En un polígono convexo, en cada vértice definimos dos ángulos: interior o interno y exterior o externo.[br][br][br][img 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[/img][br][br]Podemos comprobar con una construcción como la siguiente que la suma de los ángulos interiores de un polígono convexo es igual 180⁰ (n-2), siendo n el número de lados.[br][br]A partir de un polígono convexo dibujando las diagonales que parten de uno de los vértices, se pueden construir triángulos.[br][br][img width=255,height=193]data:image/png;base64,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[/img][br][br]Se construirán n-2 triángulos, siendo n el número de lados del polígono.[br][br]En el ejemplo anterior, en el pentágono hemos construido tres triángulos.[br][br]Sabemos que la suma de los ángulos de un triángulo es 180⁰, por lo que la suma de los ángulos de los tres[br]triángulos construidos será 3x180⁰.[br][br]El valor tres se ha obtenido como 5 ados – 2, por lo que la expresión de la suma de los ángulos interiores de un olígono será 180⁰(n-2), siendo n el número de lados del polígono.[br][br]Se puedes realizar una construcción imilar para otros polígonos. [br][br]En un polígono regular podemos dibujar también el ángulo central.[br][br][img width=186,height=184]data:image/png;base64,/9j/4AAQSkZJRgABAQEAYABgAAD/2wBDAAoHBwgHBgoICAgLCgoLDhgQDg0NDh0VFhEYIx8lJCIfIiEmKzcvJik0KSEiMEExNDk7Pj4+JS5ESUM8SDc9Pjv/2wBDAQoLCw4NDhwQEBw7KCIoOzs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozv/wAARCAC4ALoDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD2aiiigAooooAKKKKACiiigAooooAK5zxfb2122jW95GklvJqKiRH+6R5b9a09b1m10DSptRvC3lRY+VBlmJOAAPUmuc0TxXofjqZ9MvNL2yRjzkhuQrq4HGQR3GenvQBd0aC10/xTdWGk7VsRaLJLFG2UilLEDHoSvUe1dNVax0+y02HybG1htoyclYkCgn8Ks0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUlLSUAFNlljhiaWWRY0QZZmOAB7mq19qUFiqht0k0nEcMYy7n2Hp7ngVnC0nv5Fn1Ta207o7VTmOM+p/vt7ngdqly6IpRvqyjrto/jLTXsV3WtixDrcOmZJGByCqnoue569vWsfw54Gu/DN6dUjvoby6VSiwmMohQ9eckhuOvSu0oqde5enYdp+pwagGVd0U8fEsEgw8Z9x6e44NXKyLuwjuykm5obiP8A1c8fDp/iPY8UW2rSW8q2uqqsUjHbHcLxFMfT/Zb2P4GmpdyXG+sTYopKWrICiiigAooooAKKKKACiiigAooooAKKKKACkNFRXN1BaQNPcSrFGvVmNAEtZNzq0k8r2ulqssinbLcNzFCfT/ab2H4kVFI91rAw/mWdif4Adssw9z/Avt1PtVuKKOCJYoUWONBhVUYAFZtt7GiiluQWllHalpC7TXEn+snk5d/8B7DirNFFFg3