Answer:
Step-by-step explanation:
Given that L is a line parametrized by
[tex]x = 2 + 2t, y = 3t, z = −1 − t[/tex]
The plane perpendicular to the line will have normal as this line and hence direction ratios of normal would be coefficient of t in x,y,z
i.e. (2,3,-1)
So equation of the plane would be of the form
[tex]2x+3y-z =K[/tex]
Use the fact that the plane passes through (2,0,-1) and hence this point will satisfy this equation.
[tex]2(2)+3(0)-(-1) =K\\K =5[/tex]
So equation is
[tex]2x+3y-z =5[/tex]
b) Substitute general point of L in the plane to find the intersecting point
[tex]2(2+2t)+3t-(-1-t) =5\\4+8t+1=5\\8t=0\\t=0\\(x,y,z) = (2,0,-1)[/tex]
i.e. same point given.
