Mediante la Aplicación dinámica de las herramientas de Geogebra realizar la demostración de que dos ángulos y un lado son congruentes con respecto a otro triángulo.

Congruencia de triángulosSe denomina [b]ángulos congruentes[/b] a aquellos [url=http://es.wikipedia.org/wiki/%C3%81ngulo]ángulos[/url] que tienen la misma medida.Los [url=http://es.wikipedia.org/wiki/%C3%81ngulos_opuestos_por_el_v%C3%A9rtice]ángulos opuestos por el vértice[/url] son un ejemplo de ángulos congruentes. Las diagonales de un [url=http://es.wikipedia.org/wiki/Paralelogramo]paralelogramo[/url] configuran ángulos opuestos por el vértice congruente.La [b]congruencia de triángulos[/b] estudia los casos en que dos o más[url=http://es.wikipedia.org/wiki/Tri%C3%A1ngulo]triángulos[/url] presentan [url=http://es.wikipedia.org/wiki/%C3%81ngulo]ángulos[/url] y lados de igual medida o congruentes.Dos triángulos son congruentes si sus lados correspondientes tienen la misma longitud y sus ángulos correspondientes tienen la misma medida.Si el triángulo ABC es congruente al triángulo DEF, la relación puede ser escrita matemáticamente así:[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJAAAAAQCAIAAAB2lGE3AAADWUlEQVRYhe1YwZEcIQzUgydvAlAEhEAIxEAMEwVBEAZREAdp4Id8mAOkYeZ8ZVfZerJaRt0tJAG0ndVat+v/lP2dJMB21RgTQjjfpZSCiNufaq3OOa01ABhj3IdZaxExpcT9y3uPiNZa55z3vpTSWnPOCWHUWnPOAtGPNJBJ4HAhIiLmnE+cnXPGGAAg9gSuaPG6ro1gMUba6Bye9x4ABP+UEgBM8sQYKYg1AKVUjHFcDCGEEAD2GUYOAKCUAgBOV+/9PZiPGE5I2OLKOWutV7HJecJF/saYWzdK3A1+ijLGeA6P0kTIxy2w/sdxhVScMpTMWssJFmNERCK35ykdyjGGNTkERCckcLhKKSvpnBLtc+WQ3Wb813V13g8PWc75ui6llNaa8+GAOecAoDNba1VKceej1soJZq2dVuiYdoUo6w9rxjkJHK7WmvdeKbU6b5UYM0lwCyHM+EfSU0orEdvIqOWM1E/GAdNaj1+ksrY9XmRcp9xqTKWG6qRSiuuXq52TIAi28r6u9LQopfS0WN06q7Ng3vupaCAip0E3IivnDABcAdkCWwvXWiEn42qacAhKKUIGrPaIBEEwqgej2JMStdZtKgi6tnFKrLWOrY8s58wldd+9b621norAFIRz7vowmqYmomlkED7HGQ0IsslAyJ6SIAjWWqNhb3JGRJr9lFLbbSfBSilj/fjFjnNuWzettUIxGfeiqrhNZ26aGttM+4Jgv8uekvBCsMMT1nWdht6f7JRS1sy6/al97vZUFbfthAM2Na3bkvit9oKEr5TE9rnWdRKOTpi1Vij0XN7RMD1eA6m9nwOj8bcHdDt0PLrOP7UXJAiCUfqOAQvTRBug3few20ZVa92O7OuJJsZXALJgfR95rG+8YF/vYe9IkMf66TFBmNdrrb01CG6NBDsZBUMI0+xE99P1w1MdkIFd1zU9dggX55zz+Wj+1N6RwOGizNs6c/ewvsmNYCkl+YGu25RfIYQtfYi49qEtsFKKUmrtDdunqZTS99XD1yRwuLTW6w2HU4J46OlyIxgiaq1v64kxpqcMVQ8A0FpP+1Ibo+mIIqaDSNPE+qDJ3dv64y85e++/72y11l6QwOGi68oUrfD4S0xSio97aq3pFjSF+idn6P/2wn4Ave7LNbRMNkoAAAAASUVORK5CYII=[/img][br]En muchos casos es suficiente establecer la igualdad entre tres partes correspondientes y usar uno de los siguientes criterios para deducir la congruencia de dos triángulos[br][br][b]Criterio (A, L, A)[/b][b][br][/b]Dos triángulos son congruentes si tienen dos ángulos correspondientes y el lado comprendido entre ellos congruentes.[img]data:image/png;base64,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[/img]