El valor absoluto de un número a (positivo o negativo) es la distancia al origen (sin signo):[br][br][img]data:image/png;base64,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[/img][br][br]Matemáticamente esto puede definirse así:[br][br][img]data:image/png;base64,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[/img][br][br]Por lo que, en consecuencia, la función valor absuluto es una función definida a trozos de la siguiente manera:[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJQAAAA5CAYAAADQvgLkAAAK2WlDQ1BJQ0MgUHJvZmlsZQAASImVlwdUU9kWhs+96SGhBSIgJfSOdAJICT0UQTqISkhCEkoICUFF7AyO4FhQEcEyoiMCCo4ORcaCWLAwCCh2nSCDgjoOFmyozA08wsy89d5bb2ednG/t7LPP3ueeu9YfAMghLJEoC1YFIFuYJ44O9qMlJiXTcE8AhHw0ARp4sNgSESMqKhwgNj3/3d7dQmIRu2Erz/Xvv/9XU+dwJWwAoBSE0zgSdjbC7ch4xhaJ8wBAHUH8xkvyRHLuQVhDjBSI8G9y5k3xBzmnTTKaNBkTG+2PMA0APInFEvMAINkgflo+m4fkIcl7sBdyBEKECxH2ZvNZHIRPIWyTnZ0j52GELZB4EQBk5HQAPe0vOXl/y5+myM9i8RQ81dek4QMEElEWa9n/eTT/27KzpNN7mCGDxBeHRMv3Q87vTmZOmIKFafMip1nAmapJznxpSNw0syX+ydPMYQWEKdZmzQuf5nRBEFORJ48ZO81cSWDMNItzohV7pYv9GdPMEk/uS0RYJs2MU/j5XKYifwE/NmGa8wXx86ZZkhkTNhPjr/CLpdGK+rnCYL+ZfYMUvWdL/tKvgKlYm8ePDVH0zpqpnytkzOSUJCpq43ADAmdi4hTxojw/xV6irChFPDcrWOGX5Mco1uYhl3NmbZTiDDNYoVHTDAQgArAAm6YyTQDkcZfmyRvxzxEtEwt4/DwaA3nbuDSmkG1nQ3O0d3QEQP7uTl2HN9TJdxKiXp3x5bYD4F6COHkzPpYxACefAEB5N+Mzfo1cpS0AnO5hS8X5Uz60/AuDPD0VoAG0gT4wBhbAFjgCV+AJfEEgCAWRIBYkgUVIrXyQDcRgCSgEa0AxKAVbwA5QCfaBA+AwOAqOgxZwCpwDl8A10AP6wX0gA0PgORgF78A4BEE4iAxRIG3IADKFrCFHiA55Q4FQOBQNJUGpEA8SQlKoEFoHlUJlUCW0H6qFfoROQuegK1AvdBcagEag19AnGAWTYA1YDzaD58B0mAGHwbHwQpgH58IFcBG8Ca6Aq+EjcDN8Dr4G98My+Dk8hgIoJRQVZYiyRdFR/qhIVDIqHSVGrUSVoMpR1agGVBuqE3UDJUO9QH1EY9EUNA1ti/ZEh6Dj0Gx0LnoleiO6En0Y3Yy+gL6BHkCPor9iyBhdjDXGA8PEJGJ4mCWYYkw55hCmCXMR048ZwrzDYrFUrDnWDRuCTcJmYJdjN2L3YBux7dhe7CB