Answer: i =2i+1j+2k
Step-by-step explanation:
The parametric equation of a plane is Ax+By+Cz=D and by definition the normal vector of the plane is n=Ai+Bj+Ck, where i,j,k are the canonic vectors
Then, in this case a normal vector to the given plane is i=2i+1j+2k
To prove that a vector defined as n=Ai+Bj+Ck is normal to the plane, let V1 and V2 be two vectors that are in the plane
If V1 ∈ Ax+By+Cz=D then Aa1+Bb1+Cc1=D
If V2 ∈ Ax+By+Cz=D then Aa2+Bb2+Cc2=D
The vector V1V2=V2-V1=(a2-a1)i+(b2-b1)j+(c2-c1)k
Two vectors are normal or perpendicular if the dot product is zero.
[tex]V2V1_{o}n=0[/tex]
[tex](a2-a1)i+(b2-b1)j+(c2-c1)k_{o}Ai+Bj+Cj=0\\(a2-a1)A+(b2-b1)B+(c2-c1)C=0\\Aa2+Bb2+Cc2-(Aa1+Bb1+Cc1)=0\\D-D=0[/tex]
So, n is a normal vector to the plane.
