Answer:
The probability of at least one person will catch the flu is 0.5952
Step-by-step explanation:
To find the probability of al least one catches the flu, we need to find the difference between 1 and the probability of not catching the flu.
The probability of catching the flu varies if the person is inoculated or not.
Let the events be:
E: the person was exposed
F: the person catches the flu
Hence, it is attached a tree diagram of the sample space. According to the diagram:
Inoculated person:
P(F')= 0.6×0.8 + 0.4×1 = 0.88 (We choose the second and the fourth way)
Not inoculated person:
P(F')= 0.6×0.1 + 0.4×1= 0.46 (We choose the second and the fourth way)
Let the events be:
[tex]F_{Inoculated}[/tex]= the person is inoculated and catches the flu
[tex]F_{Not inoculated}[/tex]=the person is not inoculated and catches the flu
Using complementary events, DeMorgan’s Laws, and independence we have:
P([tex]F_{Inoculated}[/tex]∪[tex]F_{Not inoculated}[/tex])=1-P([tex]F_{Inoculated}[/tex]∪[tex]F_{Not inoculated}[/tex])'
=1 - P([tex]F'_{Inoculated}[/tex]∩[tex]F'_{Not inoculated}[/tex])
=1 - P([tex]F'_{Inoculated}[/tex])×P([tex]F'_{Not inoculated}[/tex])
=1 - (0.88)×(0.46)
=1 - 0.4048
=0.5952
The probability of at least one will catch the flu for a randomly selected person is 0.5952
