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1998 CEMC Gauss (Grade 8) Problems/Problem 12

Revision as of 13:43, 18 June 2025 by Anabel.disher (talk | contribs) (Created page with "==Problem== In the <math>4\text{x}4</math> square shown, each row, column, and diagonal should contain each of the numbers <math>1</math>, <math>2</math>, <math>3</math>, an...")
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Problem

In the $4\text{x}4$ square shown, each row, column, and diagonal should contain each of the numbers $1$, $2$, $3$, and $4$. Find the value of $K + N$.

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$\text{ (A) }\ 4 \qquad\text{ (B) }\ 3 \qquad\text{ (C) }\ 5 \qquad\text{ (D) }\ 6 \qquad\text{ (E) }\ 7$

Solution 1

$R$ must be equal to $4$ because $1$, $2$, $3$ are already present in a diagonal that contains $R$.

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$J$ must be $2$ or $4$ because $1$ and $3$ are in a column with $1$, $3$, $J$, and $G$. However, $2$ already appears in a row containing $J$, so $J$ must be $4$.

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We can also conclude $Q = 3$, $P = 2$, $T = 3$, and $L = 4$ using similar logic.

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$3$, $2$, and $4$ are already present in the row with $K$, so $K = 1$.

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Since $N$ can't be $1$ due to $K$ being in the same column and being $1$, $M$ = $1$, which also shows $N = 2$ using similar logic to $K = 1$.

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Therefore, $K + N$ = $2 + 1 = \boxed {\textbf {(B) } 3}$.

~anabel.disher

Solution 2

We can start out by getting the value of $R$ and $J$, like in solution 1.

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However, we can see that $K = 1$ because $T$ or $K$ must be $1$, but $T$ cannot be $1$ since it is in a column with $1$.

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From the column with $N$ and $K$, $N = 3$ or $N = 2$ because $1$ and $4$ are in the column already. However, $N$ cannot be $3$ because it is in a row with $3$, so $N = 2$.

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Therefore, $K + N$ = $2 + 1 = \boxed {\textbf {(B) } 3}$.

~anabel.disher

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