Suma De Fracciones Propias

[b]Definición[/b][br]Una fracción es un número, que se obtiene de dividir un entero en partes iguales. Por ejemplo cuando decimos una cuarta parte de la torta, estamos dividiendo  la torta en cuatro partes y consideramos una de ellas.[br][img]https://storage.googleapis.com/portaleducativo-net-publica-g3p6/biblioteca/fraccion_un_cuarto.jpg[/img][br][br]Una fracción se representa matemáticamente por números que están escritos uno sobre otro y que se hallan separados por una línea recta horizontal llamada[b] raya fraccionaria.[/b][br]La fracción está formada por dos términos: [b]el numerador y el denominador[/b]. El numerador es el número que está sobre la raya fraccionaria y el denominador es el que está bajo la raya fraccionaria.[br]El [b]numerador [/b]es el número de partes que se considera de la unidad o total.[br]El[b] denominador [/b]es el número de partes[b] iguales [/b]en que se ha dividido la unidad o total.[br][b] [img]https://storage.googleapis.com/portaleducativo-net-publica-g3p6/biblioteca/que_son_fracciones.jpg[/img][/b][br][b] [/b][br][br][b]2- Lectura de fracciones[/b][br]Todas las fracciones reciben un nombre específico, se pueden leer como tal, de acuerdo al numerador y denominador que tengan.[br]El número que está en el [b]numerador se lee igual[/b], no así el denominador. Cuando el denominador va de 2 a 10, tiene un nombre específico (si es 2 es "[b]medios[/b]", si es 3 es "[b]tercios[/b]", si es 4 es "[b]cuartos[/b]", si es 5 es "[b]quintos[/b]", si es 6 es "[b]sextos[/b]", si es 7 es "[b]séptimos[/b]", si es 8 es "[b]octavos[/b]", si es 9 es "[b]novenos[/b]", si es 10 es "[b]décimos[/b]"), sin embargo, cuando es mayor que 10 se le agrega al número la terminación "[b]avos[/b]".[br] [br]Ejemplos:[br][img]https://storage.googleapis.com/portaleducativo-net-publica-g3p6/biblioteca/lectura_y_escritura_de_fracciones.jpg[/img][br] Los matemáticos usan tres categorías para describir fracciones: propias, impropias, y mixtas.[br] [br]Las fracciones que son mayores que 0 pero menores que 1 se llaman [b]fracciones propias[/b]. En las fracciones propias, el [b]numerador[/b] es menor que el [b]denominador[/b]. Cuando una fracción tiene un numerador mayor o igual que el denominador, la fracción es una [b]fracción impropia[/b]. Una fracción impropia siempre es 1 o mayor que 1. Y, finalmente, un [b]número mixto[/b] es una combinación de un número entero con una fracción propia.[br] 
Dos gráficas de fracciones que se suman de manera automática en la parte de abajo y que pueden variar mediante los deslizadores entre números del 1-20 tanto en numerador como en denominador.
Suma de Fracciones con el mismo denominador
Suma de Fracciones con Diferente denominador
Encuentra la fracción faltante.
[center][/center][img]data:image/png;base64,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[/img]
[img]data:image/png;base64,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[/img]
Resuelve
[img]data:image/png;base64,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[/img]
Cálcula
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[/img]
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[/img]
Apartir de esta imagen diga la respuesta correcta.
[img]https://www.geogebra.org/resource/fs5vw5b5/a4iLBl6Z8I4bSt1V/material-fs5vw5b5.png[/img]
[img]https://www.geogebra.org/resource/y6haqfue/4nVUc5oeLi4S447Y/material-y6haqfue.png[/img][br][br]A partir de la imagen anterior ¿Cuál es la respuesta correcta?
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