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1. Partes del polígono<img src="https://www.mundoprimaria.com/wp-content/uploads/2020/03/PartesDeLosPoligonos.png" alt="? Tipos de Polígonos ?Clasificación y Propiedades?" width="500" height="363" style="width: 500px; height: 363px;">2. Clasificación de polígonos según el número de lados Partes del polígono <img src="https://2.bp.blogspot.com/-nongBk4NfJY/WmiAH27npXI/AAAAAAAAC7E/rkFnpyk7CpkIednEtX5vw9bBuGrzP15AwCLcBGAs/s1600/poligonoslados22.jpg" alt="Mi clasecitanueva.: Los Poligonos | Videos Educativos para Niños" width="454" height="269" style="width: 454px; height: 269px;"> 3. Polígono regular: Cuando todos sus lados y ángulos internos son iguales.<img src="https://matematicasparaticharito.files.wordpress.com/2015/09/poligonosreg1-1.png" alt="Polígonos regulares. Perímetro y área | matematicas para ti" width="406" height="325" style="width: 406px; height: 325px;"> Polígono irregular: Cuando sus lados y ángulos internos no son iguales, sino diferentes.<img src="data:image/png;base64,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" alt="Polígonos irregulares | Unidad: Polígonos" width="438" height="168" style="width: 438px; height: 168px;">

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