CiiimAUyWKOeJoZo1kjcYZGGQRT6KAKMb3ejD92JLyxH/ACzJ3Swj/Z/vr7dfrWvbXUF5As9tKssbdGU1WqlNZSRXDXmnSLBcNzIjD93N/vDsf9oc/Wkm0DSl6m3S1n2Gqx3jtbyxtbXaDLwOeceqn+Ie4/Sr+atO5DTWjFopKWmIKKKKACiiigAoprMEUsxwFGSax7XxfoN7PFDbX4keZgsYET4YnpzjFAG1RTSQASTgCsefU7jUGMGlMEiBw96wyo9ox/EffoPek2kNRbLV/qsVnItvGjXN24ykEZ5x6sf4V9z+tVIrKSWdbvUJFnuF5jVR+7h/3R6/7R5+lS2llBZIyxAlnOZJHO55D6se9T1Gr3NNFsFFFFMQUUUUAFFFFABRRRQAUUUUAQXdlBeoqyghkO6ORDteM+qntUUOpz6cwh1YhoScJeqML7CQfwn36H2q5SMoZSrKGVhggjIIpW6od+jL6kEAg5B7ilrASG60g7rAGe0/isyeU94yf/QTx6YrVsb+31CDzreTcucMCMMh7hh1B9qpSvoQ421LVFJS1RIUVQ1LXNM0got/eJC0gyqnJJHrgc496njv7OaJZY7qFkcBlYSDBB6GgB1zk2soHUo38q4fwpqENraaZFLreqNIkKobFrIhA23G3d5eeO3zdqw5Pi5qX9otLDYWpsC2ER9wkK5wGLZxnvjHtXoNrZPFK1zdXDXN2wwZDwqj+6q9h+p71LdikrkTR3Wr/Nfqbe0P3bMH5n/66Ef+gjj1zV5VCqFUAKBgADAApaKmxbYUUUUxBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABVS5sN8/2u0lNteAY81RkOPR1/iH6jsat0UmrjTsR2Or+ZOLO9jFteY4XOUlHqjd/p1FaWeKzLq1gvYDDcRh0JyOxU9iD1B9xXG+KfGmseFbqLSrYwXbvGJVuLlSWVMkBSARuPHX9Kab2ZMkt0dBNdR6J4l1C91CCdobuGIQTRwtIBtBBj+UEjJ59DmoE0+1mRZV8FxhXAYBzGrYPqOx9qu+DPEjeJ9D+2ywLDPHIYZVQ/LuAByPYgiugqyDhtX8C6FZarBraW77PtatPAX/AHQ3HG7b2wxBxnHtXVnrUuoWi3+n3Fo3SaMrn0JHB/Os/TblrvToJnGJCu2Qejjhv1BqHuaL4S1RRRQAUUUUAFFFFABRRRQAUUVU1LU4NLiieeOeQzSiKNIIzI7MQTjA9gaALdFVrK9W+jZxbXVvtbbtuYTGx9wD1FWaACiiigAooooAKKKKACue8R+HNP8AE2qafaXKOsiK8jzRNtdYxxtz0wWI6jsa6Gq2kL9o1G/viON4toj/ALKfe/NifypdUh9Gy1pGkWWh6dHYWEXlQpk8nJYnqSe5NXqSlrQyErEtl+y6vf2fRZCLqP6Nw3/jwz+NblZGsr9nvLG/HRZDBL/uvwP/AB4L+dRLa5cN7FiiiigYUUUUAFFFFABRRRQAVk+INPk1E6ZEom8tb5XleFyjRqEcbtw5HJA/GneJL4WOg3TCRknmQw2/l/faRhhQvvmuZ8BWt/4evbjSdXlxJdqs1sokLoxAO/BP8XIyPxouS2tjs7OzjsbfyI5J5FyW3TzNI3P+0ecVPRRQUFFFFABRRRQAUUUUAQX10LKwnuSM+UhYD1PYfnirWlWZsdMt7ZuXRBvPqx5Y/mTWdfL9pvrGxHIeXzpf9yPn9WK1uUR3uEtkgpaKKszCqmp2Yv8ATbi1zgyIQp9G6g/gcVbpKTV9Bp21MmwuTeWEFyRhpEBYejdCPzBqxVK0X7LqN9ZdhILiMf7L9f8Ax4N+dXahbGj3CiiimIKKKKACkd0jjaSRgqICWYnAA9aWud8Rpd6vnTrJPOtoWDX6q20yDqIgfXoT7cd6T0E3ZXItP3+INTXW51K2keV0+Jh2PBlI9T29B9aoNd3XiJ7aE28Vr5sT3tlco5LxbGCrkepJ5HTBxWxDrVguI5HNo6ceXOuzb+fFU4I/Dmm3f2yG5VZQGCgXBcKrclQueBnnA71m2c8ndqzNjQtWOqWbCZBDeW7eXcw5+447j2PUH0NaVcoTeSatHrWm2UqxxJtuS42/aIvRV6lh1B+o711MU0dxCk0Lh45FDIw6EHoatO5vF3Q6iiiqKCiiigAooqK7uVs7Oa5fpEhfHrgdKARHpa/adWvr08rHi1j/AOA8t/48cf8AAa16paPatZaVBC/+s27pD6u3LfqTV6nFaEyd2FFFFUSFJS0UAZGrL9n1GxvRwrMbaT6Nyp/76A/OrFO1a0N9pdxbr99kzGfRxyp/MCq9nci8sobkDHmoGx6HuPzzWezNFrEmooopgFFFRXNzDZ20lzO22OMZY4yfoB3J6CgCDULuSBY7e1Aa8uCVhB6L6ufZRz78DvUtnaR2NqtvESQMlnb7zseSx9yeag062m3SX14u27uAPk6+Sn8MY/mfU/QVeoAZJFHKMSRo4/2lBpkdnaxHMdtEh9QgqailYVkFZi40i+EXSxvJP3fpDKf4fZW7eh471p1HcW8V3bSW86b4pF2sP896YySiqGm3Eyu+nXjbrm3AKyH/AJbx9A/17H3+tX6ACiiigAqlfr9puLKwHSabfJ/uJ8x/M7R+NXaraav2jWby6P3bcC2j+v3n/UgfhSeug1pqa9LRRWhkFFFFABRRRQAhrDsVFteX1h0Ecvmxj/Yfn9G3CtysjU1+z6tY3Y4WXdbSfj8yfqCP+BVEu5cOxZooooGFZkX/ABN78XHWxtHPkjtNKOC/uq9B75PYU/UJJLucaVbuVaRd1zKp5ijPYH+83QegyavRxpDEkUSBI0UKqqOAB0FADqKKKACiiigAooooAp6jZyXMcc1swS7tzvgY9Ce6n/ZYcH8D2qWyu0vrVZ0UoclXjb70bDqp9wanrMvc6ZdHVEBNu4C3iAdB0Eo9x0Pt9KANOigEEAgggjII70UAR3E6WttLcSH5IkLt9AM0/RLZ7XSoFl/1rgyS/wC+x3H+dUtSH2h7SwHP2mYbx/0zX5m/kB+NblC3CWkbC0UUVZmFFFFABRRRQAlUdZtmvNJnijH71V3xH0dfmX9QKtzTJbwSTSsFjjUszHsAMmuB8B+Jp9Q124hur24n/tCE3UUcyOogIcgxruGCNhQ8ZHBraGHlVpymtkHNZo661uEu7SG5T7sqBx7ZFR3959itwyJ5s8jbIIs8yOeg+ncnsAar2MkVhJe2MsiRrayNIm4gYib5s/QHcPwosI3u5zqlwhUspW1jYcxxnuR/ebqfQYHrXKtjV7liws/scBDv5s8reZPLj77nqfYDoB2AFWaKKYgooooAKKKKACiiigAoIBBBAIPBB70UUAZVkf7KvV0uQn7PLlrJz/DjkxE+3VfbjtWrVe+so9QtGt5Sy5IZJF+9Gw5DD3Bqva6nttJjqBSK4s+LgZwG4yGX2Ycj8R2oAmsF+067dXB5S0jFun+8fmf/ANlFbFZ2hW7w6TE0oxNOTPL/ALznP6ZA/Csuz8d6ZeGB/smpQW9xII4rqa0KwsxOAN3Tk8CtKVOco3irkzaudNRSUtIkKKKKACiiigCtqFjDqVhPY3G7yZ0KOFYqSD1GRUc2lWk01jM0ZV7BiYChxtyu0j3GO3sKKKpSktEwPBPFmleJ7jx3eLJa3k15LcH7MyIxUpn5Np6bQMfTvXtUNp4j8mPzbnTjJtG8+U/XHP8AFRRXbjavtoUk0lZdNPvJpvlbH/ZPEH/Pzp3/AH5f/wCKo+yeIP8An507/vy//wAVRRXncqNedh9k8Qf8/Onf9+X/APiqPsniD/n507/vy/8A8VRRRyoOdh9k8Qf8/Onf9+X/APiqPsniD/n507/vy/8A8VRRRyoOdh9k8Qf8/Onf9+X/APiqPsniD/n507/vy/8A8VRRRyoOdh9k8Qf8/Onf9+X/APiqPsniD/n507/vy/8A8VRRRyoOdh9k1/8A5+dO/wC/L/8AxVeT/FXTPEL6/BNdwtcWzQKkL2sTFAcnKkcnOeefwooruy+p7HERmknvvqjOpJyjY9R8BRarB4M0+PWfMF2qHIl++Fydob3xiuM0TRb5LfSrZdJ1uO+t7pHlN3IfsSqHJYhCxH3emB15oorSjXlH2jS31/P/ADJa2PVBS0UV55YUUUUAf//Z[/img][br][br]Fácilmente podemos deducir que la suma e los ángulos centrales siempre es igual a 360⁰ ya que corresponderá a una circunferencia completa.[br][br][img width=190,height=188]data:image/png;base64,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[/img][br][br]En un polígono regular de n lados, la medida del ángulo central será 360⁰/n, siendo n el número de lados.[br]