2016 AIME I Problems/Problem 8: Difference between revisions

Revision as of 18:22, 4 March 2016

Problem 8

For a permutation $p = (a_1,a_2,\ldots,a_9)$ of the digits $1,2,\ldots,9$ , let $s(p)$ denote the sum of the three $3$ -digit numbers $a_1a_2a_3$ , $a_4a_5a_6$ , and $a_7a_8a_9$ . Let $m$ be the minimum value of $s(p)$ subject to the condition that the units digit of $s(p)$ is $0$ . Let $n$ denote the number of permutations $p$ with $s(p) = m$ . Find $|m - n|$ .

Solution

To minimize $s(p)$ , the numbers $1$ , $2$ , and $3$ (which sum to $6$ ) must be in the hundreds places. For the units digit of $s(p)$ to be $0$ , the numbers in the ones places must have a sum of either $10$ or $20$ . However, since the tens digit is more significant that the ones digit, we take the sum's units digit to be $20$ . We know that the sum of the numbers in the tens digits is $\sum\limits_{i=1}^9 (i) -6-20=45-6-20=19$ . Therefore, $m=100*6+10*19+20=810$ .

To find $n$ , realize that there are $3!=6$ ways of ordering the numbers in each of the places. Additionally, there are three possibilities for the numbers in the ones place: $4-7-9$ , $5-7-8$ , and $6-7-9$ . Therefore there are $6^3*3=648$ ways in total. $|m-n|=|810-648|=\fbox{162}$ .

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 ==Solution==
-Solution by jonnyboyg: To minimize <math>s(p)</math>, the numbers 1, 2, and 3 must be in the hundreds places.  The numbers in the ones places must have a sum of 20.  This means that the numbers in the tens places will always have the same sum.  One way to do this is 154+267+389=810.  Therefore m=810.
+To minimize <math>s(p)</math>, the numbers <math>1</math>, <math>2</math>, and <math>3</math> (which sum to <math>6</math>) must be in the hundreds places.  For the units digit of <math>s(p)</math> to be <math>0</math>, the numbers in the ones places must have a sum of either <math>10</math> or <math>20</math>. However, since the tens digit is more significant that the ones digit, we take the sum's units digit to be <math>20</math>. We know that the sum of the numbers in the tens digits is <math>\sum\limits_{i=1}^9 (i) -6-20=45-6-20=19</math>. Therefore, <math>m=100*6+10*19+20=810</math>.
-To find n, realize that there are 3!=6 ways of ordering the numbers in each of the places.  Additionally, there are three possibilities for the numbers in the ones place-4 7 and 9, 5 7 and 8, and 6 7 and 9.  Therefore there are 6^3 * 3 ways total, which is 648. <math>|m-n|</math>=<math>|810-648|</math>=162.
+To find <math>n</math>, realize that there are <math>3!=6</math> ways of ordering the numbers in each of the places.  Additionally, there are three possibilities for the numbers in the ones place: <math>4-7-9</math>, <math>5-7-8</math>, and <math>6-7-9</math>.  Therefore there are <math>6^3*3=648</math> ways in total. <math>|m-n|=|810-648|=\fbox{162}</math>.
 == See also ==
 {{AIME box|year=2016|n=I|num-b=7|num-a=9}}
 {{MAA Notice}}

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2016 AIME I Problems/Problem 8: Difference between revisions

Revision as of 18:22, 4 March 2016

Problem 8

Solution

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