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m (Revertidos los cambios de Lilai (disc.) a la última edición de LailaTov)
 
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{{tutorial|
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__NoToc__{{Interfaz Gráfica|Prácticas}}
title=Retomando desde Bloque de Prácticass<small> Diseño de un Taller de [http://www.centrobabbage.com Centro Babbage]</small>
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<small><small>
}}
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=Retomando desde Bloque de Prácticas=
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</small></small><!-- --><small> Diseño de un Taller de Centro Babbage</small>
 
==Resoluciones Gráficas de Sistemas de (In)Ecuacions==
 
==Resoluciones Gráficas de Sistemas de (In)Ecuacions==
 
Un sistema de ecuaciones lineales puede quedar diseñado como un escenario para la resolución gráfica de modo tal que en cada caso se ingresen los valores correspondientes y sea posible representar ágilmente una variedad de problemas de tal tipo.
 
Un sistema de ecuaciones lineales puede quedar diseñado como un escenario para la resolución gráfica de modo tal que en cada caso se ingresen los valores correspondientes y sea posible representar ágilmente una variedad de problemas de tal tipo.
 
===Pasos de Construcción===
 
===Pasos de Construcción===
{{step|num=1}} Como se anotarán dos funciones de formato '''''m x + b''''', es preciso ingresar en primer lugar, desde la [[Barra de Entrada]], cada componente necesario, empezando por...
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{{step|num=1}} Como se anotarán dos funciones de formato '''''m x + b''''', es preciso ingresar en primer lugar, desde la [[Manual:Barra de Entrada|Barra de Entrada]], cada componente necesario, empezando por...
 
* m_1 = 1                  b_1 = 3
 
* m_1 = 1                  b_1 = 3
 
*  m_2 = 2                b_2 = 1
 
*  m_2 = 2                b_2 = 1
Línea 11: Línea 12:
 
* m_1 x + b_1
 
* m_1 x + b_1
 
* m_2 x + b_2
 
* m_2 x + b_2
Todo esto aparecerá registrado en la [[Vista Algebraica]]
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Todo esto aparecerá registrado en la [[Comentarios:Vista_Algebraica_CAS|Vista Algebraica]]
{{Note|1=Para que los valor de los parámetros de una y otra ecuación lineal aparezca representado como un [[Herramienta de Deslizador|deslizador]] en la [[Vista Gráfica]], basta con tildar con un ''clic'' cada redondelito que lo encabeza en la [[Vista Algebraica]].}}
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{{Note|1=Para que los valor de los parámetros de una y otra ecuación lineal aparezca representado como un [[Herramienta de Deslizador|deslizador]] en la {{vista|graf}}, basta con tildar con un ''clic'' cada redondelito que lo encabeza en la [[Comentarios:Vista_Algebraica_CAS|Vista Algebraica]].}}
 
{{step|num=2}} Los valores de cada parámetro determinará la inclinación y la posición de la recta que representa la ecuación y para que todo sea más fácil de ser identificado, conviene darles los mismos colores contrastantes a los de una y otra ecuación.
 
{{step|num=2}} Los valores de cada parámetro determinará la inclinación y la posición de la recta que representa la ecuación y para que todo sea más fácil de ser identificado, conviene darles los mismos colores contrastantes a los de una y otra ecuación.
 
{{Note|1=En la figura se exponen...
 
{{Note|1=En la figura se exponen...
*los deslizadores a los que se les asignó orientación '''Vertical''' en la casilla correspondiente de la pestaña '''Deslizador''' de la [[Caja de Diálogo de Propiedades]],
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*los deslizadores a los que se les asignó orientación '''Vertical''' en la casilla correspondiente de la pestaña '''Deslizador''' del [[Manual:Referencias_y_Cuadros_de_Diálogo#Cuadro_de_Propiedades_de_Objetos|Cuadro de Propiedades]],
 
*el rótulo de cada ecuación de recta a la que, además, se les cambió en nombre por '''''f_1''''' y '''''f_2''''' respectivamente.}}
 
