Question

A triangle has sides A, B, and C. Sides A and B are of lengths `2` and `7`, respectively, and the angle between A and B is `(5pi)/12`. What is the length of side C?

Answer 1

`C=7`

Explanation:

The length of `A` is `2`

The length of `B` is `7`

The angle between `A` and `B` is `/_c=(5pi)/12`

Now to the Law of Cosines

`C^2=A^2+B^2-2AB*cosc`

`C=sqrt(A^2+B^2-2AB*cosc`

We will simply substitute the values we have and find the length of `C`

`C=sqrt(2^2+7^2-2(2)(7)*cos(5pi)/12`

`color(red)(NOTE):` Your calculator should be in radian mode when computing this. If you cannot change it to rad then change the angle to degrees and compute it.

`(5cancelpi)/12xx180^0/cancelpi=75^0`

`C=sqrt(4+49-2(14)*cos(5pi)/12`, if your calculator is in `color(red)(radian)` mode

`C=sqrt(4+49-2(14)*cos75^0`, if your calculator is in `color(red)(degree)` mode

`C=6.76~~7`