Answer:
[tex] P(A \cup B) = \frac{5}{73} +\frac{21}{73} -\frac{1}{73}=\frac{25}{73}[/tex]
Step-by-step explanation:
Let A and B events. We have defined the probabilities for some events:
[tex] P(A') =\frac{68}{73} , P(B) =\frac{21}{73} , P(A \cap B) =\frac{1}{73}[/tex]
Where A' represent the complement for the event A
The complement rule is a theorem that provides a connection between the probability of an event and the probability of the complement of the event. Lat A the event of interest and A' the complement. The rule is defined by: [tex]P(A)+P(A') =1[/tex]
So for this case we can solve for P(A) like this:
[tex] P(A) = 1-P(A') = 1-\frac{68}{73}=\frac{5}{73}[/tex]
And now we can find [tex] P(A \cup B)[/tex] using the total probability rul given by:
[tex] P(A \cup B) = P(A)+P(B) -P(A \cap B)[/tex]
And if we replace the values given we got:
[tex] P(A \cup B) = \frac{5}{73} +\frac{21}{73} -\frac{1}{73}=\frac{25}{73}[/tex]
And that would be the final answer.
