How do you convert \[0.16\] \[\left( {6\;{\text{repeated}}} \right)\] to a fraction?
Answer
Verified543.6k+ views
Hint:In this question we convert a decimal repeated number to a fraction. For converting decimal repeated numbers to fractions, there are two methods.
First is a simple calculation.
The second is by using the formula.
The formula is that decimal number multiplied with a repeated number (which is denoted below) minus non-repeating part and it is divided by repeating number (which is denoted as below. And the formula is written as below.
\[ \Rightarrow \dfrac{{\left( {DN*F} \right) - NRP}}{D}\]
Where, \[DN\] is decimal number, \[F\] is \[10\] if one repeating number, \[100\] if two repeating number, \[1000\] if three repeating number etc, \[NRP\] is non repeating part of decimal number and \[D\] is\[9\] if one repeating number, \[99\] if two repeating number, \[999\] if three repeating number etc.
Complete step by step answer:
In this question, we have given a repeated decimal number and we need to convert it into fraction form.
We have given the decimal number as \[0.16\mathop 6\limits^ - \]
Let’s assume that
\[ \Rightarrow x = 0.16\mathop 6\limits^ - ............\left( 1 \right)\]
Now we will multiply both sides with\[10\] in equation \[1\]. Then,
\[ \Rightarrow 10x = 1.6\mathop 6\limits^ - .............\left( 2 \right)\]
Again, we will multiply both sides with \[100\] in equation $1$. Then,
\[ \Rightarrow 100x = 16.\mathop 6\limits^ - ...........\left( 3 \right)\]
Now, we will subtract the equation \[2\] from equation \[3\] as,
\[100x - 10x = 16.\mathop 6\limits^ - - 1.6\mathop 6\limits^ - \]
After simplification we will get,
\[ \Rightarrow 90x = 15\]
On further simplification of the equation we get,
\[ \Rightarrow x = \dfrac{{15}}{{90}}\]
Now, divided numerator and denominator by \[15\] and we get,
\[\therefore x = \dfrac{1}{6}\]
Therefore, the fraction form is \[\dfrac{1}{6}\].
Note: As we know that we can convert repeated decimal numbers to the fraction by using the formula.
By using the formula, we calculate the factor of the decimal repeated number.
The formula is
\[ \Rightarrow \dfrac{{\left( {DF \times F} \right) - NRP}}{D}\]
\[
DN = 1.\mathop 6\limits^ - \\
F = 10 \\
NRP = 0.1 \\
D = 9 \\
\]
Now we will put these values in the above formula as,
\[ \Rightarrow \dfrac{{\left( {0.16 \times 10} \right) - 0.1}}{9} = \dfrac{{1.5}}{9} = \dfrac{1}{6}\]
Therefore, the fraction is \[\dfrac{1}{6}\].
First is a simple calculation.
The second is by using the formula.
The formula is that decimal number multiplied with a repeated number (which is denoted below) minus non-repeating part and it is divided by repeating number (which is denoted as below. And the formula is written as below.
\[ \Rightarrow \dfrac{{\left( {DN*F} \right) - NRP}}{D}\]
Where, \[DN\] is decimal number, \[F\] is \[10\] if one repeating number, \[100\] if two repeating number, \[1000\] if three repeating number etc, \[NRP\] is non repeating part of decimal number and \[D\] is\[9\] if one repeating number, \[99\] if two repeating number, \[999\] if three repeating number etc.
Complete step by step answer:
In this question, we have given a repeated decimal number and we need to convert it into fraction form.
We have given the decimal number as \[0.16\mathop 6\limits^ - \]
Let’s assume that
\[ \Rightarrow x = 0.16\mathop 6\limits^ - ............\left( 1 \right)\]
Now we will multiply both sides with\[10\] in equation \[1\]. Then,
\[ \Rightarrow 10x = 1.6\mathop 6\limits^ - .............\left( 2 \right)\]
Again, we will multiply both sides with \[100\] in equation $1$. Then,
\[ \Rightarrow 100x = 16.\mathop 6\limits^ - ...........\left( 3 \right)\]
Now, we will subtract the equation \[2\] from equation \[3\] as,
\[100x - 10x = 16.\mathop 6\limits^ - - 1.6\mathop 6\limits^ - \]
After simplification we will get,
\[ \Rightarrow 90x = 15\]
On further simplification of the equation we get,
\[ \Rightarrow x = \dfrac{{15}}{{90}}\]
Now, divided numerator and denominator by \[15\] and we get,
\[\therefore x = \dfrac{1}{6}\]
Therefore, the fraction form is \[\dfrac{1}{6}\].
Note: As we know that we can convert repeated decimal numbers to the fraction by using the formula.
By using the formula, we calculate the factor of the decimal repeated number.
The formula is
\[ \Rightarrow \dfrac{{\left( {DF \times F} \right) - NRP}}{D}\]
\[
DN = 1.\mathop 6\limits^ - \\
F = 10 \\
NRP = 0.1 \\
D = 9 \\
\]
Now we will put these values in the above formula as,
\[ \Rightarrow \dfrac{{\left( {0.16 \times 10} \right) - 0.1}}{9} = \dfrac{{1.5}}{9} = \dfrac{1}{6}\]
Therefore, the fraction is \[\dfrac{1}{6}\].
Recently Updated Pages
Master Class 7 Social Science: Engaging Questions & Answers for Success
Master Class 7 Science: Engaging Questions & Answers for Success
Class 7 Question and Answer - Your Ultimate Solutions Guide
Master Class 7 English: Engaging Questions & Answers for Success
Master Class 7 Maths: Engaging Questions & Answers for Success
Master Class 6 English: Engaging Questions & Answers for Success
Trending doubts
Full Form of IASDMIPSIFSIRSPOLICE class 7 social science CBSE
Convert 200 Million dollars in rupees class 7 maths CBSE
What are the controls affecting the climate of Ind class 7 social science CBSE
Write a letter to the editor of the national daily class 7 english CBSE
List of coprime numbers from 1 to 100 class 7 maths CBSE
Fill in the blanks with appropriate modals a Drivers class 7 english CBSE