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Cos(x + y) + cos(x − y) = 2 cos(x) cos(y)
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Cos(x + y) + cos(x − y) = 2 cos(x) cos(y)

User Earth Engine
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7.2k points

2 Answers

5 votes


\texttt{We use formula: }~~~ \boxed{\cos(x\pm y) = \cos (x) \cos (y) ~\mp ~\sin (x) \sin (y)}\\\\ \cos(x + y) + \cos(x - y) =\\\\ = \underbrace{\cos (x) \cos (y) -\sin (x) \sin (y)}_(\cos(x + y) ) +\underbrace{\cos (x) \cos (y) +\sin (x) \sin (y)}_(\cos(x - y)) =\\\\ =\cos (x) \cos (y)+\cos (x) \cos (y)-\sin (x) \sin (y)+\sin (x) \sin (y)=\\\\ =\cos (x) \cos (y)(1+1) + \sin (x) \sin (y)(-1+1) = \\\\ =2\cos (x) \cos (y) + 0\sin (x) \sin (y) = \boxed{\boxed{2\cos (x) \cos (y)}}



User Travis Bradshaw
by
6.6k points
1 vote

Answer:


2cos((x+y+x-y)/(2)) cos((x+y-x+y)/(2))


2cos((2x)/(2))cos((x+y-x+y)/(2))


2cos(x)cos((2y)/(2))


2cos(x)cos(y)

User Allok
by
7.3k points
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