Understanding Rational Functions and Asymptotes

Exploring exponential growth

Learning about trigonometric functions

Studying asymptotes and rational functions

Finding the roots of polynomials

A function with a constant numerator

A function with a quadratic numerator

A function with a linear denominator

A function with a polynomial numerator and denominator

A horizontal line that a graph approaches

A vertical line that a graph approaches but never touches

A diagonal line that a graph crosses

A line that a graph intersects at infinity

They are the points where vertical asymptotes occur

They have no significance

They determine the horizontal asymptotes

They indicate the function's maximum points

The horizontal asymptote is always y = 0

The horizontal asymptote is the sum of the coefficients

There is no horizontal asymptote

The horizontal asymptote is the ratio of the leading coefficients

The limit approaches zero

The limit approaches a constant value

The limit approaches infinity

The limit does not exist

y = 3

y = 1

y = 0

y = 2

By checking if the function is continuous at the asymptote

By finding the integral of the function

By calculating the derivative at the asymptote

By finding the limit as x approaches the asymptote from both sides

Determining the y-intercepts

Calculating the derivative

Identifying the asymptotes

Finding the x-intercepts

To calculate the function's range

To determine the function's domain

To ensure the graph is accurate

To find the function's derivative