Category:Rational numbers
Vai alla navigazione
Vai alla ricerca
English: A rational number is any number that can be expressed as the quotient or fraction p/q of two integers, with the denominator q not equal to zero. Since q may be equal to 1, every integer is a rational number. This category represents all rational numbers, that is, those real numbers which can be represented in the form: ...where and are integers and is not equal to zero. All integers are rational, including zero.
numero ottenibile come rapporto fra due numeri interi. | |||||
Carica un file multimediale | |||||
Istanza di |
| ||||
---|---|---|---|---|---|
Sottoclasse di | |||||
Parte di |
| ||||
Consiste di |
| ||||
Distinto da | |||||
Considerato essere uguale a | frazione egizia | ||||
| |||||
![]() |
Sottocategorie
Questa categoria contiene le 12 sottocategorie indicate di seguito, su un totale di 12.
File nella categoria "Rational numbers"
Questa categoria contiene 55 file, indicati di seguito, su un totale di 55.
-
3分の1と3分の2.png 959 × 375; 6 KB
-
Algebra1 03 fig003 segmentounitario.svg 303 × 103; 14 KB
-
Algebra1 03 fig021 perretre.svg 71 × 24; 4 KB
-
Algebra1 03 fig022a rettafraz.svg 306 × 56; 21 KB
-
Algebra1 03 fig022b rettafraz.svg 316 × 46; 14 KB
-
Algebra1 fnz fig011 ret.svg 320 × 43; 19 KB
-
Algebra1 fnz fig012 ret.svg 320 × 24; 9 KB
-
Bad dyadic approximation.svg 512 × 294; 5 KB
-
Btree1.jpg 800 × 600; 190 KB
-
Chandhini K Nair.jpg 2 768 × 2 551; 1,6 MB
-
Decimal-fraction equivalents--v0006.png 3 217 × 1 767; 41 KB
-
Diagonal argument.svg 429 × 425; 77 KB
-
Diophantine approximation graph.svg 512 × 640; 16 KB
-
Divisione numero periodico.png 178 × 293; 8 KB
-
Dyadic rational.svg 512 × 294; 3 KB
-
Dyadic sqrt2 approximation.svg 512 × 568; 5 KB
-
Esempi di Frazioni Equivalenti.jpg 644 × 220; 31 KB
-
Figure e Frazioni Proprie.jpg 491 × 209; 13 KB
-
Frazioni Apparenti.jpg 613 × 282; 34 KB
-
Frazioni che danno interi.jpg 251 × 75; 4 KB
-
HarmonicNumbers.svg 600 × 480; 8 KB
-
Irregularity of distributions.png 1 193 × 674; 132 KB
-
Irregularity of distributions.svg 512 × 288; 74 KB
-
Just diatonic semitone on C.mid 0,0 s; 206 byte
-
Konstrukcja liczb wymiernych 1.svg 721 × 380; 53 KB
-
LosnmerosRacionales 198 4741.jpg 517 × 290; 70 KB
-
Middle usage example LaTeX.svg 177 × 62; 7 KB
-
Natural scale ratios -Large Print.svg 714 × 373; 71 KB
-
Nomenclatura de denominadores.png 686 × 852; 63 KB
-
Nonuniform.png 1 250 × 1 250; 17 KB
-
Number-systems (NZQRC).svg 1 000 × 500; 421 byte
-
Number-systems.svg 800 × 400; 501 byte
-
Números Reales.svg 2 000 × 2 000; 9,02 MB
-
Passeiodecantor1.png 1 126 × 845; 96 KB
-
Passeiodecantor2.png 1 151 × 864; 141 KB
-
Passeiodecantor3.png 983 × 710; 58 KB
-
Quadrati Frazioni.jpg 408 × 78; 6 KB
-
Quadrato Frazioni.jpg 67 × 73; 2 KB
-
Radionella tal.png 799 × 638; 79 KB
-
Rationals.png 447 × 276; 6 KB
-
Recta racional v001.svg 500 × 150; 2 KB
-
Retta Frazioni.jpg 479 × 166; 9 KB
-
Schema Proporzione I.jpg 309 × 140; 9 KB
-
Schema Proporzione II.jpg 296 × 154; 12 KB
-
Screen-shot-2012-05-21-at-14-54-08.png 515 × 361; 7 KB
-
Set-of-numbers for junior education japanese.svg 550 × 300; 23 KB
-
Sets of Numbers (Without Complex Numbers).svg 512 × 359; 44 KB
-
Stereographic projection of rational points on circle.svg 526 × 200; 491 KB
-
Stereographic projection of rational points.svg 526 × 200; 137 KB
-
Struttura Frazione.jpg 268 × 136; 7 KB
-
Superposition of two simple harmonic motions, rational ratio frequencies.png 1 855 × 896; 220 KB
-
The process of comparing numbers in rational and decimal forms.jpg 2 481 × 3 508; 678 KB
-
Есеп-3.png 210 × 120; 1 KB
-
Есеп-4.png 418 × 86; 2 KB
-
分数説明図.png 1 276 × 787; 14 KB