How is the graph of y=log(x) transformed to produce the graph of y=log(2x)+3

Question

How is the graph of y=log(x) transformed to produce the graph of y=log(2x)+3

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Brielle 2 months 2021-09-26T04:27:11+00:00 2 Answers 0 views 0

Answers ( )

    0
    2021-09-26T04:28:47+00:00

    Answer:

    The answer is B or It is compressed horizontally by a factor of 2 and translated up 3 units. If that is incorrect I’m very sorry I am in the midst of taking the exam

    Step-by-step explanation:

    0
    2021-09-26T04:28:56+00:00

    Answer:

    • horizontally compressed by a factor of 2 and translated upward by 3 units.

    Step-by-step explanation:

    A multiplier of x in a function transformation is effectively a compression factor. That is f(2x) will have half the horizontal extent of f(x) for the same values of x.

    Addition of a constant the the value of a function effectively translates the graph upward by that amount. The graph of y = log(2x) +3 has been translated upward 3 units.

    The graph of y=log(x) has been horizontally compressed and translated upward to produce the graph of y = log(2x) +3.

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45:7+7-4:2-5:5*4+35:2 =? ( )