La ecuación general de un plano en el espacio es:[br][br][img]data:image/png;base64,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[/img][br][br]Donde:[br][br][img]data:image/png;base64,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[/img]son coeficientes que definen un vector normal al plano.[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACYAAAAYCAYAAACWTY9zAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAJPSURBVEhL7ZZBSFNxHMe/NViEgssdBBvSIPIhrIMTFutgeVl1EKpFEK6si0EReihSYlaHwIi6urqsToFB0KEQsh5tTooVY4NhQ5i4EtOWC7fDXPL6v/d+a6+3pzDZgx32gfH9/b//B/vuvd//t7dDYKAG2Ulac9SDVYo+Pfb7K/iZFPK0LKcRre0c2ttMMBrIUqFLsHTQDx+/ip/xAEJLzGiywmW3YJe8jfxSAuG5H0ijBb2DtzFyrIV2FIjB9GJ67KzgOHpSuPJ8lRwF+ZQwcb2P7fcJ3qksmSV07LEkEvF1phZ02U2ypcRogdt7AUcMOUz6JhAju4gqWACjPadwSPpcg3+O7O2QnUV0geluDgf2y1YZjRy4NqYrH/A+IltF/gvGex9hkmrgG8afBajeBp9iCIlqt8EpGVrsQbN0MzNI/5KMfyiCJTEv/kIlCynMU1kpseispM6uTkm1WcbiMpUqFMGs6PcPwUUrsTcu3zqHfbSqjCQ+RzJMLTjY0SBbWrDHnfguFiaYmyWnBB2C6rL2Whhip9Fx+rEQJUuTqTHp1DpOPBSm/5BH6HMqi/3VwcEmGdqEPn6R1NzdDadq0OoSLBSWv3DL/sq+xat3bJwYbBgYKL9Oh2Cl+bV5f+XA338KfqMBruEb6G0iW0H1g63EEN5yfhWQ8A3jZrAAm+cu7vRoh696sLXgDMJioZ5fGzksRt7gnseD8y8LcI+O48lFK22WU6U/8QxeXL2EB3FaamKEea8Vh4+fQb+7E61Gsjeh/mpdKfVglVKjwYC/JlW3nbgGAlIAAAAASUVORK5CYII=[/img]es una constante que depende de la posición del plano en relación con el origen.[br][br]La ecuación del plano también puede expresarse en forma paramétrica como:[br][br][img]data:image/png;base64,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[/img][br][br]Donde:[br][br][img]data:image/png;base64,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[/img]es el vector de posición en el plano.[br][img]data:image/png;base64,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[/img]es un vector que señala un punto en el plano.[br][img]data:image/png;base64,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[/img]son dos vectores no colineales que están en el plano.[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAADwAAAAXCAYAAABXlyyHAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAPySURBVFhH7Zh/SNN5GMfflxiESZ1RkQ5xXTfXH5O4DZqh8nVRnggdFxuFoRhcnAUqdZwcFIpwB92dJBiIWODyIO4PuT+KruvK+T3c6ZA0cUQqXZOlpl1bXts43DV2z/e7x3Q//EHMEPMF2+fzPJ/t+93zed7P8/myD4IE3iM28PjesB7wWmc94LXOesBAF2oNR6GXX5UwP2b3GiEqYLGmAXd4Doyhua2L58vlP3gmp+By+9h+B3in4Zqchj/ANuN3T8HjZ4OJCNiBUSdPZ3E+xShPlyTggPl0Jc5dvoqzJSUobXXwgoQPYl0J9MVmjLAnDMsPIVXVRG/w6NVKea3Wwo55eKxNKK1qQGNNBfKONaGbg/bcqkWe8TQOfRt+vYiAlSgzn0UBW4AC5ReKkcHWUoy2NmCwsB5XvitEFtkjj/7Cmw0O9KPTSllXKqBiVxiGalzModHaAzHkYRwQrWNAuhEnDeyaxduF+tZEfN1Sh8qDCsA9hBHe4+Q0BTISaBKRsBg1nIs6yy+wya9GlO1h95L0o/2uGsYjScBAH7r/BVSqj7CRV9Frl3dfl6VjRzSCoKd3GzrnZ/JxDyykuoLS6I133foVrsMmaBJ8+LN3GEigIJW8uO8UzhdtpQ3eHfa9GAG/LRp82XIKB2jW/XsHJkgtnxbO3p2y/3AIHmyFKpN+xEIYTChPB+60XX+TFbGtnUpAj/zI7BLbii7gkpGuN34bNx9QVg15EKSsMqm7dkKnVrMVIo4BJyJ5SyKN/ej+g4S8JxtCWmhFqt/BRyTLBDWy9rErJkoIOSRNpw2ifDp0URmQUopNEOT1CDYnYSMF6LL2wU5ays+VFDKH/aEPOm34BscxYIblnKHVIpVdUv32DdKYpYGWBv8/vrnajiDjCxP1kDFYRCpGSw+dGAoYhDmlRMNyJoVps0MeGe89/DauhxBRkvEP2P2S5AxkfjzvR9qHYKf6Ve1VI5ly0Vx1Dfd5KZpc5FPzGqHmZRZtQI5piT7yHG4XDelKZM6T88SNDuDoZ1F1H/+AN22moOhY8PI5HJhC+09STUv9gzZhwIb7mZ/Itb4QcvNytqOZ5Fwg5LJ3IXYgZQcNdD9PyAH8fRuNogblRdRAI1iBPwCk87YC3wx8iAJtClzDbpJpIXC5CZ0pGqQGknDiUjWELfzxmNB5XvYVmmHEz+ZlHIvDN3DuPDW67Rro0vxwOHfi5I9ncCDWPaSAV4KZ6cngi2cvgzOv2fHaS/Zk8NUM24vR8X1wf/7nwZIrT9ixHPzBV3T9F8+8wcVusar+4pGeqI5fp24uo8dFCymBrXgR/xqOC/SE1xL/YCVWVYbfBas0wysF8D8mYh4RBpznfgAAAABJRU5ErkJggg==[/img]son parámetros que varían a lo largo del plano.[br][br]Las ecuaciones paramétricas del plano son:[br][br][img]data:image/png;base64,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[/img][br][br]Donde[img]data:image/png;base64,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[/img] son las coordenadas de un punto en el plano, y [img]data:image/png;base64,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[/img] son vectores no colineales en el plano.[br][br][img]data:image/png;base64,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[/img][br][br][br]