Graphing Trigonometric Functions

1. Graphing Trigonometric Functions Chapter 4

2. The sine and cosine curves • Graph y = sinx

3. The sine and cosine curves • Graph y = cosx

4. The sine and cosine curves • Graph y = -cosx

5. The sine and cosine curves • Graph y = -sinx

6. Amplitude “a” y = asinx y = acosx The amplitude will stretch the graph vertically. The value of “a” is half the distance of the max and min.

7. Amplitude “a” • Graph y = 3cosx

8. Period of the sine and cosine y = sinbx and y = cosbx The period of the function will shrink or stretch the graph horizontally. The period of a function is The standard period is 2π, this occurs when b = 1.

9. Period of the sine and cosine • Graph y = sin3x

10. Period of the sine and cosine • Graph y = cos2x

11. Amplitude “a” and Period ”b” • Graph y = 3sin4x

12. Amplitude “a” and Period ”b” • Graph y = -4cosπx

13. Phase Shifts of sine and cosine y = sinb(x-d) and y = cosb(x-d) The period of the function will have new endpoints when solving the inequality 0 ≤ b(x-d) ≤ 2π. (x – d) is a shift of “d” to the right (x + d) is a shift of “d” to the left

14. Phase Shifts of sine and cosine • Graph

15. Phase Shifts of sine and cosine • Graph

16. Vertical Translations of sine and cosine y = c + sinx and y = c + cosx The “c” will shift the entire graph “c” units up when “c” is positive and “c” units down when “c” is negative

17. Vertical Translations of sine and cosine • Graph y = 2 + sinx

18. Vertical Translations of sine and cosine • Graph y = -2 + cos3x

19. Combinations of Translations • Graph y = -2 – 2sin5x

20. Combinations of Translations • Graph y = 1 -2cos3(x+π)

21. Combinations of Translations • Graph

22. Identifying Features Give the amplitude, period, phase shift, and vertical translation. Amplitude: 2 Period: 2π Phase Shift: π/3 to the left Vertical Translation: none

23. Identifying Features Give the amplitude, period, phase shift, and vertical translation. Amplitude: 1 Period: 2π/3 Phase Shift: π/6 to the right Vertical Translation: up 1

24. Identifying Features Give the amplitude, period, phase shift, and vertical translation. Amplitude: 4 Period: π Phase Shift: π to the right Vertical Translation: down 2

25. Graphs of Secant and Cosecant • Graph y = secx

26. Graphs of Secant and Cosecant • Graph y = cscx

27. Graphs of Secant and Cosecant • Graph y = 2csc5x

28. Graphs of Secant and Cosecant Find the amplitude, period, phase shift, and vertical translation…then graph it. Amplitude: not applicable Period: π Phase Shift: π/6 to the left Vertical Translation: down 1

29. Graphs of Secant and Cosecant Find the amplitude, period, phase shift, and vertical translation…then graph it.

30. Graphs of Secant and Cosecant Find the amplitude, period, phase shift, and vertical translation…then graph it. Amplitude: not applicable Period: 2π Phase Shift: π/4 to the right Vertical Translation: up 2

31. Graphs of Secant and Cosecant Find the amplitude, period, phase shift, and vertical translation…then graph it.

32. Over “2-periods” • Graph y = sinx

33. Over “2-periods” • Graph

34. Tangent and Cotangent • Sine,Cosine,Secant, and Cosecant have a standard period of 2π. • The tangent and cotangent have a standard period of π. • The standard tangent graph has asymptotes at –π/2 and π/2 • The standard cotangent graph has asymptotes at 0 and π

35. Tangent and Cotangent • Graph y = tanx

36. Tangent and Cotangent • Graph y = cotx

37. Tangent and Cotangent • Graph y = 1 – tan3x

38. Tangent and Cotangent • Graph y = 2 + 3cot(x – π) Find the amplitude, period, phase shift, and vertical translation…then graph it. Amplitude: not applicable Period: π Phase Shift: π to the right Vertical Translation: up 2

39. Tangent and Cotangent • Graph y = 2 + 3cot(x – π) Find the amplitude, period, phase shift, and vertical translation…then graph it.

40. Tangent and Cotangent • Graph Find the amplitude, period, phase shift, and vertical translation…then graph it. Amplitude: not applicable Period: π/2 Phase Shift: π/8 to the left Vertical Translation: up 1