Question

How do you solve the triangle given m∠A = 70°, c = 26, a = 25?

Answer 1

See below.

Explanation:

From the information given, we can solve this using the Sine Rule:

The sine rule states that:

`sinA/a=sinB/b=sinC/c`

Finding angle C. Since we know angle A and side a, we will use:

`sinA/a=sinC/c`

`sin(70^o)/25=sinC/26=>sinC=(26sin(70^o))/25=0.9778`

`C=sin^-1(sinC)=sin^-1(0.9778)=color(blue)(77.76^o)`

Angle `B = 180^o-(70^o +77.76^o)=color(blue)(32.24^o)`

Side b:

`sin(70^o)/25=sin(32.24^o)/b=>b=(25sin(32.24^o))/sin(70^o)=color(blue)(14.19)`

So the solution is:

`A=70^o`

`B=32.24^o`

`C=77.76^o`

`a=25`

`b=14.19`

`c=26`