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Observamos el siguiente vídeo: <h1><a href="https://youtu.be/Y-gx7CReA4E">ttps://youtu.be/Y-gx7CReA4E</a><a href="https://youtu.be/Y-gx7CReA4E">h</a>Las fracciones para niños - Matemáticas para niños</h1> Ahora transcribimos en el cuaderno con buena letra y ortografía:¿Qué es una fracción?Una fracción representa el número de partes que cogemos de una unidad que está dividida en partes iguales. Se representa por dos números separados por una línea de fracción.Es un número que expresa una cantidad determinada de porciones, que se toman de un todo (unidad) dividido en partes iguales.<img src="data:image/png;base64,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" alt=""> 1/2 Se lee: Un medio.<img src="data:image/png;base64,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" 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" 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" alt="">¿Cuáles son los términos de una fracción?Los términos de una fracción son el numerador y el denominador y se ubican así:<img src="https://sites.google.com/site/matematicasagradables/_/rsrc/1404695768808/terminos-de-una-fraccion/Imagen1.png" alt="TÉRMINOS DE UNA FRACCION - Los Números Fraccionarios">¿Cómo se leen las fracciones?El numerador se lee como los números cardinales. 1 – un, 2 – dos, 3 – tres, …, 10 – diez, …, 24 – veinticuatro…El denominador se lee con los números partitivos. 2 – medios, 3 – tercios, 4 – cuartos, 5 – quintos, 6 – sextos, 7 – séptimos, 8 – octavos, 9 – novenos, 10 – décimos. A partir del 11, el número se lee terminado en -avos: 11 – onceavos, 12 – doceavos, … El cien se lee centésimos.Ejemplos:1/3 Un tercio 5/8 Cinco octavos12/10 Doce décimos 6/15 Seis quinceavos43/9 Cuarenta y tres novenos8/100 Ocho centésimos30/7 Treinta séptimos11/5 Once quintos 4/6 Cuatro sexto<iframe width="500" height="281" src="//www.youtube.com/embed/ahM8vfSS6Gg" frameborder="0" allowfullscreen=""></iframe> <a href="/web/uploads/532/7266a78597-complemento-de-la-informacion-de-fracciones.docx">Fracciones</a> <h1> </h1>

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