Sort the Common Fractions String ¹²³/_2,673, ¹¹¹/_2,674, ¹⁸⁴/₁₀₀, ¹⁷³/₁₂₁, ¹⁷²/₉₄, ²⁶⁸/₁₀₃, ²⁷⁹/₉₇, ²⁷⁸/₁₁₆, ²⁸⁴/₉₆, ²⁸¹/₁₂₃, ²⁷⁶/₁₁₀, ²⁹³/₂₀ in Ascending Order. Online Calculator

Multiple fractions ¹²³/_2,673, ¹¹¹/_2,674, ¹⁸⁴/₁₀₀, ¹⁷³/₁₂₁, ¹⁷²/₉₄, ²⁶⁸/₁₀₃, ²⁷⁹/₉₇, ²⁷⁸/₁₁₆, ²⁸⁴/₉₆, ²⁸¹/₁₂₃, ²⁷⁶/₁₁₀, ²⁹³/₂₀ compared and then sorted in ascending order

To compare and sort multiple fractions, they should either have the same denominator or the same numerator.

The operation of sorting fractions in ascending order:
¹²³/_2,673, ¹¹¹/_2,674, ¹⁸⁴/₁₀₀, ¹⁷³/₁₂₁, ¹⁷²/₉₄, ²⁶⁸/₁₀₃, ²⁷⁹/₉₇, ²⁷⁸/₁₁₆, ²⁸⁴/₉₆, ²⁸¹/₁₂₃, ²⁷⁶/₁₁₀, ²⁹³/₂₀

Analyze the fractions to be compared and ordered, by category:

positive proper fractions: ¹²³/_2,673, ¹¹¹/_2,674

positive improper fractions: ¹⁸⁴/₁₀₀, ¹⁷³/₁₂₁, ¹⁷²/₉₄, ²⁶⁸/₁₀₃, ²⁷⁹/₉₇, ²⁷⁸/₁₁₆, ²⁸⁴/₉₆, ²⁸¹/₁₂₃, ²⁷⁶/₁₁₀, ²⁹³/₂₀

How to compare and sort the fractions in ascending order, by categories:

- any positive proper fraction is smaller than...

- any positive improper fraction.

How do we compare and sort all the fractions?

It is clear that there is no point in comparing fractions from different categories.

We will compare and sort the fractions in each of the above categories, separately.

Sort the positive proper fractions in ascending order:
¹²³/_2,673 and ¹¹¹/_2,674

Simplify the operation
Reduce (simplify) the fractions to their lowest terms equivalents:

To reduce a fraction to the lowest terms equivalent: divide both the numerator and denominator by their greatest common factor, GCF.
Internal link » Reduce (simplify) common (ordinary) fractions to the lowest terms (to their simplest form equivalent), online calculator

The fraction: ¹²³/_2,673

The prime factorizations of the numerator and denominator:
123 = 3 × 41
2,673 = 3⁵ × 11
Multiply all the common prime factors: if there are repeating prime factors we only take them once, and only the ones having the lowest exponent (the lowest powers).
GCF (123; 2,673) = 3

¹²³/_2,673 = ^{(123 ÷ 3)}/_{(2,673 ÷ 3)} = ⁴¹/₈₉₁

The fraction can also be reduced without calculating GCF; factor the numerator and denominator and cross out all the common prime factors:

¹²³/_2,673 = ^{(3 × 41)}/_{(3⁵ × 11)} = ^{((3 × 41) ÷ 3)}/_{((3⁵ × 11) ÷ 3)} = ⁴¹/₈₉₁

The fraction: ¹¹¹/_2,674

¹¹¹/_2,674 is already reduced to the lowest terms.

The numerator and denominator have no common prime factors:

111 = 3 × 37
2,674 = 2 × 7 × 191
GCF (111; 2,674) = 1

To compare and sort the fractions, make their numerators the same.

To make the fractions' numerators the same - we have to:

1) calculate their common numerator
2) calculate the expanding number of each fraction
3) expand the fractions to equivalent forms having equal numerators

Calculate the common numerator

The common numerator is nothing else than the least common multiple (LCM) of the numerators of the fractions.

To calculate the LCM, we need the prime factorization of the numerators:

41 is a prime number.

111 = 3 × 37

Multiply all the unique prime factors: if there are repeating prime factors we only take them once, and only the ones having the highest exponent (the highest powers).

External link » Calculate LCM, the least common multiple of numbers, online calculator

LCM (41, 111) = 3 × 37 × 41 = 4,551

Calculate the expanding number of each fraction:

Divide the LCM by the numerator of each fraction.

