[color=#000000]GeoGebra no dispone de un comando para dibujar un diagrama de sectores, por lo que la única opción será dividir la circunferencia en sectores para representar los valores.[/color][br]Por ejemplo, si queremos representar en un diagrama de sectores los datos 3, 4, 7, 11 y 15, el  proceso sería el descrito a continuación.[br]En total, la suma de los datos es 3 + 4 + 7 + 11 + 15 = 40.[br]Comenzaremos dibujando una circunferencia, por ejemplo la que tiene centro en el origen de coordenadas y radio 3 unidades. Como la circunferencia abarca un ángulo de 360º, tendremos que determinar los grados que corresponderán a cada uno de los valores anteriores.[br]Para obtenerlos bastará con realizar una regla de tres considerando que 360º corresponden al total de los datos (40).[br]Si lo deseamos podemos aprovechar las opciones que ofrece la hoja de cálculo de GeoGebra.[br][br][img 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[/img][br][br]En este caso, hemos incluido en la celda A7 la fórmula [b]Suma(A2:A7) [/b]para obtener la suma de todos los datos.[br]Y en la celda B2 hemos incluido la fórmula para obtener los grados que corresponden al dato que aparece en la celda A2. La expresión de la fórmula es 360*A2/40.[br]A continuación, repetimos esta fórmula en el resto de celdas de la columna B arrastrando para completar.[br]

Una vez obtenidos los grados que corresponden a cada dato, basta con trasladar estos ángulos a la circunferencia.[br]Antes dibujamos el punto de origen de los sectores que en nuestro ejemplo, puede ser el punto B de corte de la circunferencia con el eje X.[br][br][img 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[/img][br][br]Para trasladar el primer ángulo cuyo valor se encuentra en la celda B2, utilizamos la herramienta [b]Ángulo dada su amplitud[/b] [url=https://wiki.geogebra.org/es/Herramienta_de_%C3%81ngulo_dada_su_amplitud][img width=24,height=24]data:image/png;base64,R0lGODlhGAAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAMAAgASABQAhQAAAAAAAAQAABEAAAwAABkZHQAAERsXHRoXHBoWGxsXGxkVGQAAHwAAPQAAPAAAMhUCMAAALAAAOgICNgAAPgAAOAAANQAAJAAARggAVQ8BRgICQgAAcwAAZQAAjwAAuQAArAAAzAAA+wAA/y4AAD8AADIAADQAACYAJloRE18QE1gRE2AAAHoAAHkMEWIQE3sND2oREXEAIYoAAIMMD4AICMAAANAAAMYGBv8AAPsAAAECAwECAwECAwECAwECAwZXQIBwSCwaj4CSjYU8tnI3U7N4mpWm2Kx2yz3mclwwmDg2ls+A8hDNHmIysqK6KBpp0vj58PEJQVIqNFkRRS8rMF1CBwAJABMcHVsLGyMjFFsVIB5dF0JBADs=[/img][/url].