The Derivative as a Function

If every point of a function has a derivative, there is a derivative function sending the point $a$ to the derivative of $f$ at $x = a$: $f'(a)$.

Learning Objective

Explain how the derivative acts as a "function of functions"

Key Points

The derivative is an operator whose domain is the set of all functions that have derivatives at every point of their domain and whose range is a set of functions.
The function whose value at $x=a$ equals $f′(a)$ whenever $f′(a)$ is defined and elsewhere is undefined is also called the derivative of $f$.
By the definition of the derivative function, $D(f)(a) = f′(a)$, where $D$ is an operator whose domain is the set of all functions that have derivatives at every point of their domain and whose range is a set of functions.

Terms

range
the set of values (points) which a function can obtain
domain
the set of all possible mathematical entities (points) where a given function is defined

Full Text

Let $f$ be a function that has a derivative at every point $a$ in the domain of $f$. Because every point $a$ has a derivative, there is a function that sends the point $a$ to the derivative of $f$ at $a$. This function is written $f'(x)$ and is called the derivative function or the derivative of $f$. The derivative of $f$ collects all the derivatives of $f$ at all the points in the domain of $f$. Visually, derivative of a function $f$ at $x=a$ represents the slope of the curve at the point $x=a$.

Derivative As Slope

The slope of tangent line shown represents the value of the derivative of the curved function at the point $x$.

Sometimes $f$ has a derivative at most, but not all, points of its domain. The function whose value at $a$ equals $f'(a)$ whenever $f'(a)$ is defined and elsewhere is undefined is also called the derivative of $f$. It is still a function, but its domain is strictly smaller than the domain of $f$.

Discontinuous Function

At the point where the function makes a jump, the derivative of the function does not exist.

Using this idea, differentiation becomes a function of functions: The derivative is an operator whose domain is the set of all functions that have derivatives at every point of their domain and whose range is a set of functions. If we denote this operator by $D$, then $D(f)$ is the function $f'(x)$. Since $D(f)$ is a function, it can be evaluated at a point $a$. By the definition of the derivative function, $D(f)(a)=f'(a)$.

For comparison, consider the doubling function $f(x) = 2x$; $f$ is a real-valued function of a real number, meaning that it takes numbers as inputs and has numbers as outputs:

$1 \rightarrow 2$

$2 \rightarrow 4$

$3 \rightarrow 6$.

The operator $D$, however, is not defined on individual numbers. It is only defined on functions:

$D(x \rightarrow 1) = (x \rightarrow 0)$

$D(x \rightarrow x) = (x \rightarrow 1)$

$D(x \rightarrow x^2) = (x \rightarrow 2x)$.

Because the output of $D$ is a function, the output of $D$ can be evaluated at a point. For instance, when $D$ is applied to the squaring function,

$x \rightarrow x^2$

$D$ outputs the doubling function,

$x \rightarrow 2x$

which is f(x)f(x). This output function can then be evaluated to get f(1)=2f(1) = 2, $f(2) = 4$, and so on.

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