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Which statement describes the graph of an odd function?

(1 point)
Responses

The graph is symmetric about the line y = x.
The graph is symmetric about the line y = x .

The graph is symmetric about the x-axis.
The graph is symmetric about the x -axis.

The graph is symmetric about the line x = 0.
The graph is symmetric about the line x = 0.

The graph is symmetric about the origin.
The graph is symmetric about the origin.

1 answer

The correct statement that describes the graph of an odd function is:

The graph is symmetric about the origin.

This means that if a point \((x, y)\) is on the graph, then the point \((-x, -y)\) will also be on the graph for an odd function.

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