Difference between revisions of "2019 AIME I Problems/Problem 14"

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==Problem==
 
==Problem==
 
Find the least odd prime factor of <math>2019^8+1</math>.
 
Find the least odd prime factor of <math>2019^8+1</math>.
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==Video Solution & More by MegaMath==
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https://www.youtube.com/watch?v=E6Vs5uf49Fc
  
 
==Solution==
 
==Solution==
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==Solution 4 (Work in Progress)==
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==Solution 4==
 
Let <math>n</math> represent the least odd prime that the question is asking for.  
 
Let <math>n</math> represent the least odd prime that the question is asking for.  
  
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The first prime we get is 17 and when we try it in <math>2019^8\equiv -1\pmod n,</math>
 
The first prime we get is 17 and when we try it in <math>2019^8\equiv -1\pmod n,</math>
  
<math>2019^{8}\equiv 13^8\pmod 17</math>
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<math>2019^{8}\equiv 13^8\pmod {17}</math>
  
<math>169^{4}\equiv -1^4\pmod 17</math>
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<math>169^{4}\equiv 16^4\pmod {17}</math>
  
<math>-1^{4}\equiv 1\pmod 17</math>
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<math>256^2\equiv 1\pmod {17}</math>
  
 
<math>1+1=2</math>  
 
<math>1+1=2</math>  
  
 
We see that 17 does not work. The next number that works from the application of Fermat's Little Theorem is 97 and when we try that,
 
We see that 17 does not work. The next number that works from the application of Fermat's Little Theorem is 97 and when we try that,
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<math>2019^{8}\equiv 79^8\pmod {97}</math>
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<math>6241^{4}\equiv 33^4\pmod {97}</math>
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<math>1089^2\equiv 22^2\pmod {97}</math>
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<math>484\equiv -1\pmod {97}</math>
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<math>-1+1=0</math>
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Thus our answer is <math>\boxed{097}</math>.
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~pengf
  
 
==Video Solution==
 
==Video Solution==

Latest revision as of 00:22, 7 March 2024

Problem

Find the least odd prime factor of $2019^8+1$.

Video Solution & More by MegaMath

https://www.youtube.com/watch?v=E6Vs5uf49Fc

Solution

We know that $2019^8 \equiv -1 \pmod{p}$ for some prime $p$. We want to find the smallest odd possible value of $p$. By squaring both sides of the congruence, we find $2019^{16} \equiv 1 \pmod{p}$.

Since $2019^{16} \equiv 1 \pmod{p}$, the order of $2019$ modulo $p$ is a positive divisor of $16$.

However, if the order of $2019$ modulo $p$ is $1, 2, 4,$ or $8,$ then $2019^8$ will be equivalent to $1 \pmod{p},$ which contradicts the given requirement that $2019^8\equiv -1\pmod{p}$.

Therefore, the order of $2019$ modulo $p$ is $16$. Because all orders modulo $p$ divide $\phi(p)$, we see that $\phi(p)$ is a multiple of $16$. As $p$ is prime, $\phi(p) = p\left(1 - \dfrac{1}{p}\right) = p - 1$. Therefore, $p\equiv 1 \pmod{16}$. The two smallest primes equivalent to $1 \pmod{16}$ are $17$ and $97$. Because $16 | p - 1$, and $p - 1  \geq 16$, each possible value of $p$ must be verified by manual calculation to make sure that $p | 2019^8+1$. As $2019^8 \not\equiv -1 \pmod{17}$ and $2019^8 \equiv -1 \pmod{97}$, the smallest possible $p$ is thus $\boxed{097}$.

Note to solution

$\phi(k)$ is the Euler Totient Function of integer $k$. $\phi(k)$ is the number of positive integers less than $k$ relatively prime to $k$. Define the numbers $k_1,k_2,k_3,\cdots,k_n$ to be the prime factors of $k$. Then, we have\[\phi(k)=k\cdot \prod^n_{i=1}\left(1-\dfrac{1}{k_i}\right).\]A property of the Totient function is that, for any prime $p$, $\phi(p)=p-1$.

Euler's Totient Theorem states that\[a^{\phi(k)} \equiv 1\pmod k\]if $\gcd(a,k)=1$.

Furthermore, the order $a$ modulo $n$ for an integer $a$ relatively prime to $n$ is defined as the smallest positive integer $d$ such that $a^{d} \equiv 1\pmod n$. An important property of the order $d$ is that $d|\phi(n)$.

Solution 2 (Basic Modular Arithmetic)

In this solution, $k$ will represent an arbitrary nonnegative integer.

We will show that any potential prime $p$ must be of the form $16k+1$ through a proof by contradiction. Suppose that there exists some prime $p$ that can not be expressed in the form $16k+1$ that is a divisor of $2019^8+1$. First, note that if the prime $p$ is a divisor of $2019$, then $2019^8$ is a multiple of $p$ and $2019^8+1$ is not. Thus, $p$ is not a divisor of $2019$.

