Given:
4x−4=5y+2=3z+3
3x−1=4y−3=2z−4
So,
a1=4i^−2j^−3k^a2=i^+3j^+4k^
So,
a2−a1=−3i^+5j^+7k^
And,
b1×b2=∣i^43j^54k^32∣=−2i^+j^+k^
⇒∣b1×b2∣=(−2)2+(1)2+(1)2=6
Shortest distance between the lines
=∣∣b1×b2∣(a2−a1)⋅(b1×b2)∣
=∣6(−3i^+5j^+7k^)⋅(−2i^+j^+k^)∣
=∣66+5+7∣=66×3units
=36units
Hence this is the correct option.