Question

Three points have coordinates A(6,6), B(-3,3) and C(9,k). The foot of the perpendicular from A to BC is the midpoint of BC. Calculate the possible values of k?

Answer 1

`color (green)(k = 15, -3)`

Explanation:

Given D is the mid point of BC and AD is also perpendicular to BC.

Hence, `AD` is perpendicular bisector of side `BC`.

Or, `AC = AB`. I.e., ABC is an isosceles triangle.

`vec(AC)^2 = (9-6)^2 +( k-6)^2=> 9 + (k-6)^2`

`vec(AB)^2 = (6+3)^2 + (6-3)^2 = 90`

Since `vec(AB) = vec (AC)`,

`(9 + (k-6)^2 )= 90`

`(k-6)^2 = 90 - 9 = 81`

`k - 6 = +-9` or k = 15, -3#

Point C (9, 15) or (9, -3)#