Answer:
Let X be the number of customer purchased coffee
Let Y be the number of customer purchased donuts
Then [tex]X\cap Y[/tex] is the number of customer purchased both coffee and donuts
[tex]X\cup Y[/tex] is the number of customer purchased both coffee or donuts
The Number of customers purchased only Coffee:
Number of customers purchased only donuts =n(X -Y)
[tex]n( X -Y) = n(X) - n(X \cap Y)[/tex]
n(X-Y) = 59 -16
n(Y - X) = 43
The Number of customers purchased only donuts:
Number of customers purchased only donuts =n(Y -X)
[tex]n(Y - X) = n(Y) - n(X \cap Y)[/tex]
n(Y - X) = 39 -16
n(Y - X) = 23
The Number of customers did not purchase either of these items:
Number of customers did not purchase either of these items = [tex]n(X\cup Y)^{\prime}[/tex]
First lets find [tex]n(X\cup Y)[/tex]
[tex]n(X\cup Y) = n(X) + n(Y) - n( X \cap Y)[/tex]
[tex]n(X\cup Y) = 59 + 39 - 16[/tex]
[tex]n(X\cup Y) = 82[/tex]
[tex]n(X\cup Y)^{\prime}[/tex] =[tex]110 - n(X\cup Y)[/tex] = 28
