Question
what's .37 (all repeating) as a fraction in simplest form
Answers
GPT-4o mini
To convert \(0.373737...\) (which we can denote as \(x\)) into a fraction, we can use the following steps:
1. Let \(x = 0.373737...\).
2. Since the repeating part has 2 digits, multiply both sides by 100:
\[
100x = 37.373737...
\]
3. Now, subtract the original \(x\) from this equation:
\[
100x - x = 37.373737... - 0.373737...
\]
This simplifies to:
\[
99x = 37
\]
4. Now, solve for \(x\):
\[
x = \frac{37}{99}
\]
Now, let's check if \(\frac{37}{99}\) is in simplest form. The greatest common divisor (GCD) of 37 and 99 is 1 since 37 is a prime number and does not divide 99.
Therefore, the fraction \(\frac{37}{99}\) is already in simplest form.
Thus, the decimal \(0.373737...\) as a fraction in simplest form is:
\[
\frac{37}{99}
\]
1. Let \(x = 0.373737...\).
2. Since the repeating part has 2 digits, multiply both sides by 100:
\[
100x = 37.373737...
\]
3. Now, subtract the original \(x\) from this equation:
\[
100x - x = 37.373737... - 0.373737...
\]
This simplifies to:
\[
99x = 37
\]
4. Now, solve for \(x\):
\[
x = \frac{37}{99}
\]
Now, let's check if \(\frac{37}{99}\) is in simplest form. The greatest common divisor (GCD) of 37 and 99 is 1 since 37 is a prime number and does not divide 99.
Therefore, the fraction \(\frac{37}{99}\) is already in simplest form.
Thus, the decimal \(0.373737...\) as a fraction in simplest form is:
\[
\frac{37}{99}
\]