We are open Saturday and Sunday!

Call Now to Set Up Tutoring:

(888) 888-0446

Trigonometry : Trigonometry

Study concepts, example questions & explanations for Trigonometry

Create An Account

All Trigonometry Resources

6 Diagnostic Tests 155 Practice Tests Question of the Day Flashcards Learn by Concept

Example Questions

Example Question #2 : Quadratic Formula With Trigonometry

Solve the equation over the interval $0 < x < 2\pi$

cos^2x = 2sinx +2

Possible Answers:

$\frac{3\pi}{2}$

$\frac{\pi}{2}$

$2\pi$

Correct answer:

$\frac{3\pi}{2}$

Explanation:

First, get the equation in terms of one trig function. We can do this by substituting in using the Pythagorean Identity for cos^2x .

Then we have 1-sin^2x = 2sinx +2 .

Bring all the terms to one side to find that sin^2x+2sinx+1 .

We can factor this quadratic to (sinx+1)^2 = 0 .

This means that sinx = -1 .

The only angle value for which this is true is $\frac{3\pi}{2}$ .

Report an Error

Example Question #1 : Quadratic Formula With Trigonometry

Solve for , giving your answer as a positive angle measure:

sin^2x+2sinx = 3

Possible Answers:

0^o or 180^o

90^o

No solution

90^o or 270^o

Correct answer:

90^o

Explanation:

First, re-write the equation so that it is equal to zero: sin^2x + 2sinx -3 =0

Now we can use the quadratic formula to solve for x. In this case, the coefficients a, b, and c are a=1, b=2, and c=-3:

$sinx = \frac{-2\pm\sqrt{(-2)^2-(4\cdot 1\cdot -3)}}{2\cdot 1}$ simplify

$sinx = \frac{-2\pm\sqrt{4+12}}{2}$

$sinx = \frac{-2\pm\sqrt{16}}{2}$

$sinx=\frac{-2\pm4}{2}$

This gives two potential answers:

$sinx=\frac{-2+4}{2}=\frac{2}{2}=1$

and

$sinx=\frac{-2-4}{2}=\frac{-6}{2}=-3$

Sine must be between -1 and 1, so there are no values of x that would give a sine of -3. The only solution that works is sinx=1 . The only angle measure that has a sine of 1 is 90^o .

Report an Error

Example Question #2 : Quadratic Formula With Trigonometry

Solve for :

4sin^2x + sinx -1 = 0 .

Give your answer as a positive angle measure.

Possible Answers:

30^o or 150^o

320.21^o, 219.79^o, 22.95^o, or 157.05^o

320.21^o or 22.95^o

39.79^o or 337.05^o

Correct answer:

320.21^o, 219.79^o, 22.95^o, or 157.05^o

Explanation:

Use the quadratic formula to solve for x. In this case, the coefficients a, b, and c are a=4, b=1, and c=-1:

$sinx = \frac{-1\pm\sqrt{(-1)^2-(4\cdot 4\cdot -1)}}{2\cdot 4}$ simplify

$sinx = \frac{-1\pm\sqrt{1+16}}{8}$

$sinx = \frac{-1\pm\sqrt{17}}{8}$

the square root of 17 is about 4.123. This gives two potential answers:

sinx=-0.64, or 0.39 . We can solve for x by evaluating both $sin^{-1}(-0.64)$ and $sin^{-1}(0.39)$ . The first gives an answer of -39.79^o . Add this to 360 to get that as a positive angle measure, 320.21^o . If this has a sine of -0.64, so does its reflection over the y-axis, which is 219.79^o .

The second gives an answer of 22.95^o . If that has a sine of 0.39, then so does its reflection over the y-axis, which is 157.05^o .

