¿Que es un triángulo?[br][br]Se llama triángulo o trígono, en geometría plana, al polígono de tres lados. Los puntos comunes a cada par de lados se denominan vértices del triángulo.​Un triángulo tiene tres ángulos interiores, tres pares congruentes de ángulos exteriores, ​ tres lados y tres vértices entre otros elementos. [br][br][img]https://www.mundoprimaria.com/wp-content/uploads/2020/03/tipos-de-triangulos.png[/img][br][br]¿Sabes por qué es tan utilizado el [b]triángulo[/b] en la vida diaria?[br][br] Si miras a tu alrededor encontrarás que el [b]triángulo[/b] está presente en la estructura de los techos de las casas, en los puentes mecanos, en los ganchos para colgar la ropa, etc.[br][br][br][img]https://sites.google.com/site/clasificandotriangulos/_/rsrc/1232930067894/utilidad-de-los-triangulos-en-la-vida-diaria/j0433745.jpg?height=277&width=420[/img]

[br]Autor:[url=https://www.geogebra.org/u/josabetcastro3]josabetcastro3[/url][br][img]https://www.geogebra.org/resource/xhm8nuc2/NiT3wb2nYPcqjWpm/material-xhm8nuc2.png[/img][br]Elementos del triángulo[img]https://www.geogebra.org/resource/hnmwrzg8/o4SvJcpQJ8vkpmt7/material-hnmwrzg8.png[/img]sus elementos son:[list][*]Vértices: puntos en los que confluyen dos lados. Tiene 3 vértices ([i]A[/i], [i]B[/i] y [i]C[/i]).[/*][*]Lados: segmentos que unen dos vértices consecutivos del [url=https://www.universoformulas.com/matematicas/geometria/triangulo/]triángulo[/url] y que delimitan su perímetro. Tiene 3 lados ([i]a[/i], [i]b[/i] y [i]c[/i]).[/*][*]Ángulos interiores: ángulo que forman dos lados consecutivos en el vértice en el que confluyen. Hay 3 ángulos interiores (α, β y γ). Los ángulos interiores del [url=https://www.universoformulas.com/matematicas/geometria/triangulo/]triángulo[/url] suman 180º ([url=https://www.universoformulas.com/matematicas/geometria/triangulo/#angulos-interiores]¿por qué suman 180º?[/url]):[img width=165,height=30]https://www.universoformulas.com/imagenes/formulas/matematicas/geometria/suma-angulos-triangulo.jpg[/img][/*][*]Ángulos exteriores: ángulo de un lado con la prolongación exterior del lado consecutivo. Hay 3 ángulos exteriores (θ). Los ángulos exteriores siempre suman 360º.[/*][*][url=https://www.universoformulas.com/matematicas/geometria/altura-triangulo/]Altura de un triángulo[/url]: La altura de un [url=https://www.universoformulas.com/matematicas/geometria/triangulo/]triángulo[/url] ([i]h[/i]) es el segmento perpendicular a un lado que va desde el vértice opuesto a este lado (o a su prolongación). También puede entenderse como la distancia de un lado al vértice opuesto. Un [url=https://www.universoformulas.com/matematicas/geometria/triangulo/]triángulo[/url] tiene tres alturas, según el vértice de referencia que se escoja. Las tres alturas confluyen en un punto llamado [url=https://www.universoformulas.com/matematicas/geometria/ortocentro-triangulo/]ortocentro[/url].[/*][/list][br]

[br]Autor:[url=https://www.geogebra.org/u/astrid96]Astrid Berenice Padilla Aceituno[/url][br][img]https://i.pinimg.com/originals/ca/18/51/ca1851d534a6b8af0b835dbbe52669d0.jpg[/img]Tenemos triángulos según sus lados y según sus ángulos.[br][list][*] Según sus lados tenemos:[/*][/list]Triángulo equilátero: tiene sus tres lados iguales.[br]Triángulo isósceles: tiene dos lados iguales y un lado desigual.[br]Triángulo escaleno: tiene sus tres lados desiguales.[br][br][list][*]Según sus ángulos tenemos:[/*][/list]Triángulo rectángulo: tiene un ángulo recto.[br]Triángulo acutángulo: tiene sus tres ángulos agudos.[br]Triángulo obtusángulo: tiene un angulo obtuso.[br]

construccion de triangulos[br]Autor:[url=https://www.geogebra.org/u/marbellyhernandez]marbellyHernandez[/url][br][br][br][size=150][size=200][color=#980000]Construcción de triángulos[/color][/size][/size][br][size=85][br][color=#ff0000]·[/color] [color=#6aa84f]Construir un triángulo conociendo los tres[br]lados.[br][br]· Construir un triángulo conociendo dos lados y el[br]ángulo que forman[br][br]· Construir un triángulo conociendo uno de los[br]lados y dos ángulos.[/color][/size][br][br][color=#1e84cc] [size=150]Construir un triángulo conociendo los tres lados[/size][br][/color][br] [br]·  Se dibuja con una regla el segmento que[br]representa al lado a.[br][br][img]data:image/png;base64,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[/img][br][br][br][br]·  Sobre los extremos de este segmento, que serán[br]dos vértices, se trazan con el compás arcos con radios iguales [br]a la longitud del lado b y del lado c respectivamente. [br][br][br][img]data:image/png;base64,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[/img][br][br][br]·  El punto de intersección es el otro vértice.