IB Maths AI 3.8 Notes

This page contains our IB Maths AI notes for 3.8. By reading each one of these notes, you will fully cover the content for IB Maths AI 'Geometric transformations'.

All Topic 3 Sub-topics 3.1: Fundamentals Of Geometry 3.2: Introduction To Trigonometry 3.3: Applied Trigonometry 3.4: Circles 3.5: Perpendicular Bisectors 3.6: Voronoi Diagrams (HL)3.7: Unit circle (HL)3.8: Geometric transformations (HL)3.9: Vectors (HL)3.10: Vector lines (HL)3.11: Graph theory (HL)3.12: Adjacency matrices (HL)3.13: Algorithms & problems

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Chapters

1. Geometric transformations

2. Standard matrix transformations

3. Composite transformations

4. Determinant & area

5. Fractal link

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Geometric transformations

In this section, we study how matrices can be used to transform points in two dimensions. A transformation changes the position, orientation, or size of an object. Using matrices allows these changes to be described clearly and efficiently.

A point $(x,y)$ can be written as the column vector $\begin{pmatrix}x\\y\end{pmatrix}$ . A matrix transformation acts on this vector to produce a new image point.

In general, a transformation can be written as:

$\begin{pmatrix}x'\\y'\end{pmatrix}=A\begin{pmatrix}x\\y\end{pmatrix}+\begin{pmatrix}e\\f\end{pmatrix}$

where $A$ is a $2\times2$ matrix and $\begin{pmatrix}e\\f\end{pmatrix}$ is a translation vector.

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