How do you find the Vertical, Horizontal, and Oblique Asymptote given #(x+3)/ (x^2+4x+3)#?
1 Answer
vertical asymptote x = -1
horizontal asymptote y = 0
Explanation:
The first step is to factorise and simplify f(x).
#f(x)=cancel((x+3))^1/(cancel((x+3))^1(x+1))=1/(x+1)# The denominator of f(x) cannot be zero as this would be undefined. Equating the denominator and solving gives the value that x cannot be and if the numerator is non-zero for this value then it is a vertical asymptote.
solve: x + 1 = 0 → x = -1 is the asymptote
Horizontal asymptotes occur as
#lim_(xto+-oo),f(x)toc" (a constant)"# divide terms on numerator/denominator by x
#(1/x)/(x/x+1/x)=(1/x)/(1+1/x)# as
#xto+-oo,f(x)to0/(1+0)#
#rArry=0" is the asymptote"# Oblique asymptotes occur when the degree of the numerator > degree of the denominator. This is not the case here (numerator-degree 0 , denominator-degree 1 ) Hence there are no oblique asymptotes.
graph{(1)/(x+1) [-10, 10, -5, 5]}
