Law of Sines

1. Law of Sines Lesson 6.4

2. C a b h B A c The Law of Sines • Let’s now solve oblique triangles (Δ’s without a right angle):

3. When to Use the Law of Sines • When we know one side and two angles (ASA or SAA) • When we know two sides and an angle opposite one of those sides (SSA) • Basically, we need to know a side and the angle opposite that side C = 112° a b = 216.75 B 44.5° c A =23.5°

4. Using the Sine Law • We know 2 sides and angle opposite one of the sides: • Now how would we find angle C and then side c? C a =9.5 b=15 A c B = 47°

5. Example 1: A satellite orbiting the earth passes directly overhead and between Phoenix and L.A., 340 mi apart. The angle of elevation is simultaneously observed to be 60° at Phoenix and 75° at L.A. How far is the satellite from L.A.? 60° 75° 340 mi

6. Ex 1 Solution: How far is the satellite from L.A.? sat 45° c b 60° 75° LA 340 mi PHO

7. Height of a Kite • Two observers directly under the string and 30' from each other observe a kite at an angle of 62° and 78°. How high is the kite? h 78° 62° 30

8. Height of a Kite (cont’d) h 78° 62° 30

9. 10 3.42 20° The Ambiguous Case (SSA) • Given two sides and an angle opposite one of them, several possibilities exist: • No solution,side too shortto make a triangle • One solution,side equalsaltitude 2 10 20°

10. The Ambiguous Case (SSA) • Two solutions: 2 triangles are possible (why?) • One unique solution,the opposite sideis longer thanadjacent side Solving for A could give either an acute or obtuse angle! 10 5 5 20° A A' 13.42 10 20°