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If Then Trigonometry

Finding the exact values of sine, cosine and tangent of angles if given a different trig ratio.

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Solve these "If Then" questions without using a calculator but giving exact answers in their simplest form. Use the / symbol to show a fraction and the root button to insert the square root sign if required.

If \( \sin \theta = \frac{3}{5} \)
then find \( \cos \theta \)

Correct Wrong

If \( \tan \theta = \frac{3}{4} \)
then find \( \sin \theta \)

Correct Wrong

If \( \cos \theta = \frac{12}{13} \)
then find \( \tan \theta \)

Correct Wrong

If \( 13\cos \theta = 5 \)
then find \( \sin \theta \)

Correct Wrong

If \( 3\tan \theta = 4 \)
then find \( \cos \theta \)

Correct Wrong

If \( 5\sin \theta = 4 \)
then find \( \tan \theta \)

Correct Wrong

If \( \tan \theta = 1 \)
then find \( \sin \theta \)

Correct Wrong

If \( 2\cos \theta = 1 \)
then find \( \tan \theta \)

Correct Wrong

If \( 2\sin \theta = \sqrt{3} \)
then find \( \cos \theta \)

Correct Wrong

Check

Instructions

Try your best to answer the questions above. Type your answers into the boxes provided leaving no spaces. As you work through the exercise regularly click the "check" button. If you have any wrong answers, do your best to do corrections but if there is anything you don't understand, please ask your teacher for help.

When you have got all of the questions correct you may want to print out this page and paste it into your exercise book. If you keep your work in an ePortfolio you could take a screen shot of your answers and paste that into your Maths file.

Why am I learning this?

Mathematicians are not the people who find Maths easy; they are the people who enjoy how mystifying, puzzling and hard it is. Are you a mathematician?

Comment recorded on the 10 April 'Starter of the Day' page by Mike Sendrove, Salt Grammar School, UK.:

"A really useful set of resources - thanks. Is the collection available on CD? Are solutions available?"

Comment recorded on the 1 February 'Starter of the Day' page by M Chant, Chase Lane School Harwich:

"My year five children look forward to their daily challenge and enjoy the problems as much as I do. A great resource - thanks a million."

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Practice Papers

Practice Papers

Mathematics GCSE(9-1) Higher style questions and worked solutions presented as twenty short, free, practice papers to print out.

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Description of Levels

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Surds - Make sure you understand what surds are before starting the levels below.

Common Trig Ratios Level 1 - Find exact trig values for special angles up to and including ninety degrees

Common Trig Ratios Level 2 - Find the indicated lengths by solving trigonometric questions with exact solutions

Common Trig Ratios Level 3 - Mixed questions on exact trig values of special angles up to and including ninety degrees

Common Trig Ratios Level 4 - Find exact trig values for angles between ninety and three hundred and sixty degrees

Common Trig Ratios Level 5 - Solving trigonometric equations with given domains

Exam Style Questions - A collection of problems in the style of GCSE or IB/A-level exam paper questions (worked solutions are available for Transum subscribers).

More Trigonometry including visual aids, investigations and self-marking exercises.

Answers to this exercise are available lower down this page when you are logged in to your Transum account. If you don’t yet have a Transum subscription one can be very quickly set up if you are a teacher, tutor or parent.

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Help

The questions in this exercise are designed to be solved by drawing a diagram of a right-angled triangle, choosing the lenghts of two of the sides using the given ratio then use Pythagoras' theorem to figure out the length of the third side. The required trig ratio can then be found from the diagram.

For example, if \(\tan \theta = \frac{8}{15} \) then find \( \sin \theta \)

Firstly sketch a righ-angled triangle containing the angle \( \theta \), opposite 8 and adjacent 15.

Example

The length of the hypotenuse can be calculated using pythagoras' Theorem to be \( \sqrt{8^2 + 15^2} = 17\).

Finally \( \sin \theta \) can be calculated as the opposite over the hypotenuse which is \( \frac{8}{17} \).

Common Trigonometric Ratios Video

Helpful Diagrams

Common Trig Ratios

Don't wait until you have finished the exercise before you click on the 'Check' button. Click it often as you work through the questions to see if you are answering them correctly. You can double-click the 'Check' button to make it float at the bottom of your screen.

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