Graphing Logarithmic Functions with Transformations
Flashcard
•
Mathematics
•
9th - 12th Grade
•
Easy
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15 questions
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1.
FLASHCARD QUESTION
Front
What is the effect of a vertical compression by a factor of 1/2 on the graph of a logarithmic function?
Back
The graph is squeezed vertically towards the x-axis, making it less steep.
2.
FLASHCARD QUESTION
Front
What is the effect of translating a logarithmic function 4 units to the left?
Back
The entire graph shifts 4 units to the left along the x-axis.
3.
FLASHCARD QUESTION
Front
What is the domain of the function y=log_2(x+1)?
Back
The domain is (-1, ∞), meaning x must be greater than -1.
4.
FLASHCARD QUESTION
Front
What is the range of the function y=log_2(x+1)?
Back
The range is (-∞, ∞), meaning it can take any real number value.
5.
FLASHCARD QUESTION
Front
How do you write the equation of a logarithmic function after a vertical stretch by a factor of 2 and a translation 5 units to the right?
Back
The new function is g(x)=6log(x-5)+4.
6.
FLASHCARD QUESTION
Front
What is the end behavior of the function y=log_2(x+1) as x approaches infinity?
Back
As x approaches infinity, y approaches infinity.
7.
FLASHCARD QUESTION
Front
What happens to the graph of y=log(x) when you apply a horizontal stretch by a factor of 2?
Back
The graph becomes wider, stretching away from the y-axis.
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