An irreducible fraction (or fraction in lowest terms, simplest form or reduced fraction) is a fraction in which the numerator and denominator are integers that have no other common divisors than 1 (and −1, when negative numbers are considered).[1] In other words, a fraction a/b is irreducible if and only if a and b are coprime, that is, if a and b have a greatest common divisor of 1. In higher mathematics, "irreducible fraction" may also refer to rational fractions such that the numerator and the denominator are coprime polynomials.[2] Every positive rational number can be represented as an irreducible fraction in exactly one way.[3]
An equivalent definition is sometimes useful: if a and b are integers, then the fraction a/b is irreducible if and only if there is no other equal fraction c/d such that |c| < |a| or |d| < |b|, where |a| means the absolute value of a.[4] (Two fractions a/b and c/d are equal or equivalentif and only ifad = bc.)
For example, 1/4, 5/6, and −101/100 are all irreducible fractions. On the other hand, 2/4 is reducible since it is equal in value to 1/2, and the numerator of 1/2 is less than the numerator of 2/4.
A fraction that is reducible can be reduced by dividing both the numerator and denominator by a common factor. It can be fully reduced to lowest terms if both are divided by their greatest common divisor.[5] In order to find the greatest common divisor, the Euclidean algorithm or prime factorization can be used. The Euclidean algorithm is commonly preferred because it allows one to reduce fractions with numerators and denominators too large to be easily factored.[6]
In the first step both numbers were divided by 10, which is a factor common to both 120 and 90. In the second step, they were divided by 3. The final result, 4/3, is an irreducible fraction because 4 and 3 have no common factors other than 1.
The original fraction could have also been reduced in a single step by using the greatest common divisor of 90 and 120, which is 30. As 120 ÷ 30 = 4, and 90 ÷ 30 = 3, one gets
Which method is faster "by hand" depends on the fraction and the ease with which common factors are spotted. In case a denominator and numerator remain that are too large to ensure they are coprime by inspection, a greatest common divisor computation is needed anyway to ensure the fraction is actually irreducible.
UniquenessEdit
Every rational number has a unique representation as an irreducible fraction with a positive denominator[3] (however 2/3 = −2/−3 although both are irreducible). Uniqueness is a consequence of the unique prime factorization of integers, since a/b = c/d implies ad = bc, and so both sides of the latter must share the same prime factorization, yet a and b share no prime factors so the set of prime factors of a (with multiplicity) is a subset of those of c and vice versa, meaning a = c and by the same argument b = d.
ApplicationsEdit
The fact that any rational number has a unique representation as an irreducible fraction is utilized in various proofs of the irrationality of the square root of 2 and of other irrational numbers. For example, one proof notes that if √2 could be represented as a ratio of integers, then it would have in particular the fully reduced representation a/b where a and b are the smallest possible; but given that a/b equals √2, so does 2b − a/a − b (since cross-multiplying this with a/b shows that they are equal). Since a > b (because √2 is greater than 1), the latter is a ratio of two smaller integers. This is a contradiction, so the premise that the square root of two has a representation as the ratio of two integers is false.
GeneralizationEdit
The notion of irreducible fraction generalizes to the field of fractions of any unique factorization domain: any element of such a field can be written as a fraction in which denominator and numerator are coprime, by dividing both by their greatest common divisor.[7] This applies notably to rational expressions over a field. The irreducible fraction for a given element is unique up to multiplication of denominator and numerator by the same invertible element. In the case of the rational numbers this means that any number has two irreducible fractions, related by a change of sign of both numerator and denominator; this ambiguity can be removed by requiring the denominator to be positive. In the case of rational functions the denominator could similarly be required to be a monic polynomial.[8]
See alsoEdit
Anomalous cancellation, an erroneous arithmetic procedure that produces the correct irreducible fraction by cancelling digits of the original unreduced form.
^E.g., see Laudal, Olav Arnfinn; Piene, Ragni (2004), The Legacy of Niels Henrik Abel: The Abel Bicentennial, Oslo, June 3-8, 2002, Springer, p. 155, ISBN9783540438267
^ abScott, William (1844), Elements of Arithmetic and Algebra: For the Use of the Royal Military College, College text books, Sandhurst. Royal Military College, vol. 1, Longman, Brown, Green, and Longmans, p. 75.
^Sally, Judith D.; Sally, Paul J., Jr. (2012), "9.1. Reducing a fraction to lowest terms", Integers, Fractions, and Arithmetic: A Guide for Teachers, MSRI mathematical circles library, vol. 10, American Mathematical Society, pp. 131–134, ISBN9780821887981{{citation}}: CS1 maint: multiple names: authors list (link).
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An irreducible fraction or fraction in lowest terms simplest form or reduced fraction is a fraction in which the numerator and denominator are integers that have no other common divisors than 1 and 1 when negative numbers are considered 1 In other words a fraction a b is irreducible if and only if a and b are coprime that is if a and b have a greatest common divisor of 1 In higher mathematics irreducible fraction may also refer to rational fractions such that the numerator and the denominator are coprime polynomials 2 Every positive rational number can be represented as an irreducible fraction in exactly one way 3 An equivalent definition is sometimes useful if a and b are integers then the fraction a b is irreducible if and only if there is no other equal fraction c d such that c lt a or d lt b where a means the absolute value of a 4 Two fractions a b and c d are equal or equivalent if and only if ad bc For example 1 4 5 6 and 101 100 are all irreducible fractions On the other hand 2 4 is reducible since it is equal in value to 1 2 and the numerator of 1 2 is less than the numerator of 2 4 A fraction that is reducible can be reduced by dividing both the numerator and denominator by a common factor It can be fully reduced to lowest terms if both are divided by their greatest common divisor 5 In order to find the greatest common divisor the Euclidean algorithm or prime factorization can be used The Euclidean algorithm is commonly preferred because it allows one to reduce fractions with numerators and denominators too large to be easily factored 6 Contents 1 Examples 2 Uniqueness 3 Applications 4 Generalization 5 See also 6 References 7 External linksExamples Edit120 90 12 9 4 3 displaystyle frac 120 90 frac 12 9 frac 4 3 nbsp In the first step both numbers were divided by 10 which is a factor common to both 120 and 90 In the second step they were divided by 3 The final result 4 3 is an irreducible fraction because 4 and 3 have no common factors other than 1 The original fraction could have also been reduced in a single step by using the greatest common divisor of 90 and 120 which is 30 As 120 30 4 and 90 30 3 one gets 120 90 4 3 displaystyle frac 120 90 frac 4 3 nbsp Which method is faster by hand depends on the fraction and the ease with which common factors are spotted In case a denominator and numerator remain that are too large to ensure they are coprime by inspection a greatest common divisor computation is needed anyway to ensure the fraction is actually irreducible Uniqueness EditEvery rational number has a unique representation as an irreducible fraction with a positive denominator 3 however 2 3 2 3 although both are irreducible Uniqueness is a consequence of the unique prime factorization of integers since a b c d implies ad bc and so both sides of the latter must share the same prime factorization yet a and b share no prime factors so the set of prime factors of a with multiplicity is a subset of those of c and vice versa meaning a c and by the same argument b d Applications EditThe fact that any rational number has a unique representation as an irreducible fraction is utilized in various proofs of the irrationality of the square root of 2 and of other irrational numbers For example one proof notes that if 2 could be represented as a ratio of integers then it would have in particular the fully reduced representation a b where a and b are the smallest possible but given that a b equals 2 so does 2b a a b since cross multiplying this with a b shows that they are equal Since a gt b because 2 is greater than 1 the latter is a ratio of two smaller integers This is a contradiction so the premise that the square root of two has a representation as the ratio of two integers is false Generalization EditThe notion of irreducible fraction generalizes to the field of fractions of any unique factorization domain any element of such a field can be written as a fraction in which denominator and numerator are coprime by dividing both by their greatest common divisor 7 This applies notably to rational expressions over a field The irreducible fraction for a given element is unique up to multiplication of denominator and numerator by the same invertible element In the case of the rational numbers this means that any number has two irreducible fractions related by a change of sign of both numerator and denominator this ambiguity can be removed by requiring the denominator to be positive In the case of rational functions the denominator could similarly be required to be a monic polynomial 8 See also EditAnomalous cancellation an erroneous arithmetic procedure that produces the correct irreducible fraction by cancelling digits of the original unreduced form Diophantine approximation the approximation of real numbers by rational numbers References Edit Stepanov S A 2001 1994 Fraction Encyclopedia of Mathematics EMS Press E g see Laudal Olav Arnfinn Piene Ragni 2004 The Legacy of Niels Henrik Abel The Abel Bicentennial Oslo June 3 8 2002 Springer p 155 ISBN 9783540438267 a b Scott William 1844 Elements of Arithmetic and Algebra For the Use of the Royal Military College College text books Sandhurst Royal Military College vol 1 Longman Brown Green and Longmans p 75 Scott 1844 p 74 Sally Judith D Sally Paul J Jr 2012 9 1 Reducing a fraction to lowest terms Integers Fractions and Arithmetic A Guide for Teachers MSRI mathematical circles library vol 10 American Mathematical Society pp 131 134 ISBN 9780821887981 a href Template Citation html title Template Citation citation a CS1 maint multiple names authors list link Cuoco Al Rotman Joseph 2013 Learning Modern Algebra Mathematical Association of America Textbooks Mathematical Association of America p 33 ISBN 9781939512017 Garrett Paul B 2007 Abstract Algebra CRC Press p 183 ISBN 9781584886907 Grillet Pierre Antoine 2007 Abstract Algebra Graduate Texts in Mathematics vol 242 Springer Lemma 9 2 p 183 ISBN 9780387715681 External links EditWeisstein Eric W Reduced Fraction MathWorld Retrieved from https en wikipedia org w index php title Irreducible fraction amp oldid 1123375868, wikipedia, wiki, book, books, library,