[br][br][img]data:image/png;base64,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[/img][br][br][br][br] [br][br][color=#6d9eeb][size=150] [color=#3c78d8]Construir un triángulo conociendo los lados[br]y el ángulo que forman.[/color][/size][/color][br]·  Se dibuja el segmento que representa el lado a. [br][br][img]data:image/png;base64,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[/img][br][br][br][br]·  Desde uno de los extremos se traza con el transportador[br]el ángulo que conocemos.[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAUIAAADRCAYAAAC5KLvFAAAgAElEQVR4nO2dd3Rc1bX/vX7r/dZL3svv8UpeQsgLCdWUUEINJYFHIKGT8Kih2WBsYkw3mCCDjW3IA0IzGDAGY9wLxlYbldGVRr1Xy7JsS7JcJBvZlpt6mc/vj30PczXItiRLmhnNvmt9luXZc8/cuTP6ap+999lnFHrooYceYX6MCvQF6KGHHnoE+lAh1EMPPcL+UCHUQw89wv5QIdRDDz3C/hjl7d6G17tDURQlbBnV2bGIrq4VdHWtpLt7JV6voihKeDGqq2sF3d1rgLWKoihhyaiurhV4vYG/kNAk0o9AX4+iKANhVHf3yoBfRGgRCUQDcYAbsIAkIN5+XAVRUUINFcJ+EQnEIMJXCGwD6oDtQBGQDLhQMVSU0EKFsM8YT9ACSqivzmDunLf56KNXmbfwYzbWlwDrgBRELFUMFSVUUCHsM5GIt5cDnZuZ+3IEYx98mNdnvs3Fvzid56ZNAw6KnXhUCBUldFAh7DNRQAKQD13bSF+7lL9Oi2DKM+9yzfnn8OzTTyNHIRI7jAqCa1YUpS+oEPaJSETYEoFSmutLuPZfL+DSa8YQ6Urg8p9fwtgJY4B2oACfEKpXqCihgArhUTGlMVGIwOXh7aogddFnTJ78GFOmvsiEKa+zYM3HwBYgz35eNFpaoyihQT+F0PmLHYX8sseOcFw2CYAHiQGuA/YBrfiORvvxHPt5CY5zA/0eBpsY5LN3er0q9kro0g8hNOLnQspHPEA6kAlkO8gZgeQinl4RInabkNKZ3YgA7rb/v8m2F9nPD/R1Dybm882yP/M0pFwoERFHDQUooUsfhdCUjiQgvwgbgK3AN4gQ7AMOjGAOAoeAZqAN6Kb3o8u2N9nPD/R1DwWNwF5gJ1CDCH86UmCuYqiEJn0UQuMJZtLcnEdurouCAg9FRXkUFRVTXFwSEpSUlPbKYIwx0PFCkaKiYoqKcsnNTWb9ejft7TlAKuIZqhAqoUcfhNBMiZNob8/k3nv/zM9/fjqnnDKa004bzemnj2b06DOCljPOcHJmL/js/R+vdwL9noea00+Xz/6kk07n9NPPYt68N5HwgdZPKqFJP4QwHq83g4KCr3G5lpKQsBa3O4GkpGQsKyUISbaR/ycnG5IdyGO+5yV/57zDj3skAv3eh5akJAu3O56EhLVERi6iri4ZyEA9QiVU6WeM0A3kI0mBHUis6BASE2sGWoKIViRe1w54OfrRZT+3zT430NcfrBxCYqZ7kATRBiRuHI/GCJVQpZ9Z42jkC28hWUOTMc7Fl1kNFvKR4uZiYD1QC+yhefsG6nZsR442JONbYz+nBFkZkh8E1x+smAxyBhIXTELix9p5RwldBlhHaGoIY/DVyhniggBzHUa0M4FyoJ6vX3mGyc88i+/Yi2Q+c5GSoETHGMHyfoIB52fcWy2hiqASuozQlSWRDmKRjjAlQAMxr0zh9NGjiZgawcvTplG2uQjxCHMQEdQVIYoSboxQITQY71VaZ0EjnulTOePq81mVEMu0cY9x670308pWZBrtFMJAX7uiKMPFCBfCtfiaJRQDu4l68RnGPfoIALu3FnPm9edSSQkilIlo1xhFCT/CQAgjkVhhLrCVJU89zs8vHs3XrnimPDiO2++/lXaqkUSAyXwG+poVRRlOwkAIo5A4YSpQRmXWGmbO+ivTp09i5mvPs2FbDpJISUXb7CtKeHIMQhgKgmFihGafkSxgI5Ip/gbYBVQg5SBJ+Frsh8J7UxRlsDjG8plAt4M6WussFzLddSOZ4wxkClyIxASLkClzJr2XzgRzCy3NbivKYDGAguo4fAXVWfjaVAUbzsLqQkT0SpGawfUO1uETxQJ6FlMH+j34Y1piZdn3Pwnt+qIox84AltgVIHV33yBLrdqADqATWaYWjHg5+jI785zuILje3ui073MbsB+Z1lchApmAlv0oysDpR9OFOCCLLVsScbuX4HZH43Yn4nYn4XZbyrCRZN/3SJKSlrBzZwoy5XehnqGiDIx+CKGbrq48br/9QUaNGqUECePGPYdM67X0R1EGSr88Qq83ndpai+rqNKqrS6mu3kR1dRXV1dUDpMbBlsNQ48dAX2ukUEV1dSXV1cVUV6dQW5uMxAuNRxj4L5WihBoDaNWfi5Sc1CLt2vcirfr3M/AW+E1Ii6d2JA5mYmLt9uOm9f3BAbzGSGG/fZ/3AvX4OuZkI96gxggVZaAMIGvswleOko7EpzIHQJaNc2OkUuSXeyNQCZQhS+Py8bV/yhrg640UMhAPMMX+HJylNIH/QilKKDII23madlz9xdTDxSG/0KmI2BUDxXR0mJKRVNse5zhnIK83UjD33Nn+SkVQUY6FAC+xM4LqQraGLKC1tZQHHvgjn3wyBVn65kZXfCiKMpQEwVpjI4QeYB1r1nzE9773IzyeBYh3mICWhSiKMpQEiRDGIVuFZvMf/3EWkyaNQYqFnfvlBv5mKYoyMgkCIYxG1vhm0dSUzsyZz7NzpwdJkCShiQBFUYaaAAuhMz6Yj6z7LbN/TkFr4xRFGQ4CKISRSBJEtgitqopl6dJPaGszO6RpbFBRlOEhQELoXL+cDmxi4sT7ufTSazhwINt+zDRJVSFUFGVoCaAQmm42JaSmfsEPfnAcUVFvIwXVyfhKZgJ/kxRFGdkEQAidXaNTgCJmznyOe+/9H9rbi5GVI7pkTFGU4SNAQhiNiF0aUEB9vZtdu0ym2FlAHfgbpCjKyCcAQmgyxSlAIS0tufi6Q1vIEjqNDSqKMnwMsxAabzAJKGT9+hjuuONGGhuTkXXFusG6oijDTwCE0JcpHjPmTn7yk1/Q2pqNdJbRVSSKogw/wyiEzp6GReTlreK4445nzZo5SHMFDzIt1tpBRVGGlwAIYRJQgsczl6effoymJrMTnm5ApChKYBgmITQlM/FIf8FipMv1BqRcRjPFiqIEjmESQmerrXzy8lazbl0UPdcUa6ZYUZTAMAxC6FxFkkdTUw7nn38hH374FuIZaocZRVECyzAJofEGK5gy5XF+8pOz6egowBcb1ASJoiiBY4iF0LmKJJu9ezM5//zzmTlzGtJyKxVfpjjwN0NRlPBkGIQwBpn+5tHdnY3LNZ+mpkykbjAR9QYVRQk0QyiEzrrBTKCApqZcpGYwBxHHGFQIFUUJNEMkhM7d6dKAMj744DVmzHgOKZlJw7eKREVQUZTAMoRCaDLFBRw4kMpxx/0HL730OLJ5u/YbVBQleBhCIYxBBK+U8eOf4NRTT6OxMQdpruBGS2YURQkWhlAI45CscCG33TaBt9+eCZTSs4A68DdAURRlCITQeIOJSGa4FCmcLkZig9p9WlGU4GKQhbBnpnj//nTy8tbS0mLKZcya4qMlSSKPgvN5gb+JiqKENkMghGYVySYWLnyXf//3i6ipcSOxwXj6JoJRSKF1HCKqhnj7MRc9BVUFUVGUgTOIQmgELBHJFOdz/vmX8vLLk/B6NyPNWI9WMmM2dUpGPMgCfNPqQpsCRFTT7eeZqbauTlEUZWAMohA6d6YrY+nS9zjttFPYti0VKaJO5chCaMcWvRZtrekcOpTPoUOVdHXvoat7H14OAfs5dKiarq5aoIbOzjw6u1PRLLSiKMfCIAthApABrGfjxiQsazGwCdmcKZ2ezVf9Rcs+vy2NpR++ytix9zF+wgR+c+Fl3D1xEgf27eH1J55j7NixXHjJPeRuKKOscCkXX3MjaRVrkJUqKoSKovSfQRLCSCSm5wGK2b07k9bWcmA7sBUpos5FvMLessZmWp0A5NDdvZkur5etaSlcfNFFxHpSyfpsIVf+9m46O7uY/dKrXH7dLbS27yB65ZdsqIxChFCnx4qi9J9BEEJnpjiHpqb1/M/tNzB37tvAHior3dTUeIAdSClNOj3F0OATQtgG7Oeaqy7m7vfeBeCFK57n4kffBKA7JZE/nHMOB5p32ePmoLWJSujg/73X722gGSQhjEVig5uYN28W3/v+T6mqygbaeOmlCE455TSeeOJRystdeL2F9KwnjLIxYpoFbMfz1ruc