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How do you find the derivative of #f(x)=8sinxcosx#?

1 Answer

Feb 16, 2017

#f'(x)=8(cos^2x-sin^2x)=8cos2x#

Explanation:

This will need the product rule:

#f(x)=uv=>f'(x)=vu'+uv'#

#f(x)=8sinxcosx#

#u=8sinx=>u'=8cosx#

#v=cosx=>v'=-sinx#

#:.f'(x)=8cosxxxcosx+8sinx xx(-sinx)#

#f'(x)=8(cos^2x-sin^2x)=8cos2x#

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