Average Value of a Function (College Board AP® Calculus BC): Study Guide

Written by: Roger B

Reviewed by: Dan Finlay

Updated on 30 September 2024

Average Value of a Function

What is the average value of a function?

If $f$ is a continuous function, then the average value of $f$ over the interval $[a, b]$ is
- average value of $f$ on $[a, b]$ $= \frac{1}{b - a} \int_{a}^{b} f (x) d x$
The average value of a function will be a number $k$
- where $k = f (c)$ for some $c$ in $[a, b]$
  - and such that $k \cdot (b - a) = \int_{a}^{b} f (x) d x$
- This result is referred to as the mean value theorem for integrals
This means that the constant function $g$ defined by $g (x) = k$
- will represent the same accumulation of change as $f$ between $x = a$ and $x = b$
  - Because $\int_{a}^{b} k d x = k {[x]}_{a}^{b} = k (b - a)$
This can also be interpreted geometrically, as seen in the following diagram

Graph showing the Mean Value Theorem for integrals, with a curve y=f(x) and a horizontal line y=k. Two shaded areas are shown with equal areas. Text explains the theorem.

Examiner Tips and Tricks

Remember that you can't talk about the 'average value of a function' in general

The average value is only defined for a particular interval $[a, b]$
The average value will usually be different for different intervals

Worked Example

Let $f$ be the function defined by $f (x) = \sin x$ .

Calculate the average value of $f$ over the interval $[0, π]$ .

Answer:

Use average value of $f$ on $[a, b]$ $= \frac{1}{b - a} \int_{a}^{b} f (x) d x$

$\begin{array}{rcl} average value & = & \frac{1}{π - 0} \int_{0}^{π} \sin x d x \\ = & \frac{1}{π} {[- \cos x]}_{0}^{π} \\ = & \frac{1}{π} (- \cos (π) - (- \cos (0))) \\ = & \frac{1}{π} (- (- 1) - (- 1)) \\ = & \frac{1}{π} (1 + 1) \\ = & \frac{2}{π} \end{array}$

Average value $= \frac{2}{π}$

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Average Value of a Function (College Board AP® Calculus BC): Study Guide

Average Value of a Function

What is the average value of a function?

Sign up now. It’s free!

Join the 100,000+ Students that ❤️ Save My Exams

Unit 1: Limits & Continuity

Limits

Definition of a Limit

Infinite Limits & Limits at Infinity

Properties of Limits

Evaluating Limits Analytically

Evaluating Limits Numerically & Graphically

Squeeze Theorem & Trigonometric Limits

Summary of Limits

Selecting Procedures for Determining Limits

Continuity

Continuity

Removable Discontinuities

Non-removable Discontinuities

Intermediate Value Theorem

Unit 2: Differentiation Definition & Fundamental Properties

Definition of Differentiation

Average Rate of Change

Instantaneous Rate of Change

Derivatives & Tangents

Estimating the Derivative at a Point

Differentiability & Continuity

Fundamental Properties of Differentiation

Derivative Rules

Derivatives of Exponentials and Logarithms

Derivatives of Sine and Cosine Functions

The Product Rule

The Quotient Rule

Derivatives of Tangent and Reciprocal Trig Functions

Unit 3: Differentiation of Composite, Implicit & Inverse Functions

Differentiation of Composite & Inverse Functions

The Chain Rule

The Inverse Function Theorem

Derivatives of Inverse Trigonometric Functions

Higher-Order Derivatives

Summary of Differentiation

Selecting Procedures for Calculating Derivatives

Unit 4: Contextual Applications of Differentiation

Rates of Change & Related Rates

Meaning of a Derivative in Context

Motion in a Straight Line

Related Rates

Linearization

Approximating Values of a Function

L'Hospital's Rule

L'Hospital's Rule

Unit 5: Analytical Applications of Differentiation

Graphs of Functions & Their Derivatives

Mean Value Theorem

Extreme Value Theorem

Critical Points

Increasing & Decreasing Functions

First Derivative Test for Local Extrema

Candidates Test for Global Extrema

Concavity of Functions

Second Derivative Test for Local Extrema

Graphs of f, f' & f''

Optimization Problems

Behaviors of Implicit Relations

Second Derivatives of Implicit Functions

Critical Points of Implicit Relations

Unit 6: Integration & Accumulation of Change

Integration & Antiderivatives

Indefinite Integrals

Derivatives & Antiderivatives

Indefinite Integral Rules

Constant of Integration

Riemann Sums & Definite Integrals

Accumulation of Change

Riemann Sums

Trapezoidal sums

Accumulation Functions

Fundamental Theorem of Calculus

Properties of Definite Integrals

Evaluating Definite Integrals