Función Lineal

[color=#0000ff][b][size=150]OBJETIVOS:[br][br][/size][/b][/color][list=1][size=150][*]Definir y reconocer funciones lineales, en base a tablas de valores, de formulación algebraica y representación gráfica con el uso de la tecnología.[/*][*]Determinar las características de las representaciones de las funciones lineales.[/*][*]Elaborar conclusiones sobre la pendiente y la ordenada al origen de una función lineal.[/*][*]Reconocer la ecuación de la recta da la pendiente y un punto o dados dos puntos de la misma.[/*][/size][/list]
PARA EMPEZAR.....
Este es un breve ejemplo de aplicación de función lineal.
Función Lineal - Material teórico y práctico
[b][size=150][color=#0000ff][icon]/images/ggb/toolbar/mode_slope.png[/icon] Les propongo:[/color][br][/size][br][/b][list=1][size=150][*]Observar la división del desplazamiento vertical entre el desplazamiento horizontal.[/*][*]Comprobar que es igual la pendiente en el deslizador.[icon]/images/ggb/toolbar/mode_keepinput.png[/icon][/*][*]Modificar la pendiente en el deslizador y ver cómo se comporta la recta: cuando es positiva, cuando es negativa y cuando es cero.[icon]/images/ggb/toolbar/mode_slider.png[/icon][/*][*]Incrementar poco a poco el valor de la pendiente en el deslizador hasta llegar a 10 y concluir que para pendientes cada vez mayores la recta tiende a ser vertical.[icon]/images/ggb/toolbar/mode_slider.png[/icon][br][/*][*]Notar que el valor de llamado [i]ordenada al origen[/i] sólo desplaza la recta de manera vertical y no influye en su inclinación.[icon]/images/ggb/toolbar/mode_keepinput.png[/icon][/*][*]Mover los puntos C y D y observar que la pendiente no varía.[icon]/images/ggb/toolbar/mode_complexnumber.png[/icon][/*][*]Reflexionar acerca de la relación entre la pendiente y el ángulo de inclinación de la recta.[icon]/images/ggb/toolbar/mode_angle.png[/icon][/*][/size][/list]
RESUMIENDO!!!!
[size=100]El valor de la pendiente determina si la función es creciente, decreciente o constante.[br][/size]
[color=#0000ff][icon]/images/ggb/toolbar/mode_conic5.png[/icon][b][size=150] Aplicación de función lineal[/size][/b][/color][justify][size=150]La siguiente aplicación muestra el proceso de llenado de un tanque cuya capacidades de 10 litros mediante un grifo con flujo ajustable. Asigne los valores del flujo y volumen inicial de agua en el tanque. Utilice el los botones para controlar la animación. [br]¿Qué puede decirse acerca del flujo y el tiempo de llenado? ¿Qué representa en la gráfica? ¿Y el volumen inicial?[/size][/justify]
[size=150][size=150][b][size=150][color=#0000ff]Ahora vamos a trabajar el concepto de pendiente con el siguiente ejercicio:[br][/color][/size][/b][/size][size=85](Escribe tu respuesta en el recuadro)[br][/size][br][icon]/images/ggb/toolbar/mode_slope.png[/icon]La[b][color=#0000ff] [/color][i]pendiente[/i][/b] es la inclinación de la recta con respecto al eje horizontal, también conocido como el eje de las abscisas. Esto significa que indica la cantidad en que se incrementa o disminuye el valor de la variable [math]y[/math], cuando la [math]x[/math] aumenta una unidad. Se denota con la letra [math]m[/math].[br][code][/code][br]Determina el valor de "[math]a[/math]" de modo que la pendiente de la recta que pasa por los puntos [math]P_1=\left(-2;3a\right)[/math] y [math]P_2=\left(4;-a\right)[/math] tenga el valor [math]m=-\frac{5}{12}[/math][/size]
