
L1=2x−1=3y−2=4z−3=pL2=1x−6=1y=−1z−4=qA(2p+1,3p+2,4p+3)B(q+6,q,4−q) D.R. of PA=2p−3,3P+1,4p+3 D.R. of PB=q+2,q−1,4−qq+22p−3=q−13p+1=4−q4p+3
$\begin{aligned}
& 2 p q-2 p-3 q+3=3 p q+6 p+q+2 \
& \mathrm{pq}+\mathrm{rp}+4 \mathrm{q}-1=0 \
& 12 p-3 p q+4-q=4 p q+3 q-4 p-3 \
& 7 p q-16 p+4 q-7=0 \
& 8 p-2 p q-12+3 q=4 p q+8 p+3 q+6 \
& 6 \mathrm{pq}=-18 \quad \therefore \mathrm{pq}=-3 \
& 8 p+4 q=4 \quad \Rightarrow 2 p+q=1 \
& -21-16 p+4 q-7 \quad \Rightarrow 4 p-q=-7 \
& 16 \mathrm{p}-4 \mathrm{q}=-28 \quad \therefore \mathrm{p}=-1, \mathrm{q}=3 \
& \mathrm{~A}(-1,-1,-1) \quad \mathrm{B}(9,3,1)
\end{aligned}$
1−190−131−11=0−19−1−130−11=1(−1+9)=8