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2024 AMC 10A Problems/Problem 23: Difference between revisions

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Thus, we must have <math>b=-12</math>, so <math>a=12c+87</math> and <math>ca=72</math>. Thus <math>c(12c+87)=72</math>, so <math>c(4c+29)=24</math>. We can simply trial and error this to find that <math>c=-8</math> so then <math>a=-9</math>. The answer is then <math>(-9)(-12)+(-12)(-8)+(-8)(-9)=108+96+72=\boxed{\textbf{(D) }276}</math>.
Thus, we must have <math>b=-12</math>, so <math>a=12c+87</math> and <math>ca=72</math>. Thus <math>c(12c+87)=72</math>, so <math>c(4c+29)=24</math>. We can simply trial and error this to find that <math>c=-8</math> so then <math>a=-9</math>. The answer is then <math>(-9)(-12)+(-12)(-8)+(-8)(-9)=108+96+72=\boxed{\textbf{(D) }276}</math>.


~eevee9406 
By Antony Huang ~Very Minor Edit by lucassf12
minor edits by Lord_Erty09


==Solution 2==
==Solution 2==
Line 86: Line 85:
However, only the last ordered pair meets all three equations.
However, only the last ordered pair meets all three equations.


Therefore, <math>ab+ba+ac= -9*-12+-12*-8+-8*-9 = \boxed{\textbf{(D) }276}.</math>
Therefore, <math>ab+ba+ac= -9\cdot-12+-12\cdot-8+-8\cdot-9 = \boxed{\textbf{(D) }276}.</math>


~[https://artofproblemsolving.com/wiki/index.php/User:Cyantist luckuso], megaboy6679 (formatting), Technodoggo (LaTeX optimization/clarity adjustments)
~[https://artofproblemsolving.com/wiki/index.php/User:Cyantist luckuso], megaboy6679 (formatting), Technodoggo (LaTeX optimization/clarity adjustments)


==Solution 6==
==Solution 6 (Elimination)==
 
Before we start, keep in mind that the problem is asking for the sum \(ab+bc+ac\). This is nothing but \(100+87+60-a-b-c\), or \(247-(a+b+c\)).


To solve the problem, we systematically test the options using elimination:
To solve the problem, we systematically test the options using elimination:


Let's first check options A and B, since they only happen when a,b, and c sum to 35 or 0.
Let's first check options A and B, since they only happen when a,b, and c sum to 35 or 0.
We begin by testing three positive values, but none satisfy the equation when there is a plus sign. For example, \( (12, 8, 4) \) satisfies \( ab + c = 100 \), but does not satisfy \( bc + a = 87\), or \( ac + b = 60\). If a+b+c=0, then not all of the numbers can be positive or negative, so this would not work.
We begin by testing three positive values, but none satisfy the equation when there is a plus sign. For example, \( (12, 8, 4) \) satisfies \( ab + c = 100 \), but does not satisfy \( bc + a = 87\), or \( ac + b = 60\). If \(a+b+c=0\), then not all of the numbers can be positive or negative, so this would not work.
From this observation, we conclude that the answer cannot be \( \textbf{A} \) or \( \textbf{B} \).
From this observation, we conclude that the answer cannot be \( \textbf{A} \) or \( \textbf{B} \).


Now let's test the next option, option C.
Now let's test the next option, option C.
Option \( \textbf{C} \) states \( ab + bc + ca = 258 \). If true, then:
Option \( \textbf{C} \) states \( ab + bc + ca = 258 \). If true, then:
[
 
a + b + c = -11
\(a + b + c = -11\)
]
 
This sum is too large. Furthermore, if all three numbers are negative, the solution still fails. For example, testing \( (-4, -5, -2) \) confirms the equation is not satisfied.
This sum is too large. Furthermore, if all three numbers are negative, the solution still fails. For example, testing \( (-4, -5, -2) \) confirms the equation is not satisfied, as we get results that are too small. Thus, we eliminate option \( \textbf{C} \).
Thus, we rule out \( \textbf{C} \).


Finally, let's test the last two options: D and E.
Finally, let's test the last two options: D and E.
For option \( \textbf{E} \), the sum \( a + b + c \) would be:
For option \( \textbf{E} \), the sum \( a + b + c \) would be:
[
 
247 - 284 = -37
\(247 - 284 = -37\)
]
 
Testing values such as \( (-11, -12, -14) \), the resulting sums \( ab + c \), \( bc + a \), and \( ac + b \) are far too large to satisfy the equation.   
Testing values such as \( (-11, -12, -14) \), the resulting sums \( ab + c \), \( bc + a \), and \( ac + b \) are far too large to satisfy the equation.   
Therefore, \( \textbf{E} \) is also eliminated.
Therefore, \( \textbf{E} \) is also eliminated.


