Science Fair Project Encyclopedia
Sum and difference formula (trigonometry)
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Cosine Formulas
- cos(a + b) = cos a cos b - sin a sin b
- cos(a - b) = cos a cos b + sin a sin b
Sine Formulas
- sin(a + b) = sin a cos b + cos a sin b
- sin(a - b) = sin a cos b - cos a sin b
- sin2a = 2 sin a cos a
Tangent Formulas
- tan(a +b) = (tan a + tan b)/(1 - tan a tan b)
- tan(a - b) = (tan a -tan b)/(1 + tan a tan b)
Derivations
- cos(a + b) = cos a cos b - sin a sin b
- cos(a - b) = cos a cos b + sin a sin b
Using cos(a + b) and the fact that cosine is even and sine is odd, we have
cos(a + (-b)) = cos a cos (-b) - sin a sin (-b)
= cos a cos b - sin a (-sin b)
= cos a cos b + sin a sin b
- sin(a + b) = sin a cos b + cos a sin b
Using cofunctions we know that sin a = cos (90 - a). Use the formula for cos(a - b) and cofunctions we can write
sin(a + b) = cos(90 - (a + b))
= cos((90 - a) - b)
= cos(90 -a)cos b + sin(90 - a)sin b
= sin a cos b + cos a sin b
- sin(a - b) = sin a cos b - cos a sin b
Having derived sin(a + b) we replace b with "-b" and use the fact that cosine is even and sine is odd.
sin(a + (-b)) = sin a cos (-b) + cos a sin (-b)
= sin a cos b + cos a (-sin b)
= sin a cos b - cos a sin b
Last updated: 06-05-2005 03:28:27
10-26-2009 08:16:03
The contents of this article is licensed from www.wikipedia.org under the GNU Free Documentation License. Click here to see the transparent copy and copyright details
The contents of this article is licensed from www.wikipedia.org under the GNU Free Documentation License. Click here to see the transparent copy and copyright details