#8A
Scalar and vector quantities
Vectors will be in two dimensions only
#8B
Understand and use vector notation
The notations \(\overrightarrow{OA}\) and \(\bold{a}\) will be used, as will column vectors
#8C
Representation of a vector by a directed line segment
#8D
Parallel vectors, unit vectors and position vectors
#8E
Sum and difference of two vectors
#8F
Modulus (magnitude) of a vector
#8G
Multiplication of a vector by a scalar
#8H
Find the resultant of two or more vectors
#8I
Apply vector methods to simple geometrical problems
The problems may involve colinearity, parallel lines and concurrency
#8J
Transformations of the plane
Reflections in any line
Rotations about any point
Translations
Enlargements
#8K
Combination of transformations
#8L
Multiplication of a vector by a matrix
To include the finding of a matrix for a given transformation of the plane, using
\(\begin{pmatrix} 1 \\ 0 \end{pmatrix}\) and \(\begin{pmatrix} 0 \\ 1 \end{pmatrix}\)
These transformations will be those for which the origin is unchanged