Elementary Properties of Probability Measure

Theorem
Let $\mathcal E$ be an experiment with probability space $\left({\Omega, \Sigma, \Pr}\right)$.

The probability measure $\Pr$ of $\mathcal E$ has the following properties:

Probability of Empty Event is Zero

 * $(2): \quad \forall A \in \Sigma: \Pr \left({\complement_\Omega \left({A}\right)}\right) = 1 - \Pr \left({A}\right)$

where $\complement_\Omega \left({A}\right)$ denotes the complement of $A$ relative to $\Omega$


 * $(3): \quad \forall A \in \Sigma: \Pr \left({A}\right) \le 1$.

Proof
From the conditions for $\Pr$ to be a probability measure, we have:


 * $(1): \quad \forall A \in \Sigma: 0 \le \Pr \left({A}\right)$


 * $(2): \quad \Pr \left({\Omega}\right) = 1$


 * $(3): \quad \displaystyle \Pr \left({\bigcup_{i \ge 1} A_i}\right) = \sum_{i \ge 1} \Pr \left({A_i}\right)$ where all $A_i$ are pairwise disjoint.

$(2)$: Probability of Non-Occurence of Event
Let $A \in \Sigma$ be an event.

Then $\complement_\Omega \left({A}\right) \in \Sigma$ from the definition of event space.

From Intersection with Relative Complement, we have that $A \cap \complement_\Omega \left({A}\right) = \varnothing$.

From Union with Relative Complement, we have that $A \cup \complement_\Omega \left({A}\right) = \Omega$.

So $\Pr \left({A}\right) + \Pr \left({\complement_\Omega \left({A}\right)}\right) = 1$ from above, and so $\Pr \left({\complement_\Omega \left({A}\right)}\right) = 1 - \Pr \left({A}\right)$.

$(3)$: Probabilty Not Greater than One
From the above: $\Pr \left({A}\right) + \Pr \left({\complement_\Omega \left({A}\right)}\right) = 1$.

We have that $0 \le \Pr \left({\complement_\Omega \left({A}\right)}\right)$, hence:
 * $\forall A \in \Sigma: \Pr \left({A}\right) \le 1$