Measures of Dispersion (DP IB Applications & Interpretation (AI)): Revision Note

Author

Dan Finlay

Last updated

4 June 2025

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Quartiles & Range

What are quartiles?

Quartiles are measures of location
Quartiles divide a population or data set into four equal sections
- The lower quartile, Q₁ splits the lowest 25% from the highest 75%
- The median, Q₂ splits the lowest 50% from the highest 50%
- The upper quartile, Q₃ splits the lowest 75% from the highest 25%
There are different methods for finding quartiles
- Values obtained by hand and using technology may differ
You will be expected to use your GDC to calculate the quartiles

What are the range and interquartile range?

The range and interquartile range are both measures of dispersion
- They describe how spread out the data is
The range is the largest value of the data minus the smallest value of the data
The interquartile range is the range of the central 50% of data
- It is the upper quartile minus the lower quartile
  
  $IQR = Q_{3} - Q_{1}$
  - This is given in the formula booklet
The units for the range and interquartile range are the same as the units for the data

Worked Example

Find the range and interquartile range for the data set given below.

43 29 70 51 64 43

4-1-2-ib-ai-aa-sl-quartiles-range-we-solution

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Standard Deviation & Variance

What are the standard deviation and variance?

The standard deviation and variance are both measures of dispersion
- They describe how spread out the data is in relation to the mean
The variance is the mean of the squares of the differences between the values and the mean
- Variance is denoted σ²
The standard deviation is the square-root of the variance
- Standard deviation is denoted σ
The units for the standard deviation are the same as the units for the data
The units for the variance are the square of the units for the data

How are the standard deviation and variance calculated for ungrouped data?

In the exam you will be expected to use the statistics function on your GDC to calculate the standard deviation and the variance
Calculating the standard deviation and the variance by hand may deepen your understanding
The formula for variance is $σ^{2} = \frac{\sum_{i = 1}^{k} {f_{i} (x_{i} - μ)}^{2}}{n}$
- This can be rewritten as

$σ^{2} = \frac{\sum_{i = 1}^{k} f_{i} {x_{i}}^{2}}{n} - μ^{2}$

The formula for standard deviation is $σ = \sqrt{\frac{\sum_{i = 1}^{k} {f_{i} (x_{i} - μ)}^{2}}{n}}$
- This can be rewritten as

$σ = \sqrt{\frac{\sum_{i = 1}^{k} f_{i} {x_{i}}^{2}}{n} - μ^{2}}$

You do not need to learn these formulae as you will use your GDC to calculate these

Worked Example

Find the variance and standard deviation for the data set given below.

43 29 70 51 64 43

4-1-2-ib-ai-aa-sl-standev-variance-we-solution

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Previous:Measures of Central TendencyNext:Frequency Tables

Measures of Dispersion (DP IB Applications & Interpretation (AI)): Revision Note

Quartiles & Range

What are quartiles?

What are the range and interquartile range?

Standard Deviation & Variance

What are the standard deviation and variance?

How are the standard deviation and variance calculated for ungrouped data?

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

1. Number & Algebra

Number Toolkit

Standard Form

Laws of Indices

Introduction to Logarithms

Approximation

Upper & Lower Bounds

Percentage Error

Accuracy & Estimation

Solving Equations using a GDC

Sequences & Series

Language of Sequences & Series

Sigma Notation

Arithmetic Sequences & Series

Geometric Sequences & Series

Applications of Sequences & Series

Financial Applications

Compound Interest & Depreciation

Amortisation

Annuities

2. Functions

Linear Functions & Graphs

Equations of a Straight Line

Parallel & Perpendicular Lines

Further Functions & Graphs

Functions & Mappings

Inverse Functions

Graphing Functions & Their Key Features

Intersecting Graphs

Quadratic Functions & Graphs

Cubic Functions & Graphs

Exponential Functions & Graphs

Sinusoidal Functions & Graphs

Modelling with Functions

Linear & Piecewise Models

Quadratic Models

Cubic Models

Exponential Models

Direct & Inverse Variation

Sinusoidal Models

Strategy for Modelling Functions

3. Geometry & Trigonometry

Geometry Toolkit

Coordinate Geometry

Perpendicular Bisectors

Arcs & Sectors

Geometry of 3D Shapes

3D Coordinate Geometry

Volume & Surface Area

Trigonometry

Pythagoras & Right-Angled Trigonometry

Sine Rule, Cosine Rule & Area of a Triangle

Angles of Elevation & Depression

Bearings & Constructions

Voronoi Diagrams

Drawing Voronoi Diagrams

Interpreting Voronoi Diagrams

Toxic Waste Dump Problem

4. Statistics & Probability

Statistics Toolkit

Sampling & Data Collection

Measures of Central Tendency

Measures of Dispersion

Frequency Tables

Linear Transformations of Data

Outliers

Box & Whisker Diagrams

Cumulative Frequency Graphs

Histograms

Interpreting Data