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Difference between revisions of "1975 IMO Problems/Problem 6"

(Created page with "Find all polynomials P; in two variables, with the following properties: (i) for a positive integer n and all real t, x, y P(tx, ty)=(t^n)P(x, y)")
 
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Find all polynomials P; in two variables, with the following properties:
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Find all polynomials <math>P</math>, in two variables, with the following properties:
(i) for a positive integer n and all real t, x, y
 
  
  P(tx, ty)=(t^n)P(x, y)
+
(i) for a positive integer <math>n</math> and all real <math>t, x, y</math> <cmath>P(tx, ty) = t^nP(x, y)</cmath> (that is, <math>P</math> is homogeneous of degree <math>n</math>),
 +
 
 +
(ii) for all real <math>a, b, c</math>, <cmath>P(b + c, a) + P(c + a, b) + P(a + b, c) = 0,</cmath>
 +
 
 +
(iii) <cmath>P(1, 0) = 1.</cmath>

Revision as of 09:47, 25 February 2017

Find all polynomials $P$, in two variables, with the following properties:

(i) for a positive integer $n$ and all real $t, x, y$ \[P(tx, ty) = t^nP(x, y)\] (that is, $P$ is homogeneous of degree $n$),

(ii) for all real $a, b, c$, \[P(b + c, a) + P(c + a, b) + P(a + b, c) = 0,\]

(iii) \[P(1, 0) = 1.\]

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