Shortest distance between two lines
a1x−x1=b1y−y1=c1z−z1 and a2x−x2=b2y−y2=c2z−z2 is given as
(a1b2−a2b1)2+(b1c2−b2c1)2+(c1a2−c2a1)2∣x1−x2a1a2y1−y2b1b2z1−z2c1c2∣
=(4−2)2+(−10+12)2+(−3+5)2∣5−(−3)112−(−5)244−1−3−5∣
=(2)2+(2)2+(2)2∣8117243−3−5∣
=4+4+4∣8(−10+12)−7(−5+3)+3(4−2)∣
=1216+14+6=2336
=318=63