/qMr2NZ5AIA37n6Zyx58BYBvYmP49Zlnc7BlK7Ae38ZP+oVSgh3zfZdaW683Gq/XCGKgry18OUYhNB9gHJDFnj1ZnHfelUyf/hRe73aghoMHK/F4FnDppTdyzjnn8fTTz9DZmY14homIJxdrYzrVbODmay/jygmTAC/QTW1iFL897UpWrfqamy+5lhsmPEaHtwbIw9fOK/A3VFEOj5k9xQEevl4yjcVzptDebhyBQF9f+DIIQujz5A4eTGPlys/ZsSMNyRQXAWVIwqSSnJyVxMcvoqsrG9mvpATxAC0k85uIeJbZxCW+TVZDNFCNTJXrcH3+BX/729O88dZkmprz7PO1gYMSCvjqY7s63UQun8at115GSf6n6B/ywHMMQuj0BiVJIkmR9UitXzqSHPHY/6bbjxcBJeTmLuLTT6fT3p6DxA4zEFFz2+Tjqxc0wrkZ2IKIYx4ioLoXshLsmN8VcRqq1s3n/j9dS0XxZ0iYSOtgA80xCmEsIl7FJCYuYMaMp5Ci5wzkr1ws4q3FIFPgePv5hZSXR3PBBWdyxRXnsXu3B/Eg0xARdE6XY+3/J9hjGs/RhdYOKsGLf0IkEalscNHRHsOBPWvw1b/qH/JAcwxCaLK8WXi9FVxyycVcccWtiHeXSs8tOp1fCBfiyZVx6FA+v//9FZx88k8oKlqMeItJ+Ly8qF7G6G3NsaIEG+b7HgNY7Kr9kprSd/A5CC6++x0P9DWHLwMUQudeJOV89NEMvv/9H7BpUwwyRbboPW7nFMMURDSLeP75Maxa9TYST/TQM6OsXxAl1HCKYCrlRfO55/eXkR8Tgfxu6Hc72DgGITQlM5VERPyFSZPGIcmLTI7cXMHZVMFC4n/rEAEtt8dIQVv5K6GJ8e6iAYvivI+46epLWbX4VST0o/v0BCMDEEJnpjgdKGb//ky6uvLx7Ux3tNidUwyT7PPKmDHjSVas+ADxFD34pg+Bv1GKcmSc4Z9ozB/6zKx38LjfQmLj5vusIhhsDEAInZniXHbu9NDSYrK6yfQ9i+ucJnuAdTz00COceOIpNDbm2uNpMwUlVDDxPvO7EY+JD/pCRRoPDFb6KYQmNmgBRdTVJfKrX13O6tXzkURHX7xB//HMJk95tLTk8MMfns1f/nI/nZ3lyBRZV4wowYzTC0zmUONaXp5yHxsq5/HdLWv1exys9FMIzV+8DKCCMWPu59RTz+PAgSxkve9A2vCbMdOAdXz11Xvcdddt7N2baT+mQqgEKz3Xye/+JpIJ99/IjCkP0NRkmgirCIYC/RBC471J41WPZyn/8i/H89VXnyJF1EfrN3i4Mc1fUzdSilPA/v1ZyNTYv1uNfpmUYMF8dyXW3d3p4tOIW3njlXF4O5KQGLrGA0OFfgqhmRYXEB+/kBkzZiLZ3jwkPhhHz9IA/1ZbvWGEMBHxNPMRYa1EVpZYhxm3L2MPhv1odYxa4xheOL+3Zn28C683loN7liB/0I1DoEIYKvRRCJ3L6VKRer+NQAUiXJlIPM+NeHBmTxH/7jIx+FaLGHs0vrrCPGATcXGrueOOSdTWepCVKqmOsWOPMnbMYezRvbz24a4t+ih25/lHGlt/CUYWzj/c8XS0xZKb9iHeLhe+lVPOZKF+/qFCP4TQTF8LKC9fwebNkUjdXy4ihJn2zzlIIwUzrTVfEjfi8ZnnevBtypSMiOBG4ABLlqxh1KhTycuLR9YVm71KTImO6XZtxk5E4olm7DQ/u9s+x9hT7XPibJLtx7PtazfnG3tKL3YTA4r3s2fiawShYjiycGaGU5g+5UGenfAnOpp6WykS6GtV+kM/hDAWyGTz5nj+6Z/+laeffpC2to2IgOWwb59FRcVKmxVUVa1ExM4CPDQ3u6moWEZFxQoqKpZTVxeJrzFDDrt3W1RUxFFRkcfatav4wQ/+lYyM1cAuWloK2bQpmoqKr+zxl9HebiGCk0xXVwobN66wx15BVdUqe1wLSKGpKYGKiqUO+2ra2pIRAUujoSGWiorljutfRVtbCqZhRG1tlMNuxk8DUvB6U6mvj7XHXmm/N/91pIH/oJVjoed0uKM9gXdnPMoj99xAa5OZHmscO5TphxDGABmUlS3jqqsuZ/z4R6mvT0G8tDzS0xfx+ON3M3HinUyceCfTpj2C15uGCFI2mzYtZ+LEO2z7HSxY8DK+LjUluFyzmTjxXiZOfJCJEx9izJg7qa1NB7ZSXZ3Miy9OYOLEu749f9euKMTDTKO5OYnnn7//29d+9dXxts0DZFNZucTx2ncyffoT7Nxp9lcpIDr6Ldtuxh9Pfb3pjZjDu+/O6mGfPv1RvN4MIIPu7kyWLv37t2NPnHgHCxdOtd+XCmHo45wOywygcfdXRC+bRePu1fj26lYRDGX6HSPs6EjC681GkiSpiFdmIaJSjKwKKUEE0sLXMSbdz55j25PsMfKRqXEt0n6/Dll6l2fbypCpuKxP9k2t3fbPhfa4JYjAJtuvbabNRQ57PuINJuFb2VJiv16pfX6KPbZ1BHuSn70MX49FXSIY+piQkCQJu9pj6OiQ+KAvKaLx4JFAP7PGzkyZ2WjdJAnMZuymTZYzsWHacBlRdCY+DKYpazrG0/NNrd34RMttv47/2M7XPpLdP6Fjrt15beb82D7a4x02Z4sw/QUJXZwJwgzy0t5j1jP30fjNKnxTYU2KjBQGsLLEGS+J8vu5N/zLZHqzHy776/98///7X8uRXnug9qO9tyPZAv8BK/2lZzywvTWeVYtf5pZrLiMx+i3w6lR4JHKMjVl7+7m/zzmabaCv3x/7kcY/2nsbyNhK8OL8o53Azq1LeXzMbawvno/MVrQj+khkEDd4V5RQxX9mkICEaVxAHF3tcfiSIiqCIxEVQkXpEf9OYX/dcjLXTMO3bYRzWwidEo9EVAiVMMc5FfZQW7mQe2+8kkV/fxLtJh0+qBAqYYzx7qSFVn7+HG655lJWLpxGz8bAWgs60lEhVMIQZzzQVCm42bx5PmXFn6BbRYQfKoRKGGJEMB6pTTU1saYWVKfD4YYKoRJGOLPDSXSSzEuT7yFuzUx6ttNXEQw3VAiVMMEpgnEc2B/D0w9dyxMP/IEDe2PQBsDhjQqhEgb4xwQTsdbM5K2nbqGj2bSX0wYZ4YwKoTLCcdYImkYJLro6Y/CtG9c1w+GOCqEyQnF6gXGARWbiW+zYtIieDUFUBBUVQmXEYkTQBaQy552J3HvrNVRVGCHUhIjiQ4VQGUH4rxmOBdJZ/vFz3PWbs9i1bQVSI6jlMUpPVAiVEYRZKmc2A7PAm0hF7kfsrluGby8ZnQorPVEhVEYAxgt0IQXSuTRtW0XT3kikPjCZ7zZTDfQ1K8GECqES4jhF0AOUkZX+MVf/7D8pjn8b2RJCt9hUjowKoRLCGBGUPUW8XZks/iyCn/3b/+PdmZNoa8lGPEQtlFaOjAqhEqKYrjFmv5sstpUv5faLTiB28XRgPeIhGm8w0NerBDMqhEqI4fQCE5CdFEuBfFoOJdGyNxLZ0TCJng1VA33dSjCjQqiEGKYsJgkopKPZw/svjWFj8UJk69cMpE5Q2+orfUeFUAkRTIxP1gpDAbUbl3Pt2b/gpotH07gjCtlcyTRT1Zig0ndUCJUQwNlJOh7Io6h4MWec/BOeeOSPtB3KQLLDpkRGBVDpHyqESpDjTIokAZlAARVlS4j9+i2ghJ4iqNNhpf+oECpBinMqnABkAfns2b6G9hYpmhaSkaYK6gkqA0eFUAlCnDvLJQJ5dLcVMPWZP3PrxWewa9taRBjVC1QGBxVCJQhxxgMz2bpxJb/79Vmce+bPKStagHiCiei6YWWwUCFUgginJxiPNE7I539nPsq4267i0EEPvhpB57K5QF+3EuqoECpBgrN/oBvIB7KRusA8oBhJlBhPUFeLKIOHCqESBJipcByyUqQc6+s3eWfWREQQUxFxNCtF1BNUBhcVQiWAOBupmh6CpXzxznP87B/+D1/OfQHxBjUeqAwtKoRKgHCKoF0j2J3P7OkTOen4fyMl4X1kDXEyGg9UhhoVQiUAOBsnuJClcTnQlUZSwvtsWLcQiQkm03PJXKCvWxmpqBAqw4xzKuwGSthTuYy6kgVIcqQAqRHUxgnK8KFCqAwjPRupQgWl6Qu44L9+xPJ3nkDigaZ9lskiB/qalXBAhVAZJvz7COYQtfBVTvre/+XNWeNo7chEkiXaVl8ZflQIlSHGf3vNBKRzdA4vXP0rVnw8GWmckI7uN6wEChVCZYgxXmA8kIbEAKVQ2ttqIZ1jTFLE1AgG+pqVcEOFUBki/LvHFNOy383kP/+B3KTZiACmoEkRJRhQIVSGAP9GqvnUVqzlqrNP4U9XncfeumjEO3TuKaIiqAQOFcIRg7+QBEpcnI0T4oAs6ipW8/tzTuHx8bfQ1ZGNTI3j0amwEiyoEI4InAkJFz6RGW4hNF6gCymDyQJyafwmhoKUj5CEiOkjqNNhJXhQIQx5eq7VbWlJpqEhFl/sbTiExlkaIz0EoZiqsi/Z2xCL1AdmI7WDusWmEnyoEIY0ThH0AOVMn/4id931AN3d6UizguHwupzdY/Kgq4A5z9/HxaNPpKxkMdJINQFdM6wEKyqEIY0RoCSghJoaF8cf/yNmz34BKEOWsA2l9+VMiriANBq2r+XeK