Equation of line through point (−1,2,1) is →
⇒2x+1=3y−2=4z−1=λ−(2)So, x=2λ−1y=3λ+2z=4λ+1 By(1)→3x+2=2y−3=1z−4=μ( Let ) So, x=3μ−2y=2μ+3z=μ+4 For intersection point ' P ' $\begin{aligned}
& \mathrm{x}=2 \lambda-1=3 \mu-2 \
& \mathrm{y}=3 \lambda+2=2 \mu+3 \
& \mathrm{z}=4 \lambda+1=\mu+4
\end{aligned}So,point\mathrm{P}(\mathrm{x}, \mathrm{y}, \mathrm{z})=(1,5,5)&\mathrm{Q}(4,-5,1)\begin{aligned}
& \therefore P Q=\sqrt{9+100+16} \
& =\sqrt{125}=5 \sqrt{5}
\end{aligned}$