Given the right triangle on the board, if AC=11 C=37 degrees, find CB
13.8
If a = 12, B = 27 degrees, and b = 15, find A to the nearest degree using the Law of Sines.
21 degrees
Given the right triangle on the board, if AB=13 B=32 degrees, find AC
8.1
If a = 12, B = 27 degrees, and b = 10, how many possible triangles can you make and why?
2 triangles because B is acute and b<a
Given the right triangle on the board, if AB=12 CB=13, find angle B
22.6 degrees
If A = 50 degrees, b = 14, and a = 12, find two possible values for B to the nearest degree using the Law of Sines. Round to the nearest degree
63 degrees and 117 degrees
Given the right triangle on the board, if AB=11.9 and AC=10, find angle C
50 degrees
Given the right triangle on the board, if AB=6 and B=28 degrees, find all other missing sides and angles
CA=3.2 CB=6.8 <C=62