What Is the Identity for |sinx - siny| and |cosx - cosy| in Trigonometry?

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does anybody know the identity for |sinx-siny| and |cosx-cosy|?
 
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What exactly do you want these identities to contain? sin(x+y)'s and cos(x+y)'s? I don't see how you could make these expressions much simpler.
 
Are you looking for some Sum-to-product identities?
If yes, then here are the four identities:
\cos \alpha + \cos \beta = 2 \cos \left( \frac{\alpha + \beta}{2} <br /> \right) \cos \left( \frac{\alpha - \beta}{2} \right).
\cos \alpha - \cos \beta = -2 \sin \left( \frac{\alpha + \beta}{2} \right) \sin \left( \frac{\alpha - \beta}{2} \right).
\sin \alpha + \sin \beta = 2 \sin \left( \frac{\alpha + \beta}{2} \right) \cos \left( \frac{\alpha - \beta}{2} \right).
\sin \alpha - \sin \beta = 2 \cos \left( \frac{\alpha + \beta}{2} \right) \sin \left( \frac{\alpha - \beta}{2} \right).
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From the 4 identities above, one can easily show that:
| \sin \alpha - \sin \beta | = 2 \left| \cos \left( \frac{\alpha + \beta}{2} \right) \sin \left( \frac{\alpha - \beta}{2} \right) \right|.
and:
| \cos \alpha - \cos \beta | = \left| -2 \sin \left( \frac{\alpha + \beta}{2} \right) \sin \left( \frac{\alpha - \beta}{2} \right) \right| = 2 \left| \sin \left( \frac{\alpha + \beta}{2} \right) \sin \left( \frac{\alpha - \beta}{2} \right) \right|.
Is that what you are looking for?
And that's not any simpler than your original expressions.
 
It is simpler, because you can drop with abs value signs using the odd or evenness of sin and cos respectively.
 
As has been stated, it is crucial that you specify what sort of identity you'
re after.

For example, the following identity holds (for all x,y):
|sin(x)-sin(y)|=|sin(x)-sin(y)|+0
 
Hi,

This is an inequality ..


| \sin x - \sin y | \leq | x - y |
 
Maybe this is what you're looking for...

|sinx - siny| = 2 * |{sin(x-y)/2} * {cos(x+y)/2}|

|cosx-cosy| = 2 * |{sin(x+y)/2} * {sin(x-y)/2}|


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