The graph of g(x) is obtained by reflecting the graph of f(x)=2|x| over the x-axis.

Which equation describes g(x)?

g(x)=−|x+2|

g(x)=2|x|

g(x)=|x+2|

g(x)=−2|x|

When a function [tex]y=f(x)[/tex] is reflected over x-axis then it actually flip itself around x-axis and gives a mirror image of the original function.

The new function will be [tex]y=-f(x)[/tex]

Given : The graph of g(x) is obtained by reflecting the graph of [tex]f(x)=2|x|[/tex] over the x-axis.

Then , g(x) should be

[tex]g(x)=-f(x)=-(2|x|)=-2|x|[/tex]

Therefore, the equation describes g(x) would be

[tex]g(x)=-2|x|[/tex]

The graph of g(x) is obtained by reflecting the graph of f(x)=2|x| over the x-axis. Which equation describes g(x)? g(x)=−|x+2| g(x)=2|x| g(x)=|x+2| g(x)=−2|x|

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The graph of g(x) is obtained by reflecting the graph of f(x)=2|x| over the x-axis.

Which equation describes g(x)?

g(x)=−|x+2|

g(x)=2|x|

g(x)=|x+2|

g(x)=−2|x|