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5.3 Solving Trigonometric Equations JMerrill, 2010

JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

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Page 1: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

5.3Solving Trigonometric

Equations

JMerrill, 2010

Page 2: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

It will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities.

The Pythagorean identities are crucial!

Recall (or Relearn )

Page 3: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Solve Using the Unit Circle Solve sin x = ½ Where on the circle does the sin x = ½ ?

5,

6 6x

5

2 , 26 6

x n n

Particular Solutions

General solutions

Solve for [0,2π]

Find all solutions

Page 4: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Solving a Trigonometric Equation Using Algebra

22sin 1 0 [0 ,360 )o oSolve for 22sin 1 0

22sin 1 2 1

sin2

2sin

2

4

sin

2

2 .

There are solutions

because is positive

in quadrants and

negative in quadrants

45 ,135 ,225 ,315o o o o

Page 5: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Find all solutions to: sin x + = -sin x

Using Algebra Again

2

sinx sinx 2 0

2sinx 2

2sinx

2

5 7x 2n and x 2n

4 4

Page 6: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Solve

You Try23tan x 1 0 f or [0,2 ]

3tanx

3

5 7 11x , , ,

6 6 6 6

Page 7: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Solve by Factoring

sin tan 3 [0, )n 2six x xSolve for

sin tan 3sin 0x x x sin (tan 3) 0x x sin 0 tan 3x or x

Round to nearest hundredth

0,3.14 1.25,4.39x x

Page 8: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Solve

You Try2cot xcos x 2cot x in [0,2 )

2cot xcos x 2cot x 0 2cot x(cos x 2) 0

cot x 0

3x ,

2 2

2

2

cos x 2 0

cos x 2

cosx 2

DNE (Does Not Exist)

No solution

Verify graphically

These 2 solutions are true because of the interval specified. If we did not specify and interval, you answer would be based on the period of tan x which is π and your only answer would be the first answer.

Page 9: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Quick review of Identities

Day 2 on 5.3

Page 10: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Fundamental Trigonometric Identities

Reciprocal Identities

1csc

sin

1

seccos

1cot

tan

Also true:

1sin

csc

1

cossec

1tan

cot

Page 11: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Fundamental Trigonometric Identities

Quotient Identities

sintan

cos

cos

cotsin

Page 12: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Fundamental Trigonometric Identities

Pythagorean Identities

2 2sin cos 1

2 2tan 1 sec

These are crucial!You MUST know

them.2 21 cot csc

Page 13: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Pythagorean Memory Trick

sin2 cos2

tan2 cot2

sec2 csc2

(Add the top of the triangle to = the bottom)

1

Page 14: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Sometimes You Must Simplify Before you Can Solve

Strategies Change all functions to sine and cosine (or at

least into the same function) Substitute using Pythagorean Identities Combine terms into a single fraction with a

common denominator Split up one term into 2 fractions Multiply by a trig expression equal to 1 Factor out a common factor

Page 15: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Recall:Solving an algebraic equation

2 3 4 0

( 1)( 4) 0

( 1) 0 ( 4) 0

1 4

x x

x x

x or x

x x

Page 16: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Solve

2 2sin sin cosx x x Hint: Make the words match so use a Pythagorean identity2 2sin sin 1 sinx x x

Quadratic: Set = 0

2 2sin sin 1 sin 0x x x Combine like terms

22sin sin 1 0x x Factor—(same as 2x2-x-1)

(2sin 1)(sin 1) 0x x 1

sin sin 12

x or x

7 11, ,

2 6 6x

Page 17: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Solve

2sin cos [0 ,360 )o oSolve for

2sin cos cos

2sin

2 cot

1tan

2

26.6 ,206.6o o

Page 18: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

You cannot divide both sides by a common factor, if the factor cancels out. You will lose a root…

What You CANNOT Do

Page 19: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Example

2sin cos cos

2sin

2 cot

1tan

2

sin tan 3sin

sin tan 3sin

sin sin tan 3

x x x

x x x

x xx

Common factor—lost a root

No common factor = OK

Page 20: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Sometimes, you must square both sides of an equation to obtain a quadratic. However, you must check your solutions. This method will sometimes result in extraneous solutions.

Squaring and Converting to a Quadratic

Page 21: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Solve cos x + 1 = sin x in [0, 2π) There is nothing you can do. So, square

both sides (cos x + 1)2 = sin2x cos2x + 2cosx + 1 = 1 – cos2x 2cos2x + 2cosx = 0 Now what?

Squaring and Converting to a Quadratic

Remember—you want the words to match so use a Pythagorean substitution!

Page 22: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

2cos2x + 2cosx = 0 2cosx(cosx + 1) = 0 2cosx = 0 cosx + 1 = 0 cosx = 0 cosx = -1

Squaring and Converting to a Quadratic

3,

2 2x x

Page 23: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

3,

2 2x x

Check Solutions

cos 1 sin2 2

0 1 1

3 3cos 1 sin

2 20 1 1

cos 1 sin

1 1 0

Page 24: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Solve 2cos3x – 1 = 0 for [0,2π) 2cos3x = 1 cos3x = ½ Hint: pretend the 3 is not there and solve

cosx = ½ . Answer:

But….

Functions With Multiple Angles

1 1cos

25

,3 3

x

x

Page 25: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Functions With Multiple Angles In our problem 2cos3x – 1 = 0 What is the 2? What is the 3? This graph is happening 3 times as often as

the original graph. Therefore, how many answers should you have?

amplitude

frequency

6

Page 26: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Functions With Multiple Angles

1 1cos

25

,3 3

x

x

Add a whole circle to each of these

7 11,

3 3

And add the circle once again.

13 17,

3 3

Page 27: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Functions With Multiple Angles

5 7 11 13 173 , , , , ,

3 3 3 3 35 7 11 13 17

, , , , ,9 9 9

,9 9

3

9

x

So x

Final step: Remember we pretended the 3 wasn’t there, but since it is there, x is really 3x:

Page 28: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

Work the problems by yourself. Then compare answers with someone sitting next to you.

Round answers: 1. csc x = -5 (degrees)

2. 2 tanx + 3 = 0 (radians)

3. 2sec2x + tanx = 5 (radians)

Practice Problems

o o191.5 ,348.5

2.16, 5.30

2.16, 5.30, .79, 3.93

Page 29: JMerrill, 2010 IIt will be imperative that you know the identities from Section 5.1. Concentrate on the reciprocal, quotient, and Pythagorean identities

4. 3sinx – 2 = 5sinx – 1

5. cos x tan x = cos x

6. cos2 - 3 sin = 3

Practice – Exact Answers Only (Radians) Compare Answers

7 11,

6 6

3 5, , ,

2 2 4 4

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