Definition:Elementary Event

Context
Probability Theory.

Definition
Let $$\mathcal E$$ be an experiment.

An elementary event of $$\mathcal E$$, often denoted $$\omega$$ (Greek lowercase omega) is one of the elements of the sample space $$\Omega$$ (Greek capital omega) of $$\mathcal E$$.

Outcome
An elementary event is one of the possible outcomes of $$\mathcal E$$.

Thus an outcome means the same thing as elementary event.