2DIfDaeOscV64SBwLl4crxu3CHcGdxfXhhnAf8Ep4A7wjPgifjBfi1+LL8XX4M/g+/FP8OEGVYErwIEQSOIRlhM2Eg4Q2wnXCEGGcqEY0J3oRY4kZxDXECmID8SLxAfGNkpKSkZK70nwlgdJqpQqlY0qXlQaUPpLUSVYkf1IKSUraRKohtZPukt6QyWQzsi85mZxH3kSuJZ8nPyJ/UKYo2ykzlTnKq5SrlJuV+5RfqhBUTFUYKotUClTKVU6oXFd5oUpQNVP1V2WprlStUj2pelt1TI2i5qAWqZattlGtTu2K2rA6Tt1MPVCdo16kfkD9vPogBUUxpvhT2JR1lIOUi5QhDayGuQZTI0OjVOOoRrfGqKa6prNmvOZSzSrN05oyKopqRmVSs6ibqcept6ifZunNYsziztowq2FW36z3WrO1fLW4WiVajVr9Wp+0adqB2pnaW7VbtB/qoHWsdObrLNHZq3NR58Vsjdmes9mzS2Yfn31PF9a10o3WXa57QLdLd0xPXy9YT6S3S++83gt9qr6vfob+dv0z+iMGFANvA4HBdoOzBs9omjQGLYtWQbtAGzXUNQwxlBruN+w2HDcyN4ozWmvUaPTQmGhMN0433m7cYTxqYmASYVJoUm9yz5RgSjflm+407TR9b2ZulmC23qzFbNhcy5xpXmBeb/7AgmzhY5FrUW1x0xJrSbfMtNxj2WMFW7lY8a2qrK5bw9au1gLrPda9NhgbdxuhTbXNbVuSLcM237bedsCOahdut9auxe7lHJM5yXO2zumc89XexT7L/qD9fQd1h1CHtQ5tDq8drRzZjlWON53ITkFOq5xanV45Wztznfc633GhuES4rHfpcPni6uYqdm1wHXEzcUt12+12m65Bj6JvpF92x7j7ua9yP+X+0cPVI8/juMcfnraemZ51nsNzzedy5x6cO+hl5MXy2u8l86Z5p3p/7y3zMfRh+VT7PPY19uX4HvJ9yrBkZDCOMF762fuJ/Zr83vt7+K/wbw9ABQQHlAR0B6oHxgVWBj4KMgriBdUHjQa7BC8Pbg/BhISFbA25zdRjspm1zNFQt9AVoRfCSGExYZVhj8OtwsXhbRFwRGjEtogH80znCee1RIJIZuS2yIdR5lG5UT/Px86Pml81/0m0Q3RhdGcMJWZxTF3Mu1i/2M2x9+Ms4qRxHfEq8SnxtfHvEwISyhJkiXMSVyReS9JJEiS1JuOS45MPJY8tCFywY8FQiktKccqtheYLly68skhnUdai04tVFrMWn0jFpCak1qV+ZkWyqlljacy03WmjbH/2TvZzji9nO2eE68Ut4z5N90ovSx/mefG28Ub4Pvxy/guBv6BS8CojJGNfxvvMyMyazImshKzGbHx2avZJobowU3ghRz9naU6vyFpULJLleuTuyB0Vh4kPSSDJQklrngYikrqkFtJvpAP53vlV+R+WxC85sVRtqXBp1zKrZRuWPS0IKvhhOXo5e3lHoWHhmsKBFYwV+1dCK9NWdqwyXlW0amh18OrDa4hrMtf8stZ+bdnat+sS1rUV6RWtLhr8Jvib+mLlYnHx7fWe6/d9i/5W8G33BqcNuzZ8LeGUXC21Ly0v/byRvfHqdw7fVXw3sSl9U/dm1817t2C3CLfc2uqz9XCZWllB2eC2iG3N22nbS7a/3bF4x5Vy5/J9O4k7pTtlFeEVrbtMdm3Z9bmSX9lf5VfVuFt394bd7/dw9vTt9d3bsE9vX+m+T98Lvr+zP3h/c7VZdfkB7IH8A08