What do we call one of these? Solve!

1. Lesson: _____ Section 6.1The Law of Sines • What do we call one of these? • Solve! • What does it mean when we say that two quantities are proportional?

2. The Law of Sines C b a h A B applet

3. The Law of Sines C a b - or - B A c ex. B=110°, C=30, c=10.5, Solve the triangle!

4. Law of Sines Law of Cosines Solving Oblique (non-right) Triangles We need three pieces of information, one of which must be a side. 4 cases are possible… 1.) 2 angles and any side 2.) 2 sides and an angle opposite one of the sides 3.) 3 sides 4.) 2 sides and their included angle

5. The Law of SinesAMBIGUOUS CASE (SSA) Three possible situations can occur • No such triangle exists • Exactly 1 triangle fits the description • Two different triangles both fit the description What does “ambiguous” mean? Why is this called the “ambiguous” case? Examples 3,4,5 from the text are good. Ex.4.(No solutions): a = 15, b = 25, A = 85° Ex.3.(1 solution): a = 22, b = 12, A = 42°Ex.5.(2 solutions): a = 12, b = 31, A = 20.5°

6. If we are dealing with the SSA case (Ambiguous), Use the Law of Sines to solve for . Then set up 2 cases to represent both the acute case  and the obtuse case (180 - ). Draw a diagram for each of these cases. After solving each triangle, test to see that everything is ok. Do the angles add to 180? Is the side-angle relationship preserved?

7. C a h b B A c Area of an Oblique Triangle Formula Area = ½ bc sinA = ½ ab sinC = ½ ac sinB This is the same as Area = ½ bhShow why!