Question

Two opposite sides of a parallelogram each have a length of `2`. If one corner of the parallelogram has an angle of `(5 pi)/8` and the parallelogram's area is `15`, how long are the other two sides?

Answer 1

`S_2 ~~ 8.1" units"`

Explanation:

Given: `S_1 = 2" units", theta = (5pi)/8" radians", and A = 15" units"^2`

Let `h =` the height of the parallelogram `= S_1sin(theta)" [1]"`
Let `S_2 =` the unknown sides.

If we designate `S_2` as the base, then the equation for the area becomes:

`A = hS_2`

Solve for `S_2`

`S_2 = A/h" [2]"`

Substitute equation [1] into equation [2]:

`S_2 = A/(S_1sin(theta))" [3]"`

We know all of the values for the right side of equation [3]:

`S_2 = (15" units"^2)/((2" units")sin((5pi)/8))`

`S_2 ~~ 8.1" units"`