Oxh/s/IH+Q+0hnUOlh77UCGtkh6MPX6h1q62t063bXA/XS+tHjqQc6TkacLS1wbZhfyO1sfQYOCY99uzH1B9vHQ873nGCfqLhJ9OfdjdRmkqaoeZlzaMt/BZZa1Jr78nQkx1tnm1NP9v9XHPK8FTVac3Tm88QzxSdmThbcHasXdT+4hzv3GDH4o775xPP37ww/0L3xbCLly8FXTrfyeg8e9nr8qkrHldOXqVfbbnmeq25y6Wr6ReXX5q6Xbubr7tdb+1x72nrndt7ps+n79yNgBuXbjJvXuuf1997K+7Wndspt2V3OHeG72bdfXUv/974/dUPMA9KHqo+LH+k+6j6V8tfG2WustMDAQNdj2Me3x9kDz7/TfLb56GiJ+Qn5U8NntYOOw6fGgka6Xm24NnQc9Hz8RfFv6v9vvulxcuf/vD9o2s0cXTolfjVxOuNb7Tf1Lx1ftsxFjX26F32u/H3JR+0Pxz+SP/Y+Snh09PxJZ9xnyu+WH5p+xr29cFE9sSEiCVmTUoBFDLg9HQAXtcg2jgJ0Q6ILicumNLWkwZN/R+YJPCfeEp/T5orADW+AMStBiAc0Sh7kWGKMAmZ5ZIo1hfATk6K8S+TpDs5TuUiIcoS82Fi4o0eALg2AL6IJybG90xMfDmIFHsXgPbcKU0vNyyi5Y9h5NSlnzMK/mFTev8vPf5zBvIKnME/5z8BkksYs2/oy9EAAABWZVhJZk1NACoAAAAIAAGHaQAEAAAAAQAAABoAAAAAAAOShgAHAAAAEgAAAESgAgAEAAAAAQAAAJSgAwAEAAAAAQAAADkAAAAAQVNDSUkAAABTY3JlZW5zaG90NP2OsgAAAdVpVFh0WE1MOmNvbS5hZG9iZS54bXAAAAAAADx4OnhtcG1ldGEgeG1sbnM6eD0iYWRvYmU6bnM6bWV0YS8iIHg6eG1wdGs9IlhNUCBDb3JlIDUuNC4wIj4KICAgPHJkZjpSREYgeG1sbnM6cmRmPSJodHRwOi8vd3d3LnczLm9yZy8xOTk5LzAyLzIyLXJkZi1zeW50YXgtbnMjIj4KICAgICAgPHJkZjpEZXNjcmlwdGlvbiByZGY6YWJvdXQ9IiIKICAgICAgICAgICAgeG1sbnM6ZXhpZj0iaHR0cDovL25zLmFkb2JlLmNvbS9leGlmLzEuMC8iPgogICAgICAgICA8ZXhpZjpQaXhlbFhEaW1lbnNpb24+MTQ4PC9leGlmOlBpeGVsWERpbWVuc2lvbj4KICAgICAgICAgPGV4aWY6VXNlckNvbW1lbnQ+U2NyZWVuc2hvdDwvZXhpZjpVc2VyQ29tbWVudD4KICAgICAgICAgPGV4aWY6UGl4ZWxZRGltZW5zaW9uPjU3PC9leGlmOlBpeGVsWURpbWVuc2lvbj4KICAgICAgPC9yZGY6RGVzY3JpcHRpb24+CiAgIDwvcmRmOlJERj4KPC94OnhtcG1ldGE+CkY9uGUAABRVSURBVHgB7dznj1zF0gfg9jqSMdlEG5NzMLwmG5NBIEAIRDYiXYkPCOleIf4KviGRJIIEAiRAJHNtcgYZTM7YBozJGSewzT1P79a4dzwzu2svrHhnGp/tczpUVVf9urq6zxmG/Vml1ElDrgFmWLZsWSrNMWLEiNTV1TXksg1EgBEDadxp+9dqAHgCUMOGDUuuf1r6Z8H/n6bdAcgLSAAUHkn+TwTUsGognSVvAIbvNG2tgY6Haq2fTu0ANdAB1AAV1mneWgMdQBX6sfp3IoBCIXW3/dFPW+/yQkGR//HHHzkQHjVyVBrWtXKH9U8MjuuwsMaPdLR8+fI84WLzEBuIknhbA2rFihX57IdCQklyykv+VXmAKfJSee10Txf0ZdIB0qhRoxoOv60B5SBx6dKlafjw4WnRokVpwYIF6ddff03bbrtt2nzzzTOgHC6qb/cERPRgYrm6hjWOltoaUMAiffvtt+mRRx5JH374YTr44IPTlltumcspMHur/PT3/wnAk3P06NGDIkDpdftLUJ+YcDzUJptskjbccMM0cuTIGonw4G0NqJhxr7zySnrrrbfStGnT0v77719TUoCpmpO1MjfKXZaAmLHuzeJGcUWvzj0P4hFJ/+ATz5F/8MEH6bHHHks77bRTOvrooxNgheG0aZTIgR45gnbIGTIbdylnKUu0RTvo/PTTT3nCzZkzJy916667bjriiCPSjjvumNvgQzZXY7/VSNL/p2UUaJmjjK222qrXKCkqG7DAk/Y5OF3RbTQdeBKpVlcZVAzWKoVBGa3Gp+qAdhh44cKFad68eemLL77IsYu2fdFFS7ssY5WTiXy///57vo9JVMo2vKt7SddOXxdPJByQP/300+n1119PU6ZMSZdddlki1z333JNDBONYsXxFjVxbe6jQQp7NlRei/L5SblsZTdtoP3LEyGzAZcuX1WY+w7VKYbjgvXzF8rTsj2VpxZ8rMrgBYvfdd09XX311bWkBijGjxzQli2aAW6O4DxBlTwvoxQTRroKQrAZsdMhlSQPm559/Pq299tpp4sSJaezYsWmXXXZJDz/8cHr33XfTdtttl+XVX78OoGhiAInSAMnM/e677/LMHzduXF4Kvv/m++xRBPQ77LBDn1Rr3qQCEy/5ySefpK+++iqhx3h2Usp5is022yytt956q4ChZAKE4kG5OAeQLFc8iphn/fXX7/a4RadyPN98803uu8UWW9Ritvmfz8/xExBZ6ox9rbXWSr/88kuaO3duWvjbwrTOuutkMCE7ZIAykDLlpaUsqLsPb1AuD3VNBuWxXq56olH/+eefp9tvvz0r+6KLLsoGE9i/+OKL6bjjjusXoNDiCQDTjGd8HuCNN95Ihx9+eFpnnXXSzTffnHbeeed08cUXN9yqZ3l6vA6ZbrnllrRkyZI0rYoHLeMPPPBAEoudfPLJ6cQTT8zDiTHExPjxxx/Ta6+9lp566qnsfU477bTcl0dbsnRJ9lQmCUDRvw0C2nlJXPZH+rNa/p3bqRsSQGVwVErgag2OIK2WCG3i0pYRJPeDnfDhfcgYsgW/4GUpYYRNN900MeL06dPTHnvskbbeaut05ZVXZsVH3+hTn6tHB22e4eOPP04TJkxIp59+ep75I6pldKONxua4ztLDW9WPl4wRK9Hfzz//nHlbGt9+++00ZsyY3H/vvffOubb64GmMP/zwQ3r//ffTs88+m8F86KGHpkMOOSQvb0EXLe0BSCI3Xp6zPJUdA0zqhwRQhCJoFqASrN5guaLuD0UwgMEYSL1y65qv9qNZ99FHH+XYgdLwlAfgycGL2HlZlngQMYb7KVXQajkIWcttdSOBjEFAu/HGG2cjPvjgg3n2H3vssXnJAlqgwLuRjujRJcl32223tPXWW6ebbrop3XfffdmroUUO9eRy/9tvv6UnnngizZw5My+D2tjd4gVo2mqHZ3glXi/0znb0JAFTyOD5bwdUMJfPnz8/z7Bdd92VLE3T4kWLs4GHjxieg8AAVhi5acfVqKB0hnznnXeyAsMYJYDFEy5A23