5 Must Know Facts For Your Next Test

1. The denominator of a rational expression determines the domain of the function, as the denominator cannot be equal to zero.
2. When the denominator of a rational expression is a linear expression, the roots of the denominator represent the vertical asymptotes of the rational function.
3. The degree of the denominator relative to the degree of the numerator determines the end behavior of the rational function.
4. Transformations of the denominator, such as adding or subtracting constants, can affect the horizontal asymptotes of the rational function.
5. The denominator plays a crucial role in the simplification and manipulation of rational expressions, as well as in the graphing and analysis of rational functions.

Review Questions

• Explain how the denominator of a rational expression determines the domain of the function.
  • The denominator of a rational expression represents the total number of parts being considered in the fraction. For a rational function to be defined, the denominator cannot be equal to zero, as this would result in an undefined or infinite value. Therefore, the denominator of a rational expression determines the domain of the function by excluding any values that would make the denominator equal to zero.
• Describe the relationship between the roots of the denominator and the vertical asymptotes of a rational function.
  • When the denominator of a rational expression is a linear expression, the roots of the denominator represent the values of the independent variable that make the denominator equal to zero. These roots correspond to the vertical asymptotes of the rational function, as the function approaches positive or negative infinity as the independent variable approaches the values that make the denominator equal to zero.
• Analyze how the degree of the denominator relative to the degree of the numerator affects the end behavior of a rational function.
  • The degree of the denominator relative to the degree of the numerator is a key factor in determining the end behavior of a rational function. If the degree of the denominator is greater than the degree of the numerator, the rational function will approach zero as the independent variable approaches positive or negative infinity, exhibiting a horizontal asymptote at y = 0. Conversely, if the degree of the numerator is greater than or equal to the degree of the denominator, the rational function will approach positive or negative infinity as the independent variable approaches positive or negative infinity.

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