Introduction to Integration (DP IB Applications & Interpretation (AI)): Revision Note

Written by: Paul

Reviewed by: Dan Finlay

Updated on 11 June 2025

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Introduction to Integration

What is integration?

Integration is the inverse (or 'opposite') to differentiation
- Integration is referred to as antidifferentiation
- The result of integration is referred to as the antiderivative
Integration is the process of finding the expression of a function (antiderivative) from an expression of its derivative (gradient function)

What is the notation for integration?

An integral is normally written in the form $\int f (x) d x$
- the large operator $\int$ means “integrate”
- “ $d x$ ” indicates which variable to integrate with respect to
  - In this case it is integrate with respect to $x$
- $f (x)$ is the function to be integrated (sometimes called the integrand)
The antiderivative is sometimes denoted by $F (x)$
- Then there’s no need to keep writing the whole integral; refer to it as $F (x)$
$F (x) = \int f (x) d x$ may also be called the indefinite integral of $f (x)$
$\frac{d y}{d x}$ notation can also be used
- So instead of integrating $f (x)$ to find its antiderivative $F (x)$
- you can think of integrating $\frac{d y}{d x}$ to find an expression for its antiderivative $y$

What is the constant of integration?

Recall one of the special cases from Differentiating Powers of x
- If $f (x) = a$ then $f^{'} (x) = 0$
This means that integrating 0 will produce a constant term in the antiderivative
- Every function, when integrated, potentially has a constant term
This is called the constant of integration and is usually denoted by the letter $c$
- it is often referred to as “plus $c$ ”
Without more information it is impossible to deduce the value of this constant
- There are endless antiderivatives, $F (x)$ , for a function $f (x)$
- Each one corresponds to a different possible value of $c$

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Previous:Numerical Integration using the Trapezoidal RuleNext:Integrating Powers of x

Introduction to Integration (DP IB Applications & Interpretation (AI)): Revision Note

Introduction to Integration

What is integration?

What is the notation for integration?

What is the constant of integration?

You've read 0 of your 5 free revision notes this week

Unlock more, it's free!

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

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