Un polígono es una figura plana y cerrada, limitada por segmentos. Para considerar polígono a una figura, ésta debe cumplir la regla de que sus [url=https://www.smartick.es/blog/matematicas/geometria/lineas-rectas-y-lineas-curvas/]l[/url]íneas siempre deben ser rectas.[br][br][u]Elementos de un polígono[/u][br]Un polígono tiene los siguientes elementos:[br][list][*]Lados: son los segmentos que delimitan el polígono.[/*][*]Vértices: son los puntos donde se unen dos lados.[/*][*]Ángulos: son los ángulos que forman los lados.[/*][*]Diagonales: son los segmentos que unen dos vértices no consecutivos. [/*][/list] [u]Dato Curioso[/u]: Un triángulo no tiene ninguna diagonal.[br][br] 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[/img][br][br][br][u]Clasificación de los polígonos[/u][br][b]Polígonos regulares:[br][/b]Un polígono es regular si todos sus lados y todos sus ángulos son iguales.[br]Ejemplos de polígonos regulares[br][img width=500,height=200]https://www.smartick.es/blog/wp-content/uploads/2024/10/poligonos_regulares.png[/img][br][br][b]Polígonos irregulares:[br][/b]Un polígono es irregular cuando no todos sus lados ni sus ángulos son iguales. [br]Los polígonos irregulares pueden tener lados de diferentes longitudes y ángulos de distintas medidas.[br]Ejemplos de polígonos irregulares[br][img width=500,height=200]https://www.smartick.es/blog/wp-content/uploads/2024/10/poligonos_irregulares.png[/img][br][br][br][u]Nombre que reciben los polígonos[br][/u]Los nombres que reciben los polígonos según su número de lados son:[br][list][*]Triángulo ➜ 3[/*][*]Cuadrilátero ➜ 4 (si el cuadrilátero es regular recibe el nombre de cuadrado)[/*][*]Pentágono ➜ 5[/*][*]Hexágono ➜ 6[/*][*]Heptágono ➜ 7[/*][*]Octágono ➜ 8[/*][*]Eneágono ➜ 9[/*][*]Decágono ➜ 10[/*][*]Hendecágono ➜ 11[/*][*]Dodecágono ➜ 12[/*][*]Tridecágono ➜ 13[/*][*]Tetradecágono ➜ 14[/*][*]Pentadecágono ➜ 15[/*][*]Hexadecágono ➜ 16[/*][*]Heptadecágono ➜ 17[/*][*]Octadecágono ➜ 18[/*][*]Eneadecágono ➜ 19[/*][*]Icoságono ➜ 20[/*][/list][br]