[i]1.[/i] Comprender el concepto de pendiente como la razón de cambio entre los valores de (x, y). [br][i]2.[/i] Calcular la pendiente de una recta dada dos puntos de esta. [br][i]3.[/i] Calcular la pendiente de una recta dada su ecuación. [br][i]4.[/i] Relacionar la pendiente de una recta con su inclinación en el plano cartesiano.

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[/img]