Pregunta
Write an equation for the function whose graph is described. the shape. of \( f(x)=\sqrt{x} \), but shifted six units down and then reflected in both the \( x \)-axis and the \( y \)-axis \( g(x)=\square \)
Ask by Harmon Weber. in the United States
Mar 10,2025
Solución de inteligencia artificial de Upstudy
Respuesta verificada por el tutor
Responder
\( g(x) = 6 - \sqrt{-x} \)
Solución
\[
g(x)=6-\sqrt{-x}
\]
To explain briefly:
1. Start with \( f(x)=\sqrt{x} \).
2. Shift six units down:
\[
f_1(x)=\sqrt{x}-6.
\]
3. Reflect in the \( x \)-axis (multiply by \(-1\)):
\[
f_2(x)=-\bigl(\sqrt{x}-6\bigr)=6-\sqrt{x}.
\]
4. Reflect in the \( y \)-axis (replace \( x \) with \(-x \)):
\[
g(x)=f_2(-x)=6-\sqrt{-x}.
\]
Thus, the final equation for \( g(x) \) is
\[
g(x)=6-\sqrt{-x}.
\]
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Simplifique esta solución Beyond the Answer
To achieve the desired transformation, start with the original function \( f(x) = \sqrt{x} \). Shifting it down 6 units gives you \( f(x) - 6 = \sqrt{x} - 6 \). Reflecting in the \( x \)-axis changes the sign of the function, resulting in \( -(f(x) - 6) = -\sqrt{x} + 6 \). Finally, reflecting in the \( y \)-axis transforms the input as well, leading to \( g(x) = -\sqrt{-x} + 6 \). So, the final equation is \( g(x) = -\sqrt{-x} + 6 \).
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