37JJSf8mNTEufhWi+hUWAleVAhDGlOknEZnZz433HA1V155Ee3tZUh5ylAWKPtPh1OAPHJip/HiE7exf088UISve4wKoBK8qBCGNFGICGXQ1pbJ44+PIylpPj3bVw2FAJmssAuJ++WCNwNJhBQC65DO0m580+FA3ytFOTwqhCGLKVZOQry/MqAc8cI8+LzBoXhdI4LpQDm5yR/wzCN/Yn+DiHLPbtLqCSrBjwphSOIsVs6gtTWXhITPOHgwFRFFExscTCH07yadirejgE9eHs+5J/6Yv896guaDHrSRqhKKqBCGJJGI2HiATcyd+zo//vGp1Ncn4CtWHmwh8usm7c1j7htPcdZJP8aKn4NMx81qERVBJbRQIQw5nN5gHvX1aZx55i95442X8HorEHEcTI/MmRSJQ6bD+UAmFeVLqd+xFokLpqAiqIQqKoQhhxFCN1DO6tX/yymnnExNjdnzN5HBi82Z6bDtBVJEw7avyXC9Q3trKkYQtUZQCXVUCEMK/x3fCtizJ4m6OhfS3spicDPFxhOUlvrbNqzk+ktGM3ncHXS0pOHzAnWLTSW0USEMKZxt7rMRD7DYJhWZug5WgsRZI5hFTtJ7XHHmiUyZ9GeaDqQh2WHzeiqASmijQhgymClxIpBNZ2chDz30RxISPkOmqGb1xrGIknOlSKz9Wh4gj5VznmLu359BVoqYzZW0PEYZGagQhgzOTPFGPvzwFf7xH79PbW00Ik4JHLs36EzEpAHZeLuM95eJeKEpiCeoIqiMHFQIQwITG4wDsmloyOacc0bz/PPjkCLqdHwZ22N5DV82urM1nVcevZk5T92NCG0K3+0mrUKojAxUCEMC57Q4n3Xrohg79gG2bYtD4oRujm1a7Owek0n9ligevOkybrzyQiqKl+GLB2ojVWVkokIY9PhniguR5XQlSHurY1nJ4d9N2kPboWReePg2Hrz9OvbvsZBsdCLaPUYZyagQBj1mNYdkiqurY8jJWYFkitMY+CoSv5Ui5ADZdLansHXDSjpbPUhM0HSTVgFURi4qhEFPFCJG2UAZZ511FQ89dA9QwcA6zDgzw2alSB5Z7neo2bwc8TLT+W43aRVCZeSiQhjUGMGygBKioj7nhBN+QWlpJDJlTaL/2VvnVFtEcParYzn/FyeQlz0fXzdpnQor4YMKYVATien0Ahu48spLueWWO4ENSAKjP622/LtJp3CgMYVnx97I5WefSn7GAqQeUeOBSvihQhi0ODPFmUApMTHvU1dnNkPqTwG1/z7DHiCL3fWxzPv4RWo2foUkYcwSPc0MK+GFCmFQ4qwbTMXrzUOSI5sQwepPptg5FZZu0h3NydBpeheWIN6lToeV8EWFMOhwZnOTgTLy85fy5JMPs3dvFv3vN+hrpAqllBct4Z4bfkum6x18TVw1KaKENyqEQYkvU+z1lvDrX1/FzTffSnv7Bvq+iqSnoHa3Z7H8kxe44OT/4tVn72HfXjcijrHocjkl3FEhDErMXiRFuFzzOO64H5KaugrpAm1x9NigMyniBvIpLfyCS886ichlbyDT4Uy0e4yiCCqEQYdprpAMFDJjxnQmTx6D7AyXzpGnxc5u0glIwXUhkEdTczINDXFI2U0qPbvHqBAq4Y0KYVBhPLkEJIFRighgmf3/I3WfdiZYUoAymvansuLjF6jfsgrZ3S4b8TS1e4yiOFEhDBqcQuYBCsjNXcvOnclIkbOztMVfwHpmmaGC6oo13Hn9Fdx33UU0bDObrZttPjU7rChOVAiDBrNPcTKwnry8hfzzP//M3rC9hN69QecWm6aH4AZyEuZy9S9/zszJj3Jwz3qgFpkiZyNi6L/HiAqiEt6oEAYFTjHLpq2tnPvu+xM33HAVTU1F+Ja9OYXLGQ9MRLpGlwMNFCStIj1yMb5jL1AHVCFT7Wx864mNdxjoe6AogUOFMCgwrbAsoJSKiij+4R9+RlTUfKCansvp/EXQjaw0Wc++vSU07trM1m3bqNu5i4Y9e9i9bx+dQEdLE1VVZezaVQlsp7kpg/o9LroGpcW/ooQ2KoRBgTO+t476+nS++GIuXm8VsqIkC0lymOms0xMsgO5y3pw+iYdvvhbX5/OYMOExnnziSc4/5Sz++Mh4DuzZwfMPPMKECX9h9Fm3EJ2ZwfrSlfzy0mtJKFyFCLAKoRK+qBAGHBMbtIB8Dh0qprGxFNgObAE2IvG9TCR+mIhMk91AFnt3JfPUw7dz3UVnsC4nCXNUp7u5/CD6Dd4AAAwASURBVL+vI798I+735nH57x4CYNXb73LR5f9NR1cDxVkx1NaaWkOdHivhiwphwDGxwSxgI/ff/yi33/4YUM/WrfnU1+ci8b3NSNIkx35uDlDAms+mcv/Nv2XXljSgEwDaD3DhJefx2MIFALxw2QtcOOEtsaUmccO557C/aSewzR7HhXqESjijQhhQjDeYBKyjrCya44//KTExXwKtfPHFQq688lLuvvtG1q1LxOutRhIeVUAlUETrPouu9nzH421ETnuXM064lkbaAJjzyAwuu/sFALasXsOvzjiHgy21SHLFg8YIlXBHhTCgmFUkqXR0lPPww3dx3XXX09a2FdhOa+sW0tNXc+edt3LaaSdyy6330t15iKKcJWQkz0b6EpYjNYL5iMdYxa03XcEfXnoO6AI62ZNjce1pVzB79hyuOOtSHnjpBbqopmc2OtD3QlEChwphwHD2B8ygszOHlJT5fPNNCtJuqxRpx18HNFFamsbKZS4Wzfk7V/3yJNKjFwKNiBDmIyUx2UAOBUVfUHnQjcQXq4Ed5MdFMn/+DJaueAu8xYh4WugKE0VRIQwgzlZb+YigVSDL6XJt8hFB3Ah0sGL+W1x7/ql8vXAeCxcu5eDBYmAHImqZyDTXrETJQrLQGUgcsAKJM1YiguncAlSFUAlvVAgDgjM2mMf27YlMnfoIUipTgNO7k+luObCZ1NRl1G7MoLVtN7fccjVnnvlTtm5NQLy+LMTDi0MENsYm1n4sHpkGxzPw7T8VZWSiQhgQIhFBSgc288AD93P22ZcgMT+zkiQXKGHfLjdtB1OQEprNyHK5LcAOxo27l//8zx+Qnv4ZsmIkGV+vQv9VKP4E+h4oSvCgQjjsmNigGygiL281P/rRD1mz5mNE6Ez8rpKSnCVcf9l5xC+bgQhhlo2sJIFaZs2awuuvv4xMfdMRry8a9fgUpe+oEA47zn6DG3j99cn85jeX09lZgsTvSsFbhuur97jotBN566X7aTmUioicG18xtdlzpJzu7kJEQIvx9RpUIVSUvqJCOKw4myukA6UcOFDIoUNliAiuA9bTuD2e8Zefy5JPJiPJkkx6ts+KRsTUbdtKWLDgA+bPf8d+fhq+7tOBfs+KEvyoEA4rZiMlD1BMd3c5bW3lSOa3BimILqO7K5vOFg8SJ/Tw3c2VDMazLGbJktmccMKJrF8fhyRYtJmCovQVFcJhw8QGLaCYrq5Kbr/9f/hwzpvIsZ0Fr40hZ9XrSPwvnZ6brft7d859j7OBcq6//mZuuun3NDWV2efHokKoKEdHhXDYMJniTKCGxYs/4ac/PZnSsgp2bd3EY4/exGUn/5SKrOVIYsR/n+HeBM3pYZZRUbGWyy//Hbm5q5GEim7OpCh9QYVwWHB6gyXs21fMiSeezDvvfULrN1Xcc+1FPHn/bTRuz0RihR58InakMhhnT8IsursLaGjIoK0tG8ku91Y0fbgSmqOV2BypFGewCfTnpYQbKoTDQiQibBnABjZvzuGjjz4AYFftOlKj5iMxwhokLpiGr52+KYUxRDuIsce1EE+zEKlF3IhvtYmzyDraj97G7O05R7IPBf7i738vByrmRzvf3360c4d6/P6+fn/twzn+YNy7oUOFcMgx3mAysmpkJwAHDu6ms3kP0AE0ISJYjohZDiKGyYhXZ0iysWySkXKZLET4qqivL+C++x6htNSNJF/MXiVpiKeZYp9nOcZLcoyX7Bj/cHbnc6xebMdit+z3albA+P8hcK6Y6e2PhL/9SM/xtznH780e3Qd7f8b3t/mfO5DXN++9N/uR7k10H86PpueqpcO9t8H6bIZPEFUIh0UI4xCx2s7WjZXMmvUsd180GvZuQY4GYBeSPa5FlsxtxLf2uADfWuQNyPR5A77uM5WIwHrZs2c7Z5xxNnl56fbY2/F5m1VI0fZmxxjr8HmRm2zbJoe9AkneVDrO3Ww/f6PjejYfxt7buZtsW6Vt3+h33nqkDCgXEW6XTRLi5ebYZCLJIhc9y4mMPQPxrM35ibbdhA48jnPN+Rl+9jiHPdnv/DSH3Xl9zvNjHSTZjxu75Wf3H99yXJ8L3x89/+t34dsC1rz3bL/zzT7Xxm5CJ+Z8U9JllnZm4uuKbsbP9Dvf4vCfTdYxfjYpDKcYqhAOuQhG2R9yEY3f5HPXzX9g1KhRvP3U0ySnpFFemkd76zbSM9ZiWUuxrCVY1mIs60ssaz6VOYtp3J2OZc3HshbYj39p/7yA8vIYtm3LwLK+wrISSUhI4IILfsXf/vYGluVh+/Z1lJen+I296NtxNlW4SEtdgmUttB9f9K09NflLilOXYVmrerEvtPkKy1phj7vExvec9esTSU1d5meXa0hLW8qmini/cRdhWV9gWZ/iseawu2YFxpvdX7