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How do you find the Maclaurin Series for #(sinx)(cosx)#?

1 Answer

Dec 7, 2016

#sin(x)cos(x)=1/2sum_(k=0)^oo(-1)^k(2x)^(2k+1)/((2k+1)!)#

Explanation:

We know that #sin(2x)=2sin(x)cos(x)# so

#sin(x)cos(x)=1/2sin(2x)# or

#sin(x)cos(x)=1/2sum_(k=0)^oo(-1)^k(2x)^(2k+1)/((2k+1)!)#

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