For non-right triangles you must use the "Law of Cosines" and then, the "Law of Sines" to solve this.
a= 8.25m
b= 10.4m
c= 3.16m
∠A= UNKNOWN
∠B= UNKNOWN
∠C=UNKNOWN
Law of Cosines:
c²= a²+b²-2abCos(C)
(3.16)²= (8.25)²+(10.4)²- 2(8.25)(10.4)(cos(C))
9.9856 = 68.0625 + (108.16) - (171.6)(cos(C)
9.9856 = 176.2225- 171.6 cos C
-166.2369= - (171.6(cosC))
cosC= 0.968746503
Take the inverse cosine of that to get the measure of angle C
∠C= 15.95813246°
Now Use law of sines to find ∠B:
[tex] \frac{10.4}{Sin(B)} = \frac{3.16}{sin(15.96)} [/tex]
[tex] \frac{10.4}{Sin(B)} =12.73922[/tex]
[tex] 10.4 =12.73922115(sinB)[/tex]
[tex]sinB= 0.816276439[/tex]
(take the inverse sine to get the measure of ∠B)
∠B= 60.8040992°
Answer:
The angle measures approximately 60.80°.
