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RESTAS DESAGRUPANDOYa sabemos que la resta es el proceso opuesto de la suma, es quitar de una cantidad mayor llamada minuendo una cantidad menor llamada sustraendo para obtener un resultado llamado resta o diferencia.El signo de la resta o sustracción es — y se lee menos.Recordemos las partes de la resta:<img src="/web/uploads/529/2252cb4272-partes-de-la-resta.jpg">En algunos casos vamos a encontrar restas un poco más complejas, las cuales van a necesitar desagruparse para poder resolverse, para facilitar el proceso de la resta nos vamos a ayudar del cuadro de valor posicional donde vamos a ubicar las cifras teniendo en cuenta las unidades debajo de las unidades y las decenas debajo de las decenas. Pasos para realizar una resta por desagrupación:<ul><li>1.Se escriben las cantidades a restar una debajo de otra, haciendo coincidir las unidades y las decenas.</li></ul><ul><li>2.Empezamos a restar de derecha a izquierda, es decir empezamos con las unidades y seguimos con las decenas.</li></ul>NOTA: Si el resultado de la resta de las unidades no se puede hallar porque el sustraendo es mayor que el minuendo vamos a ir donde nuestras amigas las decenas a que nos presten una decena y convertir la unidad en decena para poder restar o quitar lo que nos pide el ejercicio.<ul><li>3.Ahora nos ubicamos sobre las decenas, no podemos olvidar que nos prestaron una decena a las unidades, por lo tanto hay que quitarle 1 a las decenas para continuar restando el valor indicado.</li></ul>Ejemplo: vamos a restar 44 - 28<ul><li>1.Vamos a escribir las cantidades a restar en el cuadro de valor posicional, haciendo coincidir las unidades y las decenas:</li></ul><img 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" alt="" width="218" height="195" style="width: 218px; height: 195px;"><ul><li>2. Empezamos a restar de derecha a izquierda, es decir empezamos con las unidades.</li></ul> A 4 no se le puede quitar 8, entonces vamos donde las decenas a que nos presten una decena para poder continuar con la resta.Ahora tenemos 14 unidades para restar o quitar 8 unidades, es decir: 14 – 8 = 6<img 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" alt="" width="244" height="226" style="width: 244px; height: 226px;"> <ul><li>3. Ahora nos ubicamos en la casilla de las decenas, como el 4 presto 1 decena, ahora se convierte en 3 y a ese 3 le vamos a restar o quitar 2, es decir: 3 – 2 = 1.</li></ul><img 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" alt="" width="250" height="226" style="width: 250px; height: 226px;">4. Como no hay más números quiere decir que ya terminamos de restar, el resultado de la resta 44 - 28 es igual a 16 y se escribe así: 44 - 28 = 16<img 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" alt="" width="249" height="226" style="width: 249px; height: 226px;">En el siguiente video, desde el minuto 2:53 puedes observar otro ejemplo de restas desagrupando: <iframe width="500" height="281" src="//www.youtube.com/embed/f5qr238L2N0" frameborder="0" allowfullscreen=""></iframe>

Ejercicios

Evidencia

Evaluación

Bibliografía

Foro

calificable?

Activo