⁴¹/₈₉₁ ⟶ 4,551 ÷ 41 = (3 × 37 × 41) ÷ 41 = 111

¹¹¹/_2,674 ⟶ 4,551 ÷ 111 = (3 × 37 × 41) ÷ (3 × 37) = 41

Make the numerators of the fractions the same:

Expand each fraction: multiply both its numerator and denominator by its corresponding expanding number, calculated above.
This way all the fractions will have the same numerator:

⁴¹/₈₉₁ = ^{(111 × 41)}/_{(111 × 891)} = ^4,551/_98,901

¹¹¹/_2,674 = ^{(41 × 111)}/_{(41 × 2,674)} = ^4,551/_109,634

The fractions have the same numerator, compare their denominators.

The larger the denominator the smaller the positive fraction.

The larger the denominator the larger the negative fraction.

The fractions sorted in ascending order:
^4,551/_109,634 < ^4,551/_98,901

The initial fractions sorted in ascending order:
¹¹¹/_2,674 < ¹²³/_2,673

Sort the positive improper fractions in ascending order:
¹⁸⁴/₁₀₀, ¹⁷³/₁₂₁, ¹⁷²/₉₄, ²⁶⁸/₁₀₃, ²⁷⁹/₉₇, ²⁷⁸/₁₁₆, ²⁸⁴/₉₆, ²⁸¹/₁₂₃, ²⁷⁶/₁₁₀, ²⁹³/₂₀

Simplify the operation
Reduce (simplify) the fractions to their lowest terms equivalents:

To reduce a fraction to the lowest terms equivalent: divide both the numerator and denominator by their greatest common factor, GCF.
Internal link » Reduce (simplify) common (ordinary) fractions to the lowest terms (to their simplest form equivalent), online calculator

The fraction: ¹⁸⁴/₁₀₀

The prime factorizations of the numerator and denominator:
184 = 2³ × 23
100 = 2² × 5²
Multiply all the common prime factors: if there are repeating prime factors we only take them once, and only the ones having the lowest exponent (the lowest powers).
GCF (184; 100) = 2² = 4

¹⁸⁴/₁₀₀ = ^{(184 ÷ 4)}/_{(100 ÷ 4)} = ⁴⁶/₂₅

The fraction can also be reduced without calculating GCF; factor the numerator and denominator and cross out all the common prime factors:

¹⁸⁴/₁₀₀ = ^{(2³ × 23)}/_{(2² × 5²)} = ^{((2³ × 23) ÷ 2²)}/_{((2² × 5²) ÷ 2²)} = ⁴⁶/₂₅

The fraction: ¹⁷³/₁₂₁

¹⁷³/₁₂₁ is already reduced to the lowest terms.

The numerator and denominator have no common prime factors:

173 is a prime number.
121 = 11²
GCF (173; 121) = 1

The fraction: ¹⁷²/₉₄

172 = 2² × 43
94 = 2 × 47
GCF (172; 94) = 2

¹⁷²/₉₄ = ^{(172 ÷ 2)}/_{(94 ÷ 2)} = ⁸⁶/₄₇

The fraction can also be reduced without calculating GCF; factor the numerator and denominator and cross out all the common prime factors:

¹⁷²/₉₄ = ^{(2² × 43)}/_{(2 × 47)} = ^{((2² × 43) ÷ 2)}/_{((2 × 47) ÷ 2)} = ⁸⁶/₄₇

The fraction: ²⁶⁸/₁₀₃

²⁶⁸/₁₀₃ is already reduced to the lowest terms.

The numerator and denominator have no common prime factors:

268 = 2² × 67
103 is a prime number.
GCF (268; 103) = 1

The fraction: ²⁷⁹/₉₇

²⁷⁹/₉₇ is already reduced to the lowest terms.

The numerator and denominator have no common prime factors:

279 = 3² × 31
97 is a prime number.
GCF (279; 97) = 1

The fraction: ²⁷⁸/₁₁₆

278 = 2 × 139
116 = 2² × 29
GCF (278; 116) = 2

²⁷⁸/₁₁₆ = ^{(278 ÷ 2)}/_{(116 ÷ 2)} = ¹³⁹/₅₈

The fraction can also be reduced without calculating GCF; factor the numerator and denominator and cross out all the common prime factors:

²⁷⁸/₁₁₆ = ^{(2 × 139)}/_{(2² × 29)} = ^{((2 × 139) ÷ 2)}/_{((2² × 29) ÷ 2)} = ¹³⁹/₅₈

The fraction: ²⁸⁴/₉₆

284 = 2² × 71
96 = 2⁵ × 3
GCF (284; 96) = 2² = 4

²⁸⁴/₉₆ = ^{(284 ÷ 4)}/_{(96 ÷ 4)} = ⁷¹/₂₄

The fraction can also be reduced without calculating GCF; factor the numerator and denominator and cross out all the common prime factors:

²⁸⁴/₉₆ = ^{(2² × 71)}/_{(2⁵ × 3)} = ^{((2² × 71) ÷ 2²)}/_{((2⁵ × 3) ÷ 2²)} = ⁷¹/₂₄

The fraction: ²⁸¹/₁₂₃

²⁸¹/₁₂₃ is already reduced to the lowest terms.

