The table is attached.
Answer:
Since P(Passed) = 0.43, and P(Passed Underclassman) = 0.43, the two results are equal so these events are independent.
Step-by-step explanation:
◙ From the table, we can see the probability of students who passed will be:
[tex] P(passed) = \frac{27}{63} = \frac{3}{7} [/tex]
Converting to decimal, we have:
P(passed) = 0.42857 ≈ 0.43
◙Probability of students who failed:
[tex] P(failed) = \frac{36}{63} = \frac{4}{7} [/tex]
Converting to decimal, we have:
P(failed) = 0.57142 ≈ 0.57
◙ P(passed upperclassman) =
[tex] \frac{12}{28} = \frac{3}{7} [/tex]
Converting to decimal, we have:
P(passed upperclassman) = 0.42857 ≈ 0.43
◙P(failed upperclassman) =
[tex] \frac{16}{28} = \frac{4}{7} [/tex]
Converting to decimal, we have:
P(failed upperclassman) = 0.5714 ≈ 0.57
◙P(passed underclassman ) [tex] = \frac{15}{35} = \frac{3}{7} [/tex]
Converting to decimal, we have:
P(passed underclassman) = 0.42857 ≈ 0.43
◙ P(failed underclassman)
[tex] = \frac{20}{35} = \frac{4}{7} [/tex]
Converting to decimal, we have:
P(failed underclassman) = 0.5714 ≈ 0.57
Since P(Passed) = 0.43, and P(Passed Underclassman) = 0.43, the two results are equal so these events are independent.
