Question

What is the angle between `<-4,3,-8 >` and `< 1,-1,5>`?

Answer 1

`theta ~~ 2.56 radians or 146.76°`

Explanation:

The dot product is used, because it has two definitions:

`barA•barB = (A_1)(B_1) + (A_2)(B_2) + (A_3)(B_3)`

and

`barA•barB = |barA||barB|cos(theta)`

where `theta` is the angle between the two vectors.

Compute the dot product, using the first definition:

`barA•barB = (-4)(1) + (3)(-1) + (-8)(5) = -41`

Compute the magnitude of vector A:

`|barA| = sqrt((-4)² + 3² + (-8)²) = sqrt(89)`

Compute the magnitude of vector B:

`|barB| = sqrt(1² + (-1)² + 5²) = sqrt(27)`

Substitute the above into the second equation:

`-41 = (sqrt(89))(sqrt(27))cos(theta)`

Solve for `theta`:

`theta = cos^-1(-41/(sqrt(89)sqrt(27)))`

`theta ~~ 2.56 radians or 146.76°`