Let the equation of AB is 2x−1=−3y−(−1)=8z−(−10)=k Let L be the foot of the perpendicular drawn form P(1,0,0). 
∴L=(2k+1,−3k−1,8k−10). Now, direction ratio of PL=(2k,−3k−1,8 −10) and direction ratio of AB=(2,−3,8) Since, PL is perpendicular to AB ∴2(2k)−3(−3k−1)+8(8k−10)=0 Now, k=(2)2+(−3)2+(8)22(1−1)+(−3)(0+1)+8(0+10) =4+9+640−3+80=7777=1 ∴ Required co-ordinate =L=(2+1,−3−1,8−10)=(3,−4,−2).