Difference between revisions of "2018 AIME I Problems/Problem 11"

Revision as of 10:59, 8 March 2018

Find the least positive integer $n$ such that when $3^n$ is written in base $143$ , its two right-most digits in base $143$ are $01$ .

Solutions

Modular Arithmetic Solution- Strange (MASS)

Note that $3^n \equiv 1 (\mod 143^2)$ . And $143=11*13$ . Because $gcd(11^2, 13^2) = 1$ , $3^n \equiv 1 (\mod 121 = 11^2)$ and $3^n \equiv 1 (mod 169=13^2)$ .

If $3^n \equiv 1 (\mod 121)$ , one can see the sequence $1, 3, 9, 27, 81, 1, 3, 9...$ so $5 \mid n$ .

Now if $3^n \equiv 1 (\mod 169)$ , it is harder. But we do observe that $3^3 \equiv 1 (\mod 13)$ , therefore $3^3 = 13a + 1$ for some integer $a$ . So our goal is to find the first number $p_1$ such that $(13a+1)^ {p_1} \equiv 1 (\mod 169)$ . In other words, the $a$ coefficient must be $0 (\mod 169)$ . It is not difficult to see that this first $p_1=13$ , so ultimately $3^{39} \equiv 1 (\mod 169)$ . Therefore, $39 \mid n$ .

The first $n$ satisfying both criteria is $5*39=\boxed{195}$ .

-expiLnCalc

Solution

Note that Euler's Totient Theorem would not necessarily lead to the smallest $n$ and that in this case that $n$ is greater than $1000$ .

We wish to find the least $n$ such that $3^n \equiv 1(\mod 143^2)$ . This factors as $143^2=11^{2}*13^{2}$ . Because $gcd(121, 169) = 1$ , we can simply find the least $n$ such that $3^n \equiv 1(\mod 121)$ and $3^n \equiv 1(\mod 169)$ .

Quick inspection yields $3^5 \equiv 1(\mod 121)$ and $3^3 \equiv 1(\mod 13)$ . Now we must find the smallest $k$ such that $3^{3k} \equiv 1(\mod 13)$ . Euler's gives $3^{156} \equiv 1(\mod 169)$ . So $3k$ is a factor of $156$ . This gives $k=1,2, 4, 13, 26, 52$ . Some more inspection yields $k=13$ is the smallest valid $k$ . So $3^5 \equiv 1(\mod 121)$ and $3^{39} \equiv 1(\mod 169)$ . The least $n$ satisfying both is $lcm[5,39]=\boxed{195}$ . (RegularHexagon)

@@ Line 19: / Line 19: @@
 We wish to find the least <math>n</math> such that <math>3^n \equiv 1(\mod 143^2)</math>. This factors as <math>143^2=11^{2}*13^{2}</math>. Because <math>gcd(121, 169) = 1</math>, we can simply find the least  <math>n</math> such that <math>3^n \equiv 1(\mod 121)</math> and <math>3^n \equiv 1(\mod 169)</math>.
-Quick inspection yields <math>3^5 \equiv 1(\mod 121)</math> and <math>3^3 \equiv 1(\mod 13)</math>. Now we must find the smallest <math>k</math> such that <math>3^3k \equiv 1(\mod 13)</math>. Euler's gives <math>3^156 \equiv 1(\mod 169)</math>. So <math>3k</math> is a factor of <math>156</math>. This gives <math>k=2, 4, 13, 26, 52</math>. Some more inspection yields <math>k=13</math> is the smallest valid <math>k</math>. So <math>3^5 \equiv 1(\mod 121)</math> and <math>3^39 \equiv 1(\mod 169)</math>. The least <math>n</math> satisfying both is <math>lcm[5,39]=\boxed{195}</math>. (RegularHexagon)
+Quick inspection yields <math>3^5 \equiv 1(\mod 121)</math> and <math>3^3 \equiv 1(\mod 13)</math>. Now we must find the smallest <math>k</math> such that <math>3^{3k} \equiv 1(\mod 13)</math>. Euler's gives <math>3^{156} \equiv 1(\mod 169)</math>. So <math>3k</math> is a factor of <math>156</math>. This gives <math>k=1,2, 4, 13, 26, 52</math>. Some more inspection yields <math>k=13</math> is the smallest valid <math>k</math>. So <math>3^5 \equiv 1(\mod 121)</math> and <math>3^{39} \equiv 1(\mod 169)</math>. The least <math>n</math> satisfying both is <math>lcm[5,39]=\boxed{195}</math>. (RegularHexagon)
 ==See Also==
 {{AIME box|year=2018|n=I|num-b=10|num-a=12}}
 {{MAA Notice}}

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Difference between revisions of "2018 AIME I Problems/Problem 11"

Revision as of 10:59, 8 March 2018

Contents

Solutions

Modular Arithmetic Solution- Strange (MASS)

Solution

See Also