En este video pueden ver la resolución del ejercicio anterior
[b][color=#0000ff][size=150]APRENDEMOS JUGANDO[/size][/color][/b][br][br][size=150]Miren este video que explico cómo se utiliza el simulador [b]PETH[/b] para resolver, por ejemplo, el ejercicio 2 de las Actividades propuestas en el PDF anterior.[br][br]Con este [b][i]simulador [/i][/b]podrán aprender el concepto de pendiente y trabajar la ecuación de la recta dada la pendiente y un punto o dados dos puntos de la misma.[br]Los invito a explorar los distintos niveles que hay en [b]Juego de rectas[/b]. Jueguen y así verán la puntuación que les servirá a ustedes como autoevaluación.[/size]
MANOS A LA OBRA
[size=150][icon]/images/ggb/toolbar/mode_join.png[/icon][color=#0000ff] [b]Ecuación de la recta que pasa por dos puntos[/b][/color][br]En el mapa de Europa que se puede encontrar en la parte inferior se encuentran representadas diferentes ciudades.[br]Despega un avión de Madrid con dirección a Moscú y queremos averiguar la ecuación de la recta que representa su trayectoria. [br]Averigua los parámetros "[math]m[/math]" y "[math]b[/math]" sabiendo que la forma de la recta es [math]f(x)=mx+b[/math][/size]
[size=150][icon]/images/ggb/toolbar/mode_parallel.png[/icon]Dos rectas son [b]paralelas[/b] si sus pendientes son iguales.[br][icon]/images/ggb/toolbar/mode_orthogonal.png[/icon]Dos rectas son [b]perpendiculares[/b] si sus pendientes son opuestas y recíprocas. [/size]
[b][size=150][color=#0000ff][icon]/images/ggb/toolbar/mode_conic5.png[/icon]Con esta APPLET podrán trabajar el concepto de rectas paralelas y perpendiculares.[br][/color][/size][/b][br]Muevan los deslizaron para obtener una recta básica.[br]Elijan un punto y seleccionen paralela o perpendicular haciendo click en la casilla correspondiente [icon]/images/ggb/toolbar/mode_keepinput.png[/icon] y podrán obtener la ecuación de la recta [icon]/images/ggb/toolbar/mode_orthogonal.png[/icon] o [icon]/images/ggb/toolbar/mode_parallel.png[/icon] a la recta básica que pasa por el punto seleccionado.
[size=200][color=#0000ff][b][left][b][img]data:image/png;base64,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[/img] [/b][b][size=150]EJERCITAMOS UN POCO[/size][/b][/left][/b][/color][/size]
A modo de cierre (Marca la opción correcta)
[size=150]¿Cuál es [code][/code]el valor de a si [b](a,5)[/b] se encuentra en la recta [b]2x+y=9[/b]?[/size]
[size=150]¿Cuál es la ordenada al origen de [b]x+4y=12[/b]?[/size]
Corrobore sus respuesta graficando las funciones anteriores
La pendiente de r :
[img]data:image/png;base64,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[/img]
La función asociada a la gráfica de la imagen es:
[img]data:image/png;base64,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[/img]
[size=100][size=150]¿Cuál de las siguientes funciones es decreciente?[/size][/size]
Analiza y responde:
[img]https://encrypted-tbn0.gstatic.com/images?q=tbn:ANd9GcQinClq9gysL2m2uJjz87x5Q3K6E9fefJ4w3Q&usqp=CAU[/img][br][br]Un andinista asciende un tramo de una montaña con una rapidez de 37 metros por hora.[br]Después de 4 horas ha llegado a una altura de 1.122 metros.[br][br][b]a)[/b] ¿Cuál es la función que indica la altura en metros después de x horas?[br][b]b)[/b] ¿A qué altura se encontraba cuando comenzó a escalar?[br][b]c)[/b] Grafique la función altura[i].[br][br][/i][size=85](Responde el recuadro de abajo)[/size]
Completa el crucigrama
Close

Information: Función Lineal