Question

A function f (x) = }" align="absmiddle" class="latex-formula"> is transformed into the function g (x) = -$\sqrt[3]{x}$ - 8.
Name the 2 transformations that occurred and describe the general shape of g(x). When describing the shape, you have the option of including a picture of its graph.

Answer 1

The two transformations are reflection across the x-axis and translation 8 units down

Step-by-step explanation:

Let us revise some transformations

• If the function f(x) reflected across the x-axis, then its image is g(x) = - f(x)
• If the function f(x) reflected across the y-axis, then its image is g(x) = f(-x)
• If the function f(x) translated vertically up by k units, then its image is g(x) = f(x) + k  
• If the function f(x) translated vertically down by k units, then its image is g(x) = f(x) - k  

∵ f(x) = $\sqrt[3]{x}$

∵ f(x) is transformed into the function g(x)

∵ g(x) = $-\sqrt[3]{x}$ - 8

- The negative sign in front of $\sqrt[3]{x}$ means f(x) becomes  

   -f(x), so f(x) is reflected across the x-axis as the 1st rule above

∴ f(x) is reflected across the x-axis

- Then 8 is subtracted from $-\sqrt[3]{x}$ , that means -f(x)

  becomes -f(x) - 8, so -f(x) is translated 8 units down as the 4th

  rule above

∴ f(x) then translated 8 units down

The two transformations are reflection across the x-axis and translation 8 units down

The graph of g(x) is the image of the graph of f(x) by reflection across the x-axis and then translation 8 units down

Look for the attached graph which represents f(x) and g(x)

The red graph is reflected across the x-axis the part of the graph over the x-axis becomes under the x-axis and the part of the graph under the x-axis becomes over the x-axis and then the graph translated 8 units down represented by the blue graph

Learn more:

You can learn more about transformation in brainly.com/question/5563823

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