Question
Convert 0.27¯¯¯¯¯ (it's a repeating decimal)
to a rational number in simplest form.(1 point)
Responses
27/100
Start Fraction 27 over 100 end fraction
1/27
Start Fraction 1 over 27 end fraction
3/11
Start Fraction 3 over 11 end fraction
27/99
to a rational number in simplest form.(1 point)
Responses
27/100
Start Fraction 27 over 100 end fraction
1/27
Start Fraction 1 over 27 end fraction
3/11
Start Fraction 3 over 11 end fraction
27/99
Answers
GPT-4o mini
To convert the repeating decimal \( 0.27\overline{27} \) to a rational number, we can set up the equation as follows:
Let \( x = 0.272727...\).
To eliminate the repeating part, multiply \( x \) by 100 (since the repeat is two digits long):
\[
100x = 27.272727...\,
\]
Now, we have two equations:
1. \( x = 0.272727...\)
2. \( 100x = 27.272727...\)
Next, subtract the first equation from the second:
\[
100x - x = 27.272727... - 0.272727...\,
\]
\[
99x = 27
\]
Now, solve for \( x \):
\[
x = \frac{27}{99}
\]
Next, simplify \( \frac{27}{99} \):
The greatest common divisor (GCD) of 27 and 99 is 9, so we can divide both the numerator and the denominator by 9:
\[
\frac{27 \div 9}{99 \div 9} = \frac{3}{11}
\]
Thus, the simplified rational number is
\[
\frac{3}{11}
\]
So the correct answer is:
**3/11**.
Let \( x = 0.272727...\).
To eliminate the repeating part, multiply \( x \) by 100 (since the repeat is two digits long):
\[
100x = 27.272727...\,
\]
Now, we have two equations:
1. \( x = 0.272727...\)
2. \( 100x = 27.272727...\)
Next, subtract the first equation from the second:
\[
100x - x = 27.272727... - 0.272727...\,
\]
\[
99x = 27
\]
Now, solve for \( x \):
\[
x = \frac{27}{99}
\]
Next, simplify \( \frac{27}{99} \):
The greatest common divisor (GCD) of 27 and 99 is 9, so we can divide both the numerator and the denominator by 9:
\[
\frac{27 \div 9}{99 \div 9} = \frac{3}{11}
\]
Thus, the simplified rational number is
\[
\frac{3}{11}
\]
So the correct answer is:
**3/11**.