Question

A parallelogram has sides with lengths of `12` and `8`. If the parallelogram's area is `72`, what is the length of its longest diagonal?

Answer 1

`sqrt(208+48sqrt(7))~~18.303`

Explanation:

`Area` `of` `ABCD=(DF*BC)=72`

`=>(DF*8)=72`

`=>DF=9`

Using the Pythagorean Theorem, I know that
`DF^2+CF^2=DC^2`

`=> CF^2=DC^2-DF^2=12^2-9^2=63`

`=> CF=sqrt(63)=3sqrt(7)`

`BF=CF+BC=3sqrt(7)+8`

Again, using the Pythagorean Theorem,
`DF^2+BF^2=DB^2`

`DB^2=9^2+(8+3sqrt(7))^2=81+64+48*sqrt(7)+63=208+48sqrt(7)`

`=>DB=sqrt(208+48sqrt(7))~~18.303`

We can also find the length of the other diagonal using the same method and to verify which diagonal is the longer one.

`Area` `of` `ABCD=AE*DC=72`

`=>AE=6`

Using the Pythagorean Theorem,

`DE^2+AE^2=AD^2`

`=>DE^2=AD^2-AE^2=8^2-6^2=64-36=28`

`=>DE=sqrt(28)=2sqrt(7)`

`CE+DE=CD`

`=>CE=CD-DE=12-2sqrt(7)`

Again, using the Pythagorean Theorem,
`AE^2+CE^2=AC^2`

`=>AC^2=6^2+(12-2sqrt(7))^2=36+144-48sqrt(7)+28=208-48sqrt(7)`

`=>AC=sqrt(208-48sqrt(7))~~9.0002`

Since DB>AC, DB is the longest diagonal.