129 Videos for "asymptote"

Exponential Functions and their Graphs  Problem 5
Math › Precalculus › Exponential and Logarithmic Functions
Examples of graphing exponential decay functions using transformations on the parent graph, including attention to asymptotes, domain and range. 
Optimization Using the Closed Interval Method  Problem 2
Math › Calculus › Applications of the Derivative
How to evaluate the limit of a function as x goes to infinity (or minus infinity), and how to determine the horizontal asymptote of its graph. 
The First Derivative Test for Relative Maximum and Minimum  Concept
Math › Calculus › Applications of the Derivative
How to use an algebraic approach to find onesided limits of a rational function, and how these limits can be used to find a vertical asymptote. 
Solving a Logarithmic Equation  Problem 4
Math › Algebra 2 › Inverse, Exponential and Logarithmic Functions
Connecting algebraic extraneous solutions to logarithmic equations with the graphs, asymptotes, and domain restrictions. 
Exponential Functions and their Graphs  Problem 4
Math › Algebra 2 › Inverse, Exponential and Logarithmic Functions
Examples of graphing exponential growth functions using transformations on the parent graph, including attention to asymptotes, domain and range. 
Exponential Functions and their Graphs  Problem 5
Math › Algebra 2 › Inverse, Exponential and Logarithmic Functions
Examples of graphing exponential decay functions using transformations on the parent graph, including attention to asymptotes, domain and range. 
The First Derivative Test for Relative Maximum and Minimum  Problem 1
Math › Calculus › Applications of the Derivative
How to use an algebraic approach to find onesided limits of a rational function, and how these limits can be used to find a vertical asymptote. 
Graphing the Transformation y = a f(x) + k  Problem 2
Math › Precalculus › Introduction to Functions
How to graph the transformation y = a f(x) + k when f(x) = 2^x. 
Graphing the Transformation y = f(x  h)  Problem 3
Math › Precalculus › Introduction to Functions
How to apply the transformation y = f(x ? h) to a rational function.