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8 June, 19:28

Given the parent function f (x) = x^2 describe the graph of g (x) = (3x-6) ^2+3

a.

expanded vertically by a factor of 3, horizontal shift left 6, vertical shift up 3

c.

compressed horizontally by a factor of 1/3, horizontal shift right 2, vertical shift up 3

b.

expanded horizontally by a factor of 3, horizontal shift left 6, vertical shift up 3

d.

compressed vertically by a factor of 1/3, horizontal shift right 2, vertical shift up 3

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Answers (1)
  1. 8 June, 19:55
    0
    For this case we have the following functions transformation:

    Vertical expansions:

    To graph y = a * f (x)

    If a> 1, the graph of y = f (x) is expanded vertically by a factor a.

    f1 (x) = (3x) ^ 2

    Horizontal translations

    Suppose that h> 0

    To graph y = f (x-h), move the graph of h units to the right.

    f2 (x) = (3x-6) ^ 2

    Vertical translations

    Suppose that k> 0

    To graph y = f (x) + k, move the graph of k units up.

    g (x) = (3x-6) ^ 2 + 3

    Answer:

    expanded horizontally by a factor of 3, horizontal shift rith 6, vertical shift up 3
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