Question

A triangle has corners A, B, and C located at `(8 ,7 )`, `(4 ,5 )`, and `(6 , 3 )`, respectively. What are the endpoints and length of the altitude going through corner C?

Answer 1

`(6,3)` and `(24/5,27/5)`. Length = `6/5sqrt{5}`

Explanation:

One end point of the altitude must of course be `C=(6,3)`. The other point must lie on the line joining `(8,7)` and `(4,5)`. So, its coordinate must of the form

`(8alpha+4(1-alpha),7alpha+5(1-alpha) ) = (4+4alpha, 5+2alpha)`

Slope of this altitude must then be

`{5+2alpha-3}/{4+4alpha-6}={1+alpha}/{2alpha-1}`

Since the slope of `AB` is `{7-5}/{8-4}=1/2`, the slope of the altitude must be `-2`. Thus

`{1+alpha}/{2alpha-1}=-2`

or

`1+alpha=-4alpha+2`

and thus `alpha=1/5`

So, the coordinates of the second endpoint of the altitude is `(24/5,27/5)`

Thus the length of the altitude is

`sqrt{(6-24/5)^2+(3-27/5)^2}=1/5sqrt{6^2+12^2}=6/5sqrt{5}`