⇒μ2+2μ−3=0μ=−3 or μ=1
A (−3,1,13) and B(9,9,5)
OA⋅OB=−27+9+65=47