Difference between revisions of "1971 IMO Problems/Problem 1"

Latest revision as of 15:32, 20 December 2024

Problem

Prove that the following assertion is true for $n=3$ and $n=5$ , and that it is false for every other natural number $n>2:$

If $a_1, a_2,\cdots, a_n$ are arbitrary real numbers, then $(a_1-a_2)(a_1-a_3)\cdots (a_1-a_n)+(a_2-a_1)(a_2-a_3)\cdots (a_2-a_n)+\cdots+(a_n-a_1)(a_n-a_2)\cdots (a_n-a_{n-1})\ge 0.$

Solution

Denote $E_n$ the expression in the problem, and denote $S_n$ the statement that $E_n \ge 0$ .

Take $a_1 < 0$ , and the remaining $a_i = 0$ . Then $E_n = a_1^{n-1} < 0$ for $n$ even. So the proposition is false for even $n$ .

Suppose $n \ge 7$ and odd. Take any $c > a > b$ , and let $a_1 = a$ , $a_2 = a_3 = a_4= b$ , and $a_5 = a_6 = ... = a_n = c$ . Then $E_n = (a - b)^3 (a - c)^{n-4} < 0$ . So the proposition is false for odd $n \ge 7$ .

Assume $a_1 \ge a_2 \ge a_3$ . Then in $E_3$ the sum of the first two terms is non-negative, because $a_1 - a_3 \ge a_2 - a_3$ . The last term is also non-negative. Hence $E_3 \ge 0$ , and the proposition is true for $n = 3$ .

It remains to prove $S_5$ . Suppose $a_1 \ge a_2 \ge a_3 \ge a_4 \ge a_5$ . Then the sum of the first two terms in $E_5$ is $(a_1 - a_2)[(a_1 - a_3)(a_1 - a_4)(a_1 - a_5) - (a_2 - a_3)(a_2 - a_4)(a_2 - a_5)] \ge 0$ .

The third term in $E_5$ is non-negative (the first two factors are non-positive and the last two non-negative).

The sum of the last two terms in $E_5$ is: $(a_4 - a_5)[(a_1 - a_5)(a_2 - a_5)(a_3 - a_5) - (a_1 - a_4)(a_2 - a_4)(a_3 - a_4)] \ge 0$ .

Hence $E_5 \ge 0$ .

This solution was posted and copyrighted by e.lopes. The original thread can be found here: [1]

Remarks (added by pf02, December 2024)

1. As a public service, I fixed a few typos in the solution above.

2. Make the solution a little more complete:

2.1. Let us note that the assumptions $a_1 \ge a_2 \ge a_3$ in case $n = 3$ and $a_1 \ge a_2 \ge a_3 \ge a_4 \ge a_5$ in case $n = 5$ are perfectly legitimate. A different ordering of these numbers could be reduced to this case by a simple change of notation: we would substitute $a_i$ by $b_j$ with the indexes for the $b$ 's chosen in such a way that the inequalities above are true for the $b$ 's.

2.2. The inequality $(a_1 - a_2)[(a_1 - a_3)(a_1 - a_4)(a_1 - a_5) - (a_2 - a_3)(a_2 - a_4)(a_2 - a_5)] \ge 0$ is true because $a_1 - a_2 \ge 0$ , and $(a_1 - a_3)(a_1 - a_4)(a_1 - a_5) - (a_2 - a_3)(a_2 - a_4)(a_2 - a_5) \ge 0$ . To see this latter inequality, just notice that $a_1 - a_3 \ge a_2 - a_3$ , and similarly for the other pairs of factors. The difference of the products is $\ge 0$ as desired.

The argument for the sum of the last two terms in $E_5$ is similar.

3. The case $n = 3$ is very easy to prove in a different way. Note that

$(a_1 - a_2)(a_1 - a_3) + (a_2 - a_1)(a_2 - a_3) + (a_3 - a_1)(a_3 - a_2) = \frac{1}{2}[(a_1 - a_2)^2 + (a_2 - a_3)^2 + (a_3 - a_1)^2]$

I could not find an identity which would give such a simple proof in the case $n = 5$ .

4. By looking at the proof above, we can also see that for $n = 3$ we have equality if and only if $a_1 = a_2 = a_3$ . For $n = 5$ , assuming that $a_1 \ge a_2 \ge a_3 \ge a_4 \ge a_5$ , we have equality if and only if $a_1 = a_2$ and $a_3 = a_4 = a_5$ , or $a_1 = a_2 = a_3$ and $a_4 = a_5$ .

