Answer:
A=48.59°, C=101.41°,c=7.84
Step-by-step explanation:
B=30°, b=4, a=6
Apply sine law to solve the triangle
[tex]\frac{Sin A}{a} =\frac{Sin B}{b} =\frac{Sin C}{c}[/tex]
[tex]\frac{Sin A}{6} =\frac{Sin 30}{4}[/tex]
cross multiply it
[tex]sin A=6 \cdot \frac{Sin 30}{4}[/tex]
[tex]A=sin^{-1}6 \cdot \frac{Sin 30}{4}[/tex]
A=48.59°
sum of angles = 180 degree
angle C= 180 - angle A - angle B
[tex]C= 180-30-48.59=101.41[/tex]
C=101.41°
[tex]\frac{Sin B}{b} =\frac{Sin C}{c}[/tex]
[tex]\frac{Sin 30}{4} =\frac{Sin 101.41}{c}[/tex]
Cross multiply
[tex]c sin(30)= 4sin(101.41)[/tex]
divide both sides by sin(30)
c=7.84
