Lesson 5.3
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Transcript of Lesson 5.3
Lesson 5.3
Solving Trigonometric Equations
Solving Trigonometric Equations
Use standard algebraic techniques learned in Algebra II.
Look for factoring and collecting like terms.
Isolate the trig function in the equation.
Use the inverse trig functions to assist in determining solutions.
To solve trigonometric equations:
Solving Trigonometric Equations
For all problems, The solution interval
Will be[0, 2)
You are responsible for checking your solutions back into the original problem!
Solving Trigonometric Equations
2cos 1 0x
2cos 1x
1cos 2x
Solve:
5,3 3
x
Step 1: Isosolate cos x using algebraic skills.
Step 2: Determine in which quadrants cosine is positive. Use the inversefunction to assist by finding the angle in Quad I first. Then use that angleas the reference angle for the other quadrant(s).
QI QIV Note: cosine is positive in Quad I and Quad IV.
Note: The reference angle is /3.
Solving Trigonometric Equations
2tan 1 0x 2tan 1x 2tan 1x
Solve:
tan 1x
3 5 7, , ,4 4 4 4
x
Step 1:
Step 2:
Note: Since there is a , all four quadrantshold a solution with /4 being the referenceangle.
Q1 QII QIII QIV
Solving Trigonometric Equations
2cot cos 2cotx x x
2cot cos 2cot 0x x x 2cot cos 2 0x x
Solve:
2cot 0 cos 2 0x or x
3,2 2
x
2cos 2x 2cos 2x
cos 2x
x
Step 1:
Step 2: Note: There is no solution here because 2 lies outside the range for cosine.
Solving Trigonometric Equations
tan 1 0x
2sec 4 0x
33tan tanx x
Try these:
1.
2.
3.
Solution
5 7 110, , , , ,6 6 6 6
x
3 7,
4 4x
2 4 5, , ,3 3 3 3
x
Solving Trigonometric Equations
22sin sin 1 0x x
2sin 1 sin 1 0x x
2sin 1 0 sin 1 0x or x
Solve:
1sin
2x sin 1x
7 11,
6 6x
2x
Factor the quadratic equation.
Set each factor equal to zero.
Solve for sin x
Determine the correct quadrantsfor the solution(s).
Solving Trigonometric Equations
22sin 3cos 3 0x x
22 1 cos 3cos 3 0x x 22 2cos 3cos 3 0x x
Solve:
22cos 3cos 1 0x x 22cos 3cos 1 0x x
2cos 1 cos 1 0x x 2cos 1 0 cos 1 0x or x
1cos
2x cos 1x
5,3 3
x
0x
Replace sin2x with 1-cos2x
Distribute
Combine like terms.
Multiply through by – 1.
Factor.Set each factor equal to zero.
Solve for cos x.
Determine the solution(s).
Solving Trigonometric Equations
cos 1 sinx x 2 2cos 1 sinx x
2 2cos 2cos 1 sinx x x
Solve:
2 2cos 2cos 1 1 cosx x x 22cos 2cos 0x x
2cos cos 1 0x x 2cos 0 cos 1 0x or x cos 0x cos 1x
3,2 2
x
x
Square both sides of the equationin order to change sine into termsof cosine giving only one trigfunction to work with.
FOIL or Double Distribute
Replace sin2x with 1 – cos2x
Set equation equal to zero since it is a quadratic equation.
Factor
Set each factor equal to zero.Solve for cos x
Determine the solution(s).XWhy is 3/2 removed as a solution? It is removed because it does not
check in the original equation.
Solving Trigonometric Equations
1cos3
2x
53 ,
3 3x
5,9 9
x
Solve:
Solution:No algebraic work needs to be done because cosine is already by itself.Remember, 3x refers to an angle and one cannot divide by 3 because it is cos 3x which equals ½.
Since 3x refers to an angle, find the angles whose cosine value is ½.
Now divide by 3 because it is angle equaling angle.
Notice the solutions do not exceed 2. Therefore,more solutions may exist.
Return to the step where you have 3x equalingthe two angles and find coterminal angles for those two.
7 11, ,3 3
53 ,
3 3x
Divide those two new angles by 3.7 11, ,9 9
5,9 9
x
Solving Trigonometric Equations
The solutions still do not exceed 2. Return to 3x and find two more coterminal angles.
13 17, ,3 3
7 11, ,3 3
53 ,
3 3x
Divide those two new angles by 3.13 17, ,9 9
7 11, ,9 9
5,9 9
x
The solutions still do not exceed 2. Return to 3x and find two more coterminal angles.
19 23, ,3 3
13 17, ,3 3
7 11, ,3 3
53 ,
3 3x
Divide those two new angles by 3.19,9
13 17, ,9 9
7 11, ,9 9
5,9 9
x
Notice that 19/9 now exceeds 2 andis not part of the solution.
Therefore the solution to cos 3x = ½ is 5 7 11 13 17, , , , ,9 9 9 9 9 9
x
Solving Trigonometric Equations
24sin 2cos 1x x
csc cot 1x x
3sin 2
2x
Try these:
2cos
2 2
x
5.4218x
2x
2 5 5 11, , ,
3 6 3 6x
2x
1.
2.
3.
4.
Solution
Solving Trigonometric Equations
What you should know:
1. How to use algebraic techniques to solve trigonometric equations.
2. How to solve quadratic trigonometric equations by factoring or the quadratic formula.
3. How to solve trigonometric equations involvingmultiple angles.