Answer:
The two-way frequency table is shown below.
Step-by-step explanation:
Romain took a total of <em>N</em> = 32 classes in high school.
Denote the events as follows:
<em>X</em> = Romain studied for a class
<em>Y</em> = Romain did not studied for a class
<em>A </em>= Romain passed the class
<em>B</em> = Romain did not pass the class
The information provided is:
n (X ∩ B) = 3
n (A) = 27
n (X) = 26
Compute the number of classes Romain did not pass as follows:
n (B) = N - n (A)
= 32 - 27
= 5
Compute the number of classes Romain did not study for as follows:
n (Y) = N - n (X)
= 32 - 26
= 6
Compute the number of classes Romain did not study for and did not pass as follows:
n (Y ∩ B) = n (B) - n (X ∩ B)
= 5 - 3
= 2
Compute the number of classes Romain did not study for but passed as follows:
n (Y ∩ A) = n (Y) - n (Y ∩ B)
= 6 - 2
= 4
Compute the number of classes Romain did study for and passed as follows:
n (X ∩ A) = n (A) - n (X ∩ A)
= 27 - 4
= 23
The two-way frequency table is as follows:
Studied (X) Did not Studied (Y) Total
Passed (A): 23 4 27
Did not Passed (B): 3 2 6
Total: 26 6 32