777fNuR4xC+ZRNrv7IRgf+4+nOOuusLO2dd96Z46Bp1ZKlXvyDVhizHFKUk1k9WYHC8gT0AKEcGLT1jGbEa86WeCXbfwkdB5b6uNdWPwB06CsXh9E/PhtttFH3MtzjpdAYEkARlHu2VEB6X4Ba8OWCdPc9d+dZe+mll5LbevmXJB6GksUwEuWWiewMwUiffvppBp/lSNwjcHZv6arvV9JwHwZjHMaydb/qqqvyKf0Tjz+RXnrppew16MdlCULTf/5JZNFf4llcDmfJZ1dmwjo7EvMItAMoG2ywQfZeYqvHH388vfrqq3nJnjx5cvcS2zUyywdM22yzTQbO119/nYEorgNIGwQ7PHyMJdLfDiizJGYKZVBUXyn6EJxSeIa/KuEVxg45gxdjktdS8eijj6aDDjooAw8IBdUmydSpU7PX6gtQjBXjscQClcNL3mXiDhOzt2O4xYsX5/Ginb3OiJVHhwAlkQkwgNDkPOaYY9ILL7yQZvx3Ru5//PHH15ZifSIeAyDxlXjLmK677ros/1FHHZX5a0secdWsWbNynAes4q4999wzA56OMtB7Jt5fZ5mwQos8gNKiSa+qUKDCvgzWq+MAH8gVqREfM378+PHpgAMOqMAzMcvC4JS/3377RdeWObr4WDp4NEa64YYb8pJy2GGHZY/xzDPPZBqWUQeLTqfLhEbEeWIxRwViIbLZ1gu63ceBbTmuoGMyGAeAvPnmm9m78XRoh1c0STwDqUmA3pQqXuTpJHWRhuQTYMAwI++4447ssq+55pqQp2FuByS2MEOvuOKK7OoNohxIw479KOQl0Z792uz07//8u/Yer1nX8F76WfYkM55hjStAH0FtMzraoRHt0fXM6PoGH57MOD2rK71z8GN49Tyow1VJ22gvb5X0xzt0GnqVh3z6a4dWyBTtStp9eiiCWsN1NjMRhWBKRHh1E0FDaUEjBhbGUI8X/gasXtK30WCCzurkguP+puBPuWSKZ/3d00uzt/HBQzv95ZLxeHYZt1Tqt9l46YcMdCZ1/dkNHnT0QUverL8+ZAg5on3wDjpRr702Ue65TC0BpSNP8txzz2XX7GBsXvVuiWsUuApCJcKWQpUDaDYQ7dGPfpQyb+68NGfunBwHWD4c+1vfnf7GDArhY4BlbpD18pSyRX1JA1+XFLSivlEeNNAVoOqrX5TXPMjKVaARmdwnjIcWA6ITtNBzaSM1kk0/EzvqPOtTPgcwGgrRUxi8oz+e6HhGK2QIWkG/Ec2WgBIXOGO56667crTv04733nsvH4QdeOCBmR6FYmidF0Bi5gr3bRdgq0nAMkU7Qkvff/99evqZp/PbdbECwN5///1592RHYYta0sDTxYCWHjEDWqEENPEQo8QrA8+ZX+UU4vxEX2PQTk7uGigQaZBKOcr7Bk2bFjFOGCgahS7iWd4X/Rhz9KmnGeWtcjTCw2lX8mwkU6OyoN8SUM5AGNKrBQGZwNGprkM93wyF15DbBcTrA8TNXownVAHn+eefn+kE0/o8AOj9l+XNNtZZkLOda6+9Np9Ge62hnYRuXMqcGd16663J1rYEhtl70kkn5dPnkicwAY/x+XTF9l9gKkbrpDXTQEtAWdJE8oDEcIJjMwBIxAiVj8iGZbhJkyblAzLg4jm0g3TI56FaJe2BBw2AsiV3YHjeeefl7a6tKgDVJzK5tP3X5f+qvakP7wU04dm0Uy4nmx3Qk08+mU/FJ//f5DTpgEk1wNbz6Tz3XwNNAUXxACEQBxiGiSN3LxqrDUWuZ2iG8mJTvKVNlAkYARJYWi0j4W0smfrzFLazeJMjrhiW50hkBJxFixflHB9lZIrkXpkUudNp5z6Ww1mvzkq//vZrfoHaCLhBZyjycqxDKVu9DcJm9TppCqjogBCDuBh5/Pjx+d1TLHcIqnMsH69SYuD6lkFjPfN4doAnAP/ss8/yi9F99tknL1++VuQlLZ949EoVpgAJD15N4I5OxBDKeUcyC/C19QxQIZ9zm6nVGYsXvJb0KVOm5JPfXnyG+ME4XGGPoRAHf/amw9CdiRu6LmVqCihEGJHHYCzH9LEsBQFtJMR9YuH9VjCMNv3JfVdz44035vjn7LPPziC8/vrrk5elF1xwQQbCKsJXHlIZgDhoc4X3CZ7kCxkDfFEXOcAL+oFtFdBGoyHKyUP+0Gl5/3eKVA9meg+Z6uVoCigNdTQoRwV2Q3Ze3owrCybeQVVmywOHYkZttbzVC+AZzaOmHpXGbTkunxCjc8YZZ+TvhHgrHqQ0djmYAAw6pcLdx6WuCuObKKF7a4xnyUOfoU4xTnK56DXK/m7Zgq8whl5NxEapKaB0omTeyW7I+yC7u3B7GLiP5Dm8SGkY5SFMtK3PfXJh1xgA0N4RBQWSoaStb7ST4ykvy/NDT7u4t7MjV1c1AXqnlV4sPBx6WeaKrMki9TWG3jQH/pR5Ckyrf8HfEm63K84bu+HYv1yGZlIDkUntnSOZ7MatRnbUoXsT1r9egPLlnW+aI/gGGLGNgBygGLhUuntXjWgFhIEk/VwlnTBc0ASY4Bl1eCj3rJ28rCtlCHCjEYAv692X/bX3XiwAWNKPdpHX0xnIM7p4BX26ZxBJGc/vSMMZoHO5M888M1UnV6uMIWiUdgga9XJGW+V4BO941i/6RL3ce8QZM2bkz2xgwPkgmbwcR1PisdTVAAU8kIjg7Nmz01PV56CQaKcFTJYlk1W9FHn9fa5s8YeAhHARQCoHFl3r6RPYVQ5Um7Jd9C3zAGNZ1ujeDKvJ0ePNQllRnmlxWNWGsS++jXj0Kut2fJlOHhPl9pR59qMFH+35HJf3Jkv9WLSTlKvnzaNN1EV9Hl/FQLkNlG/X2dZnLewQYzUuNGJ82gITzyS+tZrcdtttaeaMmRlgYudSthqgggih7IriQ3Un4sCknDBjho+pMcujWc0/AnyfWfAaBGrmPZAnzwknnJABpW05+Bj4aorRsJuxmmB0YswBfOV4A3YYriGBfhRaSmMcmseExi92o3a4dqJ40U8jnjF+gCFn2AlNdXhwFPrH5Rv2u+++O4czPlXxhQIbq8ffFbI5gwS+vfbaK8uCB4C//PLLeQmMDw3xk2qAQkQihB3TtOqLQcK5IhBrNKDcaYB/8PJKxnfYYaxWJByM7rvvvlnpMdBW7dekjmwUa2b6cB8/3w05mvDsTYFJRpFrkugZH7oVYthF+0jPvQ/XGJkMvnECLN8kSaUN0CiNz4uQEV0A0NZq400Ama046LOvDxUdlTjc9cMKn8z4Nsq5IZugK7cZQ8+kdnwTMuDl3NHZIVtqL9UARTgzwxVJmdkoByy5a02S/qGUoBV5K7rRLwQ3yP70a0WzWR0j+0nTvffem/XhENRO148bKdVXjGsKKEClU7pwbOLXKfj4HFfwGwe7zuIY2hekxtwo0QN6gENm3o6RjcNXsYw+YcKEvKkK/fFIp5xySuKhvDbz7RVwOezFS8BtEjlb9KaCPJL+MIInsAGopTNs2gtQ9QaKRgg1G4y6gSZ0S9r97b+6/fpLP7