Probability - Set Operations - Intro
23 Topics, 3 Skills
Probability Union, Intersection, Complement - Name to Description
Topic 1
Probability Union, Intersection, Complement - Name to Set Operation
Topic 2
Probability Union, Intersection, Complement - Name to Venn Diagram
Topic 3
Probability Union, Intersection, Complement - Description to Set Operation
Topic 4
Probability Union, Intersection, Complement - Description to Name
Topic 5
Probability Union, Intersection, Complement - Description to Venn Diagram
Topic 6
Probability Union, Intersection, Complement - Venn Diagram to Set Operation
Topic 7
Probability Union, Intersection, Complement - Venn Diagram to Name
Topic 8
Probability Union, Intersection, Complement - Venn Diagram to Description
Topic 9
Probability Union, Intersection, Complement - Set Operation to Name
Topic 10
Probability Union, Intersection, Complement - Set Operation to Description
Topic 11
Probability Union, Intersection, Complement - Set Operation to Venn Diagram
Topic 12
Probability Union, Intersection, Complement - Name to Formula
Topic 13
Probability Union, Intersection, Complement - Description to Formula
Topic 14
Probability Union, Intersection, Complement - Venn Diagram to Formula
Topic 15
Probability Union, Intersection, Complement - Set Operation to Formula
Topic 16
Probability Union, Intersection, Complement - Formula to Set Operation
Topic 17
Probability Union, Intersection, Complement - Formula to Name
Topic 18
Probability Union, Intersection, Complement - Formula to Description
Topic 19
Probability Union, Intersection, Complement - Formula to Venn Diagram
Topic 20
Probability Union, Intersection, Complement - Example Problem to Name
Topic 21
Probability Union, Intersection, Complement - Example Problem to Set Operation
Topic 22
Probability Union, Intersection, Complement - Example Problem to Formula
Topic 23
This math topic explores basic probability concepts, focusing on the union, intersection, and complement of events. Specifically, it comprises exercises regarding selecting appropriate formulas for cases like both events occurring, either event occurring, or an event not occurring. Problems involve understanding and applying formulas such as \( P(A \cup B) = P(A) + P(B) - P(A \cap B) \) for the union of two events, \( P(A \cap B) \) for the intersection, and \( P(A^c) = 1 - P(A) \) for the complement. It helps beginners grasp how to translate descriptions of probability events into mathematical expressions.
Work on practice problems directly here, or download the printable pdf worksheet to practice offline.
moreComplete these online problems with 80% or 4 correct answers in a row. Results are immediate.
Select the formula to calculate the probability operation being described
Event A not happening
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