We can use the Law of Sines (sinA/a=sinB/b=sinC/c)
sinC/22=sin102/30
C=arcsin(22sin102/30)
C≈45.83° (to nearest hundredth of a degree), since A+B+C=180
B≈32.17° (to nearest hundredth of a degree)
sin102/30=sin32.17/b
b=30sin32.17/sin102
b≈16.33 (to nearest hundredth of a unit)
So a,b, and c are 30, 16.33, 22 respectively and:
A,B, and C are 102°, 32.17°, and 45.83° respectively.
