I saw a simple question and decided to try an alternate method to see if I could get the same answer; however, it didn't work out how I had expected.
Given $A(4, 4, 2)~$ and $~B(6, 1, 0)$, find the coordinates of the midpoint $M$ of the line $AB$.
I realize that this is quite easy just taking $\frac{1}{2}(A+B) = (5, \frac{5}{2}, 1)$; however, I don't understand why this doesn't give me the same answer:
If I take $\frac{1}{2}\vec{AB}~$ I would have thought that I would be half way to B from A which would be the midpoint right? but, of course I get:
$\frac{1}{2}\vec{AB} = \frac{1}{2}(2, -3, -2) = (1, -\frac{3}{2}, -1)$
Is it just because this is a directional vector which doesn't indicate position in any way, and I am trying to halve the direction/angle or something?