Question

If a segment has an endpoint at (3, 2) and the midpoint at (-1, 2), what are the coordinates of the other endpoint?

Answer 1

`(-5,2)`

Explanation:

The distance from the midpoint to the first endpoint is `4`, which means that the other endpoint will be at the exact same distance from the midpoint as the first endpoint. So, four to the left of `(-1,2)` is `(-5,2)`

Answer 2

Coordinates of other endpoint`=-5,2`

Explanation:

Let the first endpoint be `A` and midpoint be `B` and other endpoint be `C`

Distance A to B:-

`:.=sqrt((x_2-x_1)^2+(y_2-y_1)^2)`

`:.=sqrt(((-1)-(3))^2+(2-2)^2)`

`:.=sqrt((-4)^2+0`

`:.=sqrt(16)`

`:.=A to B=`4units#

The segment is a vertical line because the`y` values of
`A and B =2`

Coords of `B=-1,2`

The bearing of the line `B to C` `=180^@`

`:.cos 180^@=-1xx4.0=-4` add to`x` coord of `B` then

`:.C`=-5`=x` coord.

`:.sin 180^@=0xx4.0=0` add to`y` coord of `B` then

`:.C`=2`=y` coord.

Coordinates of `C=-5,2`

Answer 3

`color(blue)((-5,2)`

Explanation:

The coordinates of the midpoint of a line is given by:

`((x_1+x_2)/2,(y_1+y_2)/2)`

Let the coordinates of the unknown end be:

`(x_2 , y_2)`

We know the coordinates of the midpoint are:

`(-1,2)`

So:

`((3+x_2)/2,(2+y_2)/2)`

And:

`(3+x_2)/2=-1=>x_2=-5`

`(2+y_2)/2=2=>y_2=2`

Coordinates:

`(-5,2)`