The numerator and denominator have no common prime factors:

281 is a prime number.
123 = 3 × 41
GCF (281; 123) = 1

The fraction: ²⁷⁶/₁₁₀

276 = 2² × 3 × 23
110 = 2 × 5 × 11
GCF (276; 110) = 2

²⁷⁶/₁₁₀ = ^{(276 ÷ 2)}/_{(110 ÷ 2)} = ¹³⁸/₅₅

The fraction can also be reduced without calculating GCF; factor the numerator and denominator and cross out all the common prime factors:

²⁷⁶/₁₁₀ = ^{(2² × 3 × 23)}/_{(2 × 5 × 11)} = ^{((2² × 3 × 23) ÷ 2)}/_{((2 × 5 × 11) ÷ 2)} = ¹³⁸/₅₅

The fraction: ²⁹³/₂₀

²⁹³/₂₀ is already reduced to the lowest terms.

The numerator and denominator have no common prime factors:

293 is a prime number.
20 = 2² × 5
GCF (293; 20) = 1

To compare and sort the fractions, make their denominators the same.

To make the fractions' denominators the same - we have to:

1) calculate their common denominator
2) then calculate the expanding number of each fraction
3) expand the fractions to equivalent forms having the same denominator

Calculate the common denominator

The common denominator is nothing else than the least common multiple (LCM) of the denominators of the fractions.

To calculate the LCM, we need the prime factorization of the denominators:

25 = 5²

121 = 11²

47 is a prime number.

103 is a prime number.

97 is a prime number.

58 = 2 × 29

24 = 2³ × 3

123 = 3 × 41

55 = 5 × 11

20 = 2² × 5

Multiply all the unique prime factors: if there are repeating prime factors we only take them once, and only the ones having the highest exponent (the highest powers).

External link » Calculate LCM, the least common multiple of numbers, online calculator

LCM (25, 121, 47, 103, 97, 58, 24, 123, 55, 20) = 2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103 = 40,534,544,047,800

Calculate the expanding number of each fraction:

Divide the LCM by the denominator of each fraction.

⁴⁶/₂₅ ⟶ 40,534,544,047,800 ÷ 25 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ 5² = 1,621,381,761,912

¹⁷³/₁₂₁ ⟶ 40,534,544,047,800 ÷ 121 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ 11² = 334,996,231,800

⁸⁶/₄₇ ⟶ 40,534,544,047,800 ÷ 47 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ 47 = 862,437,107,400

²⁶⁸/₁₀₃ ⟶ 40,534,544,047,800 ÷ 103 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ 103 = 393,539,262,600

²⁷⁹/₉₇ ⟶ 40,534,544,047,800 ÷ 97 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ 97 = 417,881,897,400

¹³⁹/₅₈ ⟶ 40,534,544,047,800 ÷ 58 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ (2 × 29) = 698,871,449,100

⁷¹/₂₄ ⟶ 40,534,544,047,800 ÷ 24 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ (2³ × 3) = 1,688,939,335,325

²⁸¹/₁₂₃ ⟶ 40,534,544,047,800 ÷ 123 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ (3 × 41) = 329,549,138,600

¹³⁸/₅₅ ⟶ 40,534,544,047,800 ÷ 55 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ (5 × 11) = 736,991,709,960

²⁹³/₂₀ ⟶ 40,534,544,047,800 ÷ 20 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ (2² × 5) = 2,026,727,202,390

Make the denominators of the fractions the same:

Expand each fraction: multiply both its numerator and denominator by its corresponding expanding number, calculated above.
This way all the fractions will have the same denominator:

⁴⁶/₂₅ = ^{(1,621,381,761,912 × 46)}/_{(1,621,381,761,912 × 25)} = ^{74,583,561,047,952}/_{40,534,544,047,800}

¹⁷³/₁₂₁ = ^{(334,996,231,800 × 173)}/_{(334,996,231,800 × 121)} = ^{57,954,348,101,400}/_{40,534,544,047,800}

