La pendiente [i]m[/i] de una recta no vertical que pasa por los puntos A(x1,y1) y B(x2,y2) es: [br][br] [img]data:image/png;base64,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[/img][br]La pendiente de una recta vertical no esta definida.[br][u][b]Ejemplo[/b][br][/u]Obtener la pendiente de una recta que pasa por dos puntos, P y Q.[br]P(3,5), Q(7,11) [br][br][b]SoluciĆ³n[/b][br][img]data:image/png;base64,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[/img][br]Por lo tanto, [br][img]data:image/png;base64,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[/img][br]Luego sustituimos cada variable por su valor:[br][u][img]data:image/png;base64,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[/img][/u]