eKdOt9LOsDm/dpbIyyf2ksGhsiSfV8gGV9iGV9SGrqh3R2+jza5uY4LOt9LGs2ljWb4uLP7XMTgRTq6lZhWe/ZY8+mpPAzOttNAXsyO8q/6HF+WepsujuMPYltNct72IuK5uHrKp5Cff1q2y7XXlOzvMfrr1+/oIe9qnIxeH0zgsqsjxzjv09N4TyMh9/R5KLg22uX66+pWYaIpUVrcxx52XNt24dY1mwaG6Pt85OAZLKzP/n23iVbs9m1YzXGU29udjmu7QM81vs0VC+xx/dwoJfPZu/eSN9nszuKVM+HPT6bjg43ZkbQ3BzvGH82RUWfcuR9vFUIQwgjhAlAAXmxb3Phuedyy003MfWVl4iYOoWVi96nad863njjRSIiHncwkYiIx4j84AWqK2OIiHjMfqwnK1fOJivrKyIiniQi4jmmTv0r06a9wtSpfyUiYjLZ2S5WrpxLRMQTfshruL6ew+uvPWv/f5KDx5n58kQWzJpCRMS0Xu3CdCIi/mqP+aSN7zmrVs3jtdee79X+t9cm41r9kd+4k4iI+AsREeOZEfEwldb7iJeQybb8ufwtYgwREWNtHqKqainiyXioWr+YWa8++q39tdcm0NKSiPwye2hoiCQi4iEiIsYQETGGL754Cd+KnQwKCuba9rFERIzhy3l/pfWQC/llTSdv5XRedpy/dNajdLW4MGKRaX3QY/zPP5+CiLiMX1g4z7bJ+Jb1PuIFif2rr2b0sCdEvgleOyzhTSLynUk9xrc+M+On0vzN13z67bWb8d/FeI77d0cx571netirqpbh283Qw3vvPUVExMNERIzllaljKcv7DPFCU2loWOt47bG8GjGGCvfb9vVnsr1gLv/b4/UfYvPmpYjn56F6wxJmvTr+W/vMmeNpbk5AhNLD7t1RPe7955+/wHC2iVMhHBYxjAU8dLVl0Lg7j7b2auCAzQ5kKijNWOX/O5A2+luQ6WKZ/bN5znbbvhXfVHMn0p+wGWnZ3wLsR6ba22z7TqDeZoc9TrU9zg6HzWnfao/Rm91c53b7Medr1OErFD+c3Uzb6xzj1tmvtxmZtptVNfHIL2URMm0utX9Otm1xyC9VoW0zIYUkx/mWbS9BliNmO86NQ7wbf3uiw57hZ8912M31Oe1ZjnPN5lxFtr0IEaE4v/H97fGO8XP87M7rt+z3a+5Nsd/50unId2+K7ftl7k2in70I33JNc77/vXdef38/m0J7TPPe/D+bLHqWj6kQjgBM70EP8mUrtP81+wunOkjD/JX3JTdS7J+N3XmOedzEtvJscvHFejL8SLdJc5DuZ087gt05RnovtmOxm/dm0TNhYgLpLny/PC56Jhb87bG92E1bMhffzaQ7zx+ovT/jx/TTHnuE1/dvuRZ3lHvT272L9bP3du/j6f36BvuzGT4RVCEcdjE0X2bzV9R82ZyZwFi/x/wzkf525+MuenoYzkRAb/iPebjnHMnuxHWU1zya3fmavZXRmFDD4eor/bOYfXnOcI6/1s+2th+v3ZfXP5b3NpD3N5T3bnhLaFQIA0JfaqnW+tkje7H39nh/ONw19dU+VAT681HCDRVCRVHCHhVCRVHCHhVCRVHCHhVCRVHCHhVCRVHCHhVCRVHCHhVCRVHCHhVCRVHCHhVCRVHCHhVCRVHCHhVCRVHCHhVCRVHCHhVCRVHCHhVCRVHCHhVCRVHCnv8P8yY+Hd6OH4MAAAAASUVORK5CYII=[/img][br][br][br][br]·  Se lleva el lado b sobre este lado del ángulo y[br]se unen los extremos de a y b para construir el tercer lado.[br][br]       [img]data:image/png;base64,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[/img]  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[/img]   [br][br] [br][br] [br][br][size=150][color=#3c78d8]Construir un triángulo conociendo uno de[br]los lados y dos ángulos.[/color][/size][br]Se debe cumplir que la suma de[br]los dos ángulos sea menor que 180º.[br][br] ·  Se dibuja el segmento que representa al lado a.[br][br][br] ·  Desde sus extremos, que son dos vértices del[br] triángulo, se trazan con el transportador los ángulos que conocemos.[br][br] ·  El punto de unión de los lados de los ángulos es[br] el tercer vértice.[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAR4AAADACAYAAADSigw9AAAgAElEQVR4nO2deXSUdZrvuXPPneXMnJm55565c3ump+e03T2t091227a7LCqIoogo7YoooLghKqId2REXBGVfwiICYZFNsqeSyr7vCWSDBMKWQAhUNkjIVvW5fzz1s4qYQAhZq54653MI+eV966233vf7Pr9n+w0Cf1wEA4mcO5fB8eMlHD9+UvFKiqmuzgISgSCuvEYU5cYZdOUvAoAwIBM4CVQDDUCT4vE0AvXO7/wEkA6EItdE31+oimcx6Me/DABCACsQAyQASYpXkOD8ziMQ61dFR+kZ2hEedwLcCFQ8HvNd9/2FqXg21xAeRVGU7keFR1GUXkeFR1GUXkeFR1GUXqcPhCegDX1/EhRF6V16WXgCkDBtJBK21ZCtongjvSg8Jj8omZMng9i27UtUfBTFO+lF4QlELJ1jfPDBO7z11ivAQSQ7tu9PhKIovUcvCk8QkEx5eRJ33DGEwsJQpDQjuM9PgqIovUsvC08Wq1bN4fnnnwVKkKmWFiEqirfRS8Jj/Dvx5OXt5eTJYCAFLUJUFO+kF4TH1HmFA6lI1XMCIkQqOorijfSC8BjRSSI7eyfV1VbEyRzY5x9eUZS+oReEJwRIo6Iigrvuuo9jx8KBWNTaURTvpYeFJwCwAMUsXjyPiRNfBI4gvX5UeBTFW+lh4QkEoqmujufWW+8mOXkPkIt0OVThURRvpReEJ5ILF8JYufITmpqSgWjUv6Mo3k0PCk8AkqNjRdpqpiNOZS2RUBRvpweFx4hOKmAsHRUdRVF6THgCkBB6HmvXLmDz5nlANloeoSgK9JjwBAHxtLQUMGzYCIKDNwBZqPAoigI9JjzBQA7ffbeUu+8egYTQY1GnsqIo0KPCk8bq1XPx81uOhNAtqH9HURToEeExBaExNDebxQAjUGtHURRDNwuPaW0aDWTgEh1tfaEoiotuFB6TtxOL3Z7KypWfUVlpQULqau0oiuKim4XHAhTg77+ehx56mNraDCRpUH07iqK46EbhCQSiaGoq4PHHH2f37uVAIVqXpShKW7pZeJLIyfHj9tvvp74+C0hEs5UVRWlLt1s8VVUWTp/2R1qbhqH+HUVR2tINwmNWBA1FLJw0JJoVioqOoijt0U3CEwYkU1h4gNJSfyRLOQidYimK0h7dIDxSl+VwHOS++0YQELAKsXpUeBRFaZ9uEJ4wIJ+QkM0MGfIAjY2H0LosRVGuxg0KTwAQQUtLJsOHP8y2bUuBIqQlhlo7iqK0T7cIT2NjNNu2LaK+PgmIR0skFEW5GjcgPKZEIgrpMpiDLEmseTuKolydGxAeaeTe2ppERYUVsXR0SWJFUa5NF4XH1GXls2rVJ3z00ZvAIa5PeALaoe9PiKIoPU8XhScQiAOOMGbMCPz8vkaafXVmPXTTOiMcmaZFO/+1On8XjghYsPN9VJQUxdPoovAEA1kkJe3g/vuH0tp6CMlWvlZPZdMkLAs4CVQBdcAZ4ChwFigD8nBlQceh4qMonkUXhMeUR2Sxe/dyNm5cCBQgVsu1olnSryc0dDmrVn2G7/p1fLNhE1Hpmdjtdras28baNV9TXJ4JnCMyYhkhIV/icESheUGK4jl0QXgCka6CWcj0KhtZN8vKtbOVg4FEtm9fysyZ81jgM4f/+MnP8IsNZMGsOUyYNoMtqzdx95jHKa2qIjXkG6ZMfZHay2YhwL4/YYqi3DjXKTzGqZxOQUEAZWURiFM5AwmpW5GplPHNtN1eyitkigUr5sxi6uefQsNFxt43lLJm+f0DtzzMxu3fAXYkTK89fRTFk7hO4QkCErDbDzJ8+Aji478DjlNcHExlZSxQjKsyvT2hME5pG+VJGdzx29s4X1dHZUEZw351Dw31lwB4855n2fLNGuAirp4+fX+yFEXpHq5TeEKBfPbv38Dw4UNwOEqB0+zf/zU33/xL1q5dilhAKbTv7wlEkgzP8dHEV3npTR8A6k6dZcy9QzhZXw3AkJuG8823OxCns7ZOVRRP4zqFJ5zW1nxeeuk5Fi+eg0SmcoAiIiN3MHjwg4wdO5YTJ0yT97bRKBEeR30mjwy7hyVh3wHN4LCz8MP3GPPMG6xespS7H32co+cOI/6j0D4/SYqidC/XITyyHnpTUxzLli3EZosB0pGpUxJSHHqIsLB1lJX541rWxj0XR3r3OJpiyM3aQZU9BcgHjkLjEUICNvH99yspLc9A+jUb8er7E6UoSvdxHcIThAhBIuJMjkecvsGIQzkCmUalYJzMdnsIkiBoWqAaTLfCGOffRiE5O0cQP1Emuh6XongunRSeIEQIUrh8OR6xcsySxO4YYQkCwjl4cDuLFr2P9OdxD7e3t10QIkgma1ktHUXxVDohPCaEfoiQkPW8994ryBQr7BrbhHDpUjTvvPMKH3wwCcn16UxJhaIonk4nhMdEoo7y+OOjWbnyM+AgIiLX2s5KS0s8b731Ejt3LkGmXZqBrCjeTieEJwjIxGLx5Y47bsVuz8FVl3U168VMoay0tlo5cWIPYjlpL2ZF8XY6ITzBQApbty5i27avkTydCDonHkZ8Qp3bhNP58gpFUTyVawiPqSaPxm5PxBWxut5ok4TR7fYY/P2X0NCQgEzfNGqlKN7IVYTH9M2JQsLniXTdUhEHtcORxeDBd+DruxBtCq8o3stVhCcIcQans3jxfE6eNCLUFeewaaVxiNDQb7nttj9ht2ehy+AoindyFeEJBQ4SG+vH4MFDqa7OQISnqxaKVKY3Nx9i9OhRRERsQpzUKjyK4m10IDwBgBWHo4gXXniK+fNnIBnFNzI1MlZPCrm5+zl2LAApAFXhURRvowPhkdyd0lILt9zyIJWVkUi/nRtNAAzErLMuhKPRLUXxPq4iPFbq66M5dswIRTgdN/jqLIFILk88Fy/GYbfH4qrjUvFRFG+hHeFxL+Js21kwyI22Vedt67UC2/mbEKS49DArVsyhpCQQCdGb+iz3/fq7beffZt9tx9u+79WOqTPH3Hbfbd9bRVJRboQ2wmNC6EmUlUVQVBSAiE8EIg7hSCQqASkUNVMlV2Go/N7k6YS5jYcgYlYINPD++2+xZ89a4DAiRma7eMSJbVqomm2jnGPxiBAGu41b2hyXxW3MFLjGO8ejnZ/FvVI+2u29I9vsO8xt38ZCU/FRlBuhHeEJB/IYN24cn346CxGGGMDK5cuR2GyR2Gxx2GzR1NSEIzd5MGChpiYCmy3aOR7J5csRzvFQHI4oqqtjsdkOYbNV88ILE1m06FPgFA5HBjU1MdhssU4iaGoyYhdKU1MENluEcyyGmpoIHI4IRJAszuOK+uG4GhrMGl0hOBzh1NZGYLPF/LDvxsYIREDCaG62uu07lurqCOx2174bG81njsVmi6K+3qz7pcKjKF2lHeGJorIylp///DaGDx9JU1MqYkXEkZKyFR+fSfj4vIaPz2RWr16Aq99ONKtXf4KPz2Tn+CSSkr51jofT0hLNokXv4uPzNj4+HzBx4kt8++0W4BiXL6exYsVMfHxe/WHf+fm7ESsnioKCPW5jr7Js2V+orzfikkBi4nrn+07Bx2cyVusKxLoKp7k5irVr57htP5HMzJ3O44rm2LHv8PGZ6Bx7jcWLZ1BbaxYWjCcra/MVnzko6EtEiPv+y1OUgUo7whNKY2M0RUWhnD5txeGIRawWM+XIQuq1cpCb20ynwpz/z3GOZyE3qPHfWJEGX0eAE8jCffm4pjjpSNX7QWR6Z6Y8wc6fM5xjuYhfKNw5FurcPhtZCDCHK5uUWZB8oVzncWXimsqZRmWZzrGDiE8rwm3fcc59H3L+G4f2C1KUG6Md57LJt4nDJRzuvpYIXEsOu48Zf4npKGimK1c2BxPxisfVHCwUM60RgYnEVcXuvq37eFib8RC397W2eV/jp4l0jhvBMmPuyym3997BbT6z9hRSlBvlKgmE7nT0+7Y3YGfGjZB0FGHqyHF7o+/bU/tWFOV66eLa6YqiKF1HhUdRlF5HhUdRlF5HhUdRlF6nB4THOJAtuKJL6pBVFMVFDwhPIK2twZSU7EXyekzzMBUfRVGEHhCeYFpbI3nrrSmMHv0E589bkDwYFR9FUYQemmpFcOGChfnz3yYnZxuSjBjBlUmFff/hFUXpG3rQx2NFShuigRguXgzH4UhDSilMOUTfnwBFUXqfHoxqua+Hns6mTQu5884hlJXFIPVaZlVRnX4pirfRw+F0Y/1EUV+fyYIFb3PnnX8iKGg7UphpQcsQFMX76KU8nmAkwnUCq3UHw4c/Sm7uPqRY1FSvq/goirfQS8Jj2p7GAtk4HMk0NYnvRwQpDVfHQnU8K4qn04uZywG4fD4mwpVMUNBq1q9fBJQgPXnM9KvvT46iKD1DH5VMGBFKIDc3gMGD72HKlHE0NuYhkTDteaMonkwf1moFIFOrHBoaDjJu3FgefXQUNTWxSLazWW9Lnc+eQ3urhyjeSB8XiQYiU65MII8DB5ZTXW1arJoOiKbboF6oAxv3/C6zIq1+p95KP6hONy1To5B+xzFAAgkJW6mujkb6KMegka+BTiAQx5FDmzmUugp54Oj36a30A+Hxx/X0M87nNL74YgF33DGUmJhA4BiuhMO+Plala99vBI0NSTw/ejABO2YjqRT6fXor/UR4DMYcjwQK2Lp1LT//+S9Zs2Yuzc2puBbqUzN94GAWiUwlL3szk8fcjd1ulsTW79Bb6WfC44/rQo0HSsjP382UKZOpqAhHrB6zGJ/6fQYGpjdTBs2XYqirDEKWG9JaPW+mHwqPP66Ew0gktycVhyMGiHGuXpqBJB4aC6ivj1fp+HsMBtJIid/Arm8XImuXqbXj7fRT4fHnyqVwzLrtmUyfPon335+IFJrm4lrLvK+PV2n/O4ygpSWNMQ/+ke+2zUcimGrteDv9WHj8uTLvIwhI5PTpSB544EmefHIMhYXyO4149VckSbTKFslXi6Zhb05EwulqpXo7/Vx43DFh92yghAUL3mLy5NE4HMZRGYz6ffoTAZjlo6tPBCFTrHj0IaHAgBIef1yOSlmj3eFIRBzOZv3zJMQvZJZW7uvj9VaMhZpMQepmpj06mNZG893o96IMOOHxx3VRhyGWTiQtLfGsWTOb06eTgdNItXuk8+/6+ni9EVMOk8VHL49m2azJiKUailo7CgxI4TEY53M4dnsWCxb4cMstd3HwYCLQBBQipRdq2vc+QYgvJ5us2LXU1USgCaCKOwNYeAwhSKnFRQ4cCGTo0IdYu3Yb8jqGlFuo5dN7BGCyz4uLv6euJhbtOKC0xQOEx3Q3rADgmWcm8tOf/opXXnmT8+ePIH1+wtH+zr1FEBDPuTMWRt73O0qP7kMKftXaUVz0U+EJuA5CgATgLIsWLeepp/5MQ0Mds2Yt5c4778Dffy1iEYW4bdPXn8+TCQGy8P1qKrOnPw/koM3dlLb0I+ExPpswxDFsiEKemKZNRozz51i38QySkw/w4IOPU1lZDDQCTVit69iwYT6QjJRahCPTAA279wym7UU2FUf3c6nGfHd6vpUr6SfCYyyXGCAfKEf8M0eBc8Ap57/ngLPASed4CRJGz+T8+WjKy+OAAmTtrlTkaZsORGG3x9DQEI9kO8ehGc89QQiQieX7xeRmbnOef41kKT+mHwiPqeeJAyqoOZvLuJeeJ67kBAArl6zh7Xem8srkSRyrK6em/BRTXn+NN998laCUeOASEsFKx2XZhCE3gSGac+esjBo1ht27VwOlqMOzuwkEorFVR/HAzTeRHb0GSWtQx77yY/qB8Bjz/Dit9S2MH/4mg/72X4krLcOWk8Wdw4dx9lwF3y7dwKg3prHgg+VM/2QzsZHf89y86eTm5bJq5RygiCvT8d39QGE4HOlYrd9y++238PHHUzl/3kzddBpw45iHRzoZsb589eE45EGgxaBK+/QD4QlCnoz1rJj7CavX72DU+EnkVlSy98t1TJ86DYCK/FM88OsHsAbH8tqTPrzz3kQCMmKZNOU1Pvt0BjLtsnTwHqbHTxEXLqQzbtyzLFkyF6lyN+t6adSr60g+FWTQ3JSCWJNxaDGo0hH9QHhCgSK2rv6EX98xnLDoFH4/9BG2hieybf4KZrxthOc0w352F5eaGjhz/AyFh49SkJfP7X8czKVLBVy96tlkO1sRkcvg4kWzrlcs8nSOR24etYCuD2PtZBH73ULm+7yM+Nm0ZYnSMf1EeLKZ+8lChj82i5de+Iz/9c8388r76zhqDWfkE3+mqQnC9wTwX78dTn2TA7ADdlat+pLlK+YiPpsorn6hm6hZMHJTRADx5OTs4YsvfLh8ORu5YdxXuOjrczMQEGuyqT6eZ+7/b/w2zkEsSc0YVzqmHwiPmQYVA80AjH39TaKLSgH48J3pTJ36Hk8/NZZ98SGADYl85XD5cjKtrWlcX2mEESB53/LyGCZNmsRdd91HVtZepIpa13TvHK52JbTGE7h1Jk1NCWjrC+Va9APh8Ucu3kjkSXkEOIWDciR0foGamhwaGguA48i0KBHxI6QgNUBdebqamyYJKGH9+i/4xS9uJzx8k/N3IWh/586cQytcjiI7xhdXqoJaO8rV6SfC44/c5CHIFCgW19paiUhOjnFYxgJJXLhgoarKgqsKvSsXuqkrSgCOUFQUTHHxflwJiynI01vbbLRPMJBJcuhynr73DzQ70pznS0VHuTr9SHj8uTIEHuhGEHKRhyIWTg7jx0/Bz28JYgF1NVfEvE8