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For this case we have that there are a total of 14 male students and a total of 16 female students. Thus, there is a total of 30 students distributed in the four categories.

On the other hand, we have a total of 8 Junior students.

Then, the probability of selecting a student Junior is [tex]\frac {8} {30} * 100 = 26.67[/tex]

Rounding off we have 27%

Answer:

27%

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abidemiokin abidemiokin · Answer 2 · 2021-09-10T18:05:53+02:00

The probability that the student is junior to the nearest whole percent is 27%

Probability is defined as the likelihood or chance that an event will occur.

Probability = Expected outcome/Total outcome

The total outcome will be the total number of students (both male and female)

Total outcome = 4+6+2+2+3+4+6+3

Total outcome = 30

Since we are to find the probability that the student is a junior.

Total Juniors = 2 + 6 = 8

Expected outcome = 8

Probability that the student is junior = 8/30

Express as a percentage:

[tex]Pr(Juniors)=\dfrac{8}{30} \times 100\%\\ Pr(Juniors)=\dfrac{800}{30}\\ Pr(Juniors)=26.66\%\\[/tex]

Hence the probability that the student is a junior is 27%.

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