Question

A triangle has corners A, B, and C located at `(4 ,3 )`, `(9 ,5 )`, and `(6 ,2 )`, respectively. What are the endpoints and length of the altitude going through corner C?

Answer 1

The end-points are `=(156/29,103/29)` and the length is `=1.67`

Explanation:

The corners of the triangle are

`A=(4,3)`

`B=(9,5)`

`C=(6,2)`

The slope of the line `AB` is `m=(5-3)/(9-4)=2/5`

The equation of line `AB` is

`y-3=2/5(x-4)`

`y-3=2/5x-8/5`

`y=2/5x+7/5`...........................`(1)`

`mm'=-1`

The slope of the line perpendicular to `AB` is `m'=-5/2`

The equation of the altitude through `C` is

`y-2=-5/2(x-6)`

`y-2=-5/2x+15`

`y=-5/2x+17`................................`(2)`

Solving for `x` and `y` in equations `(1)` and `(2)`, we get

`-5/2x+17=2/5x+7/5`

`2/5x+5/2x=17-7/5`

`29/10x=78/5`

`x=78/5*10/29=156/29`

`y=2/5*156/29+7/5=515/145=103/29`

The end points of the altitude is `=(156/29,103/29)`

The length of the altitude is

`=sqrt((6-156/29)^2+(2-103/29)^2)`

`=sqrt((18/29)^2+(45/29)^2)`

`=sqrt(2349)/29`

`=1.67`