We have seen how we can prove statements using direct reasoning in the form of proofs. We can also disprove statements that are invalid by providing a counterexample.

Counterexamples are helpful because proving that a statement is true requires a formal proof while proving that it is false only requires one example where the given statement does not hold true.

We can use the following steps to identify a counterexample:

1. Identify the condition and conclusion of the statement
2. Generate options that satisfy the condition
3. Of those options, any for which the conclusion is false will be a counterexample

We can prove theorems and other deductions indirectly. When we do this, it is referred to as an indirect proof. For mathematical proofs, there are two types of indirect proofs:

A contradiction occurs when two different pieces of information that are assumed to be true, cannot be true at the same time.

Proof by contradiction in steps with symbols:

1. Assume p and \sim q are true.
2. Show that assuming \sim q is true leads to a contradiction.
3. Conclude that q is true.

Worked examples