Question

The endpoints of one diagonal of rhombus are (0,-8) and (8,-4). If the coordinates of the third vertex are (1,0). what are the coordinates of the forth vertex?

Answer 1

The coordinates are `=(7,-12)`

Explanation:

Let `A=(0,-8)`

`C=(8,-4)`

The midpoint of `AC` is

`E=((0+8)/2, (-8-4)/2)=(4,-6)`

Let `B=(1,0)` and `D=(x,y)`

The mid point of `BD` is

`E'=((x+1)/2,(y/2))`

`E and E'` is the same point

`(4,-6)=((x+1)/2,(y/2))`

`=>`

`(x+1)/2=4`

`x+1=8`

`x=7`

`y=-12`

The point `D=(7,-12)`

Answer 2

`(7,-12),` is the reqd. fourth vertex.

Explanation:

We know that a Rhombus is a Parallelogram, and, the

Diagonals of a parallelogram bisect each other.

This means that both the diagonals must have the same mid-point.

Hence, the midpt. of the diagonal through vertices

`(0,-8) and (8,-4)` is the same as that through the fourth vertex, say,

`(x,y) and (1,0).`

`:. ((0+8)/2,(-8-4)/2)=((x+1)/2,(y+0)/2).`

`:. 8=x+1, -12=y.`

`rArr (x,y)=(7,-12),` is the reqd. fourth vertex.

Enjoy Maths.!