Question

A triangle has two corners with angles of `( pi ) / 2` and `( pi )/ 6`. If one side of the triangle has a length of `5`, what is the largest possible area of the triangle?

Answer 1

The largest possible area is `21.65`.

Explanation:

As the two angles are `pi/2` and `pi/6`, the third angle is

`pi-pi/2-pi/6=(6pi)/6-(3pi)/6-pi/6=(6pi-3pi-pi)/6=(2pi)/6=pi/3`

As the smallest angle of the three is `pi/6`,

area will be largest if side with length `5` is opposite the smallest angle `pi/6`

Such a triangle is typical `30^@-60^@-90^@` triangle and looks like as shown below

In such a right angled triangle, if smallest side is `5`, hypotenuse is `5xx2=10` and third side `5xxsqrt3`.

As the two sides forming the right angle in right angled triangle are `5` and `5sqrt3`, the area of triangle is

`1/2xx5xx5sqrt3=25/2xx1.732=21.65` and

The largest possible area is `21.65`.