Question

A triangle has corners A, B, and C located at `(8 ,3 )`, `(4 ,5 )`, and `(2 , 7 )`, respectively. What are the endpoints and length of the altitude going through corner C?

Answer 1

End points of the altitude are `(8/5,31/5), (2,7)`
Length of altitude `= 2sqrt(1/5)=0.894`

Explanation:

As shown in the diagram, `CD` is the altitude perpendicular to `AB` from point `C`.

The slope of `AB= (5-3)/(4-8)=-1/2`
`=>` The slope of `CD=2` (perpendicular to `AB)`

The equation of `AB` is : `y-3=(-1/2)(x-8)`
`=> y+x/2=7 ..........(1)`
The equation of `CD` is : `y-7=2(x-2)`
`=> y-2x=3 ............ (2)`

Solving (1) and (2) we get :
`x=8/5, y=31/5`

So endpoints of altitude `CD=(8/5,31/5) and (2,7)`

Length of altitude `CD= sqrt((2-8/5)^2+(7-31/5)^2)`
`=sqrt(4/5)=2sqrt(1/5)=0.894`