Once we have this answer, we still need to verify it by testing out numbers:
Once we have this answer, we still need to verify it by testing out numbers:
Finally, we test option \( \textbf{D} \). Using \( ab + bc + ca = 276 \), the values \( (-9, -12, -8) \) satisfy the equation.
Finally, we test option \( \textbf{D} \). Using \( ab + bc + ca = 276 \), we get that \(a+b+c = -29\). Also note that a, b, and c all have to be different, because the sums from the three equations are all different. We want to get the three closest values of a, b, and c such that they are all different, and the sum \(a+b+c = -29\). The values \( (-9, -12, -8) \) are the closest three numbers. When we try them, they satisfy all three equations.
Thus, the correct answer is:
So, the correct answer is:
<math>ab+ba+ac= -9*-12+-12*-8+-8*-9 = \boxed{\textbf{(D) }276}.</math>
<math>ab+ba+ac= -9\cdot-12+-12\cdot-8+-8\cdot-9 = \boxed{\textbf{(D) }276}.</math>


~pimathmonkey
~pimathmonkey


== Video Solution by Power Solve ==
== Video Solution by STEM Station(Quick and Easy to Understand!) ==
https://www.youtube.com/watch?v=LNYzBhf3Ke0
https://youtu.be/bfeqoUiWNhE
 
==Video Solution, Fast, Quick, Easy! Simple Factoring Technique==
https://youtu.be/g4xdfcFgwGo


==Video Solution by SpreadTheMathLove==
==Video Solution by SpreadTheMathLove==
https://www.youtube.com/watch?v=6SQ74nt3ynw
https://youtu.be/CVjqq_yRWvA?si=MgzdckiX0nCJP1jA
 
==Video Solution by TheBeautyofMath==
https://youtu.be/1JyBt8Bh_vI
 
== Video solution by TheNeuralMathAcademy ==
https://www.youtube.com/watch?v=4b_YLnyegtw&t=5249s
 
==See Also==
 


==See also==
{{AMC10 box|year=2024|ab=A|num-b=22|num-a=24}}
{{AMC10 box|year=2024|ab=A|num-b=22|num-a=24}}
{{AMC12 box|year=2024|ab=A|num-b=16|num-a=18}}
{{AMC12 box|year=2024|ab=A|num-b=16|num-a=18}}
* [[AMC 10]]
* [[AMC 10 Problems and Solutions]]
* [[Mathematics competitions]]
* [[Mathematics competition resources]]
{{MAA Notice}}
{{MAA Notice}}

Latest revision as of 13:41, 24 October 2025

The following problem is from both the 2024 AMC 10A #23 and 2024 AMC 12A #17, so both problems redirect to this page.

Problem

Integers $a$, $b$, and $c$ satisfy $ab + c = 100$, $bc + a = 87$, and $ca + b = 60$. What is $ab + bc + ca$?

$\textbf{(A) }212 \qquad \textbf{(B) }247 \qquad \textbf{(C) }258 \qquad \textbf{(D) }276 \qquad \textbf{(E) }284 \qquad$

Solution 1

Subtracting the first two equations yields $(a-c)(b-1)=13$. Notice that both factors are integers, so $b-1$ could equal one of $13,1,-1,-13$ and $b=14,2,0,-12$. We consider each case separately:

For $b=0$, from the second equation, we see that $a=87$. Then $87c=60$, which is not possible as $c$ is an integer, so this case is invalid.

For $b=2$, we have $2c+a=87$ and $ca=58$, which by experimentation on the factors of $58$ has no solution, so this is also invalid.

For $b=14$, we have $14c+a=87$ and $ca=46$, which by experimentation on the factors of $46$ has no solution, so this is also invalid.

Thus, we must have $b=-12$, so $a=12c+87$ and $ca=72$. Thus $c(12c+87)=72$, so $c(4c+29)=24$. We can simply trial and error this to find that $c=-8$ so then $a=-9$. The answer is then $(-9)(-12)+(-12)(-8)+(-8)(-9)=108+96+72=\boxed{\textbf{(D) }276}$.

By Antony Huang ~Very Minor Edit by lucassf12

Solution 2

Adding up first two equations: \[(a+c)(b+1)=187\] \[b+1=\pm 11,\pm 17\] \[b=-12,10,-18,16\]

Subtracting equation 1 from equation 2: \[(a-c)(b-1)=13\] \[b-1=\pm 1,\pm 13\] \[b=0,2,-12,14\]

\[\Rightarrow b=-12\]

Which implies that $a+c=-17$ from $(a+c)(b+1)=187$

Giving us that $a+b+c=-29$

Therefore, $ab+bc+ac=100+87+60-(a+b+c)=\boxed{\text{(D) }276}$

~lptoggled

Solution 3 (Guess and check)

The idea is that you could guess values for $c$, since then $a$ and $b$ are factors of $100 - c$. The important thing to realize is that $a$, $b$, and $c$ are all negative. Then, this can be solved in a few minutes, giving the solution $(-9, -12, -8)$, which gives the answer $\boxed{\textbf{(D)} 276}$ ~andliu766


Solution 4

\begin{align} ab + c &= 100 \\ bc + a &= 87 \\ ca + b &= 60 \end{align}

\[(1) + (2) \implies ab + c +bc + a = (a+c)(b+1)=187\implies b+1=\pm 11,\pm 17\]

\[(1) - (2) \implies ab + c - bc - a = (a-c)(b-1)=13\implies b-1=\pm 1,\pm 13\]

Note that $(b+1)-(b-1)=2$, and the only possible pair of results that yields this is $b-1=-13$ and $b+1=-11$, so $a+c=-17$.

