Which function, g or h, is the inverse function for function ƒ? the function h because the graphs of ƒ and h are symmetrical about the y-axis the function g because the graphs of ƒ and g are symmetrical about the line y = x the function h because the graphs of ƒ and h are symmetrical about the line y = x the function g because the graphs of ƒ and g are symmetrical about the x-axis?

A function and it's inverse function, when graphed, will be symmetrical across the line y=x.
Without seeing your graphs, I can't tell you if it's g or h. Look for the function which mirrors 'f' across y=x, which is a diagonal line passing through the origin (0,0) of the graph.

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azikennamdi azikennamdi · Answer 2 · 2022-05-20T12:23:21+02:00

When graphed, a function and its inverse function become symmetrical across the line y = x.

What is a symmetrical function?

A function that is symmetric is a function whose variables remain constant regardless of the ways in which the variables are permutated.

Hence When graphed, a function and its inverse function become symmetrical across the line y = x.

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