Se llama [b]función lineal[/b] a aquella cuya fórmula es [img]data:image/png;base64,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[/img]. [br]Los números [b]m[/b] y [b]b[/b] reciben el nombre de pendiente y ordenada al origen, respectivamente. [br][b]Ecuación explícita[/b] de la recta: [img]data:image/png;base64,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[/img][br]La representación gráfica de una función lineal es una [b]recta[/b].[br][list][*]La [b]pendiente [/b]de una recta es el cociente entre la variación de la variable dependiente [img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAC0AAAAlCAYAAADWSWD3AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAARmSURBVFhH7ZhJKH1vGMcf0y8hMiRTugsUZcicSCiZYmtjKAtEyMbGSimxULKwMmQqbBArZGNmYSazMiyQsczP730f77n+1/+ce+9Pv9+R8qnTee9zzj33Od/zfZ/nPdcEGfDNMBX7b8VP0mrxk7Ra/FHSLy8vUF1dDd7e3rC8vCyiXwAvecayubmJGo2Gl0gsKSnBp6cncURdjFaaq9zZ2QkHBwf0uaenB1ZXV2msNkYnvbe3B6Ojo1BRUQG/fv2C09NTaG5uhufnZ3GGehiVNFe5o6MDAgMDoaysDMLDwyne29sLa2trNFYVYRO9bG1tYXR0NM7OztJnZhNkan+Ztw0qLXk5ICCAlOYkJSVBWFgYjb9EbZG8Itvb2xgTE6NVWYLZRat2aWmp0WpvbGxgX18f7T+LXqXlVJZITk7Wqs0riSG1+YStr6+HmpoaWF9fh4SEBJonH1lZWaE+kJeXB4+PjyL6AZG8LEoqS7S3txut9sDAABYVFeHd3R2ySoSenp4YHx+PNzc34ow3Ghsb0dTUFPPz8xWvp6j06+urosoSKSkpEBoaSmN9at/e3kJ/fz/k5OSAlZUVMDHg/PxcHH2HKzs5OQksaYiIiABzc3NxRBfFpKW6zH+I12U5HBwcoLCwECwsLODk5ARaWlpk6zbzL+39/PzIcsPDw8AUJ4vwm5C4uLiApaUlsLW1heDgYBGVQSiuA7swVlVV0eN8eHgQUXmYYhgVFUUWcXNzQ/aj4sg73ALspmjM9/7+/shuGOfn5ykmMTExgSxhZH2ArquErNL7+/swMjICubm5iipLcLULCgpI7ePjY9kuaWNjAy4uLjSem5sjewQFBYGPjw/FJBYWFoDdIKnM1Vbif0lzL3d1dQFTg/xsDB+9zauDHPxmuDXu7++p+lhbW4sjb36enp4GMzMziIyMVPQzIRTXsrOzg7GxscgUERHjaGtrQ6Y22YS1etmZzx85f/R2dnY4NTUlom9ItnF0dMTFxUURlUdH6c+oLJGammpQ7aurK5qwzs7O4O7uLqJv7O7u0grSy8sLPDw8RFQenWfAvzQ0NATl5eXAFBdR40lLSwNW07Xerqur03nMJiYmtPGK8d+5wsUaGxuD6+trCAkJ0etnQiiurRg89Dc2XknY2424+husXmNGRga6uroiW4uLKCLzOVUTdoNkM0Nokz46OkJfX1/ZBD67VVZWiqu/w5NlNqJOW1tbi6xdY2ZmJjLLoJOTk2zJ/IjeNv6v4LV/ZmYGBwcH8fDwEJklkVmGCsDl5aU4SxnVkuYNhq9Vuru7dRoWrzLFxcXISh02NDSQTQ2hStI8EfYWj2wS0kKJL5gkeFdkjQfj4uLw7OxMRPWjuPb4m/DqwEuapaUlZGdnA5uIFOflj79z2tvbQ1NTE7AaTXGDiOT/OXxpmpWVhWyJQMqz7kevcOnp6fTXxJ+g2l+9XO3x8XFobW2lFZ5Go4HExERa6elt2TL8/D+tFj9Jq8U3TBrgN82RZUCh22fCAAAAAElFTkSuQmCC[/img] y la variación de la variable independiente [img]data:image/png;base64,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[/img] de cualquier punto de la 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[/img][br][br][/center][list][*]La [b]ordenada al origen[/b] es el valor donde la recta corta al eje y.[/*][/list][center][img]data:image/png;base64,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[/img][/center]

La ecuación explícita de la recta: [img]data:image/png;base64,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[/img]donde [b]m[/b] y [b]b[/b] reciben el nombre de pendiente y ordenada al origen, respectivamente.

La ecuación segmentaria de la recta: [img]data:image/png;base64,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[/img]

La ecuación punto - pendiente de la recta: [img]data:image/png;base64,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[/img]donde [img]data:image/png;base64,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[/img] es un punto de la recta y [b]m[/b] es la pendiente[b].[/b]

Dados dos puntos [img]data:image/png;base64,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[/img] pertenecientes a la recta. La ecuación de la recta es: [center][img]data:image/png;base64,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[/img][/center]

La ecuación implícita de la recta: [img]data:image/png;base64,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[/img]