Given,
The lines L1 and L2 given by
L1:2x−1=1y−3=2z−2
L2:1x−2=2y−2=3z−3
Now any point on line L1 is given by,
P=(2λ+1,λ+3,2λ+2)
And any point on line L2 is given by,
Q=(μ+2,2μ+2,3μ+3)
Now equation of line L3 which passes through Q is given by,
1x−(μ+1)=−1y−(2μ+2)=−2z−(3μ+3)
Now it also passes through P, so we get,
⇒12λ−μ−1=−1λ−2μ+1=−22λ−3μ−1
Now on solving above equations we get, λ=μ=3
Hence, P(7,6,8) and Q(5,8,12)
So, the distance PQ=26