IcsPEI4ITz8mT/sTGfoNMAdMRQVTxufLcWYBMJjw9jJ1b5yMJgyH94NiU/s51Ck/bJ9n1/v9q++tMXVYoYgEd4pe/fIKdOzfjqgXqKBx+tWNyF7lg5KYJA5IoKAjht7+9n9mzpyOZ04fQvBR3ghBHfB65OTtovGQasqk4K9emA+EJbIO7BRKC3OhhuObybRfkC+PKmij3mzsMV2ZxYJtt2+47sM37xgLZtLYWMGrUCIqKInC11Ix0bhvczn6vdUwWXEvrWpAbKJ+zZ4uYMOFpHnlkJGfPpiEhe32iuxp9ZWJdP5PKkv1u5+Z6HjaKt9KO8LhXfCcjN2IQrjyYg0iWcAEyBTH+D7MWVr5zPA9XI3bTMTALKW8owmWpmH1HIM7JIuffZOBaPysE8beUIO0vqkhJ2Y/dXuh8vxInh53vYbYzLTPynPvNx9X31/RwTne+32Hn38XhWk5ZWm2sW7eT06ezgTLnmLffPBLJOla4m5E3/QenivYg18vVrB1zjWiipvIj4ZFksNraQLZsmYWv73ROndqHWAJWqqtD8fWdia/vHHx9Z7N//xfIjShrn6elbcHXdxa+vnPx9Z2FxbIesR4stLZG4ue3wLntHDZvnktjYwQiPuFcumRh48bZP+x7165Pnfu2ADEEBa117vczfH2/JDo6GDjGiROR+PrOczIXP78FtLYa6yea8PANVxxTauqWK455//4v8PU17zuT6uowRHxSKS+PZ9Om1ezZs5PNm1ezefNSGhtNFK3vv7y+wUx5D7Jj2XRWfDwJeRhdrRg0EIc9yHktxHGltdvXn0fpC9qxeIKorw8iOno5Fstizp/3x10cLJZVWCzrsFjWkpKyEZniiHO2uHgvFssaLBZfLJY1ZGfvdI6HYbdbiY1d59x2HVFRa2lutiLWiYXLl8OJiFj9w74TEnx/2BYiycjYjsWyFotlIxbLBtLT9wO5VFZGOX/vi8WyjtjYddjt1h+2y8nZecUxHTmyB7HcZMHAlJSNzu3XYbGs4tIlM+2KxmaLJCJiAxbLZiyWTURFbXYeszcXPpq8qxwuVcfiaEnGlXTZ0TYWzpfvYsqY+8jL+gaxMsNQ8fFeOphqBePqe2OmUkGYehyZEmUj05gQt/FoZKqT6/w31vl7M61JQaZYuUjpgrn4zOoRac6xHK7MpQlyHks2Mh06iCvUHev8/UHntiltjjm2zTFFux1TiPMzZDvHM3CVTZjcomxkipbn3LdaO3CQrZ+9yda1HyNO92u1vpCuhNs3zWbEbTeTk7bDeV6j0Jwf76QD53JHUSVzM5t2E0HtjJvoUFsnb0A72wZ2Yd+hbuOG4E5s15VjCmjnPb35JgkEEigr2sN9P/t/5GTtQB4Q17IAjTM6i+JDuzh19ABlxftoaTJ5WtqexNvoZ3k8Sv/FiHAGJ0r98Vs/G7EQO1sMaqzeZOAQa2ZO4MWH7qbstAVxTBsrVQXIG1DhUTqJNPpqrI/hdIk/EtU009bO1si5pvGt9Ul8MeMF1nz2FjIFzkAim95uVXoHKjxKJzBTpRy+WevDx28+hYhFV5q4m+ltDJBOa0Myeel+HPBbiOQCxaDi4/mo8CjXwJXX1dSUxtMP/J6s1G+RPKcbLVUJB1I4fTyEcQ/ezYJXHuNyfSIiPu7JqX19DpTuRoVHuQYhSETxGHCKwoytdF9bUxNZTMF2zsKqz9+msiwIiWqmosW5nosKj3IVTDrCSdLSw9i5ZQmSAZ5G95WOGL9PLFBAY30Ci/7yCrmpa3FloavT2dNQ4VE6wFSf59PUVMNP//MXDP/vn9PaVIJEproridI9rSEchz2FfX6fce+v/424oGWI9aNdIT0NFR6lAwIRX8t5vtuzn7/7q/9BYfQ+pDlbJN0vAsbvYwGyOXZoO4dzdnC+PAQccYjYab6Pp6DCo3RAEJCKw3GWJ558hs3rfIEmXNOfnnhPIz4m36eQXWs+YNwjf+RUqSQvqt/HM1DhUTpAwuctzSW8+soIKsoygdOIFdTTN76ZekXR1JTC3I8n8NHrTyG5PtnoaiADHxUepR0CEb/KSQ6lbOGpobdysc60KgntxeMwzcYyuGiL5uypAKLDV6D5PgMfFR6lHUKBNBobT7Br9Vwsu1Yh4fTe7kXk7vdJ40JZICPuuZlZ056h2haNRMJMIXFfnzPlelDhUdpgrJ0TbPNbw4z3PgQqca0139vHY6JeIUAyl6pCWbPwVU4Vm6WIUtDFAwceKjxKG4KRm/kEt992K999Ow84Sd/3Uzb5PnFALthT2PjFa8RHrEKmXuFovs/AQYVHaYMFKCRg9zfc+u//TFVZFGJZ9FQk63pw5fvgSCN836eM+P2vCfCbieb7DCxUeBQ3zDTrGFt8N7J98zKkl7WpQu/r4/PH5feRZvPlZUEU5e2k6pyV1qYEXI3gVHz6Myo8ihPTXTCDirIoslL3IM3tE+l/N7K73ycByCPcfzkvPvInDuf5ITlA2t+nP6PCozgxdVmn+fz9l1n2lwnACSRLub86bo3fx4rdnsL6pe8y+fF7aKiPR/J9tL9Pf0WFR3FiAfKoq0jlsdt/TWlBKNJPOYz+feMav48VSKO+OoYLFaEkhi1D8o5M3+/+/Bm8DxUeBVddVgVpSfv50+/vpLm1DKlCHwjN7d39Pkk01MXx+lMP8O6k0dTXJnBlvo8KUH9AhUdBbsp0HC1lPD7qAVavXYIsZhhL/51mtcW9tWoCDfWx+IwfSYZ1FbJYYzpXX+pa6U1UeLyeAMQXUsyuLYu4+Ze/4oKtGAmhW/rB8XXl85j+Ppk4HJls+3oqkQcWIUsURaLdDfseFR6vJwiJDBWzbO7bJCXsQZzKMfSfEPr1Yvw+EUAasZbV3Pvrn3Fg+2fI+mmJuBqM9fWxeicqPF5NAOKUPQSOYnCUInk7Jhzd18d3o5/N+H1yKS3aQ9ieZTiaUhGncxaubOe+PlbvQ4XHazF5O5lABW+Mf5o9uzcCp+id1he9hRGfNOA069fNYcgdt3DyaCgacu87VHi8FlknC86SGraXQYMG8dXXK5CeO1Y860Y04pPCqdOJTHp1LE+PuJvayljE7xPnHB+oU8uBhwqP1xKMLD8MYbu287vf3UJN7VmgkIHpVL4WRnxSgXwunA7jUlUUieHrkTqvPESI+1uWtmeiwuOVBCD+jULqTmYz7pExfPHlV8BFxPHqqU9+s5xOFJBJc1MmH7/9IhNGD6X6glTkixj396TJgY8Kj1cSiISbT7Fw/Ag+n/IsjU3nkEzlCDz/pnNZPy3NB/n43cn89je3k5QUgjSzT0ZzfnoWFR6vJAwo4FiGH+Mf+h12+zkkmhWD5ziVr4URnwzgPDt37eWPN/8Gv6ULgDOI+ETgyvnp6+P1LFR4vA5TDFpGY+1JUi3f4cCUR/SHnju9iZlypgLlFOZZefTOX7Fh8TTgOJLxnIgIkLcIcu+gwuN1SKOvhprjLJk1i1FPjKe5uZTuXaRvIGEsn3igmKqzFoI2fE5cTCjBwfuBC8gUVJuMdScqPF6F8e2cZ+3iTxg0aBCr16xFbq5ovPemMmUWEUhe0wVSQ/346//5N8zwmQOcR6J9Kj7dhQqP12AaZ2XgoIJxf/g1P/2Xf8VWfRaZUoSjN5RZ0SIFOE7wnhX87F/+D+OfG0fF+QIgH/GD6aKCN4oKj9dgyiNycTRXEBmyl42bVgPlyDTDG6dZHZ0nWU4HKqk8novvis+JCFmPZHWXIA7pKHRJ5a6jwuM1SOuL8vJ45k97HnvjaeAc8nTXvJUrMeKTABwFLrDow2d55+VRHC9OxW4/hYhQKmopdg0VHq8gALMy6IIZE1nw/p9x2GuRSu3+3Nq0r89ZsPP8ZNLUnMf6L97lw9dfZNRjz1FSUgI0Ij4hCyo+14cKj1cQjEStGjnw7UZefOIRiktSEeEZ6FXoPY3x+6QDp7C3XsZn+kf8/d//C8EhoUhDfGM1qoB3FhUej8c0+jpM1ekC8nJyGDFyLBcuHEF8FZ1pbWqaZgUhU7ZQ57/BToJwZfl64pM/AFNkCueoLj/KiLv+wN/81SBKj6YhCx6mIFalqfXyxPPQfajweDxBQDItDTn4TBjKsD/9kQULFyF1WZ1pbWoEJxLxaZiCyhzEAZuBWAMJyI0Xgctn5Ek3n2kjkgSUc7muhLAD31JXdRip6K9E/D7G8azO+quhwuPxhAHFROxfyhvPD+ftqa+SkxMLFE1hqtUAAA38SURBVCFRrs4ITwSXLkVz/nw65ypLqKk7Q93FSqCF+rpyys7kIE/9w9TWRXH5sgXP9HuYlIQYJKnwAtXnMlj80WTeeeMVtu1YCdQCR3Atguhp56B7UOHxaEzPnWNUXyjgYtVx6upOI5GaFDoXkRGLaePGmTz22OO8+OLL3PeHe/jg66/IOniI0Y9MYPrU93hz1nvUUU+0/1IeGz2M83VWBsYKFV0hCBH0BOytBVgDN3HrT/6J//qPf+PNqbMoP3MSyfmJxPMsv+5BhcejsQAFHCsKo7QohRMnzyDV1/lI688Yrp0MFwjEUVeXT0WljcyoCO4bMZKjVceZ9tyz+IbtBQfcd8dIlu7cA/Y6cg/uobYhBM+dbhghCUZyoI7TVFXA2RMn+PMT43juz2OBUiTiZUXzfX6MCo/HEggk0NJcwuvjx/DxB1N5eOSz2O3naWk5xKlTFmRKkIHcHB1NCwIQgSoH4LmHR+K7Zw+0wCO33E/pyVIAZo6ZxnyfmYADiZZ54lSrvXMTgvjKSoAmvt+4kAf/+2bOVx1CLMtCRIBi0HwpFyo8HksocJC87EBmTX+Hd6dNZfXqFcBlGhoO8fDDj/Huu69RW5sJFNDxtMvkAFWQuH0Xg//0AI3Yaa1uYPTvBlNSfgyA6Y++xZwPZwOX8K5MaPd8n2yglK/nTWD1rFeBS6RlRVJlOwbYEEGORlttqPB4KAHIjZBHa+MZjpUeZdgDwzh9uhBxAhdy6lQiU6aM5/bb72PXrpVIVKq9G8Ls6xhvvvQ0o9+bCYDDATNeGc+Hi9dQWVbBH24dwsZd+5AufhH94Bz0xTk3LTbyqK8q4FRREs8++AAPj3qag4dykFcp0mrDu6dfKjweSTCQxZGsHfiv9CElJZGvv56DiEIacuHnAieIjNzCokXzcDhicPl7AtpgAXsqKxe+R1DhPmSV0QuUH0ni1Zde5i8z3uDT5V/QwnEkUdFTncrXwlg/cUAx58vTefmB+3l86G8Z8cAwvj8QjLwuIGF5703eVOHxOMRCcbTmM33MEL79dAZQjzS2SkKeyqHOf6NxCZEFeQpH4FryJdBJEK7sXZOzk4z4L04hvqJStO7LnH8jPuepqagky38zG5et5Cc//U9mzv6U2to6RHzi8J4p6ZWo8HgcIYi5fwi/lT5cqjqKiE7btcPNgndBToKBcDZtWkRu7nbETxPs9veBbn8X7HyfcMT/E4M4qNV34TpXEYjPB06Vnee+ex7j9bEP8uJjD/PQ8GewWKyIcHtnrZwKj0dhWl/kc6kqF7CzctUS0tJ2IpGVjoTB3CyRJCdvYvz4pzhzJghXD+aOxCTA7V9PF5xAXKJrhDf0KoQD6dTVFfPU08+yb/9+8pPjeeeZkcyd8TZfLlmEWItpzvNswZsSDlV4PIpgIJuzx/bz7sujOJRTyB9uG0p5eSIyDbqaWW9KI1KwWNbw2mvPUFUVhK4zZVqjJiL5TxmIWOQh08tjSPlILhI+P4JYnAlAKo2NKaSn+yPRPqg8kUljbQHVZ4/QVF+ElFsUIdZPPN6RhqDC40GYYtBC5k0fw/JP5zN/wWLmz5+JJA1G07nyiFAgnqKibVy8eIArHc59/Rl7GzNlOgiUkpwZQeXFM8Alyo8XsW/fNqKTQoFWoBpLyLcEBOzgYoPJDi9ChCoXsTiznb8/h7/fYiaPGcbxvETemjqX8PADQDXe0mZDhccjMNZKLHCE9GR/zlaUMG3am5w8mYQ8kTsbQTG+HCsyXYjEO3NPTEW6hME3fP4Vg/7h/5JadoH6c2e5d9gjrF67licfG8vmOAu71+7muVffZ/r77/GJ30agmTWrv6auLgGXJROGCFkSdnseyxe+zcJ3JxIRbuGue0ex4JNPqa8vQSwmzw63q/B4BKZjXi7Joeuos+UBFTgcRchT9noX6TNCFs3x499z+LA/3hexCkKmS40kBkTy+JDJ/GrIo5TUXCR85Tpe++ANAFKD4rnn/rHMm7Gc2bM38+03i5i7YxX+gRaefPIpLl82TeLd0xNCkIhWIU3Np6mrPMr2lat54dnJ+PjMprW1AHmIhOKpfh8VHo9ACjkrzsQw8s7fcK48C1kZIYuut2gIBFKIjNzEgw8+gt1+CFeSYV9/3t4gBCjgzKE4Xnj+eY5UnGDEsy9ytKaOr95ZwLwZswAoTSzkid8PoaqymmUzV/HZks+pvFjH6NFPExOzA/H5tF2L3iXsJhDw0cRH8Xl9ImWncoFi5IFxCPEtheNpAqTCM+AxU4J8dm2Yx+K5b3DmTB4BARuQi7erVopUtjc1FfDII4+xdetypLTCW5LeLEA+Y8eO43/fNIaJ4+fxj//+B2Yu2sX+z7/mo5mSwX0oMoPf/uRe7LheCXFWBg8egQjI1RIqA5Ep7UGaW3NYM3M8Z45akfKKE1itW2hqKkDEKwZPmu6q8Ax4AhGr5hi1lXk0X6pmzlwfPvhgGhIp6WpUykzfCtmz5yseemgEzc3ZyNO3rz9zbxAMJJGVHUu4JYeQgCT+4ee3sSkgjerSYu64awT79oYx4bmXeHXuAqAFyQwvprIygYoKk3Bpcqeu9v1ZEIEqobW1gI2fvUNmwgEmv/YxI0eOobw8A4meeU7OjwrPgCcEyCE9dg2xcRbsDrj33gc5ejQWcYzeyNRI2j5cvBjF7t3LaGqKwXssHmNJ5iLT1loORAVyobEGaCUrKQJf38/ZvG0ll5pPICKfighIBtfXh9lkO0cB2cSHrWDk7b8gOfwAmzev5U93/J69ezchU69wPCHKqMIzoHFOhxpSeOqum4iy7GX9xg08++wEJD8klhtLyXdP/89GzH3Pjrb8+POHIr6YVCQUnocIwAnnOT6OhMATgARaWxNoaopFrJPr9cuYaGIRJ4rDOJweCjhISU4mIHAbrhyhJAZ6nx8VngFNMJBJxfE9LPp4PFBJSUkcJ05YEcfy9Uaz2uL+JE5CLvpI5ILv68/emwQ6P7MFsTisuNIMopw/xwL57N+/jMWLfRAxul7/mjnf0Yi4VREXsJb3x4+k8kwhcIaamoOcPh2JCF8mLoHr63N0fajwDEhcJQ6QQUNtGlIxftH57xHE1I9GbparpfZfDQti5eRy8mQ0mzZ9Dj9UoFuRG6ur+x4ohDnPgxGdcETQrbgEKBbx55zF1/cz/PxWINZQEq7m9519r3DnOU8G8mltOYnvFx/zybQ/Q2stlRfqGTXqOZYs+RqwI2UXSVw5rev/VpAKT7eKgREE9zl42xYT7uPtYcbdt/VvMyYFnVBI4oFP+Pz18QDU1p6nubkByYA9jXTFK0KiUddLIRKVOQVc5ujRI7zwwgs0NjYCNcgT94jz77qy/4GGKWsodP5chKw5byrzK4FWJkyYzN693yPZzOXO76Cz58js2+zzDHAZAJoqabpso7Qkm3PnzjLuzxN44YXXOHv2DFLpnoM8aEK5srj3atfZta7Ba4115vpW4elhjDMyynkBROIKfxoTOgJ5msU4f3YfD0GeoMZ8D+PK1hQW51gc4k9Ip+ViGi/cfxNhAQE0NNgZO/Z5mptb6IlXff1lXnppUo/s25NeaWkJ1NVd7LH9r/n0I0K2LQVg2bJNxMVFuY0eQyyvJCRb2lxH7u1NTDuUGH7c/iQEuW5jcFnL7uNhuKaYZsrddt8xbfbdvvio8HSb6IRw8WIwNls4NlskNlsYzc2mx00wra1hVFWFYrNZneOhtLaGYaqcmxpCsNnCnGPhXKwz5ncwYOHSpTBstghstihstiiamtJpqIkndP1CAGbP/phBg/6OKVPeYPbsOW2Y2wXct5/NjBkfctNNtzF16rvdtP+BRtvP3B6zWbx4IQsXzmf27NldOEcd73f27NnMnTcPn7/8hd/89B+Z8NQYlq5Ywaeff86cOXOYP38+1dXF1NcVYLMlYLPFYLOF03Ax+IfryOEIo7o6xHkNWqmqCsXhsGCq7Zsaw9yuQSs1NSFOsZF91NdeeX1fbgi74hqtrr7y+rbbO47qqfB0m/BEsn37LHx8JuLjMwkfn1c4enQ78tSxYKvYz2efvO4cm4SPz8tUVu7DPIHyIr/Cx+cV59hEdvvNQ54aoUAc+/YtdO57Mj4+k8jP34k4IM9TX3eWVydN5IknnmDYsGEMHjzYyZBuQPY1ZMhQRo16lKFDh3bz/j2JwR383D3fweDBgxk2bBiPjHqMYQ8+yL//09/yj3/71zw4YgRDhw6l+HAmFr+l+PhMwcfnVXx8JhK9fRZioYTR0hLGF1+8+cM1+sknU2hoMOJiJT97Ez4+L/9wDS5d+o7bNRhJ6MYP3a7RV0iJW41Y6aGAla+/nvbD9T1nzmRqa/3pKBChwtNtmES+VFx5HCbV3ZipCc6xDK50CJoqaJMDkoarMNP4dGIQMzrTOR7r/NLjEf+Ae+6svrzhVVt2mBnjHiZp1xbnb6oQv9MhJP0hFVfJTCCm84BcRxlIOYa5Bs1UKRnXNRaHazplSjzcr29rO/vOaLPvDqZaDsdulK6DYzewG9gD7AMOOE/u98Be5+/3OH/e73by97cz/r1z7IBzX3vccN+3+/g+5xcf4/zC83E5QbvLqXoYcTQbDnfj/j2JIje68/wUun0HpYjD/yxQT82ZLLLDv8HVz8dMjQJwXSfm+mx7HV3PNbibH1/f++jc9f3j+2aQw1GEcmPIRdEZijr4+Wq/u9a+3CMsxUgU5ajisRzDlbx4Bolg1iCCZB4KN3INdvV6vPq+294zg9CXvvSlr15+qfDoS1/66vWXCo++9KWvXn/9fxtjT8XBLztZAAAAAElFTkSuQmCC[/img]

Las Propiedades de los Triángulos[br]Autor:[url=https://www.geogebra.org/u/melinabarrow]Melina[/url][br]Ángulos internos[br][br][img]https://www.geogebra.org/resource/k6gah58m/K2d5devjmKlLMvPr/material-k6gah58m.png[/img][br]Propiedades básicas en los Triángulos[br][br][br]