*el rótulo de cada ecuación de recta a la que, además, se les cambió en nombre por '''''f_1''''' y '''''f_2''''' respectivamente.}}
{{step|num=3}} Se puede establecer, con la herramienta [[Archivo:Tool Intersect Two Objects.gif]],  el [[Herramienta de Intersección de Dos Objetos|punto de intersección]] entre una y otra función graficada.
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{{step|num=3}} Se puede establecer, con la herramienta [[Archivo:Tool Intersect Two Objects.gif]],  el [[Referencia:Herramientas_3D_a_libro#Sobre_la_Intersección|punto de intersección]] entre una y otra función graficada.
{{Note|1=Es conveniente activar la [[Vista Gráfica#Barra de Estilo|Barra de Estilo]] de la [[Vista Gráfica]] para agilizar cada una de las operaciones descriptas y, respecto del punto recién creado así como para cada ecuación, tener un modo sencillo de dejar expuesto del rótulo, específicamente el '''''Valor''''' o el '''''Nombre y Valor'''''.}}
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{{Note|1=Es conveniente activar la [[Vista Gráfica#Barra de Estilo|Barra de Estilo]] de la {{vista|graf}} para agilizar cada una de las operaciones descriptas y, respecto del punto recién creado así como para cada ecuación, tener un modo sencillo de dejar expuesto del rótulo, específicamente el '''''Valor''''' o el '''''Nombre y Valor'''''.}}
{{step|num=4}} Con la correspondiente herramienta [[Archivo:Tool Insert Text.gif]], se puede establecer el [[Herramienta de Inserta Texto|texto]] en el lugar adecuado de la [[Vista Gráfica]] y anotar el texto estático: ''Solución: x =''  y seleccionar el nombre del punto de intersección del listado que se despliega a indicar ''Objetos''.
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{{step|num=4}} Con la correspondiente herramienta [[Archivo:Mode text.png]], se puede establecer el [[Herramienta de Texto|texto]] en el lugar adecuado de la {{vista|graf}} y anotar el texto estático: ''Solución: x =''  y seleccionar el nombre del punto de intersección del listado que se despliega a indicar ''Objetos''.
 
{{Note|1=Si se prefiriera identificar cada uno de los valores, se podría, en la caja de edición...
 
{{Note|1=Si se prefiriera identificar cada uno de los valores, se podría, en la caja de edición...
 
*modificar la casilla que contiene el nombre del punto de intersección, digamos '''A''' para reemplazarlo por '''x(A)''' y  
 
*modificar la casilla que contiene el nombre del punto de intersección, digamos '''A''' para reemplazarlo por '''x(A)''' y  
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{{step|num=6}} Una propuesta adicional sería la de operar con inecuaciones.
 
{{step|num=6}} Una propuesta adicional sería la de operar con inecuaciones.
 
{{Note|1=<br>
 
{{Note|1=<br>
El par de inecuaciones que se ingresan por [[Barra de Entrada]] y también se establece su texto dinámico representativo correspondiente, son...
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El par de inecuaciones que se ingresan por [[Manual:Barra de Entrada|Barra de Entrada]] y también se establece su texto dinámico representativo correspondiente, son...
 
*in_1: (y < m_2 x + b_2) ∧ (y > m_1 x + b_1)   
 
*in_1: (y < m_2 x + b_2) ∧ (y > m_1 x + b_1)   
 
*in_2: (y > m_2 x + b_2) ∧ (y < m_1 x + b_1)
 
*in_2: (y > m_2 x + b_2) ∧ (y < m_1 x + b_1)
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'''[[File:Lineales.PNG|510px|thumb|center]]'''
 
'''[[File:Lineales.PNG|510px|thumb|center]]'''
 
{{step|num=8}} Abriendo la [[Vista Gráfica|Vista Gráfica 2]] y cambiando allí la escala para que sea posible ver ambas a la vez, se pueden sumar propuestas como las derivadas de establecer...
 
{{step|num=8}} Abriendo la [[Vista Gráfica|Vista Gráfica 2]] y cambiando allí la escala para que sea posible ver ambas a la vez, se pueden sumar propuestas como las derivadas de establecer...
*un par de [[Archivo:Tool Point in Region.gif]] [[Herramienta de Punto en Objeto|puntos en la región]] delimitada por inecuaciones
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*un par de [[Archivo:Tool Point in Region.gif|link=Comentarios:Herramienta de Nuevo Punto]] [[Comentarios:Herramienta de Nuevo Punto|puntos en la región]] delimitada por inecuaciones
 
*la [[Archivo:Tool Slope.gif]] [[Herramienta de Pendiente|pendiente de la recta]] que ambos determinan
 
*la [[Archivo:Tool Slope.gif]] [[Herramienta de Pendiente|pendiente de la recta]] que ambos determinan
 
... de modo tal que se pueda indagar qué valor presenta en cada caso.
 
