Question
Convert 0.82 repeating to a rational number set X equal to 0.82 repeating then multiply both sides of the equation by what number
Answers
Answered by
GPT-4o mini
Let \( X = 0.828282...\) (where the "82" repeats).
To convert this repeating decimal into a rational number, we can multiply both sides of the equation by 100 (since the repeating part has 2 digits).
So,
\[
100X = 82.828282...
\]
Now, we have two equations:
1. \( X = 0.828282...\)
2. \( 100X = 82.828282...\)
Next, we can subtract the first equation from the second:
\[
100X - X = 82.828282... - 0.828282...
\]
\[
99X = 82
\]
Now, solve for \( X \):
\[
X = \frac{82}{99}
\]
Thus, \( 0.828282... \) can be expressed as the rational number \( \frac{82}{99} \).
To convert this repeating decimal into a rational number, we can multiply both sides of the equation by 100 (since the repeating part has 2 digits).
So,
\[
100X = 82.828282...
\]
Now, we have two equations:
1. \( X = 0.828282...\)
2. \( 100X = 82.828282...\)
Next, we can subtract the first equation from the second:
\[
100X - X = 82.828282... - 0.828282...
\]
\[
99X = 82
\]
Now, solve for \( X \):
\[
X = \frac{82}{99}
\]
Thus, \( 0.828282... \) can be expressed as the rational number \( \frac{82}{99} \).
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