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Difference between revisions of "2017 UNM-PNM Statewide High School Mathematics Contest II Problems/Problem 2"

(Solution)
(Solution)
Line 14: Line 14:
 
<math>1A9</math> <math>\cdot</math> <math>1A9</math> = <math>19AR1</math>
 
<math>1A9</math> <math>\cdot</math> <math>1A9</math> = <math>19AR1</math>
  
Because the first two digits of <math>STARS</math> are <math>1</math> and <math>9</math>, A cannot take on too many value because if it becomes 5, <math>S</math> will become 2. It cannot be four either because even then, <math>STARS</math> would be too small. Now, if A is tested from the set {<math>0,1,2,3</math>}:
+
Because the first two digits of <math>STARS</math> are <math>1</math> and <math>9</math>, A<math></math> cannot take on too many values because if it becomes 5, <math>S</math> will become 2. It cannot be four either because even then, <math>STARS</math> would be too small. Now, if A is tested from the set {<math>0,1,2,3</math>}:
  
 
<math>A=0</math>:
 
<math>A=0</math>:

Revision as of 12:23, 21 August 2023


Problem

Suppose $A, R, S$, and $T$ all denote distinct digits from $1$ to $9$. If $\sqrt{STARS} = SAT$, what are $A, R, S$, and $T$?

Solution

$A = 3, T = 9, S = 1$ and $R = 2$

Another way of stating the question is that $SAT$ $\cdot$ $SAT$ = $STARS$. This means that the ending digit of $T$ $\cdot$ $T$ or $S$ has to be the ending digit of a square number, or {$0, 1, 4, 5, 6, 9$}. Keep in mind that $STARS$ is a 5-digit number. We know that $S$ cannot be 0 because $SAT$ would become a 2-digit number. It cannot be 4 or over because $STARS$ would have 6 digits instead of 5. This only leaves $S$ = 1. Because the last digit of $STARS$ is $1$, we can conclude that $T$ must be $9$ or $1$. However, since all the digits are unique, $T$ = $9$. Now the expression becomes:

$1A9$ $\cdot$ $1A9$ = $19AR1$

Because the first two digits of $STARS$ are $1$ and $9$, A$$ (Error compiling LaTeX. Unknown error_msg) cannot take on too many values because if it becomes 5, $S$ will become 2. It cannot be four either because even then, $STARS$ would be too small. Now, if A is tested from the set {$0,1,2,3$}:

$A=0$:

$109$ $\cdot$ $109$ = $11881$ (Does not work)

$A=1$:

$119$ $\cdot$ $119$ = $14161$ (Does not work)

$A=2$:

$129$ $\cdot$ $129$ = $16641$ (Does not work)

$A=3$:

$139$ $\cdot$ $139$ = $19321$

This works as it fits the template: $\boxed{\textbf{(S=1, T=9, A=3, and R=2)}}$

See also

2017 UNM-PNM Contest II (ProblemsAnswer KeyResources)
Preceded by
Problem 1 		Followed by
Problem 3
1 2 3 4 5 6 7 8 9 10
All UNM-PNM Problems and Solutions
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