Equivalent Fraction
Plotting & Ordering Fractions
Selected Reading
- Simplifying a Fraction Advanced
- Introduction to Simplifying a Fraction
- Equivalent Fractions
- Understanding Equivalent Fractions
- Introduction
- Home
Plotting & Ordering Fractions
- Using a Common Denominator to Order Fraction
- Ordering Fractions With The Same Numerator
- Ordering Fractions With The Same Denominator
- Plotting Fractions on a Number Line
- Fractional Position on a Number Line
Selected Reading
- Who is Who
- Computer Glossary
- HR Interview Questions
- Effective Resume Writing
- Questions and Answers
- UPSC IAS Exams Notes
Ordering Fractions With The Same Numerator
Ordering Fractions With The Same Numerator
Ordering is arranging either in increasing or decreasing order. We are deapng with fractions with the same numerators here. To order these fractions, we consider their denominators and order them, either from least to the greatest or from the greatest to the least. The order of fractions will be reverse of the order of the denominators. (As greater the denominator, smaller is the fraction)
If a, b, c and d are any four real numbers and a < b < c then
To arrange the fractions d/a, d/b, d/c in increasing order, we find that the fractions have same numerator. We arrange the denominators in increasing order as a < b < c. The order of fractions will be reverse of the order of the denominators. Hence, the fractions in increasing order would be d/c < d/b < d/a.
To arrange the fractions d/a, d/b, d/c in decreasing order, we find the fractions have same numerator. We arrange the denominators in decreasing order as c > b > a. The order of fractions will be reverse of the order of the denominators. Hence, the fractions in decreasing order would be d/a > d/b > d/c
Order the following fractions from the least to greatest
$frac{3}{11}$, $frac{3}{6}$, $frac{3}{8}$
Solution
Step 1:
The numerator of each fraction is the same 3. So we look at the denominators. Here is the order of the denominators from least to the greatest.
6 < 8 < 11
Step 2:
The order of the fractions from least to greatest is the reverse
$frac{3}{11}$ < $frac{3}{8}$ < $frac{3}{6}$
Order the following fractions from the least to greatest.
$frac{5}{9}$, $frac{5}{12}$, $frac{5}{8}$
Solution
Step 1:
The numerator of each fraction is the same 5. So we look at the denominators. Here is the order of the denominators from least to the greatest.
8 < 9 < 12
Step 2:
The order of the fractions from least to greatest is the reverse
$frac{5}{12}$ < $frac{5}{9}$ < $frac{5}{8}$
Order the following fractions from the least to greatest.
$frac{3}{8}$, $frac{3}{7}$, $frac{3}{5}$
Solution
Step 1:
The numerator of each fraction is the same 3. So we look at the denominators. Here is the order of the denominators from least to the greatest.
5 < 7 < 8
Step 2:
The order of the fractions from least to greatest is the reverse
$frac{3}{8}$ < $frac{3}{7}$ < $frac{3}{5}$