Graphing Logarithmic Functions | Summary and Q&A

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January 30, 2018
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The Organic Chemistry Tutor
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Graphing Logarithmic Functions

TL;DR

Learn how to graph logarithmic functions and understand the four basic shapes they can take.

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Key Insights

  • 🚦 Logarithmic functions are the inverse of exponential functions and contain vertical asymptotes.
  • 😥 Graphing logarithmic functions requires finding the vertical asymptote and plotting two points.
  • ❣️ The four basic shapes of logarithmic functions determine the range of x and y values.
  • ☠️ Logarithmic functions increase at a decreasing rate compared to exponential functions.
  • 🤯 The domain and range of logarithmic functions are restricted, with the lowest x value being the vertical asymptote.
  • ❣️ By analyzing the signs in front of x and y, you can determine the direction of the graph.
  • 😥 The points on the graph of a logarithmic function will guide you in plotting the correct shape.

Transcript

now let's talk about graphing logarithmic functions let's go over the four basic shapes so let's say if you have log x where x and y are both positive kind of like what we did in the last lesson in this case the graph is going to travel towards quadrant one logarithmic functions are basically the inverse of an exponential function exponential funct... Read More

Questions & Answers

Q: What are logarithmic functions?

Logarithmic functions are the inverse of exponential functions. They represent the relationship between an exponent and a base, where the exponent is the logarithm of a given number to the base.

Q: How do logarithmic functions relate to exponential functions?

Logarithmic functions and exponential functions are inverse functions of each other. The graph of a logarithmic function is obtained by reflecting the graph of its corresponding exponential function across the line y = x.

Q: What are the four basic shapes of logarithmic functions?

The four basic shapes of logarithmic functions are: traveling towards quadrant one, reflecting across the y-axis, reflecting across the x-axis, and reflecting across the origin. Each shape represents different ranges of positive and negative x and y values.

Q: How do you graph a logarithmic function?

To graph a logarithmic function, first find the vertical asymptote by setting the inside of the logarithm equal to zero. Then choose two points and calculate their corresponding y values. Plot these points on the graph, starting from the vertical asymptote, to get the shape of the function.

Summary & Key Takeaways

  • Logarithmic functions are the inverse of exponential functions and contain vertical asymptotes.

  • There are four basic shapes of logarithmic functions: traveling towards quadrant one, reflecting across the y-axis, reflecting across the x-axis, and reflecting across the origin.

  • To graph a logarithmic function, find the vertical asymptote, determine the x and y values for two points, and plot them on a graph.

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