Question

What is the orthocenter of a triangle with corners at `(2 ,3 )`, `(5 ,7 )`, and (9 ,6 )#?

Answer 1

Orthocenter of the triangle is at `( 71/19,189/19)`

Explanation:

Orthocenter is the point where the three "altitudes" of a triangle

meet. An "altitude" is a line that goes through a vertex (corner

point) and is at right angles to the opposite side.

`A(2,3) , B(5,7) , C(9,6)` . Let `AD` be the altitude from `A`

on `BC` and `CF` be the altitude from `C` on `AB`, they meet

at point `O` , the orthocenter.

Slope of `BC` is `m_1= (6-7)/(9-5)= -1/4`

Slope of perpendicular `AD` is `m_2= 4; (m_1*m_2=-1)`

Equation of line `AD` passing through `A(2,3)` is

`y-3= 4(x-2) or 4x -y = 5 (1)`

Slope of `AB` is `m_1= (7-3)/(5-2)= =4/3`

Slope of perpendicular `CF` is `m_2= -3/4 (m_1*m_2=-1)`

Equation of line `CF` passing through `C(9,6)` is

`y-6= -3/4(x-9) or y-6 = -3/4 x+27/4` or

`4y -24= -3x +27 or 3x+4y=51 (2)`

Solving equation(1) and (2) we get their intersection point , which

is the orthocenter. Multiplying equation (1 )by `4` we get

`16x -4y = 20 (3)` Adding equation (3 ) and equation (2 )

we get, `19x =71 :. x=71/19 ; y =4x-5or y=4*71/19-5` or

`y=189/19`. Orthocenter of the triangle is at `(x,y)` or

`( 71/19,189/19)` [Ans]