Given equation of lines2x−3=3y−2=−1z−1 &
2x+3=1y−6=3z−5
Now let the point be A=(3,2,1) on first line
and B=(−3,6,5) on second line, so BA=6i^−4j^−4k^
And direction ratio's be n1=2i^+3j^−k^ &
n2=2i^+i^−3k^
n1×n2=∣i^22j^31k^−13∣=10i^−8j^−4k^
We know that shortest Distance =∣n1×n2∣[BAn1n2]
BA\rightarrow n1\rightarrow n2\rightarrow =6i^-4j^-4k^.10i^-8j^-4k^=60+32+16=108
∣n1×n2∣=100+64+16=180
S.D=180108=65108=518