proper fraction - traduction vers néerlandais
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proper fraction - traduction vers néerlandais

MATHEMATICAL REPRESENTATION OF A PORTION OF A WHOLE
Vulgar fraction; Denominator; Numerator; Fractions; Proper fraction; Mixed number; Improper fraction; Mixed fraction; Numerators and denominators; Common fractions; Common fraction; Complex fraction; Complex fractions; Rational arithmetic; Equivalent fractions; Mixed numbers; Case fraction; Fundamental Law of Fractions; Numerator (fraction); Compound fraction; Equivalent fraction; Denominator (fraction); Fraction bar; Arithmetic fraction; Simple fraction; Simple fractions; Vulgar fractions; Special fractions; Horizontal fraction bar; Mixed numeral; Division bar; Fraction (math); ⁤; Mathematics fraction; Fraction (mathematics); Fraction line; Simplification of a fraction; Simplifying a fraction; Reduction (fraction); Reduction of a fraction; Reducing a fraction; Simplification (fraction)
  • If <math>\tfrac12</math> of a cake is to be added to <math>\tfrac14</math> of a cake, the pieces need to be converted into comparable quantities, such as cake-eighths or cake-quarters.
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proper fraction         
werkelijke breuk
improper fraction         
onechte breuk (getal geschreven als breuk maar in feite heel of meer is)
mixed number         
gemengd nummer (vol nummer samen met een breuk)

Définition

proper fraction
¦ noun a fraction that is less than one, with the numerator less than the denominator.

Wikipédia

Fraction

A fraction (from Latin: fractus, "broken") represents a part of a whole or, more generally, any number of equal parts. When spoken in everyday English, a fraction describes how many parts of a certain size there are, for example, one-half, eight-fifths, three-quarters. A common, vulgar, or simple fraction (examples: 1 2 {\displaystyle {\tfrac {1}{2}}} and 17 3 {\displaystyle {\tfrac {17}{3}}} ) consists of a numerator, displayed above a line (or before a slash like 12), and a non-zero denominator, displayed below (or after) that line. Numerators and denominators are also used in fractions that are not common, including compound fractions, complex fractions, and mixed numerals.

In positive common fractions, the numerator and denominator are natural numbers. The numerator represents a number of equal parts, and the denominator indicates how many of those parts make up a unit or a whole. The denominator cannot be zero, because zero parts can never make up a whole. For example, in the fraction 3/4, the numerator 3 indicates that the fraction represents 3 equal parts, and the denominator 4 indicates that 4 parts make up a whole. The picture to the right illustrates 3/4 of a cake.

A common fraction is a numeral which represents a rational number. That same number can also be represented as a decimal, a percent, or with a negative exponent. For example, 0.01, 1%, and 10−2 are all equal to the fraction 1/100. An integer can be thought of as having an implicit denominator of one (for example, 7 equals 7/1).

Other uses for fractions are to represent ratios and division. Thus the fraction 3/4 can also be used to represent the ratio 3:4 (the ratio of the part to the whole), and the division 3 ÷ 4 (three divided by four). The non-zero denominator rule, which applies when representing a division as a fraction, is an example of the rule that division by zero is undefined.

We can also write negative fractions, which represent the opposite of a positive fraction. For example, if 1/2 represents a half-dollar profit, then −1/2 represents a half-dollar loss. Because of the rules of division of signed numbers (which states in part that negative divided by positive is negative), −1/2, −1/2 and 1/−2 all represent the same fraction – negative one-half. And because a negative divided by a negative produces a positive, −1/−2 represents positive one-half.

In mathematics the set of all numbers that can be expressed in the form a/b, where a and b are integers and b is not zero, is called the set of rational numbers and is represented by the symbol Q, which stands for quotient. A number is a rational number precisely when it can be written in that form (i.e., as a common fraction). However, the word fraction can also be used to describe mathematical expressions that are not rational numbers. Examples of these usages include algebraic fractions (quotients of algebraic expressions), and expressions that contain irrational numbers, such as 2 2 {\textstyle {\frac {\sqrt {2}}{2}}} (see square root of 2) and π/4 (see proof that π is irrational).