How do you find the derivative of ${sin}^{2} (2 x)$ $sin^2(2x)$ ?

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How do you find the derivative of ${sin}^{2} (2 x)$ $sin^2(2x)$ ?

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Answer 1 · 2017-02-03T13:00:23

I got: $f'(x)=4sin(2x)cos(2x)$

Explanation:

Here I would try to use the Chain Rule applied to three functions one nested into the other:
the first and all-embracing function is $()^2$ ; the next one is the $sin$ function and the last one the $2x$ function.

I will use the Chain Rule deriving each one as if alone (regardless of the argument) and I will multiply each individual derivative together using, as visual help, a sequence of red-blue-green colors to identify each derivative:

$f'(x)=color(red)(2sin^(2-1)(2x))*color(blue)(cos(2x))*color(green)(2)$
giving:
$f'(x)=4sin(2x)cos(2x)$

This function can be compressed (giving: $2sin(4x)$ ) using a trigonometric identity but I do not want to confuse the procedure.

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How do you find the derivative of ${sin}^{2} (2 x)$ $sin^2(2x)$ ?

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