Fraction Calculator

Add, subtract, multiply, and divide fractions with ease Ensure that numbers and operators are pre-filled in all calculators

Fraction Calculator

Mixed Numbers Calculator

Simplify Fractions Calculator

Decimal to Fraction Calculator

Fraction to Decimal Calculator

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2. What are fractions?

Fractions are numerical quantities that are not whole numbers. They show a part of a whole. They are written in the form a / ​b, where a is the numerator and b is the denominator. Fractions point to parts of objects or measurements of quantities, hence they find their application in a vastly various amount of domains, from math and science to engineering and everyday life.

Parts of Fractions:

  • Numerator: The top number in a fraction that gives information on how many of the parts of the whole are taken under consideration. An example would be if the fraction read 3/4 of something, then the 3 represents the numerator or three parts out of four of whatever is being taken into consideration.
  • Denominator: The Denominator refers to the number at the bottom of a fraction. It tells a person the number of parts that are in the whole. In 3/4​, 4 is at the bottom and is therefore the denominator, showing that the whole is divided into four equal parts.

Properties of Fractions:

  • Proper Fractions: These are fractions where the numerator is less than the denominator, representing a quantity less than a whole. Examples include ½, ¾, ⅞.
  • Improper Fractions: These are fractions where the numerator is greater than or equal to the denominator, representing a quantity greater than or equal to a whole. Examples include 5/3, 9/8, 7/7​.
  • Mixed Numbers: A mixed number combines a whole number and a proper fraction. It is used to represent quantities that are greater than a whole but not in a single fraction form. Examples include 2 ½, 3 ¾, 4 ⅚.
  • Equivalent Fractions: Fractions that express the same value are known as equivalent fractions. They can be obtained by multiplying or dividing both numerator and denominator by the same number. Thus, ½, 2/4, 4/8 are equivalent fractions.
  • Simplifying Fractions: Simplification of fractions means to write it in the simplest form where the numerator and the denominator have no common factor other than 1. As an example, 8/12 can be simplified to 2/3 because the greatest common divisor for the numerator and the denominator is 4.
3. What are the types of fractions

Fractions can be categorized into various types based on their characteristics and how they represent parts of a whole. Understanding these types is essential for performing arithmetic operations and solving mathematical problems effectively.

Proper Fractions

A proper fraction is a fraction where the numerator is less than the denominator. This type of fraction represents a quantity that is less than one whole. Proper fractions are commonly used in everyday measurements and calculations.

Examples:

  • 1/2
  • 3/4
  • 5/8

Improper Fractions

An improper fraction is a fraction where the numerator is greater than or equal to the denominator. This type of fraction represents a quantity that is equal to or greater than one whole. Improper fractions are often converted to mixed numbers for easier interpretation.

Examples:

  • 7/4
  • 9/8
  • 12/5

Mixed Fractions

A mixed fraction, or mixed number, combines a whole number and a proper fraction. It represents a quantity that is more than one whole but includes a fractional part. Mixed fractions are useful for expressing measurements in a more understandable form.

Examples:

  • 2 ½
  • 3 ¾
  • 5 ⅓

Like Fractions

Like fractions are fractions that have the same denominator. These fractions are easy to compare, add, and subtract because the parts they represent are divided into the same number of equal parts.

Examples:

  • 1/4, 3/4, and 7/4
  • 2/5, 4/5, and 6/5

Unlike Fractions

Unlike fractions are fractions that have different denominators. To perform arithmetic operations with unlike fractions, it is often necessary to find a common denominator.

Examples:

  • 2/3 and 3/5
  • 1/2 and 2/7

Equivalent Fractions

Equivalent fractions are different fractions that represent the same value or proportion of the whole. They can be obtained by multiplying or dividing the numerator and the denominator by the same number. Simplifying fractions often involves finding their equivalent forms.

Examples:

  • 1/2, 2/4, and 4/8
  • 3/5 and 6/10

Understanding these different types of fractions is crucial for mastering fraction arithmetic and for solving a wide range of mathematical problems. Proper fractions and improper fractions are foundational concepts, while mixed fractions provide a convenient way to express quantities greater than one. Like and unlike fractions highlight the importance of common denominators in fraction operations, and equivalent fractions emphasize the concept of fraction simplification.

4. Rules for working with fractions

Working with fractions involves a set of rules that ensure accurate calculations and simplifications. These rules cover addition, subtraction, multiplication, division, and simplification of fractions. Understanding and applying these rules is essential for solving mathematical problems involving fractions.

Rule 1: Common Denominators

To add or subtract fractions, they must have a common denominator. If the fractions do not have the same denominator, you must find the least common denominator (LCD) and convert the fractions accordingly.

Steps:

  • Find the least common denominator (LCD) of the fractions.
  • Convert each fraction to an equivalent fraction with the LCD.
  • Add or subtract the numerators of the converted fractions.
  • Keep the common denominator.
  • Simplify the resulting fraction, if possible.

Rule 2: Multiply the Numerators and Denominators

To multiply fractions, multiply the numerators and the denominators.

Steps:

  • Multiply the numerators of the fractions.
  • Multiply the denominators of the fractions.
  • Simplify the resulting fraction, if possible.

Rule 3: Multiply by the Reciprocal

To divide fractions, multiply the first fraction by the reciprocal (inverse) of the second fraction.

Steps:

  • