Express the following in set-builder notation: a)The set A of natural numbers divisible by 3. b)The set B of pairs (a,b) of real numbers such that a + b is an integer. c)The open interval C = (—2,2). d)The set D of 20 element subsets of N.

Tabansi

Tabansi

Answered question

2021-08-02

Express the following in set-builder notation:
a)The set A of natural numbers divisible by 3.
b)The set B of pairs (a,b) of real numbers such that a + b is an integer.
c)The open interval C = (—2,2).
d)The set D of 20 element subsets of N.

Answer & Explanation

jlo2niT

jlo2niT

Skilled2021-08-03Added 96 answers

(a) A number is divisible by 3 if it is a multiple of 3. Every element of A will be of the form 3n.
The set-builder notation of A is A={3n:nN}


(b) Set B is the set of all pairs (a,b) of real numbers, a+b is an integer. Every element of B will be of the form (a,b) where a,bR and a+bZ
The set-builder notation of B is B={(a,b):a,bR and a+bZ}


(c) =C is the open interval (−2,2).  Every element of the open interval (−2,2) is a real number such that it lies between -2 and 2 and never equal to -2 or 2. The set-builder notation of C is C={x:xR  and −2 < x < 2}. 


(d) Set D is the set of all 20 element subsets of N. Every element of D is a subset of N and the cardinality of each set in D is 20. The set-builder notation of D is D={X:XN and |X|=20}

RizerMix

RizerMix

Expert2023-06-15Added 656 answers

Step 1:
a) The set A of natural numbers divisible by 3 can be expressed in set-builder notation as follows:
A={xx is divisible by 3}
This notation indicates that A is the set of natural numbers (denoted by ) such that each element, denoted as x, satisfies the condition of being divisible by 3.
Step 2:
b) The set B of pairs (a,b) of real numbers such that a + b is an integer can be expressed in set-builder notation as follows:
B={(a,b)×a+b is an integer}
In this notation, B represents the set of ordered pairs (a, b) where a and b are real numbers (denoted by ), and their sum, a + b, is an integer.
Step 3:
c) The open interval C = (-2,2) can be expressed in set-builder notation as follows:
C={x2<x<2}
Here, C represents the set of real numbers (denoted by ) that lie strictly between -2 and 2. The use of the less than and greater than symbols indicates that the interval is open and does not include the endpoints -2 and 2.
Step 4:
d) The set D of 20-element subsets of N can be expressed in set-builder notation as follows:
D={S|S|=20}
In this notation, D represents the set of subsets (denoted by ) of the natural numbers (denoted by ) such that the cardinality (the number of elements) of each subset, denoted by |S|, is equal to 20.
Vasquez

Vasquez

Expert2023-06-15Added 669 answers

a) The set A of natural numbers divisible by 3 can be expressed in set-builder notation as:
A={xx is divisible by 3}
b) The set B of pairs (a,b) of real numbers such that a + b is an integer can be expressed in set-builder notation as:
B={(a,b)×a+b is an integer}
c) The open interval C = (-2,2) can be expressed in set-builder notation as:
C={x2<x<2}
d) The set D of 20-element subsets of N can be expressed in set-builder notation as:
D={S|S|=20}
Here, represents the set of natural numbers, represents the set of real numbers, and |S| represents the cardinality of set S.

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