Question

A triangle has sides A, B, and C. Sides A and B have lengths of 3 and 8, respectively. The angle between A and C is `(pi)/12` and the angle between B and C is `(5pi)/6`. What is the area of the triangle?

Answer 1

No such triangle is possible.

Explanation:

If the angle between B and C is `(5pi)/6` then it is an obtuse angle and the side opposite that angle must be longer than any other side of the triangle. Therefore A can not be less than B.

`"------------------------------------------"`

Assuming the values for the lengths of A and B have been accidentally switched doesn't work either.

`/_b` (i.e. the angle between A and C) `= pi/12`
and
`/_a` (i.e. the angle between B and C) `=(5pi)/6`

`rArr /_c` (i.e. the angle between B and C) `= pi/12`
(since the interior angles of a triangle must add up to `pi`)

`rArr` C `=` B `=3`

But then we would have 2 sides of a triangle (B and C) whose length was less than the third side (A), which is clearly impossible.