Because $2019^8+1$ is a multiple of $p$, $2019^8+1\equiv0\pmod{p}$. This means that $2019^8\equiv-1\pmod{p}$, and by raising both sides to an arbitrary odd positive integer, we have that $2019^{16k+8}\equiv-1\pmod{p}$.

Then, since the problem requires an odd prime, $p$ can be expressed as $16k+m$, where $m$ is an odd integer ranging from $3$ to $15$, inclusive. By Fermat's Little Theorem, $2019^{p-1}\equiv1\pmod{p}$, and plugging in values, we get $2019^{16k+n}\equiv1\pmod{p}$, where $n=m-1$ and is thus an even integer ranging from $2$ to $14$, inclusive.

If $n=8$, then $2019^{16k+8}\equiv1\pmod{p}$, which creates a contradiction. If $n$ is not a multiple of $8$ but is a multiple of $4$, squaring both sides of $2019^{16k+n}\equiv1\pmod{p}$ also results in the same contradictory equivalence. For all remaining $n$, raising both sides of $2019^{16k+n}\equiv1\pmod{p}$ to the $4$th power creates the same contradiction. (Note that $32k$ and $64k$ can both be expressed in the form $16k$.)

Since we have proved that no value of $n$ can work, this means that a prime must be of the form $16k+1$ in order to be a factor of $2019^8+1$. The smallest prime of this form is $17$, and testing it, we get \[2019^8+1\equiv13^8+1\equiv169^4+1\equiv(-1)^4+1\equiv1+1\equiv2\pmod{17},\] so it does not work. The next smallest prime of the required form is $97$, and testing it, we get \[2019^8+1\equiv(-18)^8+1\equiv324^4+1\equiv33^4+1\equiv1089^2+1\equiv22^2+1\equiv484+1\equiv-1+1\equiv0\pmod{97},\] so it works. Thus, the answer is $\boxed{097}$. ~emerald_block

Solution 3 (Official MAA)

Suppose prime $p>2$ divides $2019^8+1.$ Then $2019^8\equiv -1\pmod p.$ Squaring gives $2019^{16}\equiv 1\pmod p.$ If $2019^m\equiv 1 \pmod p$ for some $0<m<16,$ it follows that \[2019^{\gcd(m,16)}\equiv 1\pmod p.\] But $2019^8\equiv -1\pmod p,$ so $\gcd(m,16)$ cannot divide $8,$ which is a contradiction. Thus $2019^{16}$ is the least positive power congruent to $1\pmod p.$ By Fermat's Little Theorem, $2019^{p-1}\equiv 1\pmod p.$ It follows that $p=16k+1$ for some positive integer $k.$ The least two primes of this form are $17$ and $97.$ The least odd factor of $2019^8+1$ is not $17$ because \[2019\equiv 13\pmod{17}\qquad \text{and}\qquad 13^2\equiv 169\equiv -1\pmod{17},\] which implies $2019^8\equiv 1\not\equiv -1\pmod {17}.$ But $2019\equiv -18\pmod{97},$ so \begin{align*} (-18)^2=324&\equiv 33\pmod{97}, \\ 33^2=1089&\equiv 22\pmod{97},\,\text{and} \\ 22^2=484&\equiv -1\pmod{97}.\end{align*} Thus the least odd prime factor is $97.$

In fact, $2019^8+1=2\cdot97\cdot p,$ where $p$ is the $25$-digit prime \[1423275002072658812388593.\]


Solution 4

Let $n$ represent the least odd prime that the question is asking for.

We can see that $2019^8\equiv -1\pmod n.$

Squaring both sides we get $2019^{16}\equiv 1\pmod n.$

From Fermat's Little Theorem $a^{n-1}\equiv 1\pmod n$, we know that $n-1$ has to be a multiple of 16. So we want to test prime numbers that fit this.

The first prime we get is 17 and when we try it in $2019^8\equiv -1\pmod n,$

$2019^{8}\equiv 13^8\pmod {17}$

$169^{4}\equiv 16^4\pmod {17}$

$256^2\equiv 1\pmod {17}$

$1+1=2$

We see that 17 does not work. The next number that works from the application of Fermat's Little Theorem is 97 and when we try that,

$2019^{8}\equiv 79^8\pmod {97}$

$6241^{4}\equiv 33^4\pmod {97}$

$1089^2\equiv 22^2\pmod {97}$

$484\equiv -1\pmod {97}$

$-1+1=0$

Thus our answer is $\boxed{097}$. ~pengf

Video Solution

On The Spot STEM:

https://youtu.be/_vHq5_5qCd8


https://youtu.be/IF88iO5keFo

Video Solution by The Power Of Logic

https://youtu.be/hqg5kCz6rnQ

See Also

2019 AIME I (ProblemsAnswer KeyResources)
Preceded by
Problem 13
Followed by
Problem 15
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15
All AIME Problems and Solutions

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