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Y = RootIndex 3 StartRoot x EndRoot. y = negative (0.4) RootIndex 3 StartRoot x minus 2 EndRoot

Which of the following describes the graph of the transformed function compared with the parent function? Select all that apply.

User Jose Rocha
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2 Answers

4 votes
4 votes

Answers:

-reflected over the x-axis

-translated 2 units right

-compressed by a factor of 0.4

User Tuan Chau
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23 votes
23 votes

Answer:

- Reflected over the x-axis

- Compressed by a factor of 0.4.

- Translated 2 units left

Explanation:

Given


y = \sqrt[3]{x}


y' = -(0.4)\sqrt[3]{x-2}

Required

The transformation from y to y'

First, y is reflected over the x-axis.

The transformation rule is:


(x,y) \to (x,-y)

So, we have:


y = \sqrt[3]{x} becomes


y' = -\sqrt[3]{x}

Next, it was compressed by a scale factor of 0.4

The rule is:


y' = k * y

Where k is the scale factor (i.e. k = 0.4)

So, we have:


y' = 0.4 * -\sqrt[3]{x}


y' = -(0.4)\sqrt[3]{x}

Lastly, the function is translated 2 units left;

The rule is:


(x,y) \to (x-2,y)

So, we have:


y' = -(0.4)\sqrt[3]{x - 2}

User Merritt
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