Set Theory Simplified (w/ Clear Explanations)

Dive into Set Theory—Empower your discrete math skills—Tackle complex problems with confidence

Sets

1 hr 28 min 23 Examples

Overview of Set Notation, Roster Method and Set-builder notation
Determine if the sets are equal, equivalent, both or neither (Examples #1-4)
Write each set using either roster method or set builder notation (Examples #5-10)
Overview of Universal Set, Empty Set, Subset and Proper Subset
Are the pair of sets equal? (Examples #11-17)
Determine which are subsets (Examples #18-19)
True/False for elements, subsets and proper subsets (Example #20a-l)
Intro to Cardinality and Power Sets
What is the cardinal number of each set? (Example #21a-f)
Find the power set and determine its cardinality (Example #22a-c)
Explanation of n-tuple and Cartesian Product
Discover the cartesian product (Example #23a-f)

1 hr 34 min 9 Examples

Overview of Union, Intersection, Disjoint, Pairwise Disjoint, Complement, Difference of Sets, and Symmetric Difference
Explanation of the Principle of Inclusion-Exclusion
Draw a Venn diagram and perform the set operations (Example #1a-g)
Create a Venn diagram and use PIE to draw conclusions (Example #2a-c)
Shade the correct solution in a Venn Diagram (Example #3a-h)
Representing sets as bit strings (Examples #4a-g)
How to Partition a set (Examples #5-6)
Minset Defined (Examples #7-9)

1 hr 39 min 14 Examples

38 min 15 Practice Problems