Question

How do you find unit vector perpendicular to plane: 6x-2y+3z+8=0?

Answer 1

Unit vector perpendicular to plane `6x-2y+3z+8=0` is `(6/7,-2/7,3/7)`

Explanation:

If we have a plane `ax+by+cz=d`, the vector normal to the plane is given by `(a,b,c)`

Hence as given plane is `6x-2y+3z+8=0` or `6x-2y+3z=-8`

and vector normal to this plane is `(6,-2,3)`

Now the magnitude of vector `(6,-2,3)` is

`sqrt(6^2+(-2)^2+3^2)=sqrt(36+4+9)=sqrt49=7`

Hence, unit vector perpendicular to plane `6x-2y+3z+8=0` is `(6/7,-2/7,3/7)`

Answer 2

`6/7veci-2/7vecj+3/7veck`

Explanation:

we can find a perpendicular vector by using the result

that `phi(x,y,z)=0=>gradphi(x,y,z)`is a vector perpendicular to the plane

where `grad` is the del operator and is defined as:

`grad-=vecidel/(dx)+vecjdel/(dely)+veckdel/(delz)`

remembering that when we partially differentiate wrt a variable we treat the other variables as constant

`phi(x,y,z)=6x-2y+3z+8=0`

`:.gradphi(x,y,z)=`

`vecidel/(delx)(6x-2y+3z+8)`

`+vecjdel/(dely)(6x-2y+3z+8)`

`+veckdel/(delz)(6x-2y+3z+8)`

`=6veci-2vecj+3veck`

call this `vecn`

then a unit vector is

`hatvecn=vecn/|vecn|`

`:.hatvecn=(6veci-2vecj+3veck)/(sqrt(6^2+2^2+3^2))`

`=(6veci-2vecj+3veck)/7`

`=6/7veci-2/7vecj+3/7veck`