Find a point e on cd such that the ratio of ce to cd is 3/8

Question

asked Nov 15, 2018 51.4k views

2 Answers

David Maze · Answer 1 · 2018-11-22T00:21:22+0000

Answer:

$x = \displaystyle(3x_2 + 5x_1)/(8), y = \displaystyle(3y_2 + 5y_1)/(8)$

Explanation:

We are given the following information:

The point E on CD such that the ratio of CE to CD is 3:8.

Thus E divides CD into ratio 3:5.

Let
(x_1,y_1) be the coordinate of C and
(x_2,y_2) be the coordinates of D.

Section formula:

Let (x,y) be the coordinates of E, then,

$x = \displaystyle(mx_2 + nx_1)/(m+n), y = \displaystyle(my_2 + ny_1)/(m+n)$ ,

where m:n is the ration where point E divides CD into.

Here, m:n = 3:5

Putting these values, we get,

$x = \displaystyle(3x_2 + 5x_1)/(8), y = \displaystyle(3y_2 + 5y_1)/(8)$