Answer:
0.6545
Step-by-step explanation:
Let [tex]P(T)[/tex] be probability of being on time and [tex]P(S)[/tex] the probability of being satisfactory. We have conditional probability here since being satisfactory depends on being on time. Conditional probability states
[tex]P(S|T) =\frac{P(S\cap T)}{P(T)}[/tex]
where
[tex]P(S|T)[/tex] is the probability of [tex]S[/tex] given that [tex]T[/tex] has occurred;
[tex]P(S\cap T)[/tex] is the probability of [tex]S[/tex] and [tex]T[/tex].
Rearranging, we have
[tex]P(S\cap T)=P(S|T)\times P(T)[/tex]
[tex]P(S\cap T)=0.85\times0.77=0.6545[/tex]
