Question

What is the unit vector that is normal to the plane containing `( i +k)` and `( i + 7 j + 4 k)`?

Answer 1

`hat v = 1/(sqrt(107)) * ((7),(3),(-7))`

Explanation:

first, you need to find the vector (cross) product vector, `vec v`, of those 2 co-planar vectors, as `vec v` will be at right angles to both of these by definition:

`vec a times vec b = abs(vec a) abs(vec b) \ sin theta \ hat n_{color(red)(ab)}`

computationally, that vector is the determinant of this matrix, ie

`vec v = det((hat i, hat j , hat k),(1,0,1),(1,7,4))`

`= hat i (-7) - hat j (3) + hat k (7)`

`= ((-7),(-3),(7))` or as we are only interested in direction
`vec v = ((7),(3),(-7))`

for the unit vector we have

`hat v = (vec v)/(abs (vec v))= 1/(sqrt(7^2 + 3^3 + (-7)^2)) * ((7),(3),(-7))`

`= 1/(sqrt(107)) * ((7),(3),(-7))`