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I understand how to apply the chain rule to two functions, but trip up when it comes to three or more.

Given $f~(x~)= x~\sqrt{1-x^{2}}$, I can see there are three values:

$a: 1-x^{2}$
$b: \sqrt{a}$
$c: x~\cdot b$

Now, $f(b(a))= \frac{1}{2~\sqrt{1-x^{2}}}~\cdot~2x= x \sqrt{1-x^{2}},$ but how do I factor in the last x value?

Am I on the right track here?

3 Answers 3

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The way you're trying to break up your function isn't quite right. The step where $x$ is multiplied with $\sqrt{1-x^2}$ should be seen as a product, not a composition. So you could look at this as $f(x)=g(x)\cdot h(x)$, where $h(x)=b(a(x))$ with $a$ and $b$ are as you defined them and $g(x)=x$. You can apply the product rule first, and only apply the chain rule for the part where you differentiate $h(x)$:

f'(x)=g'(x)h(x)+g(x)h'(x)=h(x)+xb'(a(x))a'(x)=\sqrt{1-x^2}+x\frac{1}{2\sqrt{1-x^2}}(-2x), etc. (You had a sign error in the derivative of $a$.)

The other problem is the notation where you wrote

$f(b(a))= \frac{1}{2~\sqrt{1-x^{2}}}~\cdot~2x= x \sqrt{1-x^{2}}.$

This doesn't really make sense. $f(b(a))$ is something different entirely from what you want to consider. The middle term is an attempted derivative of $b(a(x))$. And the right-hand term is $f(x)$. Thus, none of these are equal, and "$=$" is best reserved for equality, both to avoid errors and to allow meaningful communication to others (such as to whomever grades your assignment if this is for a class).

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If you know how to apply the chain rule for two functions, then the simplest thing to do to avoid getting tripped up is to the work one step at a time. For instance, \begin{eqnarray*} \frac{d}{dx}c\Biggl(b\Bigl(a(x)\Bigr)\Biggr) &= c'\Biggl(b\Bigl(a(x)\Bigr)\Biggr)\Biggl(b\Bigl(a(x)\Bigr)\Biggr)'\\ &= c'\Biggl(b\Bigl(a(x)\Bigr)\Biggr)\Biggl( b'\Bigl(a(x)\Bigr)\Bigl(a(x)\Bigr)'\Biggr)\\ &= c'\Biggl(b\Bigl(a(x)\Bigr)\Biggr)b'\Bigl(a(x)\Bigr)a'(x). \end{eqnarray*}

That said, in your example, you should not think of $f(x)$ as the composition of three functions, but rather first and foremost as a product, so the first thing you should do is apply the product rule, (gh)' = g'h + gh', with $g(x) = x$ and $h(x) = \sqrt{1-x^2}$.

(If you want to think about $c$ as a function of the form $c(u) = xu$, then what would the derivative of $c$ with respect to $x$ be? First you would use the product rule: $\frac{d}{dx}c(u) = \frac{d}{dx}(xu) = u + x\frac{du}{dx}$, and then you would find the derivative of $u$.)

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    @Billare: I used manual control of the size (`\Biggl` and `\Bigl`, `\Biggr` and `\Bigr`) rather than `\left` and ``right`; I usually skip over `\bigl` and `\biggl`, because they aren't quite as contrasting.2011-03-07
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You want to work you're way from the outside in to take derivatives.

First, apply the product rule to $x$ and $\sqrt{1-x^2}$. That is, f'(x)g(x)+f(x)g'(x)
In this case, you can let $f(x)=x$ and $g(x)=\sqrt{1-x^2}$.
1*\sqrt{1-x^2} + x(\sqrt{1-x^2})'

Now you have only 2 functions to work with. The outer square root function and the inner square function.
Now you get: \sqrt{1-x^2} + x(\frac{1}{2}(1-x^2)^{-1/2}(-x^2)') And finally:
$\sqrt{1-x^2} + x(\frac{1}{2}(1-x^2)^{-1/2}(-2x))$
Which you can simplify to:
$\sqrt{1-x^2} + \frac{-x^2}{\sqrt{1-x^2}}$
And further to:
$\frac{-2x^2+1}{\sqrt{1-x^2}}$

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    Interesting. Did this and other answers clear things up for you? You were using the product rule?2011-03-08