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International Mathematics Competition
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IMC 2024 |
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IMC2023: Day 1, Problem 3
Problem 3. Find all polynomials \(\displaystyle P\) in two variables with real coefficients satisfying the identity
\(\displaystyle P(x,y)P(z,t)=P(xz-yt,xt+yz). \)
Giorgi Arabidze, Free University of Tbilisi, Georgia
Hint: The polynomials \(\displaystyle (x+iy)^n\) and \(\displaystyle (x-iy)^m\) are trivial complex solutions. Suppose that \(\displaystyle P(x,y)=(x+iy)^n(x-iy)^mQ(x,y)\), where \(\displaystyle Q(x,y)\) is divisible neither by \(\displaystyle x+iy\) nor \(\displaystyle x=iy\) and consider \(\displaystyle Q(x,y)\).
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