Equation of line PQ is: 3x+2=2y+1=2z−3=r( say ) Let coordinate of Q=(3r−2,2r−1,2r+3) ∵PR=5 Then $\begin{aligned}
& (3 r-2-1)^2+(2 r-1-3)^2+(2 r+3-3)^2=25 \
& \therefore r=0 \text { or } 2 \
& \therefore \quad \text { Coordinate of } Q=(4,3,7)
\end{aligned}$ 
∴ square of area of △PQR=21(PQ×PR)2=21(6i^+4j^+4k^)×(3i^+4j^)2=∣−8i^+6j^+6k^∣2=136