Actualizar Secuencia Didactica: 3799

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Sebastián registro en una tabla la temperatura de tres cuartos fríos de un laboratorio.<img src="/web/uploads/9119/1a09fc5c51-71.jpg" width="236" height="98" style="width: 236px; height: 98px;">Para determinar en cual de los tres hace más frío, se pueden representar las temperaturas en una recta numérica y luego comparar su ubicación.<img 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" alt="" "="" justify;"="" width="433" height="105" style="width: 433px; height: 105px;">Cuando se comparan dos números en la recta numérica, se deduce que es mayor el número que se encuentra ubicado a la derecha del otro. A su vez, es menor el que se encuentra ubicado a la izquierda. De acuerdo con lo anterior, se puede establecer las siguientes relaciones de orden.<ul><li>Como -2 está a la derecha de -5, entonces -5 &lt; -2.</li><li>Como -5 está a la derecha de -8, entonces -8 &lt; -5.</li><li>Como -2 está a la derecha de -8, entonces -8 &lt; -2. Esto quiere decir que el orden de las temperaturas es:</li></ul><img src="data:image/png;base64,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" alt="">Por lo tanto el cuarto B es en el que hace más frío.Otros criterios que permiten determinar la relación de orden existente entre dos números enteros son:<ul><li>Dados dos números enteros positivos, es mayor el que tiene mayor valor absoluto.</li><li>Dados dos números enteros negativos, es mayor el que tiene menor valor absoluto.</li><li>Un número positivo siempre es mayor que cualquier número negativo.</li></ul> Adición de números enteros del mismo signo.En una exploración del fondo marino, un buzo se sumerge en un primer momento 45 m de profundidad, y al cabo de una hora desciende otros 27 m. en total, ¿Cuántos metros descendió el buzo durante laexploración?Para resolver la situación se pueden sumar las distancias recorridas por el buzo en su descenso, es decir, se efectúa la adición de números enteros.<img src="/web/uploads/9119/08739b1f6e-74.jpg" width="507" height="220" style="width: 507px; height: 220px;">Analíticamente, el resultado anterior equivale a la suma de los valores absolutos de los sumandos, precedida por el signo común de los dos números. Se deduce entonces que el buzo descendió 72 metros en total.Adición de números enteros del diferente signo.En la adición de números enteros de diferente signo, se restan los valores absolutos de los sumandos y a la suma se le antepone el signo del sumando que tenga el mayor valor absoluto.PRÁCTICA Y EJECUCIÓNEjemplo 1Observa los números enteros representados en la recta numérica de la imagen.<img src="/web/uploads/9119/b9040fe6ef-75.jpg" width="575" height="77" style="width: 575px; height: 77px;"> <ul><li>8 &lt; - 4, ya que -4 está a la derecha de -8. </li> <li>6 es el mayor de los números representados, puesto que está ubicado a la derecha de todos los demás.</li> <li>El orden de los números señalados de menor a mayor es: -9 &lt; -8 &lt; -4 &lt; 3 &lt; 6</li></ul> Ejemplo 2Para efectuar la operación -9 + 12 se procede así:1. Se calcula los valores absolutos de los dos sumandos. |-9| = 9 y |12 | = 122. Al mayor valor absoluto se le resta el menor valor. 12 – 9 = 33. Al resultado se le antepone el signo del sumando que tenga el mayor valor absoluto. -9 + 12 = 3

Ejercicios

1. Representa cada pareja de números enteros en una recta numérica. Luego, escribe &lt; o &gt; según sea el caso.a. -3 y 1b. 4 y -6 c. -5 y -8 d. 6 y -3 e. 4 y 102. Ordena de menor a mayor los números de cada grupo. a. 25, -32, 24, -1, 0, -12.b. 12, 7, -20, 16, -13, 8.c. -54, 678, -249, 14, 0, 190. d. 32, 56, 17, -34, -56, 2e. 36, -65, -39, -41, 58, 72.3. Relaciona cada adición con la representación en la recta numérica que le corresponde. a. -4 + (-3) b. 6 +5 c. -2 + 7 d. -8 + 5 <img src="/web/uploads/9119/79772e1106-76.jpg" width="343" height="213" style="width: 343px; height: 213px;">4. Calcula la suma en cada caso. a. 19 + (-12)b. -82 + 9c. -6 + (-27) d. 18 + (-2) e. 42 + 37<img src="/web/uploads/9119/fb2ccd43a2-77.jpg" style="width: 315px; height: 145px;" width="315" height="145">

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