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Difference between revisions of "2024 AMC 10A Problems/Problem 11"

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== Problem ==
  
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How many ordered pairs of integers <math>(m, n)</math> satisfy <math>\sqrt{n^2 - 49} = m</math>?
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<math>\textbf{(A)}~1\qquad\textbf{(B)}~2\qquad\textbf{(C)}~3\qquad\textbf{(D)}~4\qquad\textbf{(E)}</math> Infinitely many
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== Solution 1 ==
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Note that <math>m</math> is a nonnegative integer.
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We square, rearrange, and apply the difference of squares formula to the given equation: <cmath>(n+m)(n-m)=49.</cmath>
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It is clear that <math>n+m\geq n-m,</math> so <math>(n+m,n-m)=(49,1),(7,7),(-7,-7),(-1,-49).</math> Each ordered pair <math>(n+m,n-m)</math> gives one ordered pair <math>(m,n),</math> so there are <math>\boxed{\textbf{(D)}~4}</math> such ordered pairs <math>(m,n).</math>
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<u><b>Remark</b></u>
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From <math>(n+m,n-m)=(49,1),(7,7),(-7,-7),(-1,-49),</math> we get <math>(m,n)=(24,25),(0,7),(0,-7),(24,-25),</math> respectively.
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~MRENTHUSIASM
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== Solution 2 ==
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Squaring both sides of the given equation gives <cmath>n^2-49=m^2\rightarrow n^2-m^2=49\rightarrow (n+m)(n-m)=49</cmath> Splitting <math>49</math> into its factors (keep in mind it doesn't ask for positive integers, so the factors can be double negative, too) gives six cases:
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<math>(1\cdot49)</math>
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<math>(7\cdot7)</math>
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<math>(49\cdot1)</math>
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<math>(-1\cdot -49)</math>
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<math>(-7\cdot -7)</math>
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<math>(-49\cdot -1)</math>.
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Note that the square root in the problem doesn't have <math>\pm</math> with it. Therefore, if there are two solutions, <math>(n,m)</math> and <math>(n,-m)</math>, then these together are to be counted as one solution.
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The solutions expressed as <math>(n,m)</math> are:
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<math>(25,24)</math>
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<math>(25,-24)</math>
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<math>(7,0)</math>
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<math>(-7,0)</math>
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<math>(-25,24)</math>
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<math>(-25,-24)</math>.
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<math>(25,24)</math> and <math>(25,-24)</math> are to be counted as one, same for <math>(-25,24)</math> and <math>(-25,-24)</math>. Therefore, the solution is <math>\boxed{\text{(D) }4}</math> ~Tacos_are_yummy_1
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== Solution 3 (Crazy Rush) ==
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From looking at the problem, it's obvious that <math>(\pm7,0)</math> are already solutions. From squaring and rearranging, we get <cmath>n^2-m^2=49.</cmath>We know that the difference between two consecutive squares is always odd, and for each pair of increasing consecutive squares, the difference starts from <math>3</math> and increases by <math>2</math> each time. This means that there is an existing pair, <math>(\pm n,m)</math> of consecutive squares that will satisfy this equation.
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Also note that the answer cannot be infinity because the difference between two squares will increase as the two squares get higher, consecutive or not.
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Therefore, the solutions <math>(\pm7,0)</math> and <math>(\pm n,m)</math> where <math>n</math> and <math>m</math> are consecutive that have a square difference of <math>49</math>, give the answer of <math>\boxed{\text{(D) }4}</math> ~Tacos_are_yummy_1
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Minor Note: Looking at the problem, it is obvious of -7 and 7 as solutions and you can eliminate 1,3,and infinite. You can assume that there is more than 2 solutions because when determining square expressions, these problems usually always have more than an obvious solution.
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~breakingbread
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==Solution 4 (Quick)==
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Clearly, <math>(7,0)</math> and <math>(-7,0)</math> are solutions.
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Notice that <math>49 = 7^2</math>. Remembering our Pythagorean triples, we realize <math>(25, 24)</math> is a solution as well, and by extension, so is <math>(-25, 24)</math>. Since 7 is not part of any other Pythagorean triple, we can conclude the answer is  <math>\boxed{\text{(D) }4}</math>.
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~i_am_suk_at_math_2
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==Solution 5 (idk why someone would ever use this)==
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Since in <math>n^2-49</math> there are no restrictions of the sign of <math>n</math>, we know that the solution will come in pairs, with negative and positive <math>n</math>. Therefore, the answer will not be <math>1</math> or <math>3</math>. We can further confirm that it is not <math>1</math>, since the problem would probably ask for an operation of <math>n</math> and <math>m</math> instead of the number of solutions. We can also guess it is not <math>2</math>, since then the problem would ask for the sum of one of the variables in the solutions. It seems improbable that over the integers there would be infinite answers. So the answer is <math>\boxed{\textbf{(D) }4}</math>
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~megaboy6679
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(do not ever use this)
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== Video Solution by Pi Academy ==
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https://youtu.be/ABkKz0gS1MU?si=ZQBgDMRaJmMPSSMM
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==Video Solution 1 by Power Solve ==
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https://youtu.be/G91MyH1CycE
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== Video Solution by Daily Dose of Math ==
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https://youtu.be/Ne1qOZNRxfY
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~Thesmartgreekmathdude
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==See also==
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{{AMC10 box|year=2024|ab=A|num-b=10|num-a=12}}
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{{MAA Notice}}

Latest revision as of 17:48, 10 November 2024

Problem

How many ordered pairs of integers $(m, n)$ satisfy $\sqrt{n^2 - 49} = m$?

