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Trigonometric Equations

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Page 1: Trigonometric Equations. Definition Example: Consider:

Trigonometric Equations

Page 2: Trigonometric Equations. Definition Example: Consider:

Definition

A trigonometric equation is an equation that contains a trig expression with a variable, such as .

Page 3: Trigonometric Equations. Definition Example: Consider:

Example:

A solution to this equation is because

Is the only solution to this equation?

Page 4: Trigonometric Equations. Definition Example: Consider:

Consider:

This graph shows 5 different solutions to the equation So how can we represent all of the solutions?

Page 5: Trigonometric Equations. Definition Example: Consider:

Since the period of the sine function is first find all solutions in Those solutions are and .

Any multiple of can be added to these values and the sine is still So, all solutions can be given by with n any integer.

Page 6: Trigonometric Equations. Definition Example: Consider:

Find 4 more solutions to

Page 7: Trigonometric Equations. Definition Example: Consider:

Equations involving a Single Trig FunctionTo solve an equation involving a single trig function:1. Isolate the function on one side

of the equation.2. Solve for the variable

Page 8: Trigonometric Equations. Definition Example: Consider:

Solve:

3sin π‘₯βˆ’2=5sin π‘₯βˆ’1

Page 9: Trigonometric Equations. Definition Example: Consider:

Solve:

5sin π‘₯=3sin π‘₯+√3

Page 10: Trigonometric Equations. Definition Example: Consider:

Equations Involving Multiple Angles

tan 3π‘₯=10≀π‘₯<2πœ‹

Page 11: Trigonometric Equations. Definition Example: Consider:

Solve:

Page 12: Trigonometric Equations. Definition Example: Consider:

Solve:

,

Page 13: Trigonometric Equations. Definition Example: Consider:

Trig Equations in Quadratic FormForm: where is a trig function Solve by usual Quadratic

Methodsa. Factorb. Quadratic Formulac. Square Root Method

Page 14: Trigonometric Equations. Definition Example: Consider:

Solve by factoring:

2π‘π‘œπ‘ 2π‘₯+cos xβˆ’1=0 ,0 ≀π‘₯<2πœ‹

Page 15: Trigonometric Equations. Definition Example: Consider:

Solve by factoring

2𝑠𝑖𝑛2π‘₯βˆ’3sin π‘₯+1=0 ,0≀π‘₯<360 Β°

Page 16: Trigonometric Equations. Definition Example: Consider:

Solve

2𝑠𝑖𝑛2π‘₯=sinπ‘₯+3 ,0 ≀π‘₯<2πœ‹

Page 17: Trigonometric Equations. Definition Example: Consider:

Solve

𝑠𝑖𝑛2π‘₯+3 𝑠𝑖𝑛π‘₯βˆ’5=0 ,0≀ π‘₯<360 Β°

Page 18: Trigonometric Equations. Definition Example: Consider:

3π‘π‘œπ‘ 2 π‘₯βˆ’4cos π‘₯=βˆ’4Solve

Page 19: Trigonometric Equations. Definition Example: Consider:

Solve

4 𝑠𝑖𝑛2π‘₯βˆ’1=0 ,0≀ π‘₯<2πœ‹

Page 20: Trigonometric Equations. Definition Example: Consider:

Solve

4π‘π‘œπ‘ 2π‘₯βˆ’3=0 ,0 ≀π‘₯<360 Β°

Page 21: Trigonometric Equations. Definition Example: Consider:

Separate Two Functions by Factoring

π‘‘π‘Žπ‘›π‘₯ 𝑠𝑖𝑛2π‘₯=3 tan π‘₯ ,0≀ π‘₯<2πœ‹

Page 22: Trigonometric Equations. Definition Example: Consider:

Separate by Factoring

𝑠𝑖𝑛π‘₯π‘‘π‘Žπ‘›π‘₯=sinπ‘₯

Page 23: Trigonometric Equations. Definition Example: Consider:

Solve

π‘‘π‘Žπ‘›2 π‘₯π‘π‘œπ‘ π‘₯=π‘‘π‘Žπ‘›2π‘₯ ,0 ≀π‘₯<360 Β°

Page 24: Trigonometric Equations. Definition Example: Consider:

Solve

π‘π‘œπ‘‘2π‘₯𝑠𝑖𝑛π‘₯=π‘π‘œπ‘‘2 π‘₯ ,0≀ π‘₯<2πœ‹

Page 25: Trigonometric Equations. Definition Example: Consider:

Using Identities to Solve Trig Equations (All Solve:

Page 26: Trigonometric Equations. Definition Example: Consider:

2𝑠𝑖𝑛2π‘₯βˆ’3cosx=0

Page 27: Trigonometric Equations. Definition Example: Consider:

π‘π‘œπ‘ 2π‘₯+3sin π‘₯βˆ’2=0

Page 28: Trigonometric Equations. Definition Example: Consider:

cos 2π‘₯+sin π‘₯=0

Page 29: Trigonometric Equations. Definition Example: Consider:

sin π‘₯cos π‘₯=12

Page 30: Trigonometric Equations. Definition Example: Consider:

sin π‘₯βˆ’ cos π‘₯=1

Page 31: Trigonometric Equations. Definition Example: Consider:

cos π‘₯βˆ’sin π‘₯=βˆ’1


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