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Benchmark Angles and Special Angles Math 30-11. Deriving the Equation of a Circle P(x, y) O (0, 0) Note: OP is the radius of the circle. The equation.

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Presentation on theme: "Benchmark Angles and Special Angles Math 30-11. Deriving the Equation of a Circle P(x, y) O (0, 0) Note: OP is the radius of the circle. The equation."— Presentation transcript:

1 Benchmark Angles and Special Angles Math 30-11

2 Deriving the Equation of a Circle P(x, y) O (0, 0) Note: OP is the radius of the circle. The equation of a circle with its centre at the origin (0, 0) Is. Math 30-12

3 Determine the equation of a circle with centre at the origin and a radius of a) 2 unitsb) 5 units c) 1 unit A circle of radius 1 unit with centre at the origin is defined to be a _________. When r = ___, _________becomes ________. The central angle and its subtended arc on the unit circle have the ______________________. Math 30-13

4 Coordinates on the unit circle P(x, y) satisfy the equation Determine the coordinates for all points on the unit circle that satisfy the conditions given. Draw a diagram in each case. a) Why are there two answers? Point P(x,y) McGraw Hill Teacher Resource DVD 4.2_193_IA A point P(x, y) exists where the terminal arm intersects the unit circle. Math 30-14

5 Determine the coordinates for all points on the unit circle that satisfy the conditions given. Draw a diagram in each case. b) c) The point is the point of intersection of a terminal arm and the unit circle. What is the length of the radius of the circle? Math 30-15

6 Relating Arc Length and Angle Measure in Radians The function P(θ) = (x, y) can be used to relate the arc length, θ, of a central angle, in radians, in the unit circle to the coordinates, (x, y) of the point of intersection of the terminal arm and the unit circle. When θ = π, the point of intersection is (-1, 0), This can be written as Determine the coordinates of the point of intersection of the terminal arm and the unit circle for each: Math 30-16

7 Special Triangles from Math 20-1 2 60 0 30 0 1 1 45 0 1 Unit Circle with Right Triangle Present Math 30-17

8 Exploring Patterns for Reflect in the y-axis and in the x-axis Convert to a Radius of 1 Math 30-18

9 Exploring Patterns for Convert to a Radius of 1 Convert to a Radius of 1 Math 30-19

10 (1, 0) (0, 1) (-1, 0) (0, -1) The Unit Circle http://www.youtube.com/watch?v=YYMWEb-Q8p8&feature=youtu.be&hd=1 http://www.youtube.com/watch?v=AXxEv0P4IOI&feature=rellist&playnext=1&list=PLOQDHQLNRNBWM WUAOOLIXQSG4U_RISTHU

11 (1, 0) (0, 1) (-1, 0) (0, -1) The Unit Circle Math 30-111

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