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Conceptos Fundamentales de la Geometría

JOS GABRIEL ECHEVERR A VILLAG MEZ, Oct 20, 2024

La unidad "Conceptos Fundamentales de Geometría" explora los elementos esenciales de la geometría, incluyendo puntos, líneas, semirrectas, segmentos y semiplanos. Se centra en las relaciones de paralelismo y perpendicularidad, proporcionando una base sólida para entender la estructura del espacio.

Punto
1. Punto
2. Determinación Geométrica del Punto
3. Actividad
Plano
1. El plano
2. Semiplano
3. Creación de Semiplanos
Polígonos
1. Poligonal
2. Crear una poligonal
3. Polígonos
Áreas de Cuerpos Geométricos
1. Calculo del área de cuerpos geométricos
2. Reforzando Conceptos y Cálculo del área
3. Construyendo polígonos, calculando su área.
4. Evaluación
Triángulos
1. Introducción a los Triángulos
2. RAZONES Y PROPORCIONES
3. Teorema de Thales
4. Semejanza de Triángulos
5. Teorema de Pitágoras

1.

Punto

1. Punto
2. Determinación Geométrica del Punto
3. Actividad

1.1.

Punto

EL PUNTO

[b]¿Qué es el punto en la geometría?[br][br][/b]El punto en la geometría es uno de los entes fundamentales de la geometría junto con la recta y el plano, solo es posible describirlos en relación con otros elementos similares o parecidos. [br]Un punto se define como una ubicación en cualquier espacio.[br]EL punto se representa como [img]https://cdn-blog.superprof.com/blog_all/wp-content/uploads/latex/0e05769a97533713a887147dd1a1c536757cf762.png[/img]. [br]El punto [b]no tiene dimensión, longitud, área, volumen, ni otro ángulo dimensional. [/b][br]El punto marca el comienzo para dibujar cualquier figura o forma.[br] El punto suele escribirse con letras mayúsculas.[br][br][u]Datos Curioso sobre el punto[br][list][*]Hay infinitos elementos llamados puntos.[/*][/list][/u] [img]https://cdn-blog.superprof.com/blog_ressources_es/wp-content/uploads/2019/07/puntos.gif[/img][u][br][list][*]Una recta comprende infinitos puntos.[/*][/list][/u] [img]data:image/png;base64,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[/img][u][br][list][*]Entre dos puntos de una recta están comprendidos infinitos puntos.[/*][/list][/u] [img]https://cdn-blog.superprof.com/blog_ressources_es/wp-content/uploads/2019/07/puntos-2.gif[/img][u][br][list][*]Por un punto del plano pasan infinitas rectas.[/*][/list][/u] [img]https://cdn-blog.superprof.com/blog_ressources_es/wp-content/uploads/2019/07/puntos-3.gif[/img][u][br][list][*]Dos puntos determinan una recta.[/*][/list][/u] [img]https://cdn-blog.superprof.com/blog_ressources_es/wp-content/uploads/2019/07/puntos-4.gif[/img][u][br][list][*]Tres puntos no situados en una recta determinan un plano.[/*][/list][/u] [img]https://cdn-blog.superprof.com/blog_ressources_es/wp-content/uploads/2019/07/puntos-5.gif[/img]

1.2.

1.3.

2.

Plano

1. El plano
2. Semiplano
3. Creación de Semiplanos

2.1.

El plano

[b]Es un elemento geométrico sin volumen y formado por un número infinito de rectas y puntos. [/b][br][br]También existen otras maneras de definirlo: [br] a) tres puntos no alineados, [br] b) una recta y un punto exterior a ella.[br][br]Si una recta divide a un plano obtenemos dos partes que llamamos [b]semiplanos.[/b] [br][br]Si deseas comprobar si una superficie es plana o no, solo tienes que colocar una regla encima: Si esta toca todos sus puntos en cualquier dirección, podemos afirmar que la superficie es plana. [br][br]Al plano se lo suele nombrar con una letra del alfabeto griego.[br][br]El plano tiene dos dimensiones: largo y ancho:[br][img width=295,height=166]https://i0.wp.com/www.aulafacil.com/matematicas-basicas/geometria/curso/geometria25.jpg[/img][br][br]En el plano podemos dibujar puntos, líneas, etc.[br][br][u][br][br]Datos Curiosos del Plano:[br][br][/u][list][*][i]Si sobre un plano o superficie plana dibujas una recta, todos sus puntos están contenidos en dicho plano o superficie plana.[/i][/*][/list][i][br][/i][list][*][i]Un plano puede contener infinitas rectas.[/i][/*][/list][i][br][/i][list][*][i]Por una recta pueden pasar infinitos planos[/i]:[/*][/list][img width=266,height=191]https://i0.wp.com/www.aulafacil.com/matematicas-basicas/geometria/curso/geometria27.jpg[/img][br][i] Por la recta[/i][i] [/i][i]r[/i] (en color negro) [i]pueden pasar infinitos planos.[/i]

2.2.

