Suppose that f(x)=x^3 and g(x)=-2^3-7 which statement best compares the graph of g(x) with the graph of f(x) (Please help ASAP)

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asked Jun 22, 2020 47.9k views

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Jason Plank · Answer 1 · 2020-06-26T18:06:20+0000

Answer:

A. The graph of
is the graph of
stretched vertically, flipped over the x axis, and shifted 7 units down.

Explanation:

Given:

$F(x)=x^3\\G(x)=-2x^3-7$

In order to transform
F(x) to
G(x) , we need to follow the following transformation rules:

1. Multiply the function by the number 2. According to transformation rules, multiplying a function by a positive number greater than 1 results in vertical stretch of the function's graph.

2. Multiply by -1. Multiplying a function by -1 flips it over the x axis.

3. Add -7 to the function obtained in step 2. When a negative number C is added to a function, then the graph shift down by C units. So, here the graph shifts down by 7 units.

Thus, the graph of
is the graph of
stretched vertically, flipped over the x axis, and shifted 7 units down.

Suppose that f(x)=x^3 and g(x)=-2^3-7 which statement best compares the graph of g(x) with the graph of f(x) (Please help ASAP)

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