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Transcript
MHF4U7 Unit 10 β Geometry of Triangles and Circles (Ch.10) Mr. Kwok 10A Right-Angled Triangles Primary Trigonometric Ratios: sin π₯ = πππ βπ¦π cos π₯ = πππ βπ¦π tan π₯ = πππ πππ Two people are trying to measure the width of a river. There is no bridge across the river, but they have instruments for measuring lengths and angles. When they stand 50 m apart on the same side of the river, at points A and B, the person at A measures that angle between line (AB) and the line from A to the tower on the other side of the river is 25.6°. The person at B finds the corresponding angle to be 28.3°, as shown in the diagram. Calculate the width of the river. Page 1 MHF4U7 Unit 10 β Geometry of Triangles and Circles (Ch.10) Mr. Kwok 10B Sine Law Sine Law: π ππ π΄ π = π ππ π΅ π = π ππ πΆ π The Sine Rule is used to solve problems involving triangles given: ο· Two angles and one side ο· Two sides and a non-included angle 1. Find x. Ambiguous case of Sine Law occurs when an angle and 2 consecutive sides are given. Since there is no angle given between the 2 consecutive sides, nothing prevents side A from swinging around. B As a result, itβs possible to have 2 triangles from a single problem: B B A C A Triangle 1 To find β C of Triangle 2: C A Triangle 2 Step 1. 2. Find β C of Triangle 1 using Sine Law β C of Triangle 2 = 180° β β πΆ ππ ππππππππ 1 Page 2 MHF4U7 Unit 10 β Geometry of Triangles and Circles (Ch.10) Mr. Kwok 2. Solve βπ΄π΅πΆ. Find all possible solutions. a) π΄ = 15°, π = 10.2, π = 17 b) π΄ = 29°, π = 3, π = 7.5 3. Find the measure of angle πΏ in triangle πΎπΏπ given that angle πΎ measures 56°, πΏπ = 16.8π, and πΎπ = 13.5π Page 3 MHF4U7 Unit 10 β Geometry of Triangles and Circles (Ch.10) Mr. Kwok 10C Cosine Law π2 = π 2 + π 2 β 2ππ cos π΄ B π 2 = π2 + π 2 β 2ππ cos π΅ c π 2 = π2 + π 2 β 2ππ cos πΆ A a b C The Cosine rule can be used to solve problems involving triangles given: 5 cm 17.2 m 6.4 m 48β° 6 cm 21.3 m 1. Find the length of π΅πΆ 2. In triangle π΄π΅πΆ, π΄π΅ = 7 ππ, π΅πΆ = 5 ππ, and πΆπ΄ = 8 ππ. Find the measure of π΅πΆπ΄ Find the angle B. Page 4 MHF4U7 Unit 10 β Geometry of Triangles and Circles (Ch.10) Mr. Kwok 10D Area of a Triangle After learning how to calculate side lengths and angles of a triangle, we are also interested in finding the area of the triangle. 1 π΄πππ = (πππ π)(βπππβπ‘) 2 π π π What is height? 1. πΆ Find the area of the triangle ABC. 28° 11 15 π΅ π΄ Page 5 MHF4U7 Unit 10 β Geometry of Triangles and Circles (Ch.10) Mr. Kwok 10E Trigonometry in 3D A cuboid has sides of length 8 cm, 12 cm, and 15 cm. The diagram shows diagonals of three of the faces. a) Find the lengths AB, BC, and CA b) Find the size of the angle ACB c) Calculate the area of the triangle ABC d) Find the length AD Page 6 MHF4U7 Unit 10 β Geometry of Triangles and Circles (Ch.10) 10FG Mr. Kwok Length of an Arc & Area of a Sector Identify the Minor Arc? Major Arc? Arc Length Ratio Length : Angle 1. Arc AB of a circle with radius 5cm subtends an angle of 0.6 at the centre. a) Find the length of the minor arc AB. b) Find the length of the major arc AB. A sector is a part of a circle bounded by two radii and an arc. Area of Sector Ratio Angle : Area 2. A sector has radius 12 cm and angle 3 radians. Use radians to find its: a) Arc length b) Area Page 7 MHF4U7 Unit 10 β Geometry of Triangles and Circles (Ch.10) 3. A sector of a circle has perimeter π = 12ππ and angle π = 50° at the center. Find the area of the sector. 4. Find the arc length and area of a sector of radius 5 cm and angle 2 radians. 5. If a sector has radius 2π₯ cm and arc length π₯ cm, show that its area is π₯ 2 ππ2 . Mr. Kwok Page 8 MHF4U7 Unit 10 β Geometry of Triangles and Circles (Ch.10) Mr. Kwok 10H Triangles and Circles Segment A region of the circle that is cut off from the rest of the circle by a secant or a cord. Formula: Chord A line segment joining two points on any curve. Formula: 1. Given the shaded area. a) Find the perimeter. b) Find the area. Page 9 MHF4U7 2. Unit 10 β Geometry of Triangles and Circles (Ch.10) Mr. Kwok The diagram shows two identical circle of radius 12 such that the center of one circle is on the circumference of the other. a) Find the exact size of angle PC1 Q in radians. b) Calculate the exact area of the shaded region. Page 10
