What Is the Smallest Integer $a$ for $\frac{1}{640}=\frac{a}{10^b}$?

anemone · Jan 10, 2018

Here is this week's POTW:

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Find the smallest value of $a$ such that $\dfrac{1}{640}=\dfrac{a}{10^b}$, where $a$ and $b$ are integers.

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Remember to read the http://www.mathhelpboards.com/showthread.php?772-Problem-of-the-Week-%28POTW%29-Procedure-and-Guidelines to find out how to http://www.mathhelpboards.com/forms.php?do=form&fid=2!

anemone · Jan 17, 2018

Congratulations to the following members for their correct solution: (Smile)

1. Ackbach
2. kaliprasad
3. castor28

Solution from Ackbach:

We have
$$a=\frac{10^b}{640}=\frac{10^{b-1}}{64}=\frac{10\cdot 10^{b-2}}{64}=\frac{5\cdot 10^{b-2}}{32}
=\frac{5^2\cdot 10^{b-3}}{16}=\dots=5^6\cdot 10^{b-7}. $$
Hence, for $5^6\cdot 10^{b-7}$ to be an integer, we need $b\ge 7$; the smallest such $b$ is $7$, which makes $a=5^6$.

What Is the Smallest Integer $a$ for $\frac{1}{640}=\frac{a}{10^b}$?

Related to What Is the Smallest Integer $a$ for $\frac{1}{640}=\frac{a}{10^b}$?

1. What is the smallest integer solution for 1/640 = a/10^b - POTW?

2. How do you determine the solution for this equation?

3. Can there be multiple solutions for this equation?

4. How does this equation relate to scientific research?

5. Are there any other types of equations that have a single, unique solution?

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