Let V be the event that a computer contains a virus, and let W be the event that a computer contains a worm. Suppose P(V) = 0.17 , P(W) = 0.05 , and P(V and W) = 0.04 . What is the probability that the computer contains neither a virus nor a worm?

The probability of the computer not containing neither a virus nor a worm is expressed as P([tex]V^{C}[/tex]∩[tex]W^{C}[/tex]) , where P([tex]V^{C}[/tex]) is the probability that the event V doesn't happen and P([tex]W^{C}[/tex]) is the probability that the event W doesn't happen.

P([tex]V^{C}[/tex])= 1-P(V) = 1-0.17 = 0.83

P([tex]W^{C}[/tex])=1-P(W) = 1-0.05 = 0.95

Since [tex]V^{C}[/tex] and [tex]W^{C}[/tex] aren't mutually exclusive events, then:

P([tex]V^{C}[/tex]∪[tex]W^{C}[/tex]) = P([tex]V^{C}[/tex]) + P([tex]W^{C}[/tex]) - P([tex]V^{C}[/tex]∩[tex]W^{C}[/tex])

Isolating the probability that interests us:

P([tex]V^{C}[/tex]∩[tex]W^{C}[/tex])= P([tex]V^{C}[/tex]) + P([tex]W^{C}[/tex]) - P([tex]V^{C}[/tex]∪[tex]W^{C}[/tex])

Where P([tex]V^{C}[/tex]∪[tex]W^{C}[/tex]) = 1 - 0.04 = 0.96

Finally:

P([tex]V^{C}[/tex]∩[tex]W^{C}[/tex]) = 0.83 + 0.95 - 0.96 = 0.82