⁸⁶/₄₇ = ^{(862,437,107,400 × 86)}/_{(862,437,107,400 × 47)} = ^{74,169,591,236,400}/_{40,534,544,047,800}

²⁶⁸/₁₀₃ = ^{(393,539,262,600 × 268)}/_{(393,539,262,600 × 103)} = ^{105,468,522,376,800}/_{40,534,544,047,800}

²⁷⁹/₉₇ = ^{(417,881,897,400 × 279)}/_{(417,881,897,400 × 97)} = ^{116,589,049,374,600}/_{40,534,544,047,800}

¹³⁹/₅₈ = ^{(698,871,449,100 × 139)}/_{(698,871,449,100 × 58)} = ^{97,143,131,424,900}/_{40,534,544,047,800}

⁷¹/₂₄ = ^{(1,688,939,335,325 × 71)}/_{(1,688,939,335,325 × 24)} = ^{119,914,692,808,075}/_{40,534,544,047,800}

²⁸¹/₁₂₃ = ^{(329,549,138,600 × 281)}/_{(329,549,138,600 × 123)} = ^{92,603,307,946,600}/_{40,534,544,047,800}

¹³⁸/₅₅ = ^{(736,991,709,960 × 138)}/_{(736,991,709,960 × 55)} = ^{101,704,855,974,480}/_{40,534,544,047,800}

²⁹³/₂₀ = ^{(2,026,727,202,390 × 293)}/_{(2,026,727,202,390 × 20)} = ^{593,831,070,300,270}/_{40,534,544,047,800}

The fractions have the same denominator, compare their numerators.

The larger the numerator the larger the positive fraction.

The larger the numerator the smaller the negative fraction.

The fractions sorted in ascending order:
^{57,954,348,101,400}/_{40,534,544,047,800} < ^{74,169,591,236,400}/_{40,534,544,047,800} < ^{74,583,561,047,952}/_{40,534,544,047,800} < ^{92,603,307,946,600}/_{40,534,544,047,800} < ^{97,143,131,424,900}/_{40,534,544,047,800} < ^{101,704,855,974,480}/_{40,534,544,047,800} < ^{105,468,522,376,800}/_{40,534,544,047,800} < ^{116,589,049,374,600}/_{40,534,544,047,800} < ^{119,914,692,808,075}/_{40,534,544,047,800} < ^{593,831,070,300,270}/_{40,534,544,047,800}

The initial fractions sorted in ascending order:
¹⁷³/₁₂₁ < ¹⁷²/₉₄ < ¹⁸⁴/₁₀₀ < ²⁸¹/₁₂₃ < ²⁷⁸/₁₁₆ < ²⁷⁶/₁₁₀ < ²⁶⁸/₁₀₃ < ²⁷⁹/₉₇ < ²⁸⁴/₉₆ < ²⁹³/₂₀

::: The operation of comparing fractions :::
The final answer:

Sort the positive proper fractions in ascending order:
¹¹¹/_2,674 < ¹²³/_2,673

Sort the positive improper fractions in ascending order:
¹⁷³/₁₂₁ < ¹⁷²/₉₄ < ¹⁸⁴/₁₀₀ < ²⁸¹/₁₂₃ < ²⁷⁸/₁₁₆ < ²⁷⁶/₁₁₀ < ²⁶⁸/₁₀₃ < ²⁷⁹/₉₇ < ²⁸⁴/₉₆ < ²⁹³/₂₀

All the fractions sorted in ascending order:
¹¹¹/_2,674 < ¹²³/_2,673 < ¹⁷³/₁₂₁ < ¹⁷²/₉₄ < ¹⁸⁴/₁₀₀ < ²⁸¹/₁₂₃ < ²⁷⁸/₁₁₆ < ²⁷⁶/₁₁₀ < ²⁶⁸/₁₀₃ < ²⁷⁹/₉₇ < ²⁸⁴/₉₆ < ²⁹³/₂₀

How are the numbers written: comma ',' used as a thousands separator; point '.' as a decimal separator; numbers rounded off to max. 12 decimals (if the case). Used symbols: '/' the fraction bar; ÷ dividing; × multiplying; + plus (adding); - minus (subtracting); = equal; ≈ approximately equal.

