A variable point on line −3x+1=2y−3=−1z−2 is (−3t−1,2t+3,−t+2)
∴DR of variable point & (−4,3,1) is
(−3t+3,2t,−t+1)
Since line is parallel to x+2y−z−5=0
∴−3t+3+4t+t−1=0
⇒t=−1
∴DR of line is (6,−2,2) or (3,−1,1)
∴ Equation of line is 3x+4=−1y−3=1z−1