[img]data:image/jpeg;base64,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[/img][br]Una recta es una línea que se extiende infinitamente en ambas direcciones. Es una figura geométrica fundamental en la geometría euclidiana y se define como la trayectoria más corta entre dos puntos. Las rectas son importantes en matemáticas y física, ya que se utilizan para describir y analizar las propiedades de las figuras geométricas y las relaciones espaciales.[br][br]Existen diferentes tipos de rectas, que se clasifican según sus características y propiedades. A continuación, se describen algunos de los tipos más comunes de rectas:[br][br][b]1. Recta horizontal:[/b] Una recta horizontal es aquella que se extiende en dirección paralela al horizonte o al eje x en un sistema de coordenadas cartesianas. En este tipo de recta, todos los puntos tienen la misma coordenada y, mientras que la coordenada x varía. Por ejemplo, la ecuación de una recta horizontal puede ser y = c, donde c es una constante.[br][img]https://encrypted-tbn0.gstatic.com/images?q=tbn:ANd9GcSN57qETySRFbckPd7mFyuc9bZyerD7RN_QQWpC1g9_0U6zEi7M3dBOXgCXdoY22KGgml4&usqp=CAU[/img][br][br][b]2. Recta vertical[/b]: Una recta vertical es aquella que se extiende en dirección perpendicular al horizonte o al eje y en un sistema de coordenadas cartesianas. En este tipo de recta, todos los puntos tienen la misma coordenada x, mientras que la coordenada y varía. Por ejemplo, la ecuación de una recta vertical puede ser x = c, donde c es una constante.[br][img]https://encrypted-tbn0.gstatic.com/images?q=tbn:ANd9GcQZaSgbxrVAZEEGtJy6V3MoDevtwg9IJ30O1G1SR6cmGiQ-TyOwjiTW1yw1hOcRHZx0SyM&usqp=CAU[/img][br][b][br]3. Recta inclinada:[/b] Una recta inclinada es aquella que no es ni horizontal ni vertical, sino que tiene una pendiente distinta de cero. La pendiente de una recta indica su inclinación o grado de inclinación con respecto al eje x. Puede ser positiva si la recta sube hacia la derecha o negativa si la recta baja hacia la derecha. La ecuación general de una recta inclinada es y = mx + b, donde m es la pendiente y b es el término independiente.[br][img]data:image/png;base64,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[/img][br][br][b]4. Recta perpendicular:[/b] Dos rectas son perpendiculares cuando se intersectan formando un ángulo recto de 90 grados. En un sistema de coordenadas cartesianas, dos rectas perpendiculares tienen pendientes que son negativas recíprocas entre sí. Por ejemplo, si una recta tiene una pendiente de m, entonces una recta perpendicular a ella tendrá una pendiente de -1/m.[br][img]data:image/png;base64,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[/img][br][br][b]5. Recta paralela:[/b] Dos rectas son paralelas cuando no se intersectan y tienen la misma pendiente. En un sistema de coordenadas cartesianas, dos rectas paralelas tienen ecuaciones de la forma y = mx + b, donde m es la pendiente y b es el término independiente.[br][br][img]data:image/png;base64,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[/img][br]Estos son solo algunos ejemplos de los diferentes tipos de rectas que existen. En matemáticas avanzadas, también se estudian otros tipos de rectas, como las rectas asintóticas, las rectas secantes y las rectas tangentes a una curva.[br][br]En resumen, las rectas son líneas infinitamente extendidas en ambas direcciones y se clasifican según sus características y propiedades. Los diferentes tipos de rectas incluyen las horizontales, verticales, inclinadas, perpendiculares y paralelas.

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[/img][br]Los ángulos son una medida de la separación entre dos líneas o planos que se encuentran en un punto común. Son una parte fundamental de la geometría y se utilizan para describir y analizar diversas formas y estructuras en matemáticas y física. Los ángulos se clasifican en diferentes tipos según sus características y propiedades.[br][br][b]1. Ángulo recto[/b]: Un ángulo recto es aquel que mide exactamente 90 grados. Es la forma más común de ángulo y se encuentra en muchas situaciones cotidianas, como las esquinas de un cuadrado o un rectángulo. Un ángulo recto se representa con el símbolo "⊥".[br][img]https://encrypted-tbn0.gstatic.com/images?q=tbn:ANd9GcRIqusKxoKyEtIbJkE5uMGLsSAwf8oSVjTxlQ&usqp=CAU[/img][br][b]2. Ángulo agudo[/b]: Un ángulo agudo es aquel que mide menos de 90 grados. Es decir, su medida está entre 0 y 90 grados. Los ángulos agudos son más pequeños que un ángulo recto y se encuentran en triángulos, polígonos regulares y muchas otras figuras geométricas.[br][img]data:image/png;base64,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[/img][br][b]3. Ángulo obtuso:[/b] Un ángulo obtuso es aquel que mide más de 90 grados pero menos de 180 grados. Es decir, su medida está entre 90 y 180 grados. Los ángulos obtusos son más grandes que un ángulo recto pero más pequeños que un ángulo llano (180 grados). Se pueden encontrar en triángulos, cuadriláteros y otras figuras geométricas.[br][img]data:image/jpeg;base64,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[/img][br][br][b]4. Ángulo llano:[/b] Un ángulo llano es aquel que mide exactamente 180 grados. Es la forma más grande de ángulo y se encuentra en situaciones donde dos líneas o planos están completamente alineados. Un ángulo llano se representa con el símbolo "∡".[br][img]data:image/png;base64,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[/img][br][b]5. Ángulo completo:[/b] Un ángulo completo es aquel que mide exactamente 360 grados. Es la vuelta completa alrededor de un punto y se utiliza en geometría circular y trigonometría.[br][img]data:image/png;base64,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[/img][br][br][b]6. Ángulos complementarios:[/b] Dos ángulos son complementarios si su suma es igual a 90 grados. Por ejemplo, si un ángulo mide 30 grados, su complementario medirá 60 grados.[br][img]data:image/png;base64,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[/img][br][br][b]7. Ángulos suplementarios:[/b] Dos ángulos son suplementarios si su suma es igual a 180 grados. Por ejemplo, si un ángulo mide 120 grados, su suplementario medirá 60 grados.[br][img]data:image/png;base64,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[/img][br][b]8. Ángulos adyacentes[/b]: Dos ángulos son adyacentes si comparten un lado y un vértice común, pero no se superponen. Los ángulos adyacentes pueden ser complementarios o suplementarios dependiendo de sus medidas.[br][img]data:image/png;base64,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[/img][br]Estos son solo algunos ejemplos de los diferentes tipos de ángulos que existen en geometría. La clasificación de los ángulos es importante para comprender las propiedades y relaciones entre las diferentes formas geométricas y para resolver problemas matemáticos y físicos.

En conclusion, la relación entre rectas y ángulos es estrecha y fundamental en la geometría. Los ángulos se forman cuando dos rectas se intersecan o se cruzan, y existen diferentes tipos de ángulos dependiendo de su medida y posición relativa. Además, las rectas perpendiculares y paralelas también tienen una relación importante con los ángulos debido a las propiedades geométricas que presentan.