Other similar operations

Compare and sort the fractions in ascending order:
¹³¹/_2,685, ¹¹⁹/_2,685, ¹⁹¹/₁₀₈, ¹⁸³/₁₂₇, ¹⁸²/₁₀₂, ²⁷⁴/₁₀₆, ²⁸⁴/₁₀₀, ²⁹⁰/₁₂₂, ²⁹⁴/₁₀₂, ²⁹⁰/₁₃₀, ²⁸⁷/₁₁₆, ³⁰²/₂₅

» New. All the Calculations Performed by Our Visitors: Common Fractions Compared and Sorted. Data organized on a Monthly Basis

Compare and sort common fractions, online calculator:

Tutoring: Comparing ordinary fractions

How to compare two fractions?

1. Fractions that have different signs:

Any positive fraction is larger than any negative fraction:
ie: ⁴/₂₅ > - ¹⁹/₂

2. A proper and an improper fraction:

Any positive improper fraction is larger than any positive proper fraction:
ie: ⁴⁴/₂₅ > 1 > ¹⁹/₂₀₀
Any negative improper fraction is smaller than any negative proper fraction:
ie: - ⁴⁴/₂₅ < -1 < - ¹⁹/₂₀₀

3. Fractions that have both like numerators and denominators:

The fractions are equal:
ie: ⁸⁹/₅₀ = ⁸⁹/₅₀

4. Fractions that have unlike (different) numerators but like (equal) denominators.

Positive fractions: compare the numerators, the larger fraction is the one with the larger numerator:
ie: ²⁴/₂₅ > ¹⁹/₂₅
Negative fractions: compare the numerators, the larger fraction is the one with the smaller numerator:
ie: - ¹⁹/₂₅ < - ¹⁷/₂₅

5. Fractions that have unlike (different) denominators but like (equal) numerators.

Positive fractions: compare the denominators, the larger fraction is the one with the smaller denominator:
ie: ²⁴/₂₅ > ²⁴/₂₆
Negative fractions: compare the denominators, the larger fraction is the one with the larger denominator:
ie: - ¹⁷/₂₅ < - ¹⁷/₂₉

6. Fractions that have different denominators and numerators (unlike denominators and numerators).

To compare them, fractions should be built up to the same denominator (or if it's easier, to the same numerator).
Read the rest of this article, here: How to compare and sort two fractions with unlike (different) denominators (and different numerators)

Sort the Common Fractions String 123/2,673, 111/2,674, 184/100, 173/121, 172/94, 268/103, 279/97, 278/116, 284/96, 281/123, 276/110, 293/20 in Ascending Order. Online Calculator

Multiple fractions 123/2,673, 111/2,674, 184/100, 173/121, 172/94, 268/103, 279/97, 278/116, 284/96, 281/123, 276/110, 293/20 compared and then sorted in ascending order

To compare and sort multiple fractions, they should either have the same denominator or the same numerator.

The operation of sorting fractions in ascending order: 123/2,673, 111/2,674, 184/100, 173/121, 172/94, 268/103, 279/97, 278/116, 284/96, 281/123, 276/110, 293/20

Analyze the fractions to be compared and ordered, by category:

positive proper fractions: 123/2,673, 111/2,674

positive improper fractions: 184/100, 173/121, 172/94, 268/103, 279/97, 278/116, 284/96, 281/123, 276/110, 293/20

How to compare and sort the fractions in ascending order, by categories:

- any positive proper fraction is smaller than...

- any positive improper fraction.

How do we compare and sort all the fractions?

It is clear that there is no point in comparing fractions from different categories.

We will compare and sort the fractions in each of the above categories, separately.

Sort the positive proper fractions in ascending order: 123/2,673 and 111/2,674

Simplify the operation Reduce (simplify) the fractions to their lowest terms equivalents:

Internal link » Reduce (simplify) common (ordinary) fractions to the lowest terms (to their simplest form equivalent), online calculator

The fraction: 123/2,673

123/2,673 = (123 ÷ 3)/(2,673 ÷ 3) = 41/891

123/2,673 = (3 × 41)/(35 × 11) = ((3 × 41) ÷ 3)/((35 × 11) ÷ 3) = 41/891

The fraction: 111/2,674

111/2,674 is already reduced to the lowest terms.

The numerator and denominator have no common prime factors:

To compare and sort the fractions, make their numerators the same.

To make the fractions' numerators the same - we have to:

Calculate the common numerator

To calculate the LCM, we need the prime factorization of the numerators:

41 is a prime number.

111 = 3 × 37

External link » Calculate LCM, the least common multiple of numbers, online calculator

LCM (41, 111) = 3 × 37 × 41 = 4,551

Calculate the expanding number of each fraction:

Divide the LCM by the numerator of each fraction.

