Answer:
The probabability is [tex]\frac{85}{100} =0.850[/tex]
Step-by-step explanation:
We are going to suppose that each score has the same probability.
For example :
[tex]P(66) = P(89)[/tex]
Where P(66) is the probability of score a 66 and P(89) is the probability of score an 89
If A is a certain score :
[tex]P(A) = \frac{CasesWhereAOccurs}{Total Cases}[/tex]
In the exercise :
[tex]P(1) = P(2)=...=P(100)=\frac{1}{100} =0.01[/tex]
Bart must score higher than an 85 on the final exam.
We are looking for the probability of the event : ''Bart obtains a 1 or a 2 or ... or a 85''
This can be written in terms of events as :
P(1∪2∪...∪85) = P(1) + P(2) + ... + P(85)
As we consider each event as independent
[tex]P(1) + P(2) + ... + P(85) =\frac{1}{100} +\frac{1}{100} +...+\frac{1}{100} =(85).\frac{1}{100} \\P(Not Score Higher Than An 85)=\frac{85}{100}[/tex]
