Question

A parallelogram has sides with lengths of `12` and `6`. If the parallelogram's area is `42`, what is the length of its longest diagonal?

Answer 1

`=17.23`

Explanation:

Area of Parallelogram `=42=ab sintheta` where `a=12` and `b=6`
or
`42=12times6timessintheta`
or

`sin theta=42/12times1/6`
or
`sin theta=7/12`
or
`theta=sin^-1(7/12)`
or
`theta=35.7`

To find the longer diagonal `=y=?`

we have to get the supplementary of the angle `35.7`

So we have Angle `180-35.7=144.3`

Using the Law of Cosine we can write
`y^2=12^2+6^2-2times12times6cos(144.3)`
`=144+36-2times12times6(-0.812)`
`=180+117`
`=297`
or
`y=sqrt297`

`=17.23`