Looking through the notes, the following sections were not fully covered. Here is a statement about their status for the exam. If you have any further questions with this regard, please, use the forum.

    1.2 We do not care about the axioms for the field of scalars. The whole exam will be over real numbers.
    2.2.2 The proof of the dimension formula was skipped, making it non-examinable. The formula itself is useful and could be asked.
    2.3.2 Matrix operations are useful and required but the proofs in this sections were discussed too briefly to be examinable.
    3.2.4 You should know that orthonormal bases exist but Gram-Schmidt process is not examinable.
    3.4 I expect you to move freely between matrices and linear maps but the proofs in this section are not examinable.
    4.1.3 Commutative squares are useful for visualising linear algebra phenomena but they will not appear on the exam.
    5.2.5 The proof was not given, making it non-examinable.
    6.3.4 The proofs were given in class but they are not in the notes. Hence, the proofs are not examinable.
    7.2 I can ask you to find the volume of a parallelepiped in dimensions 2 and 3 but I see no way of asking a fair well-posed question on the theory surrounding the geometric properties of the determinant. 
    8.2.1 We have not touched Lucas numbers, so I cannot ask you what they are. Yet telling you what they are and asking to find a formula for them would be a fair question.
    8.2.2 The section is not examinable in its entirety. 
    8.2.3 The section is not examinable in its entirety but knowing similarity classes of 2×2

    -matrices could be useful in other problems.
    9.2 The section is not examinable in its entirety.