41/891 ⟶ 4,551 ÷ 41 = (3 × 37 × 41) ÷ 41 = 111

111/2,674 ⟶ 4,551 ÷ 111 = (3 × 37 × 41) ÷ (3 × 37) = 41

Make the numerators of the fractions the same:

41/891 = (111 × 41)/(111 × 891) = 4,551/98,901

111/2,674 = (41 × 111)/(41 × 2,674) = 4,551/109,634

The fractions have the same numerator, compare their denominators.

The larger the denominator the smaller the positive fraction.

The larger the denominator the larger the negative fraction.

The fractions sorted in ascending order: 4,551/109,634 < 4,551/98,901 The initial fractions sorted in ascending order: 111/2,674 < 123/2,673

Sort the positive improper fractions in ascending order: 184/100, 173/121, 172/94, 268/103, 279/97, 278/116, 284/96, 281/123, 276/110, 293/20

Simplify the operation Reduce (simplify) the fractions to their lowest terms equivalents:

Internal link » Reduce (simplify) common (ordinary) fractions to the lowest terms (to their simplest form equivalent), online calculator

The fraction: 184/100

184/100 = (184 ÷ 4)/(100 ÷ 4) = 46/25

184/100 = (23 × 23)/(22 × 52) = ((23 × 23) ÷ 22)/((22 × 52) ÷ 22) = 46/25

The fraction: 173/121

173/121 is already reduced to the lowest terms.

The numerator and denominator have no common prime factors:

The fraction: 172/94

172/94 = (172 ÷ 2)/(94 ÷ 2) = 86/47

172/94 = (22 × 43)/(2 × 47) = ((22 × 43) ÷ 2)/((2 × 47) ÷ 2) = 86/47

The fraction: 268/103

268/103 is already reduced to the lowest terms.

The numerator and denominator have no common prime factors:

The fraction: 279/97

279/97 is already reduced to the lowest terms.

The numerator and denominator have no common prime factors:

The fraction: 278/116

278/116 = (278 ÷ 2)/(116 ÷ 2) = 139/58

278/116 = (2 × 139)/(22 × 29) = ((2 × 139) ÷ 2)/((22 × 29) ÷ 2) = 139/58

The fraction: 284/96

284/96 = (284 ÷ 4)/(96 ÷ 4) = 71/24

284/96 = (22 × 71)/(25 × 3) = ((22 × 71) ÷ 22)/((25 × 3) ÷ 22) = 71/24

The fraction: 281/123

281/123 is already reduced to the lowest terms.

The numerator and denominator have no common prime factors:

The fraction: 276/110

276/110 = (276 ÷ 2)/(110 ÷ 2) = 138/55

276/110 = (22 × 3 × 23)/(2 × 5 × 11) = ((22 × 3 × 23) ÷ 2)/((2 × 5 × 11) ÷ 2) = 138/55

The fraction: 293/20

293/20 is already reduced to the lowest terms.

The numerator and denominator have no common prime factors:

To compare and sort the fractions, make their denominators the same.

To make the fractions' denominators the same - we have to:

Calculate the common denominator

To calculate the LCM, we need the prime factorization of the denominators:

25 = 52

121 = 112

Sort the Common Fractions String ¹²³/_2,673, ¹¹¹/_2,674, ¹⁸⁴/₁₀₀, ¹⁷³/₁₂₁, ¹⁷²/₉₄, ²⁶⁸/₁₀₃, ²⁷⁹/₉₇, ²⁷⁸/₁₁₆, ²⁸⁴/₉₆, ²⁸¹/₁₂₃, ²⁷⁶/₁₁₀, ²⁹³/₂₀ in Ascending Order. Online Calculator

Multiple fractions ¹²³/_2,673, ¹¹¹/_2,674, ¹⁸⁴/₁₀₀, ¹⁷³/₁₂₁, ¹⁷²/₉₄, ²⁶⁸/₁₀₃, ²⁷⁹/₉₇, ²⁷⁸/₁₁₆, ²⁸⁴/₉₆, ²⁸¹/₁₂₃, ²⁷⁶/₁₁₀, ²⁹³/₂₀ compared and then sorted in ascending order

The operation of sorting fractions in ascending order:
¹²³/_2,673, ¹¹¹/_2,674, ¹⁸⁴/₁₀₀, ¹⁷³/₁₂₁, ¹⁷²/₉₄, ²⁶⁸/₁₀₃, ²⁷⁹/₉₇, ²⁷⁸/₁₁₆, ²⁸⁴/₉₆, ²⁸¹/₁₂₃, ²⁷⁶/₁₁₀, ²⁹³/₂₀

positive proper fractions: ¹²³/_2,673, ¹¹¹/_2,674

positive improper fractions: ¹⁸⁴/₁₀₀, ¹⁷³/₁₂₁, ¹⁷²/₉₄, ²⁶⁸/₁₀₃, ²⁷⁹/₉₇, ²⁷⁸/₁₁₆, ²⁸⁴/₉₆, ²⁸¹/₁₂₃, ²⁷⁶/₁₁₀, ²⁹³/₂₀

