GRAPHING TRIGONOMETRIC FUNCTIONS

1. GRAPHING TRIGONOMETRIC FUNCTIONS Using the TI-83+ ™

2. GRAPHING BASIC TRIGONOMETRIC FUNCTIONS • Setting up the calculator. • Graphing the sine and cosine functions. • Graphing the tangent function. • Graphing the reciprocal trig functions.

3. Setting Up the Calculator • Press theMode key. • Select the appropriate mode. • Press Window key. • Choose your x-min value and x-max value. Use the “pi” or “π” key when appropriate. • Set your x-scale by using ¼ of the length of the period.

4. Graphing Sine and Cosine Curves in the form: y= a sin(bx) y =a cos(bx) • Choosing the Ymin and Ymax values depends on the amplitude. Find the amplitude, l a l. • It is recommended to select a Ymin at least one value lower than your amplitude (plus the phase shift) and to select a Ymax at least one value higher than that value. Select an appropriate y-scl based on the size of your amplitude. A “1” value will probably be sufficient. • Leave Xres = 1.

5. Viewing the Graph • Press the y= key. • Check to be sure the “Plot 1” key is not highlighted. • Enter the equation under Y1=. • Press the graphkey.

6. SAMPLE GRAPH: y= 3 sin(2x) • For y = 3 sin (2x), the amplitude = 3 and the period is (2π)/2 or π. • Setting The Window: • In order to graph 2 full cycles, set the Xmin at –π and the Xmax at π. • Since the period is π, the Xscl should be ¼ of π, or π/4. • Since the amplitude is 3, set the Ymin = -4, the Ymax = 4, and Yscl=1. • Enter the equation in Y1=

7. Graphing the tangent curve in the form of y = a tan (bx) • The window setting for x min and x max should be set according to the number of cycles desired. Again, the x sc l should be set to ¼ of the period. Recall the period of the tangent function is π/ lbl • Since the tangent function has no upper and lower limit, choose a reasonable y min and y max value for the window setting. Be sure to include values at least from a to –a.

8. SAMPLE GRAPH: y = 2 tan x • For y = 2 tan x, a = 2 and the period is π/1, or π. • Setting the window: • Since the period is π, the Xmin should be set at –π, the Xmax is π, and the Xscl should be set to π/4. • Since a =2, set the Ymin to -5, Ymax to 5, and the Yscl to 1. • Enter the equation in Y1=.

9. GRAPHING THE RECIPROCAL FUNCTIONS • In order to graph the reciprocal trig functions, use the reciprocal key x-1 with either the sin, cos, or tan key.

10. SAMPLE PROBLEM: y = 2sec x • Since the secant is the reciprocal of cosine, consider the graph of y = 2 cos x when setting the Xmin, Xmax and Xscl on the window. Since the period is 2π, set the xscl: • Xmin= -2πXmax = 2πXscl =π/2 • Since the secant has no limit, set the Ymin lower than –l a l and Ymax higher than la l. • Ymin=- 6 and Ymax = 6. • Enter the equation in Y1=.

11. The graph of y = 2 sec x The graph of y = 2 sec x is shown here. Do you see the asymptotes? Are there any x or y- intercepts?

12. Now, try these! Graph at least two cycles. • y = 3 csc 4x. • y = 5 cot 2x. • y = 2 cos ¼x. • y = -4 sin πx • y = ½ tan x. • y = -3 sec x/2

13. 1) y= 3csc(4x) 2) y=5cot (2x)

14. 3) y= 2 cos ¼x 4) y=-4sinπx

15. 5) y= ½ tan x 6) y= - 3sec x/2