Introduction to Venn Diagrams
NAME: _____________________
1. Determine what regions make up the given probabilities – shade the Venn Diagram.
P(A) = ___________
P(B) = ___________
P(Ac) = ___________
P(Not A)
P(Bc) = ___________
P(Not B)
P(A or B) = ___________
P(Union)
P(A and B) = ___________
P(Intersection)
P(A or B)c = ___________
P(Not the Union)
P(A and B)c = ___________
P(Not the Intersection)
P(A and Bc) = ___________
P(A and Not B)
P(B and Ac) = ___________
P(B and Not A)
P(A or Bc) = ___________
P(A or Not B)
P(B or Ac) = ___________
P(B or Not A)
P(A or Ac) = ___________
P(A or Not A)
P(B or Bc) = ___________
P(B or Not B)
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HSS-CP.A.1 ACTIVITY #3 – PATTERSON
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2. Determine the number of students that fit the given description and then shade the Venn diagram.
a) Number of students in
Chemistry.
_________
b) Number of students in Physics.
c) Number of students Not in
Chemistry.
d) Number of students in both
Chemistry and Physics.
_________
e) Number of students Not in
Chemistry and Not in Physics.
_________
_________
f) Number of students in total.
_________
_________
g) Number of students in Physics
and Not in Chemistry.
h) Number of students Not taking
both classes.
_________
_________
i) Number of students only taking
Chemistry.
_________
j) Number of students in
Chemistry and Not in Physics.
_________
3. Determine what regions make up the given
probabilities – shade the Venn Diagram.
P(A) = _______________________
P(C) = _______________________
P(A)c = ______________________
P(Not A)
P(B)c = ______________________
P(Not B)
P(A or B) = ___________________
P(Union)
P(A or B or C) = _______________
P(Union)
P(A and B) = __________________
P(Intersection)
P(B and C) = _________________
P(Intersection)
HSS-CP.A.1 ACTIVITY #3 – PATTERSON
P(A and B and C) = _____________
P(Intersection)
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P((A or B or C)c = ______________
P(Not Union)