Actividad con: Números Racionales - Intervalos

EJERCICIO 2
Para poder realizar el ejercicio 2, debes dar check a Ej. 2, y completar los campos que representa a cada consigna del problema.[br]En La Puntilla Samborondón se ha realizado un acordonamiento, por sectores que cubren gran parte de las urbanizaciones como Laguna Dorada, Las Riveras, Parque del Río, Isla Sol y Río Grande, para realizar una encuesta de cuántas familias tienen parentelas aún en el extranjero, limitándose por untos estratégicos [b]ABCDE[/b], como se muestra en la figura. Desde McDonald´s [b]F[/b] hasta la orilla del río “[b]D[/b]” hay una distancia [color=#0000ff][b]920m[/b][/color], se ha puesto dos puntos de información [b]G[/b] y [b]H[/b] separados a una distancia de [color=#0000ff][b]240 m.[/b][/color][br][br]1. [b]Hallar[/b] la distancia que hay desde McDonald´s “F” hasta la altura de Villa Nueva “[b]A[/b]”[br]2. H[b]allar[/b] el Área del sector acordonado es . . . [br]3. Si Para acordonar se necesita poner por cada metro 3 conos. [b]Calcular [/b]¿Cuántos conos se necesitan para acordonar el perímetro seleccionado?[br]4. ¿Qué sucede con los segmentos [b]CD[/b] y [b]ED[/b]?. Argumente los resultados. [br]USE LA CALCULADORA SI ES NECESARIO PARA EL LITERAL 3)
¿Cuál de los siguientes decimales es una fracción decimal mixta?
¿La fracción generatriz de 1.3111..., es?
Cuando un ejercicio aparece una expresión periódica, debe de remplazarse por una fracción generatriz para resolver el ejercicio
[math]\left(1.333...-0.0666...-0.303030...+\frac{2}{5}-\frac{4}{11}\right)[/math]
[math]\left(0.555...-1.222...\right)\times\left(1-0.7\right)[/math]
[b]Escribir[/b] una desigualdad para representar el intervalo y el estado dados si el intervalo es cerrado, abierto[br]o medio abierto. Además, indique si el intervalo es acotado o ilimitado.[br][br][img]data:image/png;base64,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[/img]
En las preguntas 1 a 6, evalúe cada expresión de valor absoluto.[br][img]data:image/png;base64,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[/img]
[b]Ejercicios 1 al 6:[/b] Expresen en notación de intervalos el conjunto de números reales que cumplen con la desigualdad dada.[br][img]data:image/png;base64,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[/img]
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Information: Actividad con: Números Racionales - Intervalos