Difference between revisions of "1985 AJHSME Problems/Problem 1"

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==Solution==
 
==Solution==
We '''could''' go at it by just multiplying it out, dividing, etc, but there is a much more obvious, simpler method.<br>Noticing that multiplying and dividing by the same number is the equivalent of multiplying (or dividing) by 1, we can rearrange the numbers in the numerator and the denominator (commutative property of multiplication) so that it looks like...<br><br><math>\frac{3}{3} \times \frac{5}{5} \times \frac{7}{7} \times \frac{9}{9} \times \frac{11}{11}</math><br><br>Notice that each number is still there, and nothing has been changed - other than the order.<br>Finally, since each fraction is equal to one, we have <math>1\times1\times1\times1\times1</math>, which is equal to 1.
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We '''could''' go at it by just multiplying it out, dividing, etc, but there is a much more simple method.
  
Thus, <math>A</math> is the answer.
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Noticing that multiplying and dividing by the same number is the equivalent of multiplying (or dividing) by <math>1</math>, we can rearrange the numbers in the numerator and the denominator (commutative property of multiplication) so that it looks like <cmath>\frac{3}{3} \times \frac{5}{5} \times \frac{7}{7} \times \frac{9}{9} \times \frac{11}{11}</cmath>
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Notice that each number is still there, and nothing has been changed - other than the order.
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Finally, since each fraction is equal to one, we have <math>1\times1\times1\times1\times1</math>, which is equal to <math>1</math>.
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Thus, <math>\boxed{\text{A}}</math> is the answer.

Revision as of 18:03, 12 January 2009

Question

$\frac{3\times5}{9\times11} \times \frac{7\times9\times11}{3\times5\times7}$

$(A) 1 (B) 0 (C) 49 (D) \frac{1}{49} (E) 50$

Solution

We could go at it by just multiplying it out, dividing, etc, but there is a much more simple method.

Noticing that multiplying and dividing by the same number is the equivalent of multiplying (or dividing) by $1$, we can rearrange the numbers in the numerator and the denominator (commutative property of multiplication) so that it looks like \[\frac{3}{3} \times \frac{5}{5} \times \frac{7}{7} \times \frac{9}{9} \times \frac{11}{11}\]

Notice that each number is still there, and nothing has been changed - other than the order.

Finally, since each fraction is equal to one, we have $1\times1\times1\times1\times1$, which is equal to $1$.

Thus, $\boxed{\text{A}}$ is the answer.