Question

How do you find the exact value of the third side given `triangle DEF`, `d=sqrt3`, e=5, and `mangleF=pi/6`?

Answer 1

`sqrt(13)~=3.61`

Explanation:

Since we don't know that the triangle is a right triangle, we're required to use the Cosine Law. I will also presume that `angleF` is opposite the unknown side.

The Law of Cosines states that:
`c^2=a^2+b^2-2abcos(C)`, where `angleC` is the angle opposite side `c`.

In our case, it becomes (I'll call the unknown side `x`):
`x^2=5^2+(sqrt3)^2-10sqrt3cos(pi/6)`

`x^2=25+3-10sqrt3cos(pi/6)`

`x^2=28-10sqrt3cos(pi/6)`

Next we take the square root on both sides:
`x=sqrt(28-10sqrt3cos(pi/6))`

`cos(pi/6)=sqrt3/2`

`thereforex=sqrt(28-10*3/2`

`x=sqrt(28-30/2)=sqrt(28-15)`

`x=sqrt(13)`