Double angle formulae for cos and sine:

What Are the Double-Angle Formulae?

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The Double-Angle formulas express the cosine and sine of twice an angle in terms of the cosine and sine of the original angle. We are going to derive them from the addition formulas for sine and cosine. The formulae are:

 

and

 

It is well worth practising the derivation so that you can do it quickly and easily. Then you will not need to remember the formulae, since you can get them quickly from the addition formulas for sine and cosine. It is also good to practice the derivation because being more fluent with the algebra will make you better at other algebra used with trigonometry.

Exercise: Check these Make Sense

Did we make a typo in these formulae? Check they at least make sense.

  • We know that   and   . Try those values out. Do the formulae work?
  •   and   . Are the formulae consistent with that?
  • Make up your own additional 'spot check' to check the formulae
Example: Half Angle formula for Cosine

If we put   we immediately get

 

Check it. Do you agree? Or rearranging:

 

So, if we know the cosine of   (we do, it is zero), we can compute the cosine of   and   and   and so on.

 
 
 


Proofs for Double Angle Formulae

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We'll prove the double angle formulae from the addition formulae. Recall that:

 

Putting   in the above formula yields:

   
 
 

So:

 

Compare this with the "Pythagorean Theorem" expressed in terms of sine and cosine. Notice the double angle formula above has a minus not a plus, otherwise it would be saying   , which would mean cos was 1 for all values of t, which we know is not true.


In terms of just cosine or just sine

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The formula

 

isn't yet quite where we want it. We want to get rid of the sine term and express it all in terms of cosine. To do that we use the disguised "Pythagorean Theorem".

 

which is the same as:

 

so

 

so

 

which is what we wanted.

We could, if we had preferred, have used the disguised Pythagorean theorem to replace the   in terms of  


Exercise: Double angle cosine formula in terms of sine.

Do that now, in other words express:

 

in terms of  

  • Check your answer, particularly to make sure that you have all the minus signs right.


Double angle formula for sine

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Now we will get the double angle formula for sine, this time using the addition formula for sine.

 

Check that we've quoted the addition formula correctly, and then put   in the above

   
 
 

So:

 

Unlike the formula for cosine the substitutions to get   just in terms of   would involve square roots, so we're not going to do that. The above formula is usually the nicest form to work with.

Treble and Higher Angles

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Using the above procedures twice, and the Pythagorean theorem where appropriate, we find

 
 

By repeating the procedure, we can find formulae for   and   for any integer n. The formulas do however get rather long.

It is not really worthwhile remembering these formulae. They are not used often, and can either be looked up in tables of formulae or calculated when you need them. It is quite good for practising algebra to derive them yourself, so....


Exercise: Treble angle formulas for sine and cosine

Derive the formulas for   and   yourself.


Double and Treble Angles for Tangents

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By using   , it can be worked out that:


 


 

Like the formulas for   and   , these formulae aren't often useful, but again it is good to be able to work them out yourself.

Exercise: Multiple angle formulae for tan

Derive the formulas for   and   yourself.

  • If you don't get 'the right answer,' don't panic. It takes time and practice to become fluent at algebraic manipulations. Here, where you know the right answer, you can work through your steps and try and find for yourself where you went wrong. Very often it is a sign error somewhere, adding a value instead of subtracting, and then everything from that point on is wrong. You can use the trick of putting in actual values for   (and calculating with a calculator) to check for the place where the first error creeps in.