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3734
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Actualizar Secuencia Didactica: 3734
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Grado 8
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Grado 10
Grado 11
CLEI I
CLEI II
CLEI III
CLEI IV
CLEI V
CLEI VI
Tema
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Propósito
<p>Taller 1</p><p>Que el niño comprenda que el valor un digito depende de la posición que ocupe dentro de un número.</p>
Motivación
<p>Sigue las pistas y averigua el número secreto. Ayúdate con la tabla.</p><p>* La cifra de las centenas es 1.</p><p>*la cifra de las centenas de mil se obtiene al sumarle 2 a la cifra de las centenas.</p><p>* la cifra de las unidades es el número anterior a 5.</p><p>* La cifra de las unidades de mil es el doble de la cifra de las centenas de mil.</p><p>* La cifra de las decenas de mil es igual a la cifra de las unidades</p><p>* La cifra de las decenas es el número anterior a 10.</p><p>El número secreto es:</p><p><img src="data:image/png;base64,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" alt="" style="" rel=""></p>
Explicación
<p>El sistema de numeración decimal es posicional porque el valor de una cifra depende de su posición en el número.</p><p>veamos los siguientes ejemplos:</p><p>a. El valor del digito 3 en 1347 es 300 , pero en el número 4932 es 30.</p><p>b. Para descomponer el número 45 164 en la suma de los valores de sus dígitos determinamos el valor de cada uno de sus dígitos y luego los adicionamos : 45 174 = 40 000 + 5000+ 100 +60 +4.</p><p>C. En el número 2745:</p><p> * El digito de las unidades es 5 y tiene 2745 unidades.</p><p> * El digito de las decenas es 4 y tiene 274 decenas completas.</p><p> * El digito de las centenas es 7 y tiene 27 centenas completas.</p><p> * El digito de las unidades de mil es 2 y tiene 2 unidades de mil completas. </p><hr><p><br></p>
Ejercicios
<p>Realizar los siguientes ejercicios<br></p><p>1. Determinar el valor y la posición del digito subrayado en cada caso.</p><table> <tbody><tr> <td> <p>Número</p> </td> <td> <p>Valor</p> </td> <td> <p>Posición del digito</p> </td> </tr> <tr> <td> <p>5<u>3</u>470</p> </td> <td> <p>3000</p> </td> <td> <p>Unidades de mil</p> </td> </tr> <tr> <td> <p><u>1</u>28345</p> </td> <td>Gfg</td> <td> </td> </tr> <tr> <td> <p>932<u>8</u>86</p> </td> <td>-55</td> <td> </td> </tr> <tr> <td> <p><u>6</u>2753</p> </td> <td> </td> <td> </td> </tr> <tr> <td> <p>432<u>7</u></p> </td> <td> </td> <td> </td> </tr> <tr> <td> <p>924<u>5</u>3</p> </td> <td> </td> <td> </td> </tr> </tbody></table>2. Escriba la descomposición de cada número en la suma de los valores de sus dígitos<p><br></p><table> <tbody><tr> <td> <p>Número</p> </td> <td> <p>descomposición</p> </td> </tr> <tr> <td> <p>5.948</p> </td> <td> <p>5.000+900+40+8</p> </td> </tr> <tr> <td> <p>35.965</p> </td> <td> </td> </tr> <tr> <td> <p>98.035</p> </td> <td> </td> </tr> <tr> <td> <p>164.895</p> </td> <td> </td> </tr> <tr> <td> <p>340.994</p> </td> <td> </td> </tr> <tr> <td> <p>801.500</p> </td> <td> </td> </tr> </tbody></table><p>3. En cada diagrama colorea todas las cantidades de la fila inferior que sean iguales a la cantidad en la fila superior.</p><table><tbody> </tbody></table><p><br><img src="/web/uploads/6912/20d0a64dc4-captura-de-pantalla-1.png" style="" ggj"=""></p><p><br></p><p><br></p><p>4. Completa los espacios en blanco</p><ul><li>a.463 = __________centenas, __________decenas y __________ unidades </li> <li></li> <li>b.463 = _________ centenas y __________unidades.</li> <li></li> <li>c.463 = _________ unidades.</li></ul><p>5. En cada pareja de números colorea el número mayor.</p><table> <tbody><tr> <td> <p>5 decenas </p> </td> <td> <p>8 unidades</p> </td> </tr> <tr> <td> <p>7 centenas</p> </td> <td> <p>7 unidades de mil</p> </td> </tr> <tr> <td> <p>4 decenas de mil</p> </td> <td> <p>2 centenas</p> </td> </tr> <tr> <td> <p>5 centenas</p> </td> <td> <p>3 centenas de mil</p> </td> </tr> </tbody></table><p><br>6. En cada caso escribe el número correspondiente.</p><ul><li>a.7 decenas y 4 unidades __________________________________________________ </li> <li>b.17 decenas y 7 unidades _______________________________________________</li> <li>c.845 centenas ________________________________________________________</li> <li>d.33 unidades de mil y 4 decenas __________________________________________</li> <li>e.54 centenas y 11 unidades _____________________________________________</li></ul>
Evidencia
Evaluación
<p>Resuelve las siguientes situaciones y escribe las respuestas.</p><p>1. Federico creó su propio sistema de numeración, el cual funciona así : cada vez que completa 5 unidades de orden, forma una unidad de orden inmediatamente superior empleando los siguientes símbolos.<br></p><p><img src="/web/uploads/6912/b4d2f6dd6f-captura-de-pantalla-2.png" style="" web="" uploads="" 6912="" 0d334bd353-captura-de-pantalla-3.png"="" rel=""></p>
Bibliografía
<p><span style="font-size: 11px;"></span>Avanza , matemáticas 4 , editorial norma.</p><p>Soluciones 4 editorial futuro</p><p>Vamos a aprender matemáticas 4 , Mineducación. </p>
Foro
<p>1. ¿Los sistemas creados por Federico y Maria son sistemas decimales?</p><p>2. ¿Los sistemas creados por Federico y Maria son sistemas posicionales?</p><p>3. crea tu propio sistema de numeración y determina si es decimal y si es posicional.</p>
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