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Use the graphing calculator to graph the parent function. f(x) = log(x) add the translated function. f(x) = log(x - h) k plug in different values of h and k to answer the following questions. what happens when h is positive? what happens when h is negative? what happens when k is positive? what happens when k is negative?

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MrRoyal

The functions f(x) = log(x) and f(x) = log(x - h) + k are logarithmic functions

How to interpret the graph?

The functions are given as:

f(x) = log(x)

f(x) = log(x - h) + k

From the graph of both functions, we have the following highlights:

  • When h is positive, the graph moves closer to the positive x-axis
  • When h is negative, the graph moves closer to the negative x-axis
  • When k is positive, the graph moves closer to the positive y-axis
  • When k is negative, the graph moves closer to the negative y-axis

Read more about logarithmic functions at:

https://brainly.com/question/1695836

sophia8212hshh

Answer:

horizontal shift to the right,

horizontal shift to the left,

vertical shift up,

vertical shift down.

Step-by-step explanation:

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