Question
simplify
To convert the repeating decimal \(0.09\overline{9}\) (where the \(9\) repeats indefinitely) into a rational number, we can set \(x\) equal to the decimal:
\[
x = 0.099999\ldots
\]
Next, we multiply both sides by \(10\) to shift the decimal point one place to the right:
\[
10x = 0.99999\ldots
\]
Now we have two equations:
1. \(x = 0.099999\ldots\)
2. \(10x = 0.99999\ldots\)
Next, notice that the repeating part in equation \(10x\) is the same as that in \(x\). We can rewrite \(0.99999\ldots\) as \(1\):
\[
10x = 1
\]
Now we can solve for \(x\):
\[
x = \frac{1}{10}
\]
Thus, we have:
\[
0.09\overline{9} = \frac{1}{10}
\]
The rational number in simplest form is:
\[
\boxed{\frac{1}{10}}
\]
To convert the repeating decimal \(0.09\overline{9}\) (where the \(9\) repeats indefinitely) into a rational number, we can set \(x\) equal to the decimal:
\[
x = 0.099999\ldots
\]
Next, we multiply both sides by \(10\) to shift the decimal point one place to the right:
\[
10x = 0.99999\ldots
\]
Now we have two equations:
1. \(x = 0.099999\ldots\)
2. \(10x = 0.99999\ldots\)
Next, notice that the repeating part in equation \(10x\) is the same as that in \(x\). We can rewrite \(0.99999\ldots\) as \(1\):
\[
10x = 1
\]
Now we can solve for \(x\):
\[
x = \frac{1}{10}
\]
Thus, we have:
\[
0.09\overline{9} = \frac{1}{10}
\]
The rational number in simplest form is:
\[
\boxed{\frac{1}{10}}
\]
Answers
GPT-4o mini
Let's go through the simplification of the repeating decimal \(0.09\overline{9}\) step by step to convert it into a rational number.
We start by letting:
\[
x = 0.099999\ldots
\]
Next, we multiply both sides by \(10\) to move the decimal point one place to the right:
\[
10x = 0.99999\ldots
\]
Now we have the two equations:
1. \(x = 0.099999\ldots\)
2. \(10x = 0.99999\ldots\)
Note that the expression \(0.99999\ldots\) is equivalent to \(1\). Thus, we can rewrite our second equation as:
\[
10x = 1
\]
Now, we can solve for \(x\):
\[
x = \frac{1}{10}
\]
This shows that:
\[
0.09\overline{9} = \frac{1}{10}
\]
In simplest form, the rational number representation is:
\[
\boxed{\frac{1}{10}}
\]
We start by letting:
\[
x = 0.099999\ldots
\]
Next, we multiply both sides by \(10\) to move the decimal point one place to the right:
\[
10x = 0.99999\ldots
\]
Now we have the two equations:
1. \(x = 0.099999\ldots\)
2. \(10x = 0.99999\ldots\)
Note that the expression \(0.99999\ldots\) is equivalent to \(1\). Thus, we can rewrite our second equation as:
\[
10x = 1
\]
Now, we can solve for \(x\):
\[
x = \frac{1}{10}
\]
This shows that:
\[
0.09\overline{9} = \frac{1}{10}
\]
In simplest form, the rational number representation is:
\[
\boxed{\frac{1}{10}}
\]