... de modo tal que se pueda indagar qué valor presenta en cada caso.
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===Desafío Adicional Cuadrático===  
 
===Desafío Adicional Cuadrático===  
 
Con la misma serie de maniobras es posible, creando otros y diversos deslizadores, operar con problemas de encuentro incluso incorporando cuadráticas.  
 
Con la misma serie de maniobras es posible, creando otros y diversos deslizadores, operar con problemas de encuentro incluso incorporando cuadráticas.  
  {{OJo|1= Una función puede anotarse en la [[Barra de Entrada]] empleando la sintaxis  más conveniente en cada caso.<br><small>Para que cada nueva ingresada no ''tape'' la anterior, es conveniente anotarlas con distintos nombres o subíndices - f_1(x), g(X)... -.</small>}}
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  {{OJo|1= Una función puede anotarse en la [[Manual:Barra de Entrada|Barra de Entrada]] empleando la sintaxis  más conveniente en cada caso.<br><small>Para que cada nueva ingresada no ''tape'' la anterior, es conveniente anotarlas con distintos nombres o subíndices - f_1(x), g(X)... -.</small>}}
 
{{note|1=<br>Se puede también ingresar una ecuación de una o dos variables de cada lado del signo igual.<br>Como '''<code>2 x + 3 = 5 y + 1</code>''' o, de mayor grado,  '''<code>3 x²  = 4  + y + 2 x</code>'''.<br>Se establece así, cada uno de las funciones  - '''<code>2x - 5y = -2</code>''' o '''<code>y = 0.4x + 0.4</code>''' o '''<code>X = (0, 0.4) + λ (-5, -2)</code>''', según el formato escogido, en el primer caso y en el segundo;<br>'''<code>3x² - 2x - y = 4</code>''' o '''<code>y = 3x² - 2x - 4 x</code>²''' o '''<code>x² = 0.67x + 0.33y + 1.33</code>''' -.}}
 
{{note|1=<br>Se puede también ingresar una ecuación de una o dos variables de cada lado del signo igual.<br>Como '''<code>2 x + 3 = 5 y + 1</code>''' o, de mayor grado,  '''<code>3 x²  = 4  + y + 2 x</code>'''.<br>Se establece así, cada uno de las funciones  - '''<code>2x - 5y = -2</code>''' o '''<code>y = 0.4x + 0.4</code>''' o '''<code>X = (0, 0.4) + λ (-5, -2)</code>''', según el formato escogido, en el primer caso y en el segundo;<br>'''<code>3x² - 2x - y = 4</code>''' o '''<code>y = 3x² - 2x - 4 x</code>²''' o '''<code>x² = 0.67x + 0.33y + 1.33</code>''' -.}}
  
 
===Textos asociados a Objetos===
 
===Textos asociados a Objetos===
 
Para que el texto de la ''Solución'' (cuando la haya única, la del punto de intersección de las representaciones lineales de las ecuaciones del sistema), no se ''aleje'' de '''A''',  se puede llevar adelante esta maniobra:
 
Para que el texto de la ''Solución'' (cuando la haya única, la del punto de intersección de las representaciones lineales de las ecuaciones del sistema), no se ''aleje'' de '''A''',  se puede llevar adelante esta maniobra:
# Abrir la [[Caja de Diálogo de Propiedades]] del texto en cuestión y en la pestaña ''Posición'' seleccionar el punto '''A'' de la lista desplegable
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# Abrir el [[Manual:Referencias_y_Cuadros_de_Diálogo#Cuadro_de_Propiedades_de_Objetos|Cuadro de Propiedades]] del texto en cuestión y en la pestaña ''Posición'' seleccionar el punto '''A'' de la lista desplegable
# Anotar [[Comando Definido|Definido[A]]] en el campo '''Condición'para Exponer el Objeto''' de la pestaña '''Avanzado'''.
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# Anotar [[Comando EstáDefinido|EstáDefinido(A)]] en el campo '''Condición'para Exponer el Objeto''' de la pestaña '''Avanzado'''.
  
