Proving a Trigonometric Identity

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einstein314
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Homework Statement



Prove that:[itex]\cos^6{(x)} + \sin^6{(x)} = \frac{5}{8} + \frac{3}{8} \cos{(4x)}[/itex]

Homework Equations



I am not sure. I used factoring a sum of cubes.

The Attempt at a Solution



I tried [itex]\cos^6{(x)} + \sin^6{(x)} = \cos^4{(x)} - \cos^2{(x)} \sin^2{(x)} + \sin^4{(x)}[/itex]. But I can't get anywhere beyond this; I must be missing something obvious.
 
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Sounds good to me! Now, you might try factoring "[itex]cos^2(x)[/itex] out of the first two terms: [itex]cos^2(x)(cos^2(x)- sin^2(x))+ sin^4(x)= cos^2(x)cos(2x)- sin^4(x)[/itex] see where you can go from that.
 
Although, x2 - xy + y2 cannot be factored (over the reals), x4 - x2 y2 + y4 can be factored .

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The 4x on the right, and the 8s in the denominators, are strong clues. Do you know how to expand cos(2x) in terms of cos(x) and sin(x)? Just apply that (in reverse) a couple of times.

Edit... SteamKing's (equivalent) post wasn't there when I hit reply, even though it seems to have been made hours earlier. Strange.