[br]En la siguiente función ¿dónde estará la asíntota vertical?[br][img]data:image/png;base64,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[/img][br][br]Obtén la gráfica en geogebra clásico la función anterior y comprueba tu respuesta

Dada la siguiente función:[br][br][math]f\left(x\right)=\frac{x^3-3x^2-x+3}{x^2+x-6}[/math][br][br]¿Cuántas asíntotas verticales tendrá? ¿dónde estarán?[br][br]Obtén la gráfica en Geogebra clásico y comprueba tu respuesta

¿Tiene asíntotas verticales la siguiente función?[br][br][img]data:image/png;base64,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[/img][br][br]