 
==Explorando las Pirámides==
 
==Explorando las Pirámides==
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{|border="1" cellpadding="10"
 
{|border="1" cellpadding="10"
|[[Image:Tool_Insert_Image.gif‎‎‎‎]]||[[Herramienta de Imagen|Imagen]]
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|[[Image:Tool_Insert_Image.gif‎‎‎‎]]||[[:Categoría:Excluir_de_Impresión|Imagen]]
 
|-
 
|-
|[[Image:Tool_Line_through_Two_Points.gif‎]]||[[Herramienta de Recta que pasa por Dos Puntos|Recta que pasa por Dos Puntos.]]
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|[[Image:Tool_Line_through_Two_Points.gif‎]]||[[Comentarios:Herramienta_de_Recta_que_pasa_por_Dos_Puntos|Recta.]]
 
|-
 
|-
 
|[[File:Tool_Slope.gif]]||[[Herramienta de Pendiente|Pendiente]]
 
|[[File:Tool_Slope.gif]]||[[Herramienta de Pendiente|Pendiente]]
 
|-
 
|-
|[[File:Tool_Angle.gif]]||[[Herramienta de Ángulo|Ángulo]]
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|[[File:Tool_Angle.gif|link=Comentarios:Herramienta_de_Cerca]]||[[Comentarios:Herramienta_de_Cerca|Ángulo]]
 
|-
 
|-
|[[File:Tool_New_Point.gif]]||[[Herramienta de Punto|Punto]]
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|[[File:Mode point.png|link=Comentarios:Herramienta_de_Refleja_Objeto_por_Punto]]||[[Comentarios:Herramienta_de_Refleja_Objeto_por_Punto|Punto]]
 
|-
 
|-
|[[Image:Tool_Perpendicular_Line.gif‎‎‎‎‎]]|||[[Herramienta de Recta Perpendicular|Recta Perpendicular]]
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|[[Image:Tool_Perpendicular_Line.gif‎‎‎‎‎]]|||[[Herramienta de Perpendicular|Perpendicular]]
 
|-
 
|-
|[[Image:Tool_Intersect_Two_Objects.gif‎]]||[Herramienta de Intersección de Dos Objetos |Intersección]]
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|[[Image:Tool_Intersect_Two_Objects.gif‎]]||[Referencia:Herramientas_3D_a_libro#Sobre_la_Intersección|Intersección]]
 
|-
 
|-
|[[Image:Tool_Show_Hide_Object.gif‎]]||[[Herramienta de Expone / Oculta Objeto|Expone / Oculta Objeto]]
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|[[Image:Mode showhideobject.png‎]]||[[Herramienta de Objeto (in)visible|Objeto (in)visible]]
 
|-
 
|-
|[[Image:Tool_Segment_between_Two_Points.gif‎]]||[[Herramienta de Segmento entre Dos Puntos|Segmento entre Dos Puntos]]
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|[[Image:Tool_Segment_between_Two_Points.gif‎]]||[[Herramienta de Segmento|Segmento]]
 
|-
 
|-
|[[Image:Tool_Move.gif‎]]||[[Herramienta de Elige y Mueve|Elige y Mueve]]
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|[[Image:Mode move.png|link=Comentarios:Herramienta de Elige y Mueve‎]]||[[Comentarios:Herramienta de Elige y Mueve|Elige y Mueve]]
 
|}
 
|}
  
 
===Determinar la pendiente  de las caras de las Pirámides===
 
===Determinar la pendiente  de las caras de las Pirámides===
A partir de la [[Herramienta de Imagen|imagen insertada]] en la [[Vista Gráfica]], se pueden:
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A partir de la [[:Categoría:Excluir_de_Impresión|imagen insertada]] en la {{vista|graf}}, se pueden:
*crear [[Archivo:Tool New Point.gif]] [[Herramienta de Punto|puntos]] en las posiviones adecuadas
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*crear [[Archivo:Mode point.png|link=Comentarios:Herramienta_de_Refleja_Objeto_por_Punto]] [[Comentarios:Herramienta_de_Refleja_Objeto_por_Punto|puntos]] en las posiciones adecuadas
*trazar cada [[Archivo:Tool Line through Two Points.gif]] [[Herramienta de Recta que pasa por Dos Puntos|recta]] que pase por los puntos indicados
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*trazar cada [[Archivo:Tool Line through Two Points.gif]] [[Comentarios:Herramienta_de_Recta_que_pasa_por_Dos_Puntos|recta]] que pase por los puntos indicados
 
