Introduction to College Algebra Trigonometry Algebra and Trigonometry
Introduction to College Algebra & Trigonometry Algebra and Trigonometry Chapter 6 – Trigonometry Section 6. 3 – Trigonometric Functions of Any Angle
Section 6. 3 – Trigonometric Functions of Any Angle n Let be an angle in standard position with (x, y) a point on the terminal side of and r y x
Section 6. 3 – Trigonometric Functions of Any Angle n Example: (-5, 12) 12 13 -5
Section 6. 3 – Trigonometric Functions of Any Angle n You try: Determine the exact values of the six trigonometric functions of the angle in standard position whose terminal side contains the point (3, -7).
Section 6. 3 – Trigonometric Functions of Any Angle n Signs of Trig Functions Quadrant II Quadrant I S A T C Quadrant III Quadrant IV
Section 6. 3 – Trigonometric Functions of Any Angle n You try:
Section 6. 3 – Trigonometric Functions of Any Angle n Reference angles – the acute angle formed by the terminal ray and the x-axis.
Section 6. 3 – Trigonometric Functions of Any Angle n 1. 2. You try: Find the reference angle for
Section 6. 3 – Trigonometric Functions of Any Angle n 1. 2. Evaluating Trig. Functions of Any Angle To find the value of a trig. Function of any angle, Determine the function value for the associated reference angle; Depending on the quadrant in which the original angle lies, affix the appropriate sign to the function value.
Section 6. 3 – Trigonometric Functions of Any Angle n You try: Evaluate
Section 6. 3 – Trigonometric Functions of Any Angle n You try: Find two values of that satisfy the equation Do not use you calculator.
Section 6. 3 – Trigonometric Functions of Any Angle n 1. Using a calculator to solve or evaluate trig functions To evaluate csc, sec & cot using the calculator, use the appropriate reciprocal function.
Section 6. 3 – Trigonometric Functions of Any Angle n 2. Using a calculator to solve or evaluate trig functions To solve for the missing angle, use the inverse trig function keys.
Section 6. 3 – Trigonometric Functions of Any Angle n 1. You try: Solve the equation for
Section 6. 3 – Trigonometric Functions of Any Angle n 2. You try: Solve the equation for
Section 6. 3 – Trigonometric Functions of Any Angle n 3. You try: Solve the equation for
Section 6. 3 – Trigonometric Functions of Any Angle n Definition of a Periodic Function A function f is periodic if there exists a positive real number p such that for all x in the domain of f. n The smallest number p for which f is periodic is called the period of f.
Section 6. 3 – Trigonometric Functions of Any Angle Even and Odd Trigonometric Functions n The cosine and secant functions are even. n The sine, cosecant, tangent, and cotangent functions are odd.
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