[br]Una vez seleccionada la herramienta marcamos el punto B, a continuación el punto A y en el cuadro de diálogo que aparece escribimos la posición del valor que deseamos trasladar, en este caso será la posición de la celda que es B2.[br][br][img width=273,height=140]data:image/png;base64,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[/img][br][br]Obtendremos un punto B’ que corresponde a la rotación del punto B el ángulo de 27º alrededor del centro de la circunferencia. Podemos observar que también aparece la medida del ángulo.[br][br][img width=248,height=223]data:image/png;base64,/9j/4AAQSkZJRgABAQEAYABgAAD/2wBDAAoHBwgHBgoICAgLCgoLDhgQDg0NDh0VFhEYIx8lJCIfIiEmKzcvJik0KSEiMEExNDk7Pj4+JS5ESUM8SDc9Pjv/2wBDAQoLCw4NDhwQEBw7KCIoOzs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozv/wAARCADfAPgDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD2aiiigAooooAKKKKACiiigAooooAKKKKACioprmC3XdPNHEvq7BR+tZd94m0+CHNrdW9xITgASEqPclQT+QNAEnib/kX7n/gH/oYrVrkNV8V6bf8AhQzZlRrgJhRC7DO4cZC4rcbxFpa/fuHT/ehcfzFAGnRWfFrukzEBNSttx6K0gU/kavKyuu5WDA9wc0AOooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKjnuIbWBp7iVYo0GWdjgCgCSq15qFpYIGup1j3cKvVmPoAOT+FUvP1HVOLQGwtT/y3lTMrj/ZQ/d+rflVqz0q0sWMkcZedvvzynfI31Y8/h0oArC91S8bFnYC3j/57XhwT9Ixz+ZWgaPPPzf6pdTf7EJ8hP8Ax3n8zWrRQBQh0LSrc7o9PgLf33QO35nJqa5s0uIBGksluVYMrwEKVP5YP0IIqzRQBi63bRWXhaW3gBCRhAMnJ++K2qyvE3/Iv3P/AAD/ANDFatAEctvDOu2aGOQHs6g1Qfw9phbfDb/ZX/vWrmI/+OkVp0UAZf2LVbXm11MXCjpHeRg/+Prg/mDSDWWtuNVs5LP/AKbA+ZD/AN9Dp/wICtWk68GgBsckc0ayROrowyrKcgj60+syXRY45Gn0yZrCcnJ8sZic/wC0nQ/UYPvRBqskMq22qwi1lY4SVTmGU+zdj/snn0zQBp0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFUtQ1D7H5cMMfn3c5xDCDjPqxPZR3P9SKAFv9SisQiBGmuZeIbeP70h/oB3J4FQW2mSTTpe6o6zXCnMcS/6qD/dHdv9o8+mKl0/ThaM9xNJ595N/rZiP/HVHZR2H9avUAFFFFABRRRQAUUVXvLtbOEOYpZmZtqxxLlmP8ux6mgCl4m/5F+5/wCAf+hitWsTW7uG98Ky3MLHy5QhXcMH744x61t0AFFFFABRRRQAUyWGOeJopo1kjcYZWGQR9KfRQBjFLrQvmi82704dY+Wltx6r3dfbqO2elasE8V1Ak8EiyRSDcrqcgipKyZ7aTSppL6xjaSBzuuLVO/q6D+96j+L69QDWoqK3uIbq3S4gkWSKRdysvQipaACiiigAooooAKKKKACiiigAooooArX97Hp9q08gLHIVI1+9Ix4Cj3JqDTLGSEyXl4Q99cY8xh0jXsi/7I/U5NQ2YGq339pOM28BKWgPc9Gk/HoPbJ71rUAFFFFABRRRQAUUUUAFVdRivJ7Qx2M8cEpIy8iFht7gYIwfftVqigDB16zRPCpjmigZoPLK7U+VWDDlc5I/Ot6srxN/yL9z/wAA/wDQxWrQAUUUUAFFFFABRRRQAUUUUAY0w/sK8a6QY064fNwvaBz/AMtB/sn+L0PPrWxSOiSxtHIoZHBDKwyCD2rN012sbhtIlYkRrvtXP8UXTb9V4H0IoA1KK5DxDDdXniyK3ht5bpFsN5iW/e1AO/G7K9fSr3hCKaTTxfzX0tyZoxEUkYkRlHcHB79cbu+0GgDoaKKKACiiigAooooAKzNZkeZYtMgYrLeEq7L1SIffb64IA92FadZel4vby61Q8q7eRAf+maEgkfVtx+gFAGjHGkMSRRqFRFCqo6ADoKfRRQAUUUUAFFFFABRRRQAUUVHNNFbwvNPIscUalndzgKB3JoAzvE3/ACL9z/wD/wBDFatZXiUg+HrkjkHZ/wChCtWgAooooAKKKKACiiigAooooAK5vx1d3em6CupWFs013azo0bBS2wHhiQOSuCQR7+1dJRQBzGjW9l4y0Kx1jWtJgN08ZXkHhQx5GecHGce9dHBBDbQJBBGsUUY2qiDAUewrP0//AELVLrTukb/6TAPQMfnH4Nz/AMCFalABRRRQAUUUUAFFFFAFHWbp7TSp5If9cwEcX++x2r+pFT2drHZWUNrEPkhQIPwFUtT/AH+q6ZaYyola4f6IuB/48y/lWpQAUUUUAFFFFABRRRQAUUUUAFUtYszf6NeWiorvLA6oH6biDj9cVdooAxPEsG7w44Z3UxGM4RyASGHB9R7Vt1leJv8AkX7n/gH/AKGK1aACiiigAooooAKKKKACiiigAooooAy9ZxbS2Wo9Ps8wSQ5/5Zv8p/IlT+FalVtRtRfabc2p/wCW0TID6Ejg03S7o3ulWty33pYlZh6NjkfnmgC3RRRQAUUUUAFFFFAGYn73xRK3aCzVR9Xck/8AoArTrLsBnXNWf3iX8kz/AFrUoAKKKKACiiigAooooAKKKKACiiigDK8Tf8i/c/8AAP8A0MVauNUsbW/trGe4VLm6z5MZzl8df8mqviX/AJAFz/wD/wBDFc3r9rqNzq11fxzQwPC8aWcE0RMs5jO/5DngMxIzg9KAO5orlR4ku9U1GCxt7eS0t7ky7LkMrMyx8Px/Cdxx3qO48VXGjuLG4WykkiGPMutQWB3GTg7SpzkY57nNR7SJn7WJ11FZ1497daTHJY3MFrJIFd5mPmLGh5Yr2Y46Z4rBkvtYbwy2otqzwmGR1ikjtkJvFLBYztYfKSfT1zQ52HKaXQ6+ism0i1uO4tFuZ0mjWJRO4CgM2Du4xnOcYxxjNa1UncpO4UUUUxhRRRQAVh6ff2uk6LcPdyeVBaXUsRbaTgGQ7eBz/EK3K5LWreaXSdbggjndxqEMgEC5kA/dMSo9RgmgDe07W9O1VnSyuPMeMAsjIyMAe+GAOPer9cv4cgnOt3N0Y9ReA26xifU12y7txO1RgfLjnp1rqKACiiigDL+xa1/0GYf/AACH/wAVR9i1r/oMw/8AgEP/AIqtSmvv8tvL2h8Hbu6Z7ZoA5vT7TWjq+qr/AGtAuJYzn7IMtmNf9ritL7FrX/QZh/8AAIf/ABVc5qVtezXepwXMay3kkcbwPbwM6K2CAMZyrHacP0Wu1TIRc9cc85oAzfsWtf8AQZh/8Ah/8VR9i1r/AKDMP/gEP/iq1KKAMc2fiD7QoGr23k7CWY2fzBsjA+90xn9Kk+xa1/0GYf8AwCH/AMVUWpectnK2qW6XkPmDyobaGRs9cbwM5HQnjHH0q7pMIt9KtoleRwqABpFKn8jyPoaAK/2LWv8AoMw/+AQ/+Ko+xa1/0GYf/AIf/FVqUUAY8ln4gDR+Vq9uVL4kLWfIXB5Hzdc4/WpPsWtf9BmH/wAAh/8AFVa2XzXcgZ4BaFcLtDCQHHrnHr2qt4dglttCtoZkdHQMCsmdw+Y4zn2oAT7FrX/QZh/8Ah/8VSfYta/6DMP/AIBj/wCKrVrL16ISwW3mwtNbLcBriNYzJuTa38IBJG7aenagDmPHmheIL7Q1ZNZjeOGQNJEIzCHzwDkE5wSDitTT/C+q2MKH/hIC9zsAkma0V3c4/vE5xUl5HPF4IKXAIkCrkN1A3jA/LFdHSaTE0nuczD4N+zXC3cOqzrdJ5hRigMaFzl8J0APXHrz7VZh0PVIWlb+2Y5TK24mSyU44A4wRxxW7RSUUthKEVsYV7oN7qdo1pfaszQHB228IiYkHIBOTx7YqNfDt7NZwRXWrTP5TJOFkUSFZRyPm43ID2wPrW+y7kK5IyMZBwRWd4dglttCtoZkdHQMCsmdw+Y4zn2p8q3BxTdxPsWtf9BmH/wAAh/8AFUfYta/6DMP/AIBD/wCKrUoplGX9i1r/AKDMP/gEP/iqjhs/EDK3navbK29gAtnkbc8H73XGM1rnkEfyrE8Px23n3U1rb3FqjBU8qaB4y2M/OdwG5jnk88AZoAsfYta/6DMP/gEP/iqPsWtf9BmH/wAAh/8AFVqUUAZf2LWv+gzD/wCAQ/8Aiq5Pwv4c8SWXiPWJ5dcUqZNjMymTzmOGDFSQFwpA4+nSvQK5DRoJX8Y311FFKI/tEyylkI/hQKd/RhkHC/w+1AG39i1r/oMw/wDgEP8A4qj7FrX/AEGYf/AIf/FVqUUAZf2LWv8AoMw/+AQ/+KorUooAKKKKAMtv3PihCeBc2ZX8UfP8nP5VqVl61+4exv8Aj/RrlQ59Ef5D+rA/hWpQAUUUUAFFFFABRRRQAUUUUAFFFFAGV4m/5F+5/wCAf+hitWsrxN/yL9z/AMA/9DFatABRRRQAUUUUAFFFFABRRRQAUUUUAJ0rN8PZfSFnIwbmSSf/AL6ckfoRUmuXD2+jXLRf6108uPH99jtX9SKtWtulraQ20f3IUVF+gGKAJaKKKACiiigAooooAr39ot/YT2jnAmjK59CRwfwqLSbtr7TIZ5BtlxtlX+66nDD8wau1lQn7BrstueIb8GaP2kUAOPxGG/BqANWiiigAooooAKKKKACiiigArH1S7v8A+xdTkSGSwkggdopiyPuwCcgAnHTv61sUhAIIIyD1FAGL4keY+G3KIr7vL8ws+3A3DJHByfbj61t1leJv+Rfuf+Af+hitWgAooooAKKKKACiiigAooooAKKKRmCKWYgADJJ7UAZl//pesWNkOViJupf8AgPCD/vo5/wCA1qVl6KDcJNqjghr1g0YPaIcIPxGW/wCBVqUAFFFFABRRRQAUUUUAFUtVs3vLP9wwW5hYSwMegcdM+x5B9iau0UAVtPvU1CyjuUBXdkOjdUYHDKfcEEVZrJuWGj35vcYsrpgLn0ifoJPoeAfwPrWtQAUUUUAFFFFABRRRQAUUUUAZXib/AJF+5/4B/wChitWsrxN/yL9z/wAA/wDQxWrQAUUUUAFFFFABRRRQAUUUUAFZWrsb2aPR4if3433LD+CEHkfVj8v03elXL+9i0+0a4lBbGAqLyzseAoHqTxUWmWkkEbz3ODd3J3zEchfRR7KOPzPegC6AFUKoAAGAB2paKKACiiigAooooAKKKKACiiigBskaTRtHIgdHBVlYZBB6g1lWUj6RcJpl05a3c4s52Of+2TH+8Ox7j3HOvUNzbQ3lu9vcRh43HIP8/Y+9AE1FZMF7Npk6WWpyF43O23vD0f0R/R/fo314rWoAKKKKACiiigArOmv2uIZVsZfIeFsSy3Nu4VBzkgEDd07H/wCvo1WvrC21KAQXcZeMMHADsvI6HIINAGPrV1cP4SEl1bOs02wOsa5CHcOTnoP5Zroax/EEKQeGZ4o92xAgG5ix+8O55NbFABRRRQAUUUUAFFFFABUc00VtC800ixxxqWZmOABSXNzBZ273FzKsUSDLMx4FZsMM2sTLdXsTRWaENBauPmc9ncfyXt1PPQAWyhk1O7XVLuNo448/Y4HGCoPWRh/eI6DsPcmtaiigAooooAKKKKACiiigAooooAKKKKACiiigCOaCK5heGeNZI3GGRhkEVmKl7opwgkvdPHRfvTQD0H99f/Hh71r0UAQ211BeQCa2lWWNujKc/h7H2qas660