Rational number Guide, Meaning , Facts, Information and Description
In mathematics, a rational number (or informally fraction) is a ratio of two integers, usually written as the vulgar fraction a/b, where b is not zero. The set of all rational numbers is denoted by Q, or in blackboard bold . Using the set-builder notation is defined as such:
The decimal expansion of a rational number is eventually periodic (in the case of a finite expansion the zeroes which implicitly follow it form the periodic part). The same is true for any other integral base above 1. Conversely, if the expansion of a number for one base is periodic, it is periodic for all bases and the number is rational.
A real number that is not rational is called an irrational number.
In mathematics, the term "rational something" means that the underlying field considered is the field of rational numbers. For example, rational polynomials or rational prime ideals.
| Table of contents |
|
2 History 3 Formal construction 4 Properties 5 Real numbers 6 p-adic numbers |
Two rational numbers and are equal iff
Additive and multiplicative inverses exist in the rational numbers.
For instance,
For any positive rational number, there are infinitely many different such representations. These representations are called Egyptian fractions, because the ancient Egyptians used them. The hieroglyph used for this is the letter that looks like a mouth, which is transliterated R, so the above fraction would be written as R2R6R21. The Egyptians also had a different notation for dyadic fractions.
Arithmetic
Addition and multiplication of rational numbers are as follows:
History
Egyptian fractions
Any positive rational number can be expressed as a sum of distinct reciprocals of positive integers. Formal construction
Mathematically we may define them as an ordered pair of integers , with not equal to zero. We can define addition and multiplication of these pairs with the following rules:
To conform to our expectation that , we define an equivalence relation upon these pairs with the following rule:
We can also define a total order on Q by writing
Properties
The set , together with the addition and multiplication operations shown above, forms a field, the quotient field of the integers .The rationals are the smallest field with characteristic 0: every other field of characteristic 0 contains a copy of .
The algebraic closure of , i.e. the field of roots of rational polynomials, is the algebraic numbers.
The set of all rational numbers is countable. Since the set of all real numbers is uncountable, we say that almost all real numbers are irrational, in the sense of Lebesgue measure.
The rationals are a densely ordered set: between any two rationals, there sits another one, in fact infinitely many other ones.
Real numbers
The rationals are a dense subset of the real numbers: every real number has rational numbers arbitrarily close to it. A related property is that rational numbers are the only numbers with finite expressions of continued fraction.
By virtue of their order, the rationals carry an order topology. The rational numbers are a (dense) subset of the real numbers, and as such they also carry a subspace topology. The rational numbers form a metric space by using the metric , and this yields a third topology on . Fortunately, all three topologies coincide and turn the rationals into a topological field. The rational numbers are an important example of a space which is not locally compact. The space is also totally disconnected. The rational numbers do not form a complete metric space; the real numbers are the completion of .
let be a prime number and for any non-zero integer let , where is the highest power of dividing ;
in addition write . For any rational number , we set .
Then defines a metric on .
The metric space is not complete, and its completion is the p-adic number field .
This is an Article on Rational number. Page Contains Information, Facts Details or Explanation Guide About Rational number p-adic numbers
In addition to the absolute value metric mentioned above, there are other metrics which turn into a topological field: