Difference between revisions of "2016 AIME II Problems/Problem 11"

(Solution 2)
m (Solution)
 
(One intermediate revision by one other user not shown)
Line 3: Line 3:
  
 
==Solution==
 
==Solution==
We claim that an integer <math>N</math> is only <math>k</math>-nice if and only if <math>N \equiv 1 \pmod k</math>. By the number of divisors formula, the number of divisors of <math>\prod_{i=1}^n p_i^{a_i}</math> is <math>\prod_{i=1}^n (a_i+1)</math>. Since all the <math>a_i</math>s are divisible by <math>k</math> in a perfect <math>k</math> power, the only if part of the claim follows. To show that all numbers <math>N \equiv 1 \pmod k</math> are <math>k</math>-nice, write <math>N=bk+1</math>. Note that <math>2^{kb}</math> has the desired number of factors and is a perfect kth power. By PIE, the number of positive integers less than <math>1000</math> that are either <math>1 \pmod 7</math> or <math>1\pmod 8</math> is <math>142+125-17=250</math>, so the desired answer is <math>999-250=\boxed{749}</math>.
+
We claim that an integer <math>N</math> is only <math>k</math>-nice if and only if <math>N \equiv 1 \pmod k</math>. By the number of divisors formula, the number of divisors of <math>\prod_{i=1}^n p_i^{a_i}</math> is <math>\prod_{i=1}^n (a_i+1)</math>. Since all the <math>a_i</math>'s are divisible by <math>k</math> in a perfect <math>k</math> power, the only if part of the claim follows. To show that all numbers <math>N \equiv 1 \pmod k</math> are <math>k</math>-nice, write <math>N=bk+1</math>. Note that <math>2^{kb}</math> has the desired number of factors and is a perfect kth power. By PIE, the number of positive integers less than <math>1000</math> that are either <math>1 \pmod 7</math> or <math>1\pmod 8</math> is <math>142+125-17=250</math>, so the desired answer is <math>999-250=\boxed{749}</math>.
  
 
Solution by Shaddoll and firebolt360
 
Solution by Shaddoll and firebolt360
  
 
==Solution 2==
 
==Solution 2==
All integers <math>a</math> will have factorization <math>2^a3^b5^c7^d...</math>. Therefore, the number of factors in <math>a^7</math> is <math>(7a+1)(7b+1)...</math>, and for <math>a^8</math> is <math>(8a+1)(8b+1)...</math>. The most salient step afterwards is to realize that all numbers <math>N</math> <math>1 \pmod{7}</math> and also <math>1 \pmod{8}</math> satisfy the criterion. The cycle repeats every <math>56</math> integers, and by PIE, <math>7+8-1=14</math> of them are either <math>7</math>-nice or <math>8</math>-nice or both. Therefore, we can take <math>\frac{42}{56} * 1008 = 756</math> numbers minus the <math>7</math> that work between <math>1000-1008</math> inclusive, to get <math>\boxed{749}</math> positive integers less than <math>1000</math> that are not nice for <math>k=7, 8</math>.
+
All integers <math>a</math> will have factorization <math>2^a3^b5^c7^d...</math>. Therefore, the number of factors in <math>a^7</math> is <math>(7a+1)(7b+1)...</math>, and for <math>a^8</math> is <math>(8a+1)(8b+1)...</math>. The most salient step afterwards is to realize that all numbers <math>N</math> not <math>1 \pmod{7}</math> and also not <math>1 \pmod{8}</math> satisfy the criterion. The cycle repeats every <math>56</math> integers, and by PIE, <math>7+8-1=14</math> of them are either <math>7</math>-nice or <math>8</math>-nice or both. Therefore, we can take <math>\frac{42}{56} * 1008 = 756</math> numbers minus the <math>7</math> that work between <math>1000-1008</math> inclusive, to get <math>\boxed{749}</math> positive integers less than <math>1000</math> that are not nice for <math>k=7, 8</math>.
  
 
== See also ==
 
== See also ==

Latest revision as of 05:19, 16 August 2024

Problem

For positive integers $N$ and $k$, define $N$ to be $k$-nice if there exists a positive integer $a$ such that $a^{k}$ has exactly $N$ positive divisors. Find the number of positive integers less than $1000$ that are neither $7$-nice nor $8$-nice.

Solution

We claim that an integer $N$ is only $k$-nice if and only if $N \equiv 1 \pmod k$. By the number of divisors formula, the number of divisors of $\prod_{i=1}^n p_i^{a_i}$ is $\prod_{i=1}^n (a_i+1)$. Since all the $a_i$'s are divisible by $k$ in a perfect $k$ power, the only if part of the claim follows. To show that all numbers $N \equiv 1 \pmod k$ are $k$-nice, write $N=bk+1$. Note that $2^{kb}$ has the desired number of factors and is a perfect kth power. By PIE, the number of positive integers less than $1000$ that are either $1 \pmod 7$ or $1\pmod 8$ is $142+125-17=250$, so the desired answer is $999-250=\boxed{749}$.

Solution by Shaddoll and firebolt360

Solution 2

All integers $a$ will have factorization $2^a3^b5^c7^d...$. Therefore, the number of factors in $a^7$ is $(7a+1)(7b+1)...$, and for $a^8$ is $(8a+1)(8b+1)...$. The most salient step afterwards is to realize that all numbers $N$ not $1 \pmod{7}$ and also not $1 \pmod{8}$ satisfy the criterion. The cycle repeats every $56$ integers, and by PIE, $7+8-1=14$ of them are either $7$-nice or $8$-nice or both. Therefore, we can take $\frac{42}{56} * 1008 = 756$ numbers minus the $7$ that work between $1000-1008$ inclusive, to get $\boxed{749}$ positive integers less than $1000$ that are not nice for $k=7, 8$.

See also

2016 AIME II (ProblemsAnswer KeyResources)
Preceded by
Problem 10
Followed by
Problem 12
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15
All AIME Problems and Solutions

The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions. AMC logo.png