Answer :
Answer:
The service level for each component must be 97.91%
Explanation:
If we want a 90% confidence of starting on time, that means we need
[tex]P_{\mbox{starting on time}}=P_{\mbox{every component being ready on time}}=0.9\\[/tex]
As the probability of each component being ready is independent from the others, that means that the probability of the 5 components being ready is equal to multiply each probability:
[tex]0.9=P_{\mbox{component 1 ready on time} } * P_{\mbox{component 2 ready on time} } *\\ P_{\mbox{component 3 ready on time} } * P_{\mbox{component 4 ready on time} } *\\P_{\mbox{component 5 ready on time} }[/tex]
The probability of being ready on time is equal to the service level (in fraction), and all 5 are equal so we can say:
[tex]0.9=(\mbox{service level(in fraction)})^5\\\\\sqrt[5]{0.9} =\mbox{service level(in fraction)}=0.9791\\\mbox{In percentage}: \mbox{service level (in fraction)}*100 = 97.91\%[/tex]