How do you find the derivative of cos(cos(cos(x)))cos(cos(cos(x)))?

1 Answer
Zack M.
Nov 4, 2015

-sin(x)sin(cos(x))sin(cos(cos(x)))sin(x)sin(cos(x))sin(cos(cos(x)))

Explanation:

It looks like the chain rule would be handy here. The chain rule states that for a function ff where;

f(x)=g(h(x))->f'(x)=g'(h(x))*h'(x)

In the given expression, we have a lot of cos terms, and the derivative of cos(x) is -sin(x), so applying the chain rule to our expression we get;

d/(dx)cos(cos(cos(x)))=-sin(cos(cos(x)))*d/(dx)cos(cos(x))

We still have d/(dx) but we can apply the chain rule again on cos(cos(x)).

-sin(cos(cos(x)))(-sin(cos(x))*d/(dx)cos(x))

One last time, we can take the derivative of cos(x).

-sin(cos(cos(x)))(-sin(cos(x))(-sin(x)))

We can make this look slightly nicer by clearing out some of the parenthesis and negative signs.

-sin(x)sin(cos(x))sin(cos(cos(x)))

If there is a way to de-nest trig functions, I don't know it, so this is the answer.

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