2.3.

3.

Polígonos

1. Poligonal
2. Crear una poligonal
3. Polígonos

3.1.

Poligonal

Las poligonales son varios segmentos de rectas unidos.[br][br][u]Clasificación[/u][br]Las líneas poligonales se pueden clasificar en abiertas y cerradas.[br][list][*]Una línea poligonal [b]es abierta[/b] cuando los extremos no coinciden en el mismo punto. Es decir, si trazamos la línea empezando por uno extremo terminamos de dibujarla terminando en otro punto diferente.[br][br][/*][/list][br][list][*]Una línea poligonal es [b]cerrada[/b] cuando los extremos sí coinciden en el mismo punto. Es decir, empezando a dibujar la línea en un punto, podemos terminar de trazarla terminando en el mismo punto.[br][/*][/list] [br][br] 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[/img]

Marca la respueta que indica que tipo de línea poligonal son las siguientes figuras:[br][img]data:image/png;base64,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[/img]

Abierta Cerrada

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[/img]

Cerrada Abierta

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[/img]

Abierta Cerrada

[img]data:image/png;base64,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[/img]

Cerrada Abierta

3.2.

3.3.

4.

Áreas de Cuerpos Geométricos

1. Calculo del área de cuerpos geométricos
2. Reforzando Conceptos y Cálculo del área
3. Construyendo polígonos, calculando su área.
4. Evaluación

4.1.

Calculo del área de cuerpos geométricos

Concepto de área como medida de la extensión de una superficie expresada en unidades de medida denominadas unidades de superficie

Calculo del área de cuerpos geométricos

[br][br]Área[br]En matemáticas, “Es la medida de la región o superficie encerrada por de una figura geométrica… En la Geometría: se le atribuye a la superficie comprendida dentro de un perímetro: el área de un cuadrado…” (EcuRed, s.f.), agrega “El área es la superficie comprendida dentro de un perímetro(en geometría) y se expresa en unidades de medidas que son conocidas como superficiales”.[br]

4.2.

4.3.

4.4.

5.

Triángulos

1. Introducción a los Triángulos
2. RAZONES Y PROPORCIONES
3. Teorema de Thales
4. Semejanza de Triángulos
5. Teorema de Pitágoras

5.1.

Introducción a los Triángulos

Introducción

Los triángulos son figuras geométricas fundamentales en la matemática y la geometría, caracterizados por tener tres lados y tres ángulos. Su simplicidad estructural les confiere una gran estabilidad, lo que los convierte en elementos esenciales en diversas aplicaciones prácticas. Desde la arquitectura hasta la ingeniería, los triángulos se utilizan para soportar cargas y crear estructuras robustas. Además, en la navegación y el diseño gráfico, juegan un papel crucial al ayudar en la visualización y el análisis de datos. Comprender los triángulos no solo es clave en la teoría matemática, sino que también tiene un impacto significativo en numerosas disciplinas del mundo real.

Los Triángulos

Evalúa tus conocimientos

¿Cuál de los siguientes triángulos tiene todos sus lados de diferente longitud?

Triángulo rectángulo Triángulo escaleno Triángulo isósceles Triángulo equilátero

¿Qué tipo de triángulo tiene un ángulo recto?

Triángulo obtusángulo Triángulo rectángulo Triángulo equilátero Triángulo acutángulo

0

Conceptos Fundamentales de la Geometría

Table of Contents

Punto

Punto

EL PUNTO

Plano

El plano

El plano

Polígonos

Poligonal

Poligonal

Áreas de Cuerpos Geométricos

Calculo del área de cuerpos geométricos

Concepto de área como medida de la extensión de una superficie expresada en unidades de medida denominadas unidades de superficie

Calculo del área de cuerpos geométricos

Triángulos

Introducción a los Triángulos

Introducción

Los Triángulos

Evalúa tus conocimientos

Information