Converting decimals to fractions is a fundamental maths skill used in cooking, DIY, engineering, and everyday calculations. This guide teaches you the step-by-step method with plenty of examples, plus quick reference tables for common conversions.
The Basic Method
Converting a terminating decimal (one that ends) to a fraction follows a simple process:
Step 1: Write the Decimal Over 1
Start by writing your decimal as a fraction with 1 as the denominator.
Example: 0.25 = 0.25/1
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Step 2: Multiply to Remove the Decimal Point
Multiply both top and bottom by 10 for each decimal place.
0.25 has 2 decimal places, so multiply by 100:
0.25/1 × 100/100 = 25/100
Step 3: Simplify the Fraction
Divide both numerator and denominator by their greatest common divisor (GCD).
GCD of 25 and 100 is 25:
25 ÷ 25 / 100 ÷ 25 = 1/4
Worked Examples
Example 1: Convert 0.6 to a fraction
Step 1: 0.6/1
Step 2: 1 decimal place → multiply by 10 → 6/10
Step 3: GCD of 6 and 10 is 2 → 6÷2 / 10÷2 = 3/5
Example 2: Convert 0.375 to a fraction
Step 1: 0.375/1
Step 2: 3 decimal places → multiply by 1000 → 375/1000
Step 3: GCD of 375 and 1000 is 125 → 375÷125 / 1000÷125 = 3/8
Example 3: Convert 1.25 to a fraction
Step 1: Separate whole number: 1 + 0.25
Step 2: Convert 0.25: 25/100 = 1/4
Step 3: Combine: 1 1/4 or as improper fraction: 5/4
Common Decimal to Fraction Conversions
Memorise these common conversions for quick mental maths:
| Decimal | Fraction | Decimal | Fraction |
|---|---|---|---|
| 0.1 | 1/10 | 0.6 | 3/5 |
| 0.125 | 1/8 | 0.625 | 5/8 |
| 0.2 | 1/5 | 0.666... | 2/3 |
| 0.25 | 1/4 | 0.7 | 7/10 |
| 0.333... | 1/3 | 0.75 | 3/4 |
| 0.375 | 3/8 | 0.8 | 4/5 |
| 0.4 | 2/5 | 0.875 | 7/8 |
| 0.5 | 1/2 | 0.9 | 9/10 |
Converting Repeating Decimals
Repeating decimals (like 0.333... or 0.142857142857...) require a different approach.
Single Repeating Digit
For decimals where one digit repeats (like 0.333... or 0.777...):
Formula: The repeating digit goes over 9
0.333... = 3/9 = 1/3
0.777... = 7/9 = 7/9
0.111... = 1/9 = 1/9
Two Repeating Digits
For decimals where two digits repeat (like 0.272727...):
Formula: The repeating digits go over 99
0.272727... = 27/99 = 3/11
0.454545... = 45/99 = 5/11
Three Repeating Digits
Formula: The repeating digits go over 999
0.142857142857... = 142857/999999 = 1/7
Practical Applications
Cooking & Baking
Recipes often use fractions for measurements:
- 0.5 cups = 1/2 cup
- 0.25 teaspoons = 1/4 teaspoon
- 0.75 litres = 3/4 litre
DIY & Measurements
Imperial measurements frequently use fractions:
- 0.5 inches = 1/2"
- 0.375 inches = 3/8"
- 0.0625 inches = 1/16"
Money
Understanding fractions helps with percentages and discounts:
- 0.25 (25%) = 1/4 off
- 0.333... (33.3%) = 1/3 off
- 0.5 (50%) = 1/2 price
How to Simplify Fractions
Finding the GCD (Greatest Common Divisor) is key to simplifying:
Method 1: List Factors
- List all factors of the numerator
- List all factors of the denominator
- Find the largest number that appears in both lists
- Divide both by this number
Example: Simplify 24/36
Factors of 24: 1, 2, 3, 4, 6, 8, 12, 24
Factors of 36: 1, 2, 3, 4, 6, 9, 12, 18, 36
Largest common factor: 12
24 ÷ 12 / 36 ÷ 12 = 2/3
Method 2: Divide by Common Factors
Keep dividing by small primes until you can't simplify further:
Example: Simplify 48/72
Both divisible by 2: 24/36
Both divisible by 2: 12/18
Both divisible by 2: 6/9
Both divisible by 3: 2/3
- If both end in 0, divide by 10
- If both are even, divide by 2
- If both end in 0 or 5, divide by 5
- If digits sum to a multiple of 3, divide by 3
Fraction to Decimal Conversion
Going the other way is even simpler:
Method: Divide the numerator by the denominator
3/4 = 3 ÷ 4 = 0.75
5/8 = 5 ÷ 8 = 0.625
1/3 = 1 ÷ 3 = 0.333...
