approaches infinity or negative infinity. This is determined by the degrees of the numerator ( ) and denominator ( The horizontal asymptote is If : The horizontal asymptote is (the ratio of leading coefficients). If
To review Topic 1.7 properly, you must be able to identify these features of a rational function These occur at the -values where the denominator (and does not cancel with the numerator).
A "proper" review requires using formal limit notation to describe the behavior near asymptotes and at the ends: Horizontal Asymptote at : 4. Example Problem Consider the function Vertical Asymptote: Set Horizontal Asymptote: Degrees are equal ( Zero: Set End Behavior: ✅ Summary
These occur when a factor appears in both the numerator and denominator and cancels out.
A-1.7z [HD]
approaches infinity or negative infinity. This is determined by the degrees of the numerator ( ) and denominator ( The horizontal asymptote is If : The horizontal asymptote is (the ratio of leading coefficients). If
To review Topic 1.7 properly, you must be able to identify these features of a rational function These occur at the -values where the denominator (and does not cancel with the numerator). A-1.7z
A "proper" review requires using formal limit notation to describe the behavior near asymptotes and at the ends: Horizontal Asymptote at : 4. Example Problem Consider the function Vertical Asymptote: Set Horizontal Asymptote: Degrees are equal ( Zero: Set End Behavior: ✅ Summary approaches infinity or negative infinity
These occur when a factor appears in both the numerator and denominator and cancels out. A "proper" review requires using formal limit notation