*emplear la [[Archivo:Tool Slope.gif]] [[Herramienta de Pendiente|herramienta]] necesaria para establecer la pendiente en cada caso
 
*emplear la [[Archivo:Tool Slope.gif]] [[Herramienta de Pendiente|herramienta]] necesaria para establecer la pendiente en cada caso
 
*establecer el ángulo correspondiente a la inclinación de las caras de cada pirámide
 
*establecer el ángulo correspondiente a la inclinación de las caras de cada pirámide
Línea 105: Línea 106:
 
;
 
;
 
En particular, se puede apreciar el comportamiento de la poligonal trasladada una y otra vez con ''colorido dinámico'' dándole '''Animación Automática''' al punto de la cruz amarilla o, al menos, desplazándolo.
 
En particular, se puede apreciar el comportamiento de la poligonal trasladada una y otra vez con ''colorido dinámico'' dándole '''Animación Automática''' al punto de la cruz amarilla o, al menos, desplazándolo.
'''<center><ggb_applet width="500" height="400"  version="4.0" 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" />  </center>'''
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'''<center><ggb_applet width="500" height="400"  version="4.4" 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" language=es />  </center>'''
  
 
====Comentario====
 
====Comentario====
 
Quienes quieran validar sus cálculos a escala con los datos con los que efectivamente se cuenta, acaso quieran dirigirse a los enlaces en que se encuentra la información sobre las pirámides comparadas y estudiadas.
 
Quienes quieran validar sus cálculos a escala con los datos con los que efectivamente se cuenta, acaso quieran dirigirse a los enlaces en que se encuentra la información sobre las pirámides comparadas y estudiadas.
 
*[[:w:es:Chich%C3%A9n_Itz%C3%A1|Chichén_Itzá]]
 
*[[:w:es:Chich%C3%A9n_Itz%C3%A1|Chichén_Itzá]]
*[[:w:es:Teotihuacan|Teotihuacan|Pirámide_del_Sol_(Teotihuacan)]]  
+
*[[:w:es:Teotihuacan|Pirámide_del_Sol_(Teotihuacan)]]  
 
*[[:w:es:Pirámide_del_Sol_(Teotihuacan)|Pirámide_del_Sol]]  
 
*[[:w:es:Pirámide_del_Sol_(Teotihuacan)|Pirámide_del_Sol]]  
 
*[[:w:es:Kukulkán|Kukulkán]]   
 
*[[:w:es:Kukulkán|Kukulkán]]   
 
*[[:w:es:Templo_de_Kukulk%C3%A1n|Templo_de_Kukulkán]]
 
*[[:w:es:Templo_de_Kukulk%C3%A1n|Templo_de_Kukulkán]]
 
*[[:w:es:Gran_Pirámide_de_Giza|Gran_Pirámide_de_Giza]]
 
*[[:w:es:Gran_Pirámide_de_Giza|Gran_Pirámide_de_Giza]]
[[en:Tutorial:Practice Block III]]
 
[[it:Tutorial:Esperienza_pratica_III]]
 
 
[[Category:Tutoriales de Diseño]]
 
[[Category:Tutoriales de Diseño]]

Revisión actual del 20:29 12 ago 2020

Retomando desde Bloque de Prácticas

Diseño de un Taller de Centro Babbage

Resoluciones Gráficas de Sistemas de (In)Ecuacions

Un sistema de ecuaciones lineales puede quedar diseñado como un escenario para la resolución gráfica de modo tal que en cada caso se ingresen los valores correspondientes y sea posible representar ágilmente una variedad de problemas de tal tipo.

Pasos de Construcción

1 Como se anotarán dos funciones de formato m x + b, es preciso ingresar en primer lugar, desde la Barra de Entrada, cada componente necesario, empezando por...

  • m_1 = 1 b_1 = 3
  • m_2 = 2 b_2 = 1

... para terminar por:

  • m_1 x + b_1
  • m_2 x + b_2

Todo esto aparecerá registrado en la Vista Algebraica

Nota: Para que los valor de los parámetros de una y otra ecuación lineal aparezca representado como un deslizador en la Menu view graphics.svg Vista Gráfica, basta con tildar con un clic cada redondelito que lo encabeza en la Vista Algebraica.

