Which statement about odd functions is correct?
A. They are symmetric over the x-axis.
B. They have rotational symmetry.
C. They are symmetric over the y-axis.
D. They are transformations of the parent function.

It is a function such that f (x) =f (x) with the sign reversed but the absolute value unchanged if the independent variable's sign is reversed.

If f(x) Equals f(x) for every x, a function is odd. An odd function's graph will be symmetrical around the origin.

For instance, f(x) = x3 is an odd number. That is, the function on one side of the x-axis is sign inverted in relation to the function on the other side, or graphically, symmetric about the origin.

Therefore the odd functions are symmetric about the origin.

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KonnorB17 KonnorB17 · Answer 2 · 2022-07-11T15:13:04+02:00

KonnorB17 KonnorB17

11-07-2022

Answer: B

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Which statement about odd functions is correct?A. They are symmetric over the x-axis. B. They have rotational symmetry. C. They are symmetric over the y-axis. D. They are transformations of the parent function.​

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Which statement about odd functions is correct?
A. They are symmetric over the x-axis.
B. They have rotational symmetry.
C. They are symmetric over the y-axis.
D. They are transformations of the parent function.