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

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

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Answer 1 · 2015-10-11T17:31:16

I would rewrite ${sin}^{2} x {cos}^{2} x$ $sin^2xcos^2x$

Explanation:

We could use the product, power and chain rules, but I'd prefer either of the two below:

Use the Pythagorean Identity

$f (x) = {sin}^{2} x {cos}^{2} x = {sin}^{2} x (1 - {sin}^{2} x) = {sin}^{2} x - {sin}^{4} x$ $f(x) = sin^2xcos^2x = sin^2x(1-sin^2x) = sin^2x-sin^4x$

$f'(x) = 2sinxcosx-4sin^3xcosx$

Rewrite as desired.

Of course, we could have used $f(x) = cos^2x-cos^4x$

to get $f'(x) = -2cosxsinx+4cos^3xsinx$ .

Use a Double Angle Identity

$sin2x = 2sinxcosx$ so

$f(x) = (sinxcosx)^2 = (1/2sin2x)^2 = 1/4 sin^2 2x$ .

So, $f'(x) = 1/4[2sin2xd/dx(sin2x)]$

$= 1/2sin2x cos2x d/dx(2x)$

$= sin2x cos2x$

Rewrite if you wish.

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

1 Answer

Explanation:

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