Question

How do you solve the triangle given `C=145^circ, b=4, c=14`?

Answer 1

`hatA~=25.57°`
`hatB~=9.43°`
`a~=10.56`

Explanation:

By the Euler Theorem, you know that:

`b/sin hatB=c/sin hatC`

and you can find

`sin hatB=(b sin hatC)/c`

`=(cancel4^2*sin 145°)/cancel14^7=(2*0.57)/7~=0.16`

and `hatB~=9.43°`

Then `hatA=180°-hatB-hatC`

`~=180°-145°-9.43°=25.57`

By the used theorem, it is:

`a/sin hatA=c/sin hatC`

and therefore is

`a=(c*sin hatA)/sin hatC`

`~=(14*0.43)/0.57=10.56`