Eighths Reference Table
Eighths are commonly used in measurements:
| Fraction | Decimal | Percentage |
|---|---|---|
| 1/8 | 0.125 | 12.5% |
| 2/8 = 1/4 | 0.25 | 25% |
| 3/8 | 0.375 | 37.5% |
| 4/8 = 1/2 | 0.5 | 50% |
| 5/8 | 0.625 | 62.5% |
| 6/8 = 3/4 | 0.75 | 75% |
| 7/8 | 0.875 | 87.5% |
Practice Problems
Try converting these decimals to fractions (answers below):
- 0.8
- 0.15
- 0.625
- 2.75
- 0.444...
Click to reveal answers
- 0.8 = 8/10 = 4/5
- 0.15 = 15/100 = 3/20
- 0.625 = 625/1000 = 5/8
- 2.75 = 2 + 75/100 = 2 + 3/4 = 2 3/4 or 11/4
- 0.444... = 4/9 = 4/9
The Mathematics Behind Decimal-to-Fraction Conversion
Every decimal number can be expressed as a fraction because decimals are simply a way of writing fractions with denominators that are powers of 10. The number 0.75 means 75 hundredths, or 75/100. The conversion process involves three mathematical steps: expressing the decimal over the appropriate power of 10, finding the greatest common divisor (GCD) of the numerator and denominator, and dividing both by the GCD to reach the simplest form.
The GCD is found using the Euclidean algorithm, one of the oldest algorithms in mathematics (dating back to around 300 BC). For 75 and 100, the algorithm works as follows: 100 divided by 75 = 1 remainder 25, then 75 divided by 25 = 3 remainder 0. Since the remainder is 0, the GCD is 25. Dividing both 75 and 100 by 25 gives 3/4, the simplest form.
0.abc = abc / 1000, then simplify by GCD
Repeating Decimal Method:
Let x = 0.333... then 10x = 3.333... then 10x - x = 3, so 9x = 3, therefore x = 1/3
Repeating decimals require a different algebraic approach. For a single repeating digit like 0.333..., you multiply by 10 to shift the decimal point, then subtract the original equation to eliminate the repeating portion. For more complex repeating patterns like 0.142857142857... (which equals 1/7), you multiply by a higher power of 10. The number of digits in the repeating block determines which power of 10 to use: a 6-digit repeat requires multiplication by one million.
Practical Applications in the UK
Decimal-to-fraction conversions appear frequently in everyday UK life, often in contexts where you might not expect them. In cooking, British recipes frequently use fractions (a quarter teaspoon, a third of a cup) while digital kitchen scales display decimals. Converting between the two is essential when scaling recipes up or down. Imperial measurements, still widely used in UK kitchens, rely heavily on fractions — half a pint, quarter of a pound — while metric equivalents appear as decimals.
In UK construction and DIY, the coexistence of metric and imperial measurements creates constant conversion needs. Timber is sold in metric sizes (47mm x 100mm) but many tradespeople still think in imperial fractions (2 inches by 4 inches). Pipe fittings, drill bits, and fasteners often come in fractional imperial sizes (3/8 inch, 1/2 inch, 5/8 inch) that must be matched to metric measurements. Understanding that 12.7mm equals 1/2 inch (because 12.7/25.4 = 1/2) helps prevent costly ordering mistakes.
Financial contexts also rely on this conversion. UK mortgage rates are quoted as decimals (e.g., 4.75%) but understanding the fractional equivalent helps with mental arithmetic. Knowing that 4.75% is four and three-quarters percent — or that a 0.125% rate change equals one-eighth of a percentage point — makes it easier to compare products and understand how rate changes affect monthly payments. Similarly, stock market movements reported as decimal percentages become more intuitive when converted to fractions.
Frequently Asked Questions About Decimal-to-Fraction Conversion
Can All Decimals Be Converted to Fractions?
All rational decimals — those that either terminate or have a repeating pattern — can be converted to exact fractions. Terminating decimals like 0.25 convert to simple fractions (1/4). Repeating decimals like 0.166666... convert to fractions too (1/6). However, irrational numbers like pi (3.14159265...) or the square root of 2 (1.41421356...) have decimal expansions that neither terminate nor repeat, and these cannot be expressed as exact fractions. They can only be approximated, such as 22/7 for pi (which is accurate to two decimal places) or 355/113 (accurate to six decimal places).
Why Does 0.999... Equal 1?
