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The graph of [tex]$y = x^3$[/tex] is transformed as shown in the graph below. Which equation represents the transformed function?

On a coordinate plane, a cubic function is shown. It has a point of inflection at (0, -4). It crosses the x-axis at (-1.5, 0).

A. [tex]$y = x^3 - 4$[/tex]
B. [tex]$y = (x - 4)^3$[/tex]
C. [tex]$y = (-x - 4)^3$[/tex]
D. [tex]$y = (-x)^3 - 4$[/tex]

Answer :

On a coordinate plane, a cubic root function is shown. It has a point of inflection at (0, -4). Then the equation will be y = - x³ - 4.

How does the transformation of a function happen?

The transformation of a function may involve any change.

Usually, these can be shifted horizontally (by transforming inputs) or vertically (by transforming output), stretching (multiplying outputs or inputs), etc.

If the original function is y = f(x), assuming horizontal axis is input axis and vertical is for outputs, then:

Horizontal shift (also called phase shift):

Left shift by c units:

y = f(x + c) (same output, but c units earlier)

Right shift by c units:

y = f(x - c)(same output, but c units late)

Vertical shift:

Up by d units: y = f(x) + d

Down by d units: y = f(x) - d

Stretching:

Vertical stretch by a factor k: y = k × f(x)

Horizontal stretch by a factor k: y = 1/k × f(x)

The graph is given below.

y = x³

On a coordinate plane, a cubic root function is shown. It has a point of inflection at (0, -4). Then the equation will be

y = - x³ - 4

Learn more about transforming functions here:

https://brainly.com/question/17006186

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