La división sintética o regla de Ruffini es un método que permite encontrar el cociente y el residuo de un[br]polinomio en función de x y un binomio de la forma 𝑥 − 𝑎 o 𝑥 + 𝑎[br]
¿Qué es la asíntotas vertical?
Es una recta paralela al eje Y, a la cual se acerca progresivamente la gráfica de la función, pero[br]sin llegar a tocarla.[br]
¿Qué es la asíntotas horizontal?
En caso de que exista la asíntota horizontal en una función racional, es una recta paralela al[br]eje X, a la cual se acerca progresivamente la gráfica de la función, pero sin llegar a tocarla.
Si en la función racional el numerador es mayor al denominador y existe un residuo, se observan...[br]
Asíntotas verticales, oblícuas, cortes en "x" y en "y"[br]
Analiza la siguiente función, de manera analítica, encuentra las asíntotas horizontales, verticales, oblicuas; según sea el caso. Puedes ayudarte de DESMOS. Recuerda cada situación sobre los exponentes de la función.[img]data:image/png;base64,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[/img]
Cortes en x=1, x=-1. No hay corte en "y". Asíntota y=x. Asíntota vertical x=0.