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Transcript
February 24, 2010 February 24, 2010 5.5 Law of Sines The Law of Sines is a formula that allows you to be able to solve oblique (non-right) triangles when given one of the following pieces of information: 1. Two angles and an included side (ASA) 2. Two angles and a non-included side (AAS) 3. Two sides and a non-included angle (SSA) Today you will be only looking at the first two cases, (ASA) and (AAS). February 24, 2010 How is the formula derived? Oblique Triangles C C b a a h A A is acute h c B b A A is obtuse c B February 24, 2010 Law of Sines a b c = = sinA sinB sinC Note: sinA = 0. or (When does sinA = 0?) sinA sinB = a b = sinC c February 24, 2010 To solve an oblique triangle, you need to know the measure of at least one side and any two other parts of the triangle. This breaks down into the following four cases. 1. Two angles and any side (AAS, ASA) 2. Two sides and an angle opposite one of them (SSA) 3. Three sides (SSS) 4. Two sides and their included angle (SAS) February 24, 2010 1. Find the remaining angle and sides. C = 102.3 , B = 28.7 , b = 27.4 ft February 24, 2010 2. A pole tilts toward the sun at an 8 angle from vertical, and it casts a 22 foot shadow. The angle of elevation from the tip of the shadow to the top of the pole is 43 . How tall is the pole? February 24, 2010 Find the remaining angle and sides. 3. A = 50 , B = 62 , a = 4 February 24, 2010 5.5 Day 2 Q: What methods do NOT work to prove two triangles congruent? Q: Explain why these methods do not work? February 24, 2010 C A e sid side B February 24, 2010 In the SSA case, three possibilities can occur. 1. No such triangle exists 2. One triangles exist 3. Two triangles exist Consider the following SSA cases and determine whether no triangle, two triangles, or no triangle is possible. Draw a sketch and/or explain if necessary. A is acute adj opp h A Condition 1. opp side < height 2. height < opp side < adj side 3. opp side > adj side 4. opp side = height Triangles Possible February 24, 2010 A is obtuse 1. opp side < adj side 2. opp side > adj side Triangles Possible February 24, 2010 In the SSA case, three possibilities can occur. 1. No such triangle exists 2. One triangles exist 3. Two triangles exist Consider the following SSA cases: A is acute 1. 2. adj adj opp opp h h A A height < opp < adj opp < height Two No 3. 4. adj adj opp h h A A opp = height opp > adj One One A is obtuse 2. 1. opp adj A opp adj A opp < adj No opp > adj One opp February 24, 2010 http://www.onemathematicalcat.org/Math/Geometry_obj/no_ASS_cong.htm http://regentsprep.org/Regents/math/geometry/GP4/Ltriangles.htm February 24, 2010 Solve the triangle. 1. a = 12 m, b = 31 m, A = 20.5 February 24, 2010 2. a = 15cm, b = 25cm, A = 85 February 24, 2010 3. c = 125m, b = 100m, C = 110