Sort the positive proper fractions in ascending order:
¹²³/_2,673 and ¹¹¹/_2,674

Simplify the operation
Reduce (simplify) the fractions to their lowest terms equivalents:

The fraction: ¹²³/_2,673

¹²³/_2,673 = ^{(123 ÷ 3)}/_{(2,673 ÷ 3)} = ⁴¹/₈₉₁

¹²³/_2,673 = ^{(3 × 41)}/_{(3⁵ × 11)} = ^{((3 × 41) ÷ 3)}/_{((3⁵ × 11) ÷ 3)} = ⁴¹/₈₉₁

The fraction: ¹¹¹/_2,674

¹¹¹/_2,674 is already reduced to the lowest terms.

⁴¹/₈₉₁ ⟶ 4,551 ÷ 41 = (3 × 37 × 41) ÷ 41 = 111

¹¹¹/_2,674 ⟶ 4,551 ÷ 111 = (3 × 37 × 41) ÷ (3 × 37) = 41

⁴¹/₈₉₁ = ^{(111 × 41)}/_{(111 × 891)} = ^4,551/_98,901

¹¹¹/_2,674 = ^{(41 × 111)}/_{(41 × 2,674)} = ^4,551/_109,634

The fractions sorted in ascending order:
^4,551/_109,634 < ^4,551/_98,901

The initial fractions sorted in ascending order:
¹¹¹/_2,674 < ¹²³/_2,673

Sort the positive improper fractions in ascending order:
¹⁸⁴/₁₀₀, ¹⁷³/₁₂₁, ¹⁷²/₉₄, ²⁶⁸/₁₀₃, ²⁷⁹/₉₇, ²⁷⁸/₁₁₆, ²⁸⁴/₉₆, ²⁸¹/₁₂₃, ²⁷⁶/₁₁₀, ²⁹³/₂₀

Simplify the operation
Reduce (simplify) the fractions to their lowest terms equivalents:

The fraction: ¹⁸⁴/₁₀₀

¹⁸⁴/₁₀₀ = ^{(184 ÷ 4)}/_{(100 ÷ 4)} = ⁴⁶/₂₅

¹⁸⁴/₁₀₀ = ^{(2³ × 23)}/_{(2² × 5²)} = ^{((2³ × 23) ÷ 2²)}/_{((2² × 5²) ÷ 2²)} = ⁴⁶/₂₅

The fraction: ¹⁷³/₁₂₁

¹⁷³/₁₂₁ is already reduced to the lowest terms.

The fraction: ¹⁷²/₉₄

¹⁷²/₉₄ = ^{(172 ÷ 2)}/_{(94 ÷ 2)} = ⁸⁶/₄₇

¹⁷²/₉₄ = ^{(2² × 43)}/_{(2 × 47)} = ^{((2² × 43) ÷ 2)}/_{((2 × 47) ÷ 2)} = ⁸⁶/₄₇

The fraction: ²⁶⁸/₁₀₃

²⁶⁸/₁₀₃ is already reduced to the lowest terms.

The fraction: ²⁷⁹/₉₇

²⁷⁹/₉₇ is already reduced to the lowest terms.

The fraction: ²⁷⁸/₁₁₆

²⁷⁸/₁₁₆ = ^{(278 ÷ 2)}/_{(116 ÷ 2)} = ¹³⁹/₅₈

²⁷⁸/₁₁₆ = ^{(2 × 139)}/_{(2² × 29)} = ^{((2 × 139) ÷ 2)}/_{((2² × 29) ÷ 2)} = ¹³⁹/₅₈

The fraction: ²⁸⁴/₉₆

²⁸⁴/₉₆ = ^{(284 ÷ 4)}/_{(96 ÷ 4)} = ⁷¹/₂₄

²⁸⁴/₉₆ = ^{(2² × 71)}/_{(2⁵ × 3)} = ^{((2² × 71) ÷ 2²)}/_{((2⁵ × 3) ÷ 2²)} = ⁷¹/₂₄

The fraction: ²⁸¹/₁₂₃

²⁸¹/₁₂₃ is already reduced to the lowest terms.

