A triangle has corners at (8 ,3 )(8,3), (4 ,-6 )(4,6), and (-2 ,5 )(2,5). If the triangle is dilated by a factor of 5 5 about point #(4 ,-3 ), how far will its centroid move?

1 Answer
Somebody N.
May 30, 2018

color(blue)((20sqrt(5))/3 " units")2053 units

Explanation:

When the vertices of the triangle are dilated by a factor of 5 about the point (4,-3)(4,3), the centroid will also be dilated by the same factor about the same point. This being the case, we only need to find the centroid of the original triangle and dilate this to find the centroid of the triangles image.

The centroid can be found by taking the arithmetic mean of the x coordinates and the y coordinates.

((x_1+x_2+x_3)/3,(y_1+y_2+y_3)/3)(x1+x2+x33,y1+y2+y33)

"centroid"=((8+4-2)/3,(3-6+5)/3)=(10/3,2/3)centroid=(8+423,36+53)=(103,23)

We can dilate this using vectors:

Let vec(OD)=((4),(-3)) be position vector of dilation point.

Let vec(OC') be the position vector of the centroids image.

Then:

vec(DC)=((-2/3),(11/3))

Then dilating by a factor of 5:

vec(OC')=vec(OD)+5vec(DC)=((4),(-3))+5((-2/3),(11/3))=((2/3),(46/3))

Distance the centroid has moved can be found using the distance formula:

d=sqrt((10/3-2/3)^2+(2/3-46/3)^2)=(20sqrt(5))/3

PLOT:

enter image source here

Related questions
See all questions in Dilations or Scaling around a Point
Impact of this question
1965 views around the world
You can reuse this answer
Creative Commons License