Horizontal/Vertical Asymptotoes/Holes

A vertical asymptote is a line x = a where a function approaches infinity or negative infinity as x approaches a. It occurs when the denominator of a rational function equals zero and the numerator does not equal zero at that point.

To find vertical asymptotes, set the denominator of the rational function equal to zero and solve for x. The values of x that make the denominator zero are the vertical asymptotes, provided the numerator is not also zero at those points.

A hole occurs in a function at a point where both the numerator and denominator are zero, indicating that the function is not defined at that point, but the limit exists.

To identify holes, factor both the numerator and denominator. If a common factor exists, set it equal to zero to find the x-coordinate of the hole.

A horizontal asymptote is a line y = b where a function approaches the value b as x approaches infinity or negative infinity. It describes the end behavior of the function.

To find horizontal asymptotes, compare the degrees of the numerator and denominator: 1) If the degree of the numerator is less than the degree of the denominator, y = 0 is the horizontal asymptote. 2) If the degrees are equal, divide the leading coefficients. 3) If the degree of the numerator is greater, there is no horizontal asymptote.

The degree of the numerator and denominator determines the end behavior of the function. It helps identify whether the function approaches a specific value (horizontal asymptote) or diverges (no horizontal asymptote).

The vertical asymptote is x = 3, as the denominator equals zero at this point.

As the function approaches the vertical asymptote, the function values increase or decrease without bound, approaching positive or negative infinity.

Vertical asymptotes are determined by the values of x that make the denominator equal to zero, provided the numerator does not also equal zero at those points.