Syllabus Edition

First teaching 2021

Last exams 2024

Vectors (CIE IGCSE Maths: Core)

Revision Note

Test Yourself

Author

Jamie W

Expertise

Maths

Basic Vectors

What are vectors?

A vector is a type of number that has both a size and a direction
Here we only deal with two-dimensional vectors, although it is possible to have vectors with any number of dimensions

Representing vectors

Vectors are represented as arrows, with the arrowhead indicating the direction of the vector, and the length of the arrow indicating the vector’s magnitude (ie its size)

Vector magnitude direction, IGCSE & GCSE Maths revision notes

In print vectors are usually represented by bold letters (as with vector a in the diagram above), although in handwritten workings underlined letters are normally used, a.

Another way to indicate a vector is to write its starting and ending points with an arrow symbol over the top such as $\vec{A B}$

Vector start end point, IGCSE & GCSE Maths revision notes

Note that the order of the letters is important! Vector $\vec{B A}$ in the above diagram would point in the opposite direction (ie with its ‘tail’ at point B, and the arrowhead at point A).

Vectors and transformation geometry

In transformation geometry, translations are indicated in the form of a column vector:

Translation Vector x,y, IGCSE & GCSE Maths revision notes

In the following diagram, Shape A has been translated six squares to the right and 3 squares up to create Shape B
This transformation is indicated by the translation vector $(\begin{matrix} 6 \\ 3 \end{matrix})$ :

Matrix Xlation Vector, IGCSE & GCSE Maths revision notes

Note: ‘Vector’ is a word from Latin that means ‘carrier’
In this case, the vector ‘carries’ shape A to shape B, so that meaning makes perfect sense!

Vectors on a grid

You also need to be able to work with vectors on their own, outside of the transformation geometry context
When vectors are drawn on a grid (with or without x and y axes), the vectors can be represented in the same (x y) column vector form as above

Vectors on grid, IGCSE & GCSE Maths revision notes

$a = (\begin{matrix} 3 \\ 4 \end{matrix}), b = (\begin{matrix} 2 \\ - 4 \end{matrix}), c = (\begin{matrix} 2 \\ 0 \end{matrix})$

Multiplying a Vector by a Scalar

Multiplying a vector by a scalar

A scalar is a number with a magnitude but no direction – ie the regular numbers you are used to using
When a vector is multiplied by a positive scalar, the magnitude of the vector changes, but its direction stays the same
If the vector is represented as a column vector, then each of the numbers in the column vector gets multiplied by the scalar

Vector mult by scalar, IGCSE & GCSE Maths revision notes

$a = (\begin{matrix} 4 \\ - 2 \end{matrix}), 2 a = (\begin{matrix} 2 \times 4 \\ 2 \times - 2 \end{matrix}) = (\begin{matrix} 8 \\ - 4 \end{matrix}), \frac{1}{2} a = (\begin{matrix} 0.5 \times 4 \\ 0.5 \times - 2 \end{matrix}) = (\begin{matrix} 2 \\ - 1 \end{matrix})$

Note that multiplying by a negative scalar also changes the direction of the vector:

Vector mult by neg scalar, IGCSE & GCSE Maths revision notes

$a = (\begin{matrix} 4 \\ - 2 \end{matrix}), - a = (\begin{matrix} - 4 \\ 2 \end{matrix}), - 2 a = (\begin{matrix} - 8 \\ 4 \end{matrix})$

Note in particular that vector -a is the the same size as vector a, but points in the opposite direction!

Adding & Subtracting Vectors

Adding and subtracting vectors

Adding two vectors is defined geometrically, like this:

Vector addition no grid, IGCSE & GCSE Maths revision notes

Subtracting one vector from another is thought of as adding a negative vector

Vector subtraction no grid, IGCSE & GCSE Maths revision notes

a – b = a + (-b)

At GCSE core you need to understand how to add and subtract vectors when they are represented as column vectors
This is simply a matter of adding or subtracting the vectors’ x and y coordinates
For example, for $a = (\begin{matrix} 2 \\ - 4 \end{matrix}), b = (\begin{matrix} 3 \\ 2 \end{matrix})$
- $a + b = (\begin{matrix} 2 + 3 \\ - 4 + 2 \end{matrix}) = (\begin{matrix} 5 \\ - 2 \end{matrix})$
- $a - b = (\begin{matrix} 2 - 3 \\ - 4 - 2 \end{matrix}) = (\begin{matrix} - 1 \\ - 6 \end{matrix})$

Worked example

The points A, B and C are shown on the following coordinate grid. Question points on grid, IGCSE & GCSE Maths revision notes

(a)

Write the vectors $\vec{A B}, \vec{A C}$ and $\vec{C B}$ as column vectors.

Start by drawing the three vectors onto the grid.

Question points with vectors, IGCSE & GCSE Maths revision notes

From A to B, it is 6 to the right and 2 up.

$\vec{A B} = (\begin{matrix} 6 \\ 2 \end{matrix})$

From A to C, it is 7 to the right and 6 down.

$\vec{A C} = (\begin{array}{r} 7 \\ - 6 \end{array})$

From C to B, it is 1 to the left and 8 up.

$\vec{C B} = (\begin{array}{r} - 1 \\ 8 \end{array})$

(b)

Using the column vectors from (a), confirm that $\vec{A B} - \vec{A C} = \vec{C B}$ .

Just perform the subtraction on the column vectors.

$\vec{A B} - \vec{A C} = (\begin{matrix} 6 \\ 2 \end{matrix}) - (\begin{array}{r} 7 \\ - 6 \end{array}) = (\begin{matrix} 6 - 7 \\ 2 - (- 6) \end{matrix}) = (\begin{array}{r} - 1 \\ 8 \end{array}) = \vec{C B}$

$\vec{A B} - \vec{A C} = \vec{C B}$

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