This is one of the most counterintuitive results in mathematics, but it is provably true. Using the algebraic method: let x = 0.999..., then 10x = 9.999..., so 10x minus x = 9, meaning 9x = 9, therefore x = 1. Another way to see it: 1/3 = 0.333..., so 3 times (1/3) = 3 times 0.333... = 0.999..., but 3 times (1/3) also equals 1. The confusion arises because our intuition suggests there should be an infinitely small gap between 0.999... and 1, but in the real number system, no such gap exists. The two representations are exactly equal.
What Is the Easiest Way to Simplify Large Fractions?
The most efficient method is prime factorisation. Break both the numerator and denominator into their prime factors, then cancel common factors. For example, 84/126: 84 = 2 x 2 x 3 x 7 and 126 = 2 x 3 x 3 x 7. Cancel the common factors (2, 3, and 7) to get 2/3. For very large numbers where manual factorisation is impractical, use the Euclidean algorithm: repeatedly divide the larger number by the smaller and take the remainder until you reach zero. The last non-zero remainder is the GCD. For instance, to find the GCD of 462 and 1071: 1071 = 2 x 462 + 147, then 462 = 3 x 147 + 21, then 147 = 7 x 21 + 0. The GCD is 21, so 462/1071 simplifies to 22/51.
Fractions and Decimals in UK Education and Everyday Life
Understanding the relationship between decimals and fractions is a core component of the UK National Curriculum in mathematics. In Key Stage 2 (ages 7 to 11), pupils are expected to recognise and write decimal equivalents of common fractions, including tenths, quarters, and hundredths. By the end of Year 6, children should be able to convert fluently between fractions, decimals, and percentages. This foundation is essential for success in GCSE Mathematics, where questions frequently require converting between these representations in the context of probability, proportion, and algebra.
In everyday UK life, fractions and decimals coexist in numerous practical contexts. The UK uses decimal currency (1 pound equals 100 pence), making monetary calculations straightforward in decimal form. However, imperial measurements that remain common in British daily life rely heavily on fractions. Distances are often expressed in miles and fractions of miles, heights in feet and inches, and weights in stones and pounds. UK cooking also uses both systems: older recipes reference tablespoons and teaspoons with fractional quantities (half a teaspoon, a quarter of a pint), while newer recipes increasingly use metric measurements in decimal form (2.5ml, 0.25 litres).
In UK building and construction trades, fractions remain essential despite the formal adoption of metric measurement. Pipe fittings are commonly sold in imperial fractional sizes such as half-inch, three-quarter-inch, and one-and-a-quarter-inch. Drill bits, wood screws, and bolts may be specified in either metric decimal or imperial fractional dimensions. Timber merchants sell wood in metric lengths but often reference traditional imperial sizes for cross-sections: a piece nominally called a "two by four" actually measures approximately 47mm by 100mm. Understanding how to convert between decimal and fractional representations is therefore practically valuable for anyone undertaking DIY, home improvement, or construction work in the UK.
Practical Tips for Converting Decimals to Fractions
- Memorise the common decimal-fraction equivalents. Learning a few key conversions makes everyday calculations much faster. The most useful are: 0.25 equals one quarter, 0.5 equals one half, 0.75 equals three quarters, 0.125 equals one eighth, 0.2 equals one fifth, and 0.333 (recurring) equals one third. These appear frequently in UK cooking recipes, DIY measurements, and financial calculations. Having them memorised eliminates the need for a calculator in many practical situations.
- Use the place value method for quick conversions. The number of decimal places tells you the denominator directly. One decimal place means tenths (0.3 equals 3/10), two decimal places means hundredths (0.25 equals 25/100), and three decimal places means thousandths (0.125 equals 125/1000). Then simplify the fraction by dividing both the numerator and denominator by their greatest common divisor. This systematic approach works for any terminating decimal.
- Know how to handle recurring decimals. Recurring decimals like 0.333... (one third) and 0.666... (two thirds) cannot be expressed as exact terminating decimals. In the UK GCSE curriculum, students learn algebraic methods to convert these: let x equal the recurring decimal, multiply by the appropriate power of 10, subtract the original equation, and solve for x. For practical purposes, rounding to three decimal places is usually sufficient for most UK applications.
- Check your conversions using multiplication. After converting a decimal to a fraction, verify by dividing the numerator by the denominator. The result should equal your original decimal. For example, if you converted 0.375 to 3/8, check by calculating 3 divided by 8, which gives 0.375. This simple verification step catches errors and builds confidence in your conversion skills.
Additional Frequently Asked Questions
What is 0.375 as a fraction?
How do I convert a recurring decimal to a fraction?
Why are fractions still used in the UK instead of decimals?
James Mitchell, ACCA
Chartered Accountant & Former HMRC Advisor
James is a Chartered Certified Accountant (ACCA) specialising in UK personal taxation and financial planning. With over 12 years in practice and a background as a former HMRC compliance officer, he brings authoritative insight to complex tax topics.