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14. Law of Sines The Ambiguous Case (SSA). Yesterday we saw that two angles and one side determine a unique triangle. However, if two sides and one opposite.

Published byRalf Hardy Modified over 9 years ago

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Presentation on theme: "14. Law of Sines The Ambiguous Case (SSA). Yesterday we saw that two angles and one side determine a unique triangle. However, if two sides and one opposite."— Presentation transcript:

1 14. Law of Sines The Ambiguous Case (SSA)

2 Yesterday we saw that two angles and one side determine a unique triangle. However, if two sides and one opposite angle are given, three possible situations can occur: (1) no triangle exists, (2) one triangle exists, or (3) two distinct triangles may satisfy the conditions.

3 Finding a missing angle Remember last unit when we were looking for an angle, we used inverse trig functions (sin -1, cos -1, tan -1 ) We will do the same thing in this unit, but instead of getting exact answers off the unit circle, we will use our calculator

4 Steps for ambiguous case Set up law of sines and solve for missing angle (use sin -1 ) Use the flow chart

5 Flowchart for ambiguous case

6 Example In triangle ABC, b = 2, c = 8, and B = 120 . Solve the triangle. 6 C B A?A? a 2 8 120 

7 Example In triangle ABC, c = 10, a = 6, and A = 28 . Solve the triangle. 7

8 Example In triangle ABC, a = 6.5, b = 7.4, and B = 79 . Solve the triangle. 8

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