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Difference between revisions of "1952 AHSME Problems/Problem 47"

(Solution #1 - Fast and Easy Solution)
(Solution #1)
 
Line 12: Line 12:
 
The easiest method, which in this case is not very time consuming, is to guess and check and use process of elimination.  
 
The easiest method, which in this case is not very time consuming, is to guess and check and use process of elimination.  
 
We can immediately rule out (B) since it does not satisfy the third equation.  
 
We can immediately rule out (B) since it does not satisfy the third equation.  
The first equation allows us to eliminate (A) and (C) because the bases are different.
+
The first equation allows us to eliminate (A) and (C) because the bases are different and aren't powers of each other.
 
Finally, we manually check (D) and (E) and see that our answer is <math>\fbox{D}</math>
 
Finally, we manually check (D) and (E) and see that our answer is <math>\fbox{D}</math>
 
  
 
== Solution #2 ==
 
== Solution #2 ==

Latest revision as of 20:48, 22 December 2015

Problem

In the set of equations $z^x = y^{2x},\quad 2^z = 2\cdot4^x, \quad x + y + z = 16$, the integral roots in the order $x,y,z$ are:

$\textbf{(A) } 3,4,9 \qquad \textbf{(B) } 9,-5,-12 \qquad \textbf{(C) } 12,-5,9 \qquad \textbf{(D) } 4,3,9 \qquad \textbf{(E) } 4,9,3$

Solution #1

The easiest method, which in this case is not very time consuming, is to guess and check and use process of elimination. We can immediately rule out (B) since it does not satisfy the third equation. The first equation allows us to eliminate (A) and (C) because the bases are different and aren't powers of each other. Finally, we manually check (D) and (E) and see that our answer is $\fbox{D}$

Solution #2

Let us actually solve the problem through algebra. We start by simplifying each of the equations given to us.

Equation #1 \[z^x = y^{2x}\] \[z = y^2\]

Equation #2 \[2^z = 2 * 4^x\] \[2^z = 2^{2x + 1}\] \[z = 2x + 1\]

Equation #3 \[x + y + z = 16\]

Equations 1 & 2 tell us that $z$ is an odd perfect square. They also tell us that $z$ is the largest of the three integers. We see that if we assume $z = 9$, then $y = 3$ and $x = 4$, which satisfies all three equations.

Therefore, the answer is $\fbox{(D) 4,3,9}$

See also

1952 AHSC (ProblemsAnswer KeyResources)
Preceded by
Problem 46 		Followed by
Problem 48
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All AHSME Problems and Solutions

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