The fraction: ²⁷⁶/₁₁₀

²⁷⁶/₁₁₀ = ^{(276 ÷ 2)}/_{(110 ÷ 2)} = ¹³⁸/₅₅

²⁷⁶/₁₁₀ = ^{(2² × 3 × 23)}/_{(2 × 5 × 11)} = ^{((2² × 3 × 23) ÷ 2)}/_{((2 × 5 × 11) ÷ 2)} = ¹³⁸/₅₅

The fraction: ²⁹³/₂₀

²⁹³/₂₀ is already reduced to the lowest terms.

25 = 5²

121 = 11²

24 = 2³ × 3

20 = 2² × 5

LCM (25, 121, 47, 103, 97, 58, 24, 123, 55, 20) = 2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103 = 40,534,544,047,800

⁴⁶/₂₅ ⟶ 40,534,544,047,800 ÷ 25 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ 5² = 1,621,381,761,912

¹⁷³/₁₂₁ ⟶ 40,534,544,047,800 ÷ 121 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ 11² = 334,996,231,800

⁸⁶/₄₇ ⟶ 40,534,544,047,800 ÷ 47 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ 47 = 862,437,107,400

²⁶⁸/₁₀₃ ⟶ 40,534,544,047,800 ÷ 103 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ 103 = 393,539,262,600

²⁷⁹/₉₇ ⟶ 40,534,544,047,800 ÷ 97 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ 97 = 417,881,897,400

¹³⁹/₅₈ ⟶ 40,534,544,047,800 ÷ 58 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ (2 × 29) = 698,871,449,100

⁷¹/₂₄ ⟶ 40,534,544,047,800 ÷ 24 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ (2³ × 3) = 1,688,939,335,325

²⁸¹/₁₂₃ ⟶ 40,534,544,047,800 ÷ 123 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ (3 × 41) = 329,549,138,600

¹³⁸/₅₅ ⟶ 40,534,544,047,800 ÷ 55 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ (5 × 11) = 736,991,709,960

²⁹³/₂₀ ⟶ 40,534,544,047,800 ÷ 20 = (2³ × 3 × 5² × 11² × 29 × 41 × 47 × 97 × 103) ÷ (2² × 5) = 2,026,727,202,390

⁴⁶/₂₅ = ^{(1,621,381,761,912 × 46)}/_{(1,621,381,761,912 × 25)} = ^{74,583,561,047,952}/_{40,534,544,047,800}

¹⁷³/₁₂₁ = ^{(334,996,231,800 × 173)}/_{(334,996,231,800 × 121)} = ^{57,954,348,101,400}/_{40,534,544,047,800}

⁸⁶/₄₇ = ^{(862,437,107,400 × 86)}/_{(862,437,107,400 × 47)} = ^{74,169,591,236,400}/_{40,534,544,047,800}

²⁶⁸/₁₀₃ = ^{(393,539,262,600 × 268)}/_{(393,539,262,600 × 103)} = ^{105,468,522,376,800}/_{40,534,544,047,800}

²⁷⁹/₉₇ = ^{(417,881,897,400 × 279)}/_{(417,881,897,400 × 97)} = ^{116,589,049,374,600}/_{40,534,544,047,800}

¹³⁹/₅₈ = ^{(698,871,449,100 × 139)}/_{(698,871,449,100 × 58)} = ^{97,143,131,424,900}/_{40,534,544,047,800}

⁷¹/₂₄ = ^{(1,688,939,335,325 × 71)}/_{(1,688,939,335,325 × 24)} = ^{119,914,692,808,075}/_{40,534,544,047,800}

²⁸¹/₁₂₃ = ^{(329,549,138,600 × 281)}/_{(329,549,138,600 × 123)} = ^{92,603,307,946,600}/_{40,534,544,047,800}

¹³⁸/₅₅ = ^{(736,991,709,960 × 138)}/_{(736,991,709,960 × 55)} = ^{101,704,855,974,480}/_{40,534,544,047,800}

²⁹³/₂₀ = ^{(2,026,727,202,390 × 293)}/_{(2,026,727,202,390 × 20)} = ^{593,831,070,300,270}/_{40,534,544,047,800}

::: The operation of comparing fractions :::
The final answer:

Compare and sort the fractions in ascending order:
¹³¹/_2,685, ¹¹⁹/_2,685, ¹⁹¹/₁₀₈, ¹⁸³/₁₂₇, ¹⁸²/₁₀₂, ²⁷⁴/₁₀₆, ²⁸⁴/₁₀₀, ²⁹⁰/₁₂₂, ²⁹⁴/₁₀₂, ²⁹⁰/₁₃₀, ²⁸⁷/₁₁₆, ³⁰²/₂₅