Horizontal Asymptotes and Slant Asymptotes of Rational Functions

This algebra video tutorial explains how to identify the horizontal asymptotes and slant asymptotes of rational functions by comparing the degree of the numerator with the degree of the denominator of the rational expression. The equation of the slant asymptote can be determine using long division if the degree of the numerator exceeds the degree of the denominator by exactly 1. This algebra video tutorial contains plenty of examples and practice problems.

Fundamental Theorem of Algebra:
   • Fundamental Theorem of Algebra  

Rational Expressions - Basic Intro:
   • Rational Expressions - Basic Introduc...  

Simplifying Rational Expressions:
   • Simplifying Rational Expressions  

Multiplying Rational Expressions:
   • Multiplying Rational Expressions  

Dividing Rational Expressions:
   • Dividing Rational Expressions  

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Adding & Subtracting Rational Expressions:
   • Adding and Subtracting Rational Expre...  

Rational Expressions - Unlike Denominators:
   • Adding and Subtracting Rational Expre...  

Simplifying Complex Rational Expressions:
   • Simplifying Complex Rational Expressions  

How To Solve Rational Equations:
   • Solving Rational Equations  

Rational Equations - Extraneous Solutions:
   • Extraneous Solutions of Rational Equa...  

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Horizontal and Slant Asymptotes:
   • Horizontal Asymptotes and Slant Asymp...  

Finding Rational Functions Given 2 Points:
   • How To Find a Rational Function That ...  

Rational Functions - X and Y Intercepts:
   • How To Find The X and Y Intercepts of...  

Graphing Advanced Rational Functions:
   • Graphing Advanced Rational Functions ...  

Rational Inequalities:
   • Rational Inequalities  

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