$\textbf{(A)}~1\qquad\textbf{(B)}~2\qquad\textbf{(C)}~3\qquad\textbf{(D)}~4\qquad\textbf{(E)}$ Infinitely many

Solution 1

Note that $m$ is a nonnegative integer.

We square, rearrange, and apply the difference of squares formula to the given equation: \[(n+m)(n-m)=49.\] It is clear that $n+m\geq n-m,$ so $(n+m,n-m)=(49,1),(7,7),(-7,-7),(-1,-49).$ Each ordered pair $(n+m,n-m)$ gives one ordered pair $(m,n),$ so there are $\boxed{\textbf{(D)}~4}$ such ordered pairs $(m,n).$

Remark

From $(n+m,n-m)=(49,1),(7,7),(-7,-7),(-1,-49),$ we get $(m,n)=(24,25),(0,7),(0,-7),(24,-25),$ respectively.

~MRENTHUSIASM

Solution 2

Squaring both sides of the given equation gives \[n^2-49=m^2\rightarrow n^2-m^2=49\rightarrow (n+m)(n-m)=49\] Splitting $49$ into its factors (keep in mind it doesn't ask for positive integers, so the factors can be double negative, too) gives six cases:

$(1\cdot49)$

$(7\cdot7)$

$(49\cdot1)$

$(-1\cdot -49)$

$(-7\cdot -7)$

$(-49\cdot -1)$.

Note that the square root in the problem doesn't have $\pm$ with it. Therefore, if there are two solutions, $(n,m)$ and $(n,-m)$, then these together are to be counted as one solution. The solutions expressed as $(n,m)$ are:

$(25,24)$

$(25,-24)$

$(7,0)$

$(-7,0)$

$(-25,24)$

$(-25,-24)$.

$(25,24)$ and $(25,-24)$ are to be counted as one, same for $(-25,24)$ and $(-25,-24)$. Therefore, the solution is $\boxed{\text{(D) }4}$ ~Tacos_are_yummy_1

Solution 3 (Crazy Rush)

From looking at the problem, it's obvious that $(\pm7,0)$ are already solutions. From squaring and rearranging, we get \[n^2-m^2=49.\]We know that the difference between two consecutive squares is always odd, and for each pair of increasing consecutive squares, the difference starts from $3$ and increases by $2$ each time. This means that there is an existing pair, $(\pm n,m)$ of consecutive squares that will satisfy this equation.

Also note that the answer cannot be infinity because the difference between two squares will increase as the two squares get higher, consecutive or not.

Therefore, the solutions $(\pm7,0)$ and $(\pm n,m)$ where $n$ and $m$ are consecutive that have a square difference of $49$, give the answer of $\boxed{\text{(D) }4}$ ~Tacos_are_yummy_1

Minor Note: Looking at the problem, it is obvious of -7 and 7 as solutions and you can eliminate 1,3,and infinite. You can assume that there is more than 2 solutions because when determining square expressions, these problems usually always have more than an obvious solution. ~breakingbread

Solution 4 (Quick)

Clearly, $(7,0)$ and $(-7,0)$ are solutions. Notice that $49 = 7^2$. Remembering our Pythagorean triples, we realize $(25, 24)$ is a solution as well, and by extension, so is $(-25, 24)$. Since 7 is not part of any other Pythagorean triple, we can conclude the answer is $\boxed{\text{(D) }4}$. ~i_am_suk_at_math_2

Solution 5 (idk why someone would ever use this)

Since in $n^2-49$ there are no restrictions of the sign of $n$, we know that the solution will come in pairs, with negative and positive $n$. Therefore, the answer will not be $1$ or $3$. We can further confirm that it is not $1$, since the problem would probably ask for an operation of $n$ and $m$ instead of the number of solutions. We can also guess it is not $2$, since then the problem would ask for the sum of one of the variables in the solutions. It seems improbable that over the integers there would be infinite answers. So the answer is $\boxed{\textbf{(D) }4}$

~megaboy6679

(do not ever use this)

Video Solution by Pi Academy

https://youtu.be/ABkKz0gS1MU?si=ZQBgDMRaJmMPSSMM

Video Solution 1 by Power Solve

https://youtu.be/G91MyH1CycE

Video Solution by Daily Dose of Math

https://youtu.be/Ne1qOZNRxfY

~Thesmartgreekmathdude

See also

2024 AMC 10A (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 16 17 18 19 20 21 22 23 24 25
All AMC 10 Problems and Solutions

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