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It belongs to any set that contains it:

The set of numbers between 3 and 4,

The set containing only the number 3.1414 repeating,

The set containing 1, 3.1414 (r) , and sqrt(37)

The set of rational numbers,

The set of real numbers,

etc

Q: What sets does 3.1414 repeating Belong to?

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The overlapping sections show elements that belong to each of the two (or maybe three) sets that overlap there.The overlapping sections show elements that belong to each of the two (or maybe three) sets that overlap there.The overlapping sections show elements that belong to each of the two (or maybe three) sets that overlap there.The overlapping sections show elements that belong to each of the two (or maybe three) sets that overlap there.

1.18 is a number and number do not contain any sets (of any kind).

Elements can belong to subsets. Subsets can be elements of sets that are called "power sets".

The difference of two sets A and B , to be denoted by A-B, is the set of all those elements which belong to A but not to B

The intersection of two sets S and T is the set of all elements that belong to both S and T.

Related questions

Yes, it can be written as the fraction 31414/10000 (which can be simplified)

The union of sets X and Y is the set consisting of all elements that belong to X, or belong to Y or to both.The union of sets X and Y is the set consisting of all elements that belong to X, or belong to Y or to both.The union of sets X and Y is the set consisting of all elements that belong to X, or belong to Y or to both.The union of sets X and Y is the set consisting of all elements that belong to X, or belong to Y or to both.

Rational numbers

The overlapping sections show elements that belong to each of the two (or maybe three) sets that overlap there.The overlapping sections show elements that belong to each of the two (or maybe three) sets that overlap there.The overlapping sections show elements that belong to each of the two (or maybe three) sets that overlap there.The overlapping sections show elements that belong to each of the two (or maybe three) sets that overlap there.

1.18 is a number and number do not contain any sets (of any kind).

Polysaccharides belong to the functional group of carbohydrates, which are composed of repeating units of monosaccharides linked together by glycosidic bonds.

17 belongs to the set of prime numbers

Elements can belong to subsets. Subsets can be elements of sets that are called "power sets".

The difference of two sets A and B , to be denoted by A-B, is the set of all those elements which belong to A but not to B

The intersection of sets A and B.

The address of the Bonaventure Historical Society Inc is: Po Box 5954, Savannah, GA 31414-5954

The intersection of two sets S and T is the set of all elements that belong to both S and T.