Therefore,

\[ab+ba+ac=ab + c +bc + a + ca + b -(a+b+c) = (1)+(2)+(3) - (a+b+c) = 100+87+60-(a+b+c)=\boxed{\textbf{(D) }276}.\] ~luckuso, yuvag, Technodoggo (LaTeX credits to the latter two and editing to the latter)

Solution 5

\begin{align} ab + c &= 100 \\ bc + a &= 87 \\ ca + b &= 60 \end{align}

\begin{align*} (1) - (2) \implies ab + c -bc - a &=(a-c)(b-1)=13 \\ (2) - (3) \implies bc + a -ca - b &=(b-a)(c-1)=27 \\ (3) - (1) \implies ca + b -ab - c &=(c-b)(a-1)=-40 \end{align*}

There are $3$ ordered pairs of $(a,b,c)$: $(5,14,4)$, $(-3,-12,-3)$, $(-9,-12,-8)$.

However, only the last ordered pair meets all three equations.

Therefore, $ab+ba+ac= -9\cdot-12+-12\cdot-8+-8\cdot-9 = \boxed{\textbf{(D) }276}.$

~luckuso, megaboy6679 (formatting), Technodoggo (LaTeX optimization/clarity adjustments)

Solution 6 (Elimination)

Before we start, keep in mind that the problem is asking for the sum \(ab+bc+ac\). This is nothing but \(100+87+60-a-b-c\), or \(247-(a+b+c\)).

To solve the problem, we systematically test the options using elimination:

Let's first check options A and B, since they only happen when a,b, and c sum to 35 or 0. We begin by testing three positive values, but none satisfy the equation when there is a plus sign. For example, \( (12, 8, 4) \) satisfies \( ab + c = 100 \), but does not satisfy \( bc + a = 87\), or \( ac + b = 60\). If \(a+b+c=0\), then not all of the numbers can be positive or negative, so this would not work. From this observation, we conclude that the answer cannot be \( \textbf{A} \) or \( \textbf{B} \).

Now let's test the next option, option C. Option \( \textbf{C} \) states \( ab + bc + ca = 258 \). If true, then:

\(a + b + c = -11\)

This sum is too large. Furthermore, if all three numbers are negative, the solution still fails. For example, testing \( (-4, -5, -2) \) confirms the equation is not satisfied, as we get results that are too small. Thus, we eliminate option \( \textbf{C} \).

Finally, let's test the last two options: D and E. For option \( \textbf{E} \), the sum \( a + b + c \) would be:

\(247 - 284 = -37\)

Testing values such as \( (-11, -12, -14) \), the resulting sums \( ab + c \), \( bc + a \), and \( ac + b \) are far too large to satisfy the equation. Therefore, \( \textbf{E} \) is also eliminated.

Once we have this answer, we still need to verify it by testing out numbers: Finally, we test option \( \textbf{D} \). Using \( ab + bc + ca = 276 \), we get that \(a+b+c = -29\). Also note that a, b, and c all have to be different, because the sums from the three equations are all different. We want to get the three closest values of a, b, and c such that they are all different, and the sum \(a+b+c = -29\). The values \( (-9, -12, -8) \) are the closest three numbers. When we try them, they satisfy all three equations. So, the correct answer is: $ab+ba+ac= -9\cdot-12+-12\cdot-8+-8\cdot-9 = \boxed{\textbf{(D) }276}.$

~pimathmonkey

Video Solution by STEM Station(Quick and Easy to Understand!)

https://youtu.be/bfeqoUiWNhE

Video Solution, Fast, Quick, Easy! Simple Factoring Technique

https://youtu.be/g4xdfcFgwGo

Video Solution by SpreadTheMathLove

https://youtu.be/CVjqq_yRWvA?si=MgzdckiX0nCJP1jA

Video Solution by TheBeautyofMath

https://youtu.be/1JyBt8Bh_vI

Video solution by TheNeuralMathAcademy

https://www.youtube.com/watch?v=4b_YLnyegtw&t=5249s

See Also

2024 AMC 10A (ProblemsAnswer KeyResources)
Preceded by
Problem 22 		Followed by
Problem 24
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


2024 AMC 12A (ProblemsAnswer KeyResources)
Preceded by
Problem 16 		Followed by
Problem 18
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 12 Problems and Solutions


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