Report an Error

Example Question #8 : Quadratic Formula With Trigonometry

Solve for $\theta$ : $2 \sin ^2 (3 \theta ) = 1$

Possible Answers:

$\frac{ \pi }{6} , \frac{ 5 \pi }{6 }$

$\frac{ \pi }{18} , \frac{5 \pi }{18 }, \frac{ 7 \pi }{18}, \frac{11 \pi }{18 }$

$\frac{ \pi }{12}, \frac{\pi }{4 }, \frac{5 \pi }{12}, \frac{ 7 \pi }{12 }$

$\frac{ \pi }{4} , \frac{3 \pi }{4} , \frac{5 \pi }{4} , \frac{ 7 \pi }{4}$

$\frac{3 \pi }{4 } , \frac{9 \pi }{4 }$

Correct answer:

$\frac{ \pi }{12}, \frac{\pi }{4 }, \frac{5 \pi }{12}, \frac{ 7 \pi }{12 }$

Explanation:

There are multiple solution paths. We could subtract 1 from both sides and use the quadratic formula with a = 2, b = 0, and c = -1 . Or we could solve using inverse opperations:

$2 \sin ^2 (3 \theta) = 1$ divide both sides by 2

$\sin ^2 (3 \theta ) = \frac{1}{2}$ take the square root of both sides

$\sin (3 \theta ) = \pm \frac{1} { \sqrt 2 }$

The unit circle tells us that potential solutions for $3 \theta$ are $\frac{\pi }{4}, \frac{3 \pi }{4} , \frac{5 \pi }{4} , \frac{7 \pi }{4}$ .

To get our final solution set, divide each by 3, giving:

$\frac{ \pi }{12}, \frac{\pi }{4 }, \frac{5 \pi }{12}, \frac{ 7 \pi }{12 }$ .

Report an Error

Example Question #42 : Solving Trigonometric Equations

Solve for $\theta$ : $4 \sin ^2( \theta + \frac{ \pi }{3 }) + 2 = 5$

Possible Answers:

$\frac{ 2 \pi }{3} , \pi, \frac{5 \pi }{3} , 2 \pi$

$\frac{11 \pi }{6} , \frac{\pi }{2} , \frac{5 \pi }{6} , \frac{ 3 \pi }{2}$

$0, \frac{\pi }{3}$

$0, \frac{\pi }{3}, \pi, \frac{4 \pi }{3}$

$\frac{ 11 \pi }{6} , \frac{ \pi }{2 }$

Correct answer:

$0, \frac{\pi }{3}, \pi, \frac{4 \pi }{3}$

Explanation:

This problem has multiple solution paths, including subtracting 5 from both sides and using the quadratic formula with a = 4, b = 0 , c = -3 . We can also solve using inverse opperations:

$4 \sin ^2 (\theta + \frac{ \pi }{3} ) + 2 = 5$ subtract 2 from both sides

$4 \sin ^2 (\theta + \frac{ \pi }{3} ) = 3$ divide both sides by 4

$\sin ^ 2 (\theta + \frac{ \pi }{3} ) = \frac{3}{4}$ take the square root of both sides

$\sin (\theta + \frac{ \pi }{3} ) = \pm \frac{\sqrt3}{2}$

If the sine of an angle is $\pm \frac{\sqrt 3 }{2}$ , that angle must be one of $\frac{ \pi }{3} , \frac{2 \pi }{3} , \frac{4 \pi }{3} , \frac{5 \pi }{3}$ . Since the angle is $\theta + \frac{ \pi }{3}$ , we can get theta by subtracting $\frac{ \pi }{3}$ :

$\frac{\pi }{3} - \frac{ \pi }{3} = 0$

$\frac { 2 \pi }{3} - \frac{ \pi }{3} = \frac{ \pi }{3}$

$\frac{ 4 \pi }{3} - \frac{ \pi }{3} = \frac{ 3 \pi }{3} = \pi$

$\frac{ 5 \pi }{3} - \frac{ \pi }{3} = \frac{ 4 \pi }{3}$

Report an Error

Example Question #1 : Quadratic Formula With Trigonometry

Solve for $\theta$ : $4 \cos ^2 \theta - 4 \cos \theta - 3 = 0$

Possible Answers:

$\frac{ \pi }{3} , \frac{5 \pi }{3}$

$\frac{ \pi }{6} , \frac{5 \pi }{6}$

$\frac{ 7 \pi }{6} , \frac{11 \pi }{6 }$

$\frac{ \pi }{3} , \frac{2 \pi }{3}$

$\frac{ 2 \pi }{3} , \frac{ 4 \pi }{3}$

Correct answer:

$\frac{ 2 \pi }{3} , \frac{ 4 \pi }{3}$

Explanation:

To solve, use the quadratic formula with a = 4, b = -4, c = -3 and $\cos \theta$ where x would normally be:

$\cos \theta = \frac{4 \pm \sqrt{16 -4(4)(-3)}}{2(4)} = \frac{4 \pm 8}{8 }$

This gives us two potential answers:

$\cos \theta = \frac{4 + 8 }{8 } = \frac{12}{8 } = 1.5$ since this number is greater than 1, it is outside of the domain for cosine and won't give us any solutions.

$\cos \theta = \frac{4 - 8 }{8} = \frac{ -4} { 8 } = \frac{-1}{2}$

Consulting the unit circle, the cosine is $-\frac{1}{2}$ when $\theta = \frac{2 \pi }{3} , \frac{ 4 \pi }{3}$

Report an Error

Example Question #41 : Solving Trigonometric Equations

Solve for $\theta$ : $2 \cos ^ 4 \theta - 9 \cos ^2 \theta + 4 = 0$

Possible Answers:

$\frac{ \pi }{4} , \frac{3 \pi }{4} , \frac{5 \pi }{4}, \frac{7 \pi }{4}$

No solution

$\frac{ \pi }{4} , \frac{ 7 \pi }{4}$

$\frac{ \pi }{3} , \frac{ 2 \pi }{3} , \frac{ 4 \pi }{3} , \frac{ 5 \pi }{3 }$

$\frac{\pi }{3} , \frac{ 5 \pi }{3}$

Correct answer:

$\frac{ \pi }{4} , \frac{3 \pi }{4} , \frac{5 \pi }{4}, \frac{7 \pi }{4}$

Explanation:

To start solving, first realize that this is a quadratic with "x" as $\cos ^2 \theta$ :

$2[\cos ^2 \theta ]^2 - 9 [\cos^2 \theta] + 4 = 0$

We can solve using the quadratic formula:

$\cos^2 \theta = \frac{9 \pm \sqrt{81 - 4(2)(4)}}{2(2)} = \frac{9 \pm 7}{4}$

One potential solution: $\cos ^2 \theta = \frac{9 + 7 }{4 } = \frac{16 }{4} = 4$

Taking the square root gives: $\cos \theta = 2$ , but 2 is outside the range of cosine, so that won't work.

The other potential solution: $\cos ^2 \theta = \frac{ 9 - 7 }{4} = \frac{ 2}{4} = \frac{1}{2}$

Taking the square root gives: $\cos \theta = \pm \frac{1 }{\sqrt 2 }$

Consulting the unit circle, $\theta = \frac{ \pi }{4} , \frac{3 \pi }{4} , \frac{5 \pi }{4} , \frac{ 7 \pi }{4}$

Report an Error

Example Question #43 : Solving Trigonometric Equations

Solve for $\theta$ : $5 \sin ^ 2 (2 \theta ) - 13 \sin (2 \theta ) - 6 = 0$

Possible Answers:

336.42^o, 203.58 ^ o

168.21 ^o, 101.79 ^ o

-23.58^ o , 23. 58^o

11.79^o, 78. 21^o

78.21 ^ o, 168.21 ^ o

Correct answer:

168.21 ^o, 101.79 ^ o

Explanation:

To solve, first use the quadratic formula:

$\sin ( 2\theta )= \frac{ 13 \pm \sqrt{13^2- 4(5)(-6)}}{2(5)} = \frac{ 13 \pm 17}{10}$

This gives us two potential solutions:

$\sin ( 2 \theta ) = \frac{ 13 + 17 }{ 10 } = \frac{ 30 }{10 } = 3$ that is outside the range of sine, so it won't work

$\sin ( 2 \theta ) = \frac{ 13 - 17 }{ 10 } = \frac{ -4 }{10 } = -0.4$

We can continue solving by taking the inverse sine:

