Question

Let L be the line passing through the point P=(4, 5, −2) with direction vector →d=[2, 2, 0]^T. Find the shortest distance d from the point P₀=(1, 1, −2) to L, and the point Q on L that is closest to P₀. Use the square root symbol '√' where needed to give an exact value for your answer.

Answer 1

I be the line passing through ( 2,5,-2) and the direction corine is (2,2,0)? So, the equation of the line is: (4,5,-2) + t (2,2,0). - ( 4+2+, 5+2,-2), (4,5,-?) ter TB Po(1,1,-2) et B be any point on the line PB. Coordinate of a be (4+24,5+24,-2) say. for some particular t.. So, IRB = (4+24-1)" + (5+24=1)"+(-2+2)~ = (3+2+)* + (1+2+) ~ - V 9+12t+4* +16+16 + 4 + Jet" +28+ + 25 =18(+*+ ++ any - V8 (+*+2.44 +44) +25-4. EV8 (t + ta) + So, Ipal is minimum if tanya and minimum 10 l = 72 =lia

so, 9 : ( 4+2+(-7); 5+ 2% (-7), -2) ( %, 2,-2). and shortest Distanu = "2. anum