Question 1090612

The graph of  f(x) will have vertical asymptotes at those values of {{{x}}} for which the {{{denominator}}} is equal to zero.=> {{{denominator}}} could be equal to zero for {{{one}}},{{{two}}}, or {{{three}}} values of {{{x}}}

 If {{{m=n}}} (that is, the degrees of the numerator and denominator are the same), then the graph of {{{f(x)}}} will have {{{one}}} horizontal asymptote at {{{y=a[n]/b[m]}}}. (coefficients of highest degree)

When the degree of the numerator is exactly {{{one}}} more than the degree of the denominator, the graph of the rational function will have an oblique asymptote.

in your case, the degree of the numerator and denominator are same; so, there is no oblique asymptote  

so, your answer is:

c. One horizontal asymptote and at least one vertical asymptote