2 Los valores de cada parámetro determinará la inclinación y la posición de la recta que representa la ecuación y para que todo sea más fácil de ser identificado, conviene darles los mismos colores contrastantes a los de una y otra ecuación.

Nota: En la figura se exponen...
  • los deslizadores a los que se les asignó orientación Vertical en la casilla correspondiente de la pestaña Deslizador del Cuadro de Propiedades,
  • el rótulo de cada ecuación de recta a la que, además, se les cambió en nombre por f_1 y f_2 respectivamente.

3 Se puede establecer, con la herramienta Tool Intersect Two Objects.gif, el punto de intersección entre una y otra función graficada.

Nota: Es conveniente activar la Barra de Estilo de la Menu view graphics.svg Vista Gráfica para agilizar cada una de las operaciones descriptas y, respecto del punto recién creado así como para cada ecuación, tener un modo sencillo de dejar expuesto del rótulo, específicamente el Valor o el Nombre y Valor.

4 Con la correspondiente herramienta Mode text.png, se puede establecer el texto en el lugar adecuado de la Menu view graphics.svg Vista Gráfica y anotar el texto estático: Solución: x = y seleccionar el nombre del punto de intersección del listado que se despliega a indicar Objetos.

Nota: Si se prefiriera identificar cada uno de los valores, se podría, en la caja de edición...
  • modificar la casilla que contiene el nombre del punto de intersección, digamos A para reemplazarlo por x(A) y
  • hacer nuevamente otro tanto para y(A).

5 Completar los detalles del texto dinámico y mejorar los del gráfico para que el escenario gráfico de resolución quede alistado para resolver toda una variedad de problemas.

Nota: Además de cuestiones casi cosméticas, es de importancia, darle a cada uno de los deslizadores un rango de valores y uno de incremento de modo que se puedan representar cada uno de los ejercicios que se destine a este encuadre de resolución gráfica.

6 Una propuesta adicional sería la de operar con inecuaciones.

Nota:

El par de inecuaciones que se ingresan por Barra de Entrada y también se establece su texto dinámico representativo correspondiente, son...

  • in_1: (y < m_2 x + b_2) ∧ (y > m_1 x + b_1)
  • in_2: (y > m_2 x + b_2) ∧ (y < m_1 x + b_1)
... como puede observarse en la figura, en la que además se aprecia que los sombreados respectivos son rayados con un ángulo de 0 y 90 grados.

7 Un desafío extra sería el de cuestionar cuál de las inecuaciones se vincula a los sectores sombreados a uno y otro lado del punto de intersección y si algún cambio en sólo uno de los deslizadores podría invertir esta correspondencia.

Lineales.PNG

8 Abriendo la Vista Gráfica 2 y cambiando allí la escala para que sea posible ver ambas a la vez, se pueden sumar propuestas como las derivadas de establecer...

... de modo tal que se pueda indagar qué valor presenta en cada caso.

Ñineales I.PNG
Bulbgraph.pngAtención: Es conveniente aumentar el tamaño de la pendiente para poder ver con claridad los cambios de valor y comportamiento.
Nota:
Un desafío adicional sería el de descubrir qué relaciones entre m_1 y m_2 desencadenan sucesivos inversos recíprocos de los valores de m_p (cuando el par de puntos E_x y E_X que determina la recta cuya pendiente m_p se analiza, se desplacen para ubicarse sobre las funciones que limitan la composición de inecuaciones).

9 Como puede apreciarse en el escenario en que se exponen ambas vistas gráficas, aparece sombreada con Estilo rayado verde, una franja delimitada por un par de funciones lineales paralelas que allí aparecen para dar una posterior consigna al respecto.

Nota:
En ocasiones conviene incluir en un mismo escenario puntas para la profundización de ciertos tópicos vinculados a los centrales. Sobre todo, para quienes, dentro de un grupo, suelan terminar antes y, antes de dispersarse, requieren encaminarse hacia nuevos retos.

Uno de ellos, podría ser cuestionar cómo lograr que esa franja verde rayada, resulte más ancha o angosta, por ejemplo.

10 Antes de guardar el boceto del escenario creado, es conveniente dejar anotadas en un archivo de texto asociado, la serie de ejercicios y problemas a resolver empleándolo.