erJhpD84p+DuW9ojMxM94nugxD2YORYjxeA3kP6Q0BoPpIj5ECCMBS0xdH0DOnlbvCbnH6L4h+6KGHsqznnHNO9kjhGNjR+HK8VsWC6PqfgwAyT2U3BygAKaGvvTwSfoAFuMpjHOprgIrG7Z6LbQDG8mB3y3uYpd4zWqIpMJS9JrpiEBdjAZFfrHi5Dlh+SuULSp5BCsDU82PIMK7cD0SnHDEle1MTwVItaA6Pgl/Q86rJDt6S6nMkcdHF1W//yAF8xkkPwCbe5e0CPICEFtBrKwXtDqCyOqo/xUpOeRQkXvJZDXdv1oppGG7ttbpnb3RdkxwoGMwbAS+5fTXhB6S+TFW+SirkVEdOF7kY/Keff8pLlbMrBldmWYoDaB7KZ0mWQjEUj3v55ZfXgBdex9FJ1/CuvMRb+sJzeatAPzy4WMzkwtsldQBVKSEUEsZxmCuO8XUFBSr3GojHMGMtLYORGG/5suXp/Q/ez8uHeMZPxqY/Oj3/esVGhAeLqz7sIJckFyTbjfmxgfEwth9wAoPlDHAkAFYm+D733HOz10XXhHG559FGjOyGhn5ooW136P/j8OWXX9ZiSe2BtgOorN7uGIFCGIWBgUb8YQaLP0499dRsJAeMdjqWvhx/1HmKHnL9zvDEjxcQQ/lw0fPS35fmeI0hbQwsgdpanuz+ACISmV2AIKi3ZFrmHIICk3EAA5lLMFqmgMb/7AJfKYO74m+J1D4+ObLs2wH6atfS6GdaACW+FOvFstsBVFilyinDsmBJo0gK9Q7RNXrU6LwTMssBSuDshwD9Oe4oWKxyy8CWJIDAhxdyMj5+/Ph05JFH5qVE3SWXXJKXGJ6rPgGafuR3CHrhhRdmWkAAWJZMy2i9R8XbLi82F+gAhvHzXMDm2em9/5yIo+HsSRuelMzaSQGmfF8J3e03c1V7/TErxQPzqiMBHknccOJJJ2ajAgxjUU8oWHvPsWNaE22hE14hDMrQYRz1LobNxq3upfzjhx7vqB8acm3190xu8rtKmvprG6+WPAcPfF1BD0/PIYd7ZZI2ytFXXqYh+RlVKcBQ3lMMzyT5Jh2weA3nTILaUCDlRaJARoq6KB9ozrAMD9BoAm3wQT8bvmojqQ8DqoukjTG4yOPSTnlJS9yTeuyuXPtIntF3RUIneJb0oo0ybUpZom9bAyorocIKt14mCosUHkGZq1750W6geckj+pZGDF4MFwAJQ0d7OXBo26gueKiLpCxol/VxH3UhC97u0VAX7ZrpoQOo0HQnHxQNrITuoJDrEGl3DXQA1e4IGOTxdwA1yAptd3IdQLU7AgZ5/B1ADbJC251cB1DtjoBBHn8HUIOs0HYn1wFUuyNgkMffAdQgK7Tdyf0PQDQ8Kd/MpBkAAAAASUVORK5CYII=[/img]

La función anterior se corresponde con dos rectas, que además son las bisetrices del primer y segundo cuadrante:[br][br] - Ambas pasan por el (0,0)[br] - Sus pendientes son -1 y 1 respectivamente[br][br]Observa que un trozo y otro son simétricos respecto al eje Y.:[br][br][img]data:image/png;base64,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[/img]