Question
Write an equation for the function whose graph is described. the shape of \( f(x)=x^{3} \), but shifted seven units to the left, three units down, and then reflected in the \( y \)-axis \( g(x)=\square \)
Ask by Logan Byrd. in the United States
Mar 10,2025
Upstudy AI Solution
Tutor-Verified Answer
Answer
\( g(x) = (7 - x)^3 - 3 \)
Solution
We start with the basic function
\[
f(x) = x^3.
\]
1. Shift seven units to the left by replacing \(x\) with \(x+7\):
\[
f(x+7) = (x+7)^3.
\]
2. Shift three units down by subtracting 3 from the function:
\[
(x+7)^3 - 3.
\]
3. Reflect in the \(y\)-axis by replacing \(x\) with \(-x\):
\[
\left((-x)+7\right)^3 - 3 = (7 - x)^3 - 3.
\]
Thus, the function is
\[
g(x) = (7 - x)^3 - 3.
\]
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Simplify this solution Extra Insights
To shift the graph of \( f(x) = x^3 \) seven units to the left, you replace \( x \) with \( x + 7 \). Then, to shift it three units down, you subtract 3. Finally, to reflect the graph in the \( y \)-axis, you change \( x \) to \( -x \). Putting it all together, the equation for the function \( g(x) \) is: \( g(x) = -(-x + 7)^3 - 3 \) or simplified: \( g(x) = -(x - 7)^3 - 3 \).