Desafío Adicional Cuadrático

Con la misma serie de maniobras es posible, creando otros y diversos deslizadores, operar con problemas de encuentro incluso incorporando cuadráticas.

Bulbgraph.pngAtención: Una función puede anotarse en la Barra de Entrada empleando la sintaxis más conveniente en cada caso.
Para que cada nueva ingresada no tape la anterior, es conveniente anotarlas con distintos nombres o subíndices - f_1(x), g(X)... -.
Nota:
Se puede también ingresar una ecuación de una o dos variables de cada lado del signo igual.
Como 2 x + 3 = 5 y + 1 o, de mayor grado, 3 x² = 4 + y + 2 x.
Se establece así, cada uno de las funciones - 2x - 5y = -2 o y = 0.4x + 0.4 o X = (0, 0.4) + λ (-5, -2), según el formato escogido, en el primer caso y en el segundo;
3x² - 2x - y = 4 o y = 3x² - 2x - 4 x² o x² = 0.67x + 0.33y + 1.33 -.

Textos asociados a Objetos

Para que el texto de la Solución (cuando la haya única, la del punto de intersección de las representaciones lineales de las ecuaciones del sistema), no se aleje de A, se puede llevar adelante esta maniobra:

  1. Abrir el Cuadro de Propiedades del texto en cuestión y en la pestaña Posición seleccionar el punto 'A de la lista desplegable
  2. Anotar EstáDefinido(A) en el campo Condición'para Exponer el Objeto de la pestaña Avanzado.

Explorando las Pirámides

A partir de la información que se resume en la siguiente ilustración y en los sitios que tratan los temas correspondientes, es posible construir, a escala, el juego de triángulos que representa escuetamente a cada pirámide para contrastar, no ya sus alturas, las pendientes de sus caras.

Pirámides.PNG

Basta con conocer la operatoria básica y el manejo de las siguientes herramientas:

Tool Insert Image.gif Imagen
Tool Line through Two Points.gif Recta.
Tool Slope.gif Pendiente
Tool Angle.gif Ángulo
Mode point.png Punto
Tool Perpendicular Line.gif Perpendicular
Tool Intersect Two Objects.gif Intersección]]
Mode showhideobject.png Objeto (in)visible
Tool Segment between Two Points.gif Segmento
Mode move.png Elige y Mueve

Determinar la pendiente de las caras de las Pirámides

A partir de la imagen insertada en la Menu view graphics.svg Vista Gráfica, se pueden:

  • crear Mode point.png puntos en las posiciones adecuadas
  • trazar cada Tool Line through Two Points.gif recta que pase por los puntos indicados
  • emplear la Tool Slope.gif herramienta necesaria para establecer la pendiente en cada caso
  • establecer el ángulo correspondiente a la inclinación de las caras de cada pirámide

Desafío Adicional: Determinar la pendiente de las caras de cada pirámide en términos de porcentaje respecto de alguna de ellas que se tome como referencia.

Nota:
Para quienes completen la propuesta y requieran un reto de profundización, se puede sugerir:
  • indagar el tipo de triángulos que se establecen en la escalera NNE de la Pirámide de Kukulkán simulando el cuerpo de una serpiente durante los atardeceres equinocciales, los rayos de luz penetran por la esquina norte de los basamentos de la fachada ONO.
Serpenteando.PNG
  • estudiar el modelo que explica e ilustra este efecto serpenteante desde los siete triángulos isósceles obtusángulos en juego.
Isósceles.PNG

Trasladando Pirámides y Animando Escalinatas

Desde una de las imágenes de la Pirámide del Templo que se está explorando, se procede a el trazado de una poligonal que perfila la sombra de los triángulos y su traslación.
Como lo expone el Protocolo de Construcción, se le suma la animación de la secuencia de sombras triangulares que serpentean geométricamente un ascenso a todo color.

Procotocol.PNG

La aplicación que se presenta a continuación despliega los efectos en este escenario.

En particular, se puede apreciar el comportamiento de la poligonal trasladada una y otra vez con colorido dinámico dándole Animación Automática al punto de la cruz amarilla o, al menos, desplazándolo.

Comentario

Quienes quieran validar sus cálculos a escala con los datos con los que efectivamente se cuenta, acaso quieran dirigirse a los enlaces en que se encuentra la información sobre las pirámides comparadas y estudiadas.

© 2024 International GeoGebra Institute