Question

A triangle has corners at `(8, 1 )`, ( 5, -8)`, and`(7, -2 )#. If the triangle is reflected across the x-axis, what will its new centroid be?

Answer 1

The coordinates of the centroid of the triangle after it has been reflected over the `x` axis are `(20/3,3)`.

Explanation:

The reflection of `(x,y)` over the `x` axis is `(x, -y)`.

If a triangle has vertices of `(8,1), (5,-8), (7,-2)`,

the vertices after reflecting it over the `x` axis are `(8,-1), (5,8), (7,2)`.

To find the coordinates of a centroid of a triangle with vertices at `(x_1, y_1), (x_2,y_2), (x_3,y_3)`, use the formula

`(x,y)_"centroid"= ((x_1+x_2+x_3)/3, (y_1+y_2+y_3)/3)`

`(x,y)_"centroid"=((8+5+7)/3, (-1+8+2)/3)=(20/3,3)`