Math 1100 2.2 Homework

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For the given​ set, first calculate the number of subsets for the​ set, then calculate the number of proper subsets. ​{ 1​, 5​, 3​, 15 ​} The number of subsets is The number of proper subsets is

16 15

The number of subsets of a set with n elements is​ _______.

2^n

The number of distinct proper subsets of a set with n elements is _______.

2^n-1

Calculate the number of subsets and the number of proper subsets for the given set. ​{ x​ | x ∈ N and 4<x<10 ​} number of subsets number of proper subsets

32 31

Calculate the number of subsets and proper subsets for the following set. ​{x | x is a side of a hexagon​} The number of subsets is The number of proper subsets is

64 63

The statement ∅⊆B tells us that ______ is a ______ of every set.

the empty set subset

Determine whether the given statement is true or false. ​{9​}∈{ ​{9​}, ​{16​} ​}

true

Determine whether the following statement is true or false. ​{Malaysia​}⊆​{Malaysia, Philippines, Indonesia, Micronesia​} The statement is______ because the symbol ⊆ means _______ and ​"{Malaysia​}" is ______the given set.

true "is a subset of" a subset of

Determine whether the following statement is true or false. Bart∈​{Homer, Marge, Bart, Lisa​} The statement is ______ because the symbol ∈ means ______ and ​"Bart​" is _____ the given set.

true "is an element of" an element of

List all the subsets of the given set. {blackberry, strawberry, fig}

A. {}, ​{blackberry​}, ​{strawberry​}, ​{fig​}, ​{blackberry​, strawberry​}, ​{blackberry​, fig​}, {strawberry​,fig​}, {blackberry strawberry​, fig​}

Set A is a proper subset of set​ B, expressed as ______ , means that set A is a subset of set B and _____.

A⊂B sets A and B are not equal

Fill in the blank so that the resulting statement is true. Set A is a subset of set​ B, expressed as​ _______, means that​ _______. A. Set A is a subset of set​ B, expressed as A⊂​B, means that every element in set A is also an element in set B and sets A and B are not equal ​(A≠​B). B. Set A is a subset of set​ B, expressed as A⊆​B, means that every element in set A is also an element in set B. C. Set A is a subset of set​ B, expressed as A⊂​B, means that every element in set A is also an element in set B. D. Set A is a subset of set​ B, expressed as A⊆​B, means that every element in set A is also an element in set B and sets A and B are not equal ​(A≠​B).

B. Set A is a subset of set​ B, expressed as A⊆​B, means that every element in set A is also an element in set B.

Determine whether ⊆​, ⊂​, ​both, or neither can be placed in the blank to make the statement true. ​{x x∈N and 5<x< 9​} ​ ___ The set of all natural numbers between 5 and 9 A. only ⊂ B. only ⊆ C. both ⊆ ​& ⊂ D. None of the above

B. only ⊆

List all the subsets of the given set. {b, r, w}

B.{}, ​{b​}, ​{r​}, ​{w​}, ​{b​, r​}, ​{b​, w​}, ​{r​, w​}, ​{b​, r​, w​}

Determine whether ⊆​, ⊂​, ​both, or neither can be placed in the blank to make the statement true. ​{x x∈N and 5<x< 10​}______ ​{x x∈N and 3≤x≤ 9​}. A. only ⊂ B. only ⊆ C. both ⊆ ​& ⊂ D. None of the above

C. both ⊆ ​& ⊂

Insert ⊆ or ⊈ so that the resulting statement is true. ∅​___{w, x, y, z​}

Select ⊆ or ⊈ for the blank so that the resulting statement is true. ​{ 4​, 3​, 6 ​} ___​ { ​1, 2,​ ..., 7 ​}

Write ⊆ or ⊈ in each blank so that the resulting statement is true. ∅​_______{1,2,3,4,...​}

Select ⊆ or ⊈ for the blank so that the resulting statement is true. ​{ −5​, ​0, 5 ​} ___​ { −5​, −3​, 3​, 5 ​}

Write ⊆ or ⊈ in each blank so that the resulting statement is true. ​{x|x is a dog​}_______{x|x is a white dog​}


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