hJJzdWcz2V0fvSRAFZP8AfXo38/eo/wC07uy+XVLQhB/y82wLx/Ur95f1HvQBq0VFb3MF3EJbaaOaM9GRgw/SpaACiiigDK8Tf8i/c/8AAP8A0MVq1leJv+Rfuf8AgH/oYrVoAKKKKACiiqd3qlnZMI5psyt92FAXkb6KOaALlUrzU4bSQQKGnunGUt4uXPuf7o9zxVYnVtS4Uf2Zbn+I4edh7DlU/U/Srllp9rp8bLbx4LnLuxLPIfVmPJNAFW302a4uEvdVZZJkOYYE5ig9x/eb/aP4AVqUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAZ9xotjPMZ1ja3uD1mt2Mbn6kdfxzUf2bWrb/j3v4btOy3Ue1v++k/+JrUooAy/wC0dRiz9p0aUgfxW0ySD8jtP6VUuvF1nBbSSLb3BeM4dXibbH1yXZQ20cGt+qc+nRPGwtmNnIWD+bAACTz14w3U8EGgDndX8V6TfeFjN55ia4CFUdG67hwDjmtv/hIdN/hlmf8A3LaRv5LVfWbSKw8KS20GQkYQDJ5++K26AMs64jHEGn6hNnoRblB+bYoN1rU/EGmw2w/vXM+T/wB8pn+dalFAGX/Zd7c/8f8AqszKesVsvkr+Yy361bs9Os9PUraW6RbvvED5m+p6n8as0UAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAf/9k=[/img][br][br]Para dibujar el sector correspondiente a este valor utilizamos la herramienta [b]Sector circular[/b] [url=https://wiki.geogebra.org/es/Herramienta_de_Sector_Circular][img width=24,height=24]data:image/png;base64,R0lGODlhGAAYAHcAMSH+GlNvZnR3YXJlOiBNaWNyb3NvZnQgT2ZmaWNlACH5BAEAAAAALAQAAgAQABQAhQAAAAAAAAAABAAAFQAAEQAAHQAAGwAANQAAJAAAMwAALwAALQAAPwAAMgAAOwAANAAAIgAANgAAKgAAVgAATAAAUwAAXgAAXQAAeAAAcQAAawAAdQAAlwAAsAAAoAAAogAA0gAAzgAA1gAA/wAA5AECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwECAwZLQIBwSCwaARMQ5WjsjDjMYgKjCESHVmGWudVejV1iODr2isnFMvcrzIQY16xopGEDHJuHGqC2bglsVg8eFXYWIyQHbBEfF3YAEkJBADs=[/img][/url] marcando en este orden los puntos: A, B y B’.[br]Obtendremos el sector que aparece representado en la imagen siguiente:[br][br][img width=218,height=203]data:image/png;base64,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[/img][br][br]Podemos ocultar los ejes y también el ángulo, aprovechando también para cambiar el color del sector.[br][br][img width=228,height=208]data:image/png;base64,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[/img][br]Repetimos el proceso para el siguiente sector, tomando en este caso como inicio del sector el punto B’.[br][br][img width=204,height=187]data:image/png;base64,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[/img][br][br]Repitiendo el proceso con el resto de valores obtendremos la representación del sector circular.[br]