2002 AMC 12P Problems/Problem 13: Difference between revisions

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Problem

What is the maximum value of $n$ for which there is a set of distinct positive integers $k_1, k_2, ... k_n$ for which

$k^2_1 + k^2_2 + ... + k^2_n = 2002?$

$\text{(A) }14 \qquad \text{(B) }15 \qquad \text{(C) }16 \qquad \text{(D) }17 \qquad \text{(E) }18$

Solution

Note that $k^2_1 + k^2_2 + ... + k^2_n = 2002 \leq \frac{n(n+1)(2n+1)}{6}$

When $n = 17$ , $\frac{n(n+1)(2n+1)}{6} = \frac{(17)(18)(35)}{6} = 1785 < 2002$ .

When $n = 18$ , $\frac{n(n+1)(2n+1)}{6} = 1785 + 18^2 = 2109 > 2002$ .

Therefore, we know $n \leq 17$ .

Now we must show that $n = 17$ works. We replace some integer $b$ within the set $\{1, 2, ... 17}\$ with an integer$ (Error compiling LaTeX. Unknown error_msg)a > 17 $to account for the amount under$ 2002 $, which is$ 2002-1785 = 217$.

Essentially, this boils down to writing$ (Error compiling LaTeX. Unknown error_msg)217 $as a difference of squares. Assume there exist positive integers$ a $and$ b $where$ a > 17 $and$ b \leq 17 $such that$ a^2 - b^2 = 217$.

We can rewrite this as$ (Error compiling LaTeX. Unknown error_msg)(a+b)(a-b) = 217 $. Since$ 217 = (7)(31) $, either$ a+b = 217 $and$ a-b = 1 $or$ a+b = 31 $and$ a-b = 7$. We analyze each case separately.

Case 1:$ (Error compiling LaTeX. Unknown error_msg)a+b = 217 $and$ a-b = 1 $Solving this system of equations gives$ a = 109 $and$ b = 108 $. However,$ 108 > 17$, so this case does not yield a solution.

Case 2:$ (Error compiling LaTeX. Unknown error_msg)a+b = 31 $and$ a-b = 7 $Solving this system of equations gives$ a = 19 $and$ b = 12$. This satisfies all the requirements of the problem.

The list$ (Error compiling LaTeX. Unknown error_msg)1, 2 ... 11, 13, 14 ... 17, 19 $has$ 17 $terms whose sum of squares equals$ 2002 $. Therefore, the answer is$ \boxed {\text{(D) }17}$.

@@ Line 25: / Line 25: @@
 Therefore, we know <math>n \leq 17</math>.
-Now we must show that <math>n = 17</math> works. We replace some integer <math>b</math> within the set <math> {1, 2, ... 17} </math> with an integer <math>a > 17</math> to account for the amount under <math>2002</math>, which is <math>2002-1785 = 217</math>.
+Now we must show that <math>n = 17</math> works. We replace some integer <math>b</math> within the set <math>\{1, 2, ... 17}\$ with an integer </math>a > 17<math> to account for the amount under </math>2002<math>, which is </math>2002-1785 = 217<math>.
-Essentially, this boils down to writing <math>217</math> as a difference of squares. Assume there exist positive integers <math>a</math> and <math>b</math> where <math>a > 17</math> and <math>b \leq 17</math> such that <math>a^2 - b^2 = 217</math>.
+Essentially, this boils down to writing </math>217<math> as a difference of squares. Assume there exist positive integers </math>a<math> and </math>b<math> where </math>a > 17<math> and </math>b \leq 17<math> such that </math>a^2 - b^2 = 217<math>.
-We can rewrite this as <math>(a+b)(a-b) = 217</math>. Since <math>217 = (7)(31)</math>, either <math>a+b = 217</math> and <math>a-b = 1</math> or <math>a+b = 31</math> and <math>a-b = 7</math>. We analyze each case separately.
+We can rewrite this as </math>(a+b)(a-b) = 217<math>. Since </math>217 = (7)(31)<math>, either </math>a+b = 217<math> and </math>a-b = 1<math> or </math>a+b = 31<math> and </math>a-b = 7<math>. We analyze each case separately.
-Case 1: <math>a+b = 217</math> and <math>a-b = 1</math>
+Case 1: </math>a+b = 217<math> and </math>a-b = 1<math>
-Solving this system of equations gives <math>a = 109</math> and <math>b = 108</math>. However, <math>108 > 17</math>, so this case does not yield a solution.
+Solving this system of equations gives </math>a = 109<math> and </math>b = 108<math>. However, </math>108 > 17<math>, so this case does not yield a solution.
-Case 2: <math>a+b = 31</math> and <math>a-b = 7</math>
+Case 2: </math>a+b = 31<math> and </math>a-b = 7<math>
-Solving this system of equations gives <math>a = 19</math> and <math>b = 12</math>. This satisfies all the requirements of the problem.
+Solving this system of equations gives </math>a = 19<math> and </math>b = 12<math>. This satisfies all the requirements of the problem.
-The list <math>1, 2 ... 11, 13, 14 ... 17, 19</math> has <math>17</math> terms whose sum of squares equals <math>2002</math>. Therefore, the answer is <math>\boxed {\text{(D) }17}</math>.
+The list </math>1, 2 ... 11, 13, 14 ... 17, 19<math> has </math>17<math> terms whose sum of squares equals </math>2002<math>. Therefore, the answer is </math>\boxed {\text{(D) }17}$.
 == See also ==
 {{AMC12 box|year=2002|ab=P|num-b=12|num-a=14}}
 {{MAA Notice}}

2002 AMC 12P (Problems • Answer Key • Resources)
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2002 AMC 12P Problems/Problem 13: Difference between revisions

Revision as of 02:03, 2 July 2024

Problem

Solution

See also