1.4 KiB
1.4 KiB
Page 411$a
Test Yourself
- The notation
A \subseteq Bis read "_____" and means that _____.
The set A is a subset of the set B; if x \in A then x \in B
- To use an element argument for proving that a set
Xis a subset of a setY, you suppose that _____ and show that _____.
x is a particular but arbitrarily chosen element of X; x is an element of
Y.
- To disprove that a set
Xis a subset of a setY, you show that there is _____.
an element in X that is not in Y.
- An element
xis inA \cup Bif, and only if, _____.
x is in either A or B.
- An element
xis inA \cap Bif, and only if, _____.
x is in both A and B.
- An element
xis inB - Aif, and only if, _____.
x is in B but not in A.
- An element
xis inA^cif, and only if, _____.
x is in the universal set and is not in A.
- The empty set is a set with _____.
no elements.
- The power set of a set
Ais _____.
the set of all subsets of A.
- Sets
AandBare disjoint if, and only if, _____.
they have no elements in common, or A \cap B = \emptyset.
- A collection of nonempty sets
A_1, A_2, A_3, \dotsis a partition of a setAif, and only if, _____.
all A_i are a subset of A, but are also disjoint.
A is the union of all the sets A_1, A_2, A_3, \dots and
A_i \cap A_j = \emptyset whenever i \neq j.