5. If we denote $P(x) = (x - a_1) \cdots (x - a_n)$ , then the expression in the problem is $E_n = P'(a_1) + \cdots + P'(a_n)$ , where $P'(x)$ is the derivative of $P(x)$ . (This is easy to see by calculating $P'(x)$ when $P(x)$ is written as a product rather than as a sum of powers of $x$ .)

The graph of $P(x)$ as $x$ goes from $-\infty$ to $\infty$ crosses the $x$ -axis, or is tangent to the $x$ -axis at every root $a_k$ . If the graph is tangent to the $x$ -axis, it crosses it, or it stays in the same half plane, depending on the multiplicity of the root. At a simple root $a_k, P'(a_k) > 0$ or $P'(a_k) < 0$ depending on the direction of the graph of $P(x)$ at $a_k$ . At a multiple root $a_k = \cdots = a_{k+p}, P'(a_k) = 0$ , and the graph of $P(x)$ crosses the $x$ -axis or not, depending on $p$ being odd or even.

This way of looking at the problem makes it very easy to find examples which prove the problem for $n$ even, or $n \ge 7$ and odd, because we would be looking for polynomials whose graph crosses the $x$ -axis once from the upper half plane to the lower half plane at a simple root $a_k$ (thus making $P'(a_k) < 0$ ), and is tangent to the $x$ -axis at all the other roots. See the picture below for images showing the graphs of such polynomials.

(Wichking makes essentially the same remarks on https://aops.com/community/p366761.)

@@ Line 76: / Line 76: @@
 . If we denote <math>P(x) = (x - a_1) \cdots (x - a_n)</math>, then the expression
-in the problem is <math>P'(a_1) + \cdots + P'(a_n)</math>, where <math>P'(x)</math> is the
+in the problem is <math>E_n = P'(a_1) + \cdots + P'(a_n)</math>, where <math>P'(x)</math> is
-derivative of <math>P(x)</math>.  The graph of <math>P(x)</math> as <math>x</math> goes from <math>-\infty</math>
+the derivative of <math>P(x)</math>.  (This is easy to see by calculating <math>P'(x)</math>
-to <math>\infty</math> crosses the <math>x</math>-axis at every root <math>a_k</math>, or is tangent
+when <math>P(x)</math> is written as a product rather than as a sum of powers of
-to it, or it is tangent to it and crosses it, depending on the
+<math>x</math>.)
-multiplicity of the root.  At a simple root <math>P'(a_k)</math> is <math>> 0</math> or
-<math>< 0</math> depending on the direction of the graph of <math>P(x)</math> at <math>a_k</math>.
+The graph of <math>P(x)</math> as <math>x</math> goes from <math>-\infty</math> to <math>\infty</math> crosses the
-At a multiple root <math>a_k = \cdots = a_{k+p}</math>, <math>P'(a_k) = 0</math>, and the
+<math>x</math>-axis, or is tangent to the <math>x</math>-axis at every root <math>a_k</math>.  If the
-graph of <math>P(x)</math> crosses the <math>x</math>-axis or not, depending on <math>p</math>.
+graph is tangent to the <math>x</math>-axis, it crosses it, or it stays in the
+same half plane, depending on the multiplicity of the root.  At a simple
+root <math>a_k, P'(a_k) > 0</math> or <math>P'(a_k) < 0</math> depending on the direction of
+the graph of <math>P(x)</math> at <math>a_k</math>.  At a multiple root
+<math>a_k = \cdots = a_{k+p}, P'(a_k) = 0</math>, and the graph of <math>P(x)</math> crosses
+the <math>x</math>-axis or not, depending on <math>p</math> being odd or even.
 This way of looking at the problem makes it very easy to find examples
-which prove the problem for <math>n</math> even or <math>n \ge 7</math> odd, because we would
+which prove the problem for <math>n</math> even, or <math>n \ge 7</math> and odd, because we
-be looking for polynomials whose graph crosses the <math>x</math>-axis once from
+would be looking for polynomials whose graph crosses the <math>x</math>-axis once
-above to below at a simple root <math>a_k</math> (to make <math>P'(a_k) < 0</math>), and is
+from the upper half plane to the lower half plane at a simple root
-tangent to the <math>x</math>-axis at all the other roots.  See the picture below
+<math>a_k</math> (thus making <math>P'(a_k) < 0</math>), and is tangent to the <math>x</math>-axis at
-for images showing the graphs of such polynomials.
+all the other roots.  See the picture below for images showing the
+graphs of such polynomials.
 [[File:prob_1971_1.png|600px]]
+(Wichking makes essentially the same remarks on
+https://aops.com/community/p366761.)

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Difference between revisions of "1971 IMO Problems/Problem 1"

Latest revision as of 15:32, 20 December 2024

Contents

Problem

Solution

Remarks (added by pf02, December 2024)

See Also