Difference between revisions of "Complex conjugate root theorem"
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Revision as of 11:56, 14 July 2021
The complex conjugate root theorem states that if is a polynomial with real coefficents, then a complex number is a root of a polynomial if and only if its complex conjugate is also a root.
A common setup in contest math is giving a complex root of a real polynomial without its conjugate. It is then up to the solver to recognize that its conjugate is also a root.
Proof
Let have the form , where are real numbers. Let be a complex root of . We then wish to show that , the complex conjugate of is a root of . Because is a root of , Then by the properties of complex conjugation, as required.