Symmetry of Odd-Degree Polynomials: Conditions for Symmetry in the Plane

AI Thread Summary
To determine the conditions for symmetry of odd-degree polynomial functions in the plane, specific translations of the standard odd function condition apply. For symmetry around the point (0,a), the function must satisfy a - f(x) = f(-x) - a. For symmetry around (b,0), the condition is f(b+x) = -f(b-x). A combined condition can be expressed as -f(b-x) + a = f(b+x) - a. The discussion concludes with the realization that the initial confusion about the conditions has been resolved.
littleHilbert
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Hi! Brief question:

I wonder which conditions should a polynomial function of odd degree fulfill in order to be symmetric to some point in the plane.
Are there such conditions?
 
Last edited:
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Of course there are! It's merely horizontal and vertical translations of the ordinary condition for an odd function, which is symmetric about (0,0).

For symmetry around (0,a) a function must satisfy:

a - f(x) = f(-x) - a

For symmetry around (b,0), f(b+x) = - f(b-x).

Perhaps you can combine these conditions?
 
Ok the combination is clear:
-f(b-x)+a=f(b+x)-a

Thank you! :-)
 
Last edited:
littleHilbert said:
you meant a + f(x) = - f(-x) - a, didn't you?
because it must be equivalent to a + f(x) + a - f(x) = 0

Ok the combination is clear:
-f(b-x)+a=f(b+x)-a

Thank you! :-)

Now that you bring it up, I am not sure what I meant lol. Its something like that, though I am sure its NOT equivalent to the condition a=0 lol.
 
Ok the combination is clear:
-f(b-x)+a=f(b+x)-a

Thank you! :-)

Oh sorry I've realized that everything is ok at the very moment you've sent your post...and deleted the thing!
 
No problem =]
 

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