Law of Sines: Missing Sides and the Circumradius

From one side and two angles (in degrees), finds the remaining sides and the circumradius with the law of sines a ÷ sin A = b ÷ sin B = 2R.

The law of sines says that each side of a triangle, divided by the sine of the angle facing it, gives the same value, and that this shared value is the diameter 2R2R of the circle through all three vertices. One side plus two angles is enough to pin down everything else.

asinA=bsinB=csinC=2R\dfrac{a}{\sin A} = \dfrac{b}{\sin B} = \dfrac{c}{\sin C} = 2R

Example

Take a=8a = 8, A=45A = 45^\circ and B=60B = 60^\circ, so C=1804560=75C = 180^\circ - 45^\circ - 60^\circ = 75^\circ. Start with the shared ratio:

2R=asinA=8sin45=8211.31372R = \dfrac{a}{\sin A} = \dfrac{8}{\sin 45^\circ} = 8\sqrt{2} \approx 11.3137

The remaining sides follow: b=2RsinB11.3137×0.86609.7980b = 2R \sin B \approx 11.3137 \times 0.8660 \approx 9.7980 and c=2RsinC11.3137×0.965910.9282c = 2R \sin C \approx 11.3137 \times 0.9659 \approx 10.9282, with a circumradius of R5.6569R \approx 5.6569.

Notes