$2 \theta = \sin ^ {-1 } (-0.4)$

using a calculator gives us

$2 \theta \approx -23.58$ , which we can convert to a positive angle measure by adding to 360:

360^o - 23.58^o = 336.42^o

This is just one answer for $2 \theta$ . The other angle that would work would be 23.58 ^o below 180^o , or 180 ^ o + 23.58 ^ o = 203.58 ^o

Since those are values for $2 \theta$ , to get our final answers divide by 2:

168.21 ^o , 101.79^o

Report an Error

Example Question #71 : Trigonometric Equations

Solve for $\theta$ : $4 \sin ^ 2 \theta - \sin \theta - 3 = 0$

Possible Answers:

90^o, 311.41^o, 221.41^o

90^o, 48.59^o, 311.41^o

90^o, 311.41^o, 228.59^o

90^o, 311.41^o

90^o, 270 ^o , 311.41^o , 48.59^o

Correct answer:

90^o, 311.41^o, 228.59^o

Explanation:

First solve using the quadratic formula:

$\sin \theta = \frac { 1 \pm \sqrt{1 - 4 (4)(-3)}}{2(4)} = \frac{ 1 \pm 7 }{ 8 }$

This gives two potential solutions:

$\sin \theta = \frac{ 1 + 7 }{8 } = \frac{ 8}{8 } = 1$

The only value for $\theta$ where sine is 1 is 90^o .

$\sin \theta = \frac{ 1 - 7 }{8 } = \frac{ -6 }{ 8 } = -0.75$

Using a calculator, we get $\theta = \sin ^ {-1} (-0.75 ) \approx -48.59$

Adding that to 360 givesus the angle's positive value, 360 - 48.59 = 311.41

That's just one instance where the sine is -0.75. We also need to find the other angle 48.59^o below the x-axis by adding 180 + 48.59 = 228.59 .

So our three values for theta are 90^o, 311.41^o, 228.59^o

Report an Error

Example Question #72 : Trigonometric Equations

Solve for $\theta$ : $2 \cos ^2 (4 \theta ) + 9 \cos (4 \theta) = 5$

Possible Answers:

15^o

60^o

7.5^o, 82.5^o

60^o, 300^o

15^o, 75^o

Correct answer:

15^o, 75^o

Explanation:

First, solve for $\cos (4 \theta)$ using the quadratic formula:

$\cos ( 4 \theta) = \frac{ -9 \pm \sqrt{81 - 4(2)(-5)}}{4} = \frac{ 9 \pm 11}{4}$

This gives two solutions:

$\cos (4 \theta ) = \frac{ -9 -11 }{ 4} = \frac{ -20 }{4} = -5$ this is outside of the range of cosine so it will not work.

$\cos (4 \theta ) = \frac{ -9 + 11}{ 4 } = \frac{ 2 }{4 } = \frac{ 1}{2}$

Consulting the unit circle tells us that $4 \theta = 60^o$ or 300^o . To get our final answers, just divide these by 4:

$\theta = 15^o, 75^o$

Report an Error

View Trigonometry Tutors

Ping
Certified Tutor

The University of Texas at Dallas, Bachelor of Science, Computer Science. University of North Texas, Master of Arts, Education.

View Trigonometry Tutors

Usman
Certified Tutor

New York University, Bachelor in Arts, Political Science and Government.

View Trigonometry Tutors

Joseph
Certified Tutor

Rutgers University-New Brunswick, Bachelor in Arts, Chemistry. Rutgers Graduate School of Biomedical Sciences, Current Grad S...

All Trigonometry Resources

6 Diagnostic Tests 155 Practice Tests Question of the Day Flashcards Learn by Concept

Trigonometry Tutors in Top Cities:

Popular Courses & Classes

GRE Courses & Classes in Atlanta, Spanish Courses & Classes in Houston, SSAT Courses & Classes in Atlanta, MCAT Courses & Classes in Phoenix, Spanish Courses & Classes in San Francisco-Bay Area, SSAT Courses & Classes in Los Angeles, GRE Courses & Classes in San Francisco-Bay Area, Spanish Courses & Classes in Atlanta, ACT Courses & Classes in Seattle, SAT Courses & Classes in Chicago

Popular Test Prep

GRE Test Prep in Miami, GMAT Test Prep in Philadelphia, SSAT Test Prep in Atlanta, ISEE Test Prep in Dallas Fort Worth, GMAT Test Prep in Atlanta, ACT Test Prep in Phoenix, SSAT Test Prep in San Francisco-Bay Area, GRE Test Prep in Denver, LSAT Test Prep in Washington DC, MCAT Test Prep in Denver

DMCA Complaint

If you believe that content available by means of the Website (as defined in our Terms of Service) infringes one or more of your copyrights, please notify us by providing a written notice (“Infringement Notice”) containing the information described below to the designated agent listed below. If Varsity Tutors takes action in response to an Infringement Notice, it will make a good faith attempt to contact the party that made such content available by means of the most recent email address, if any, provided by such party to Varsity Tutors.

Your Infringement Notice may be forwarded to the party that made the content available or to third parties such as ChillingEffects.org.

Please be advised that you will be liable for damages (including costs and attorneys’ fees) if you materially misrepresent that a product or activity is infringing your copyrights. Thus, if you are not sure content located on or linked-to by the Website infringes your copyright, you should consider first contacting an attorney.

Please follow these steps to file a notice:

You must include the following:

A physical or electronic signature of the copyright owner or a person authorized to act on their behalf; An identification of the copyright claimed to have been infringed; A description of the nature and exact location of the content that you claim to infringe your copyright, in \ sufficient detail to permit Varsity Tutors to find and positively identify that content; for example we require a link to the specific question (not just the name of the question) that contains the content and a description of which specific portion of the question – an image, a link, the text, etc – your complaint refers to; Your name, address, telephone number and email address; and A statement by you: (a) that you believe in good faith that the use of the content that you claim to infringe your copyright is not authorized by law, or by the copyright owner or such owner’s agent; (b) that all of the information contained in your Infringement Notice is accurate, and (c) under penalty of perjury, that you are either the copyright owner or a person authorized to act on their behalf.

Send your complaint to our designated agent at:

Charles Cohn Varsity Tutors LLC
101 S. Hanley Rd, Suite 300
St. Louis, MO 63105

Or fill out the form below:

Do not fill in this field

Contact Information

* Full legal name

Company name

* Phone number

* Email address

Address

* Address1

Address2

* City

* State

* Zipcode

* Country

Complaint Details

* URL of copyrighted work (where your original material is located)

* Please describe the copyrighted work so that it may be easily identified

I am the owner, or an agent authorized to act on behalf of the owner of an exclusive right that is allegedly infringed.

I have a good faith belief that the use of the material in the manner complained of is not authorized by the copyright owner, its agent, or the law.

This notification is accurate.

I acknowledge that there may be adverse legal consequences for making false or bad faith allegations of copyright infringement by using this process.

* Signature (your digital signature is legally binding)

HIGH SCHOOL

GRADUATE SCHOOL

K-8

Search 50+ Tests

math tutoring

science tutoring

foreign languages

elementary tutoring

other

Search 350+ Subjects

Trigonometry : Trigonometry

Study concepts, example questions & explanations for Trigonometry

All Trigonometry Resources

Example Questions

Example Question #2 : Quadratic Formula With Trigonometry

Example Question #1 : Quadratic Formula With Trigonometry

Example Question #2 : Quadratic Formula With Trigonometry

Example Question #8 : Quadratic Formula With Trigonometry

Example Question #42 : Solving Trigonometric Equations

Example Question #1 : Quadratic Formula With Trigonometry

Example Question #41 : Solving Trigonometric Equations

Example Question #43 : Solving Trigonometric Equations

Example Question #71 : Trigonometric Equations

Example Question #72 : Trigonometric Equations

All Trigonometry Resources

Report an issue with this question

DMCA Complaint

Contact Information

Address

Complaint Details

Email address:
Your name:
Feedback: