The contrapositive method is very confusing to grasp initially – however, one student told me that she liked using it as it made her feel that she had done something clever. I think this feeling comes from the fact that the method is very indirect.

We saw in Chapter 8 that the statement ‘A ⇒ B’ is equivalent to ‘not B ⇒ not A’. The contrapositive method is the use of this equivalence. The indirectness and feeling of being clever is that in using it to prove ‘A ⇒ B’ we start with not B (and proceed to show that not A is true).

Since this idea causes a lot of confusion for beginners we shall start with some revision of Chapter 8 and show, via a different proof to the one in that chapter, that a statement and its contrapositive are equivalent. We shall then see the contrapositive in action.

Revision of the contrapositive

Definition 26.1

The contrapositive of the statement ‘A ⇒ B’ is

‘not(B) ⇒ not(A)’:

Examples 26.2