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Difference between revisions of "1989 USAMO Problems/Problem 3"

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==Problem==
 
==Problem==
Let <math>P(z)= z^n + c_1 z^{n-1} + c_2 z^{n-2} + \cdots + c_n</math> be a polynomial in the complex variable <math>z</math>, with real coefficients <math>c_k</math>. Suppose that <math>|P(i)| < 1</math>. Prove that there exist real numbers <math>a</math> and <math>b</math> such that <math>P(a + bi) = 0</math> and <math>(a^2 + b^2 + 1)^2 < 4 b^2 + 1</math>.
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Let <math>P(z)= z^n + c_1 z^{n-1} + c_2 z^{n-2} + \cdots + c_n</math> be a [[polynomial]] in the complex variable <math>z</math>, with real coefficients <math>c_k</math>. Suppose that <math>|P(i)| < 1</math>. Prove that there exist real numbers <math>a</math> and <math>b</math> such that <math>P(a + bi) = 0</math> and <math>(a^2 + b^2 + 1)^2 < 4 b^2 + 1</math>.
  
 
==Solution==
 
==Solution==
  
{{solution}}
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Let <math>z_1, \dotsc, z_n</math> be the (not necessarily distinct) roots of <math>P</math>, so that
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<cmath> P(z) = \prod_{j=1}^n (z- z_j) . </cmath>
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Since all the coefficients of <math>P</math> are real, it follows that if <math>w</math> is a root of <math>P</math>, then <math>P( \overline{w}) = \overline{ P(w)} = 0</math>, so <math>\overline{w}</math>, the [[complex conjugate]] of <math>\overline{w}</math>, is also a root of <math>P</math>.
  
==See Also==
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Since
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<cmath> \lvert i- z_1 \rvert \cdot \lvert i - z_2 \rvert  \dotsm \lvert i - z_n \rvert = \lvert P(i) \rvert < 1, </cmath>
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it follows that for some (not necessarily distinct) conjugate <math>z_i</math> and <math>z_j</math>,
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<cmath> \lvert z_i-i \rvert \cdot \lvert z_j-i \rvert < 1. </cmath>
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Let <math>z_i = a+bi</math> and <math>z_j = a-bi</math>, for real <math>a,b</math>.  We note that
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<cmath> (a+b+1)^2 - (a+b-1)^2 = 4a^2 + 4b^2 . </cmath>
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Thus
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<cmath> \begin{align*}
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(a^2+b^2+1)^2 &= (a^2+b^2-1)^2 + 4a^2 + 4b^2 = \lvert a^2 + b^2 - 1 - 2ai \rvert ^2 + 4b^2 \\
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&= \lvert (a-i)^2 - (bi)^2 \rvert^2 + 4b^2 \\
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&= \bigl( \lvert a+bi - i \rvert \cdot \lvert a-bi -i \rvert \bigr)^2 + 4b^2 \\
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&= \bigl( \lvert z_i - i \rvert \cdot \lvert z_j - i \rvert \bigr)^2 + 4b^2 < 1+4b^2.
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\end{align*} </cmath>
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Since <math>P(a+bi) = P(z_i) = 0</math>, these real numbers <math>a,b</math> satisfy the problem's conditions.  <math>\blacksquare</math>
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== Resources ==
  
 
{{USAMO box|year=1989|num-b=2|num-a=4}}
 
{{USAMO box|year=1989|num-b=2|num-a=4}}
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* [http://www.artofproblemsolving.com/Forum/viewtopic.php?p=356637#356637 Discussion on AoPS/MathLinks]
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[[Category:Olympiad Algebra Problems]]

Revision as of 17:23, 10 January 2008

Problem

Let $P(z)= z^n + c_1 z^{n-1} + c_2 z^{n-2} + \cdots + c_n$ be a polynomial in the complex variable $z$, with real coefficients $c_k$. Suppose that $|P(i)| < 1$. Prove that there exist real numbers $a$ and $b$ such that $P(a + bi) = 0$ and $(a^2 + b^2 + 1)^2 < 4 b^2 + 1$.

Solution

Let $z_1, \dotsc, z_n$ be the (not necessarily distinct) roots of $P$, so that \[P(z) = \prod_{j=1}^n (z- z_j) .\] Since all the coefficients of $P$ are real, it follows that if $w$ is a root of $P$, then $P( \overline{w}) = \overline{ P(w)} = 0$, so $\overline{w}$, the complex conjugate of $\overline{w}$, is also a root of $P$.

Since \[\lvert i- z_1 \rvert \cdot \lvert i - z_2 \rvert \dotsm \lvert i - z_n \rvert = \lvert P(i) \rvert < 1,\] it follows that for some (not necessarily distinct) conjugate $z_i$ and $z_j$, \[\lvert z_i-i \rvert \cdot \lvert z_j-i \rvert < 1.\] Let $z_i = a+bi$ and $z_j = a-bi$, for real $a,b$. We note that \[(a+b+1)^2 - (a+b-1)^2 = 4a^2 + 4b^2 .\] Thus \begin{align*} (a^2+b^2+1)^2 &= (a^2+b^2-1)^2 + 4a^2 + 4b^2 = \lvert a^2 + b^2 - 1 - 2ai \rvert ^2 + 4b^2 \\ &= \lvert (a-i)^2 - (bi)^2 \rvert^2 + 4b^2 \\ &= \bigl( \lvert a+bi - i \rvert \cdot \lvert a-bi -i \rvert \bigr)^2 + 4b^2 \\ &= \bigl( \lvert z_i - i \rvert \cdot \lvert z_j - i \rvert \bigr)^2 + 4b^2 < 1+4b^2. \end{align*} Since $P(a+bi) = P(z_i) = 0$, these real numbers $a,b$ satisfy the problem's conditions. $\blacksquare$

Resources

1989 USAMO (ProblemsResources)
Preceded by
Problem 2 		Followed by
Problem 4
1 2 3 4 5
All USAMO Problems and Solutions
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