rational number

A number capable of being expressed as an integer or a quotient of integers, excluding zero as a denominator.

American Heritage® Dictionary of the English Language, Fifth Edition. Copyright © 2016 by Houghton Mifflin Harcourt Publishing Company. Published by Houghton Mifflin Harcourt Publishing Company. All rights reserved.

rational number

(Mathematics) any real number of the form a/b, where a and b are integers and b is not zero, as 7 or 7/3

Collins English Dictionary – Complete and Unabridged, 12th Edition 2014 © HarperCollins Publishers 1991, 1994, 1998, 2000, 2003, 2006, 2007, 2009, 2011, 2014

ra′tional num′ber

a number that can be expressed exactly by a ratio of two integers.

[1900–05]

ra·tion·al number

(răsh′ə-nəl)

A number that can be expressed as an integer or a quotient of integers. For example, 2, -5, and ¹/₂ are rational numbers.

The American Heritage® Student Science Dictionary, Second Edition. Copyright © 2014 by Houghton Mifflin Harcourt Publishing Company. Published by Houghton Mifflin Harcourt Publishing Company. All rights reserved.

ThesaurusAntonymsRelated WordsSynonymsLegend:

Noun

rational number - an integer or a fraction

rational

real, real number - any rational or irrational number

fraction - the quotient of two rational numbers

Translations

racionální číslo

ρητός αριθμός

número racional

rationaaliluku

nombre rationnel

racionalni broj

racionális szám

numero razionale

rationellt tal

Mentioned in

References in periodicals archive

Since [f.sub.*]R' = R', we have [f.sub.*][gamma] [equivalent] a[gamma] for a positive rational number a.

Termination of extremal rays of divisorial type for the power of etale endomorphisms

Parameter relations corresponding to rational numbers of small quotients support resonance interactions inside the system and make the system unstable.

Global Scaling of Planetary Systems

Students who perform at the basic level are able to compute whole and rational numbers; solve simple problems with the help of charts, diagrams, and graphs; and understand informal algebraic concepts.

Comparisons of Mathematics Intervention Effects in Resource and Inclusive Classrooms

Elementary school math textbooks in Korea devote far more space to rational number arithmetic and provide more practice problems than do U.S.

The trouble with fractions

If one were to ask what area the Ford circles cover, one would need to think about whether every rational number is in a Farey sequence and how many fractions there are that have each possible denominator.

Making connections

This is even more important as researchers (Brown & Quinn, 2007; Good et al., 2013; Lamon, 2005; National Mathematics Advisory Panel, 2008; Siegler et al., 2013; Wu, 2001) have documented that developing proficiency in understanding fractions is critical if strong conceptual understanding of further mathematical concepts such as rational numbers, proportional reasoning, and algebra is to be built.

Teaching and learning of fractions in elementary grades: let the dialogue begin!

That is, we extend the range of an exponent of a power function in the nonsingular terminal sliding surface from a rational number with an odd numerator and an odd denominator to a real number.

Extended nonsingular terminal sliding surface for second-order nonlinear systems

Although a possibility, that there exists a rational number of BECS hierarchical levels, can be ruled out; methods are presented.

The efficiency of algorithms and number of control hierarchy levels of building electronic control system

(i) are larger for the flow in the clearances with curvilinear generating lines than these ones for the flow in clearances with rectilinear generating lines for the nonlinearity index 2m being natural numbers; for m being rational numbers this phenomenon progresses inversely.

Inertia effects in the flow of a Herschel-Bulkley ERF between fixed surfaces of revolution

Proposition 7 Let x = p/q be a rational number such that gcd(p, q) = 1 and q [greater than or equal to] 4 then x [not member of] L.

On the algebraic numbers computable by some generalized Ehrenfest urns

As noted by Charalambous and Pitta-Pantazi (2007) the concept of part-whole partitioning takes up the bulk of the curriculum in younger grades, because it is critical to understanding other rational number concepts such as ratios, quotients, and measure.

Developing a theoretical framework for examining student understanding of fractional concepts: an historical accounting