[color=#ff0000][size=200]1.[/size][/color] A partir de las ecuaciones paramétricas de la 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[/img][br][br][size=200][color=#ff0000]2. [/color][/size]Despejamos el parámetro t en ambas ecuaciones e igualamos[br][br][img]data:image/png;base64,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[/img][br][br][size=200][color=#ff0000]3. [/color][/size]Pasamos los denominadores multiplicando a cada lado y despejamos y 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[/img][br][br][color=#1e84cc][b][size=150]IMPORTANTE[/size] Observar la relación de la pendiente con el vector director[br][br][/b][/color]Vector director d(d[sub]1[/sub], d[sub]2[/sub]) ---> Pendiente m = [math]\frac{d_2}{d_1}[/math][br][br][color=#ff0000][size=200]4. [/size][/color] Pasando todo al primer miembro , dejándolo igualado a cero[br][img]data:image/png;base64,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[/img][br][b][color=#1e84cc][size=150]IMPORTANTE[/size] Observar la relación de los coeficientes A y B de la ecuación con el vector director[br][/color][/b][br]El vector v (A, B) es un vector perpendicular al vector director que es d (-B, A) [br](Veremos esto con detalle en el punto 6.5)[br]

[b]Ejercicio 1, apartados a, b y c. Página 167[/b]