Trigonometric Graphs

Trigonometric Graphs Written by B. Willox (Bridge of Don Academy) for Fourth Year – Credit Level Click to continue.

You are already familiar with the basic graph of y = sin xo. There are some important points to remember. y It has a maximum value of 1 at 90o. It crosses the x-axis at The curve has a period of It passes through the origin. 1 180o 270o 360o O x 90o y = sin xo -1 It has a minimum value of –1 at 270o. Click to continue.

Let us compare the graph of y =sin xoto the family of graphs of the form y = a sin bxo + c where a, b and c are constants. We will begin by looking at graphs of the form y = a sin xo. For example: y = 2 sin xo, y =3.7 sin xo or y = ½ sin xo. Click to continue.

Here is the graph of y = sin xo. Click once to see the graph of y = 2 sin xo. y It has a maximum of 2 (twice that of the normal graph). 3 2 Notice the following points on the curve. y = 2 sin xo 1 360o x O 180o y = sin xo It has a period of 360o. -1 It passes through the origin. -2 -3 It has a minimum of –2. Click to continue.

Here is the graph of y = sin xo. Click once to see the graph of y = -3 sin xo. y 3 It has a maximum of 3. 2 Notice the following points on the upside-down curve. y = -3 sin xo 1 360o x O 180o y = sin xo It has a period of 360o. -1 It passes through the origin. It has a minimum of -3 (negative three times that of the normal graph). -2 -3 Click to continue.

Here is the graph of y = sin xo. Click once to see the graph of y = 2½ sin xo. y It has a maximum of 2½ (two and a half times that of the normal graph). 3 2 Notice the following points on the curve. y = 2½ sin xo 1 360o x O 180o y = sin xo It has a period of 360o. -1 It passes through the origin. -2 -3 It has a minimum of –2½. Click to continue.

Here is the graph of y = sin xo. Click once to see the graph of y = ½ sin xo. y 3 It has a maximum of ½ (half of the normal graph). 2 Notice the following points on the curve. 1 y = ½ sin xo 360o x O 180o It has a period of 360o. -1 y = sin xo It passes through the origin. -2 It has a minimum of –½. -3 Click to continue.

Here is the graph of y = sin xo. Click once to see the graph of y = a sin xo. y It has a maximum of a (a times that of the normal graph). a Notice the following points on the curve. It still passes through the origin y = a sin xo It has a period of 360o. 1 The period is unaffected. 360o x O 180o y = sin xo -1 It passes through the origin. The height is now “a”. The height is now “a”. -a It has a minimum of –a. Click to continue.

This is the graph of which function? y 15 y = sin 15xo 10 5 y = 15 sin xo 360o x O 180o -5 -10 y = sin xo + 15 -15

WRONG! Try again.

Well Done! Click to continue

Which of these diagrams shows the graph of y = 7 sin xo? y y 14 7 7 x x O O 180o 360o 360o 720o -7 -14 -7 y y 7 7 3.5 3.5 x x O O 180o 360o 540o 720o 180o 360o -3.5 -3.5 -7 -7

WRONG! The height (or altitude) is too big. Try again.

WRONG! The period is too long. Try again.

WRONG! The period is too short. Try again.

For y = a sin xo only the height is affected. The graph will now have an altitude of 1  a. Here are the graphs of y = cos xo and y = tan xo. This is also true for y = a cos xo and y = a tan xo. y y 1 y = tan xo 1 y = cos xo x O O x 90o 180o 270o 360o 45o 90o 180o 270o 360o -1 -1 Click to continue.

Here are some examples of the graphs of y = a cos xo. y Click fory = 2 cos xo 1 y = cos xo Click for y = ¾ cos xo x O 90o 180o 270o 360o Click fory = - cos xo -1 Click to continue.

Here are some examples of the graphs of y = a tan xo. Click fory = 2tan xo Click fory = -3tan xo y 4 Notice this point y = tan xo 3 Notice this point 2 1 x O 45o 90o 180o 270o 360o 450o -1 Notice this point -2 -3 -4 Click to continue.

We will now look at graphs of the form y = sin bxo. For example: y = sin 2xo, y = sin 3xo or y = sin ½xo. Click to continue.

You are already familiar with the basic graph of y = sin xo. There are some important points to remember. y 1 180o 270o 360o O x 90o y = sin xo -1 Click to continue.

Here is the graph of y = sin xo. Click once to see the graph of y = sin 2xo. y It has a maximum of 1 (the same as a normal graph). 1 y = sin xo It has a period of 360o ÷ 2 = 180o. 360o Notice the following points on the curve. x O 180o It passes through the origin. y = sin 2xo -1 It has a minimum of –1. Click to continue.

Here is the graph of y = sin xo. Click once to see the graph of y = sin 3xo. y It has a maximum of 1 (the same as a normal graph). 1 y = sin xo It has a period of 360o÷ 3 = 120o. 360o Notice the following points on the curve. x O 180o It passes through the origin. y = sin 3xo -1 It has a minimum of –1. Click to continue.

Here is the graph of y = sin xo. Click once to see the graph of y = sin ½xo. y It has a maximum of 1 (the same as a normal graph). It has a period of 360o ÷ ½ = 720o. 1 Notice the following points on the curve. x O 180o 360o 540o 720o y = sin xo It passes through the origin. -1 y = sin ½ xo It has a minimum of –1. Click to continue.

Here is the graph of y = sin bxo. y It still passes through the origin. 1 y = sin bxo x The altitude (or height) is unaffected. O -1 The period is 360o b. The period is 360o÷ b. Period is (360o ÷ b) Click to continue.

This is the graph of which function? y 1 y = 4 sin xo y = sin 2xo x O 45o 90o 135o 180o y = sin 4xo -1

WRONG! Remember, a normal SINE graph has a period of 360o. Try again.

Which of these diagrams shows the graph of y = sin 6xo? y y 1 1 x x O O 180o 360o 90o 180o -1 -1 y y 1 1 0.5 0.5 x x O O 30o 60o 90o 120o 45o 90o -0.5 -0.5 -1 -1

WRONG! Remember, the period of a normal SINE graph is 360o. Try again.

For y = sin bxo only the period is affected. The graph will now have a period of 360o b. Here are the graphs of y = cos xo and y = tan xo. This is also true for y = cos bxo and y = tan bxo. y y 1 y = tan xo 1 y = cos xo x O O x 90o 180o 270o 360o 45o 90o 180o 270o 360o -1 -1 Click to continue.

Here are some examples of the graphs of y = cos bxo. Click fory = cos 2xoperiod = 360o÷ 2 = 180o Click fory = cos 2/3 xo period = 360o÷ 2/3 = 540o Click fory = cos ½xo period = 360o÷ ½ = 720o y 1 y = cos xo y O 90o 180o 270o 360o 450o 540o 630o 720o -1 Click to continue.

Here are some examples of the graphs of y = tan bxo. Click to seey = tan 2xo period = 180o÷ 2 = 90o and 45o÷ 2 = 22.5o y y = tan xo y = tan 2xo y = tan ½xo 4 Notice this point 3 Notice this point 2 1 x O -90o -45o 45o 90o 180o Click to seey = tan ½xo period = 180o÷ ½ = 360o and 45o÷ ½ = 90o -1 Notice this point -2 -3 -4 Click to continue.

We will now look at graphs of the form y = sin xo + c. For example: y = sin xo+ 2, y =sin xo+ 3 or y = sin xo– 1. Click to continue.

You are already familiar with the basic graph of y = sin xo. There are some important points to remember. y 1 180o 270o 360o O x 90o y = sin xo -1 Click to continue.

Here is the graph of y = sin xo. Click once to see the graph of y = sin xo+ 1. It has a maximum of 1 + 1 = 2. y 3 It has a period of 360o. 2 1 Notice the following points on the curve. y = sin xo + 1 The whole graph has been moved up one unit. The whole graph has been moved up one unit. y = sin xo 360o x O 180o -1 It passes through the origin + 1 = (0, 1). It has a minimum of –1 + 1 = 0. -2 -3 Click to continue.

Here is the graph of y = cos xo. Click once to see the graph ofy = cos xo– 1. y 1 y = cos xo x O 90o 180o 270o 360o y = cos xo– 1 -1 The whole graph has been moved down one unit. The whole graph has been moved down one unit. Click to continue.

Here is the graph of y = tan xo. y = tan xo+ 2 y Notice this point 4 y = tan xo 3 Notice this point Click once to see the graph of y = tan xo+ 2. 2 1 x O 45o 90o 180o 270o 360o 450o -1 -2 The whole graph has been moved up two units. The whole graph has been moved up two units. Click to continue.

This is the graph of which function? y 3 y = -3 sin xo 2 1 y = sin xo – 2 x O 180o 360o 540o 720o -1 -2 y = sin xo + 2 -3

WRONG! Remember, a normal SINE graph has a height of 2 (from –1 to 1). Try again.

Which of these diagrams shows the graph of y = cos xo+ 2? y y 4 2 2 x x O O 180o 360o 180o 360o 540o -2 -4 -2 y y 3 6 2 4 1 2 O x O x 180o 360o 180o 360o 540o -1 -2

WRONG! This is the graph of y = sin xo + 2. Try again.

WRONG! This is the graph of y = cos xo + 1. Try again.

WRONG! This is the graph of y = 2 cos xo + 3. Try again.

We will now look at graphs of the form y = a sin bxo + c, y = a cos bxo + c and y = a tan bxo + c. For example: y = 2 sin 3xo– 1, y =½ cos 4xo+ 3 or y = ¾ tan ¼xo– 12. Click to continue.

Let us look at the graph of y = 2 sin 3xo – 1. Begin by considering the simple curve of y = sin xo. Now, think on the graph of y = 2 sin xo: the 2 will double the height. The graph of y = 2 sin 3xo: the 3 makes the period  as long (360o÷ 3 = 120o) Finally, y = 2 sin 3xo – 1, where the –1 moves the whole graph down one unit. y 2 1 x O 120o 180o 360o 540o -1 y = 2 sin 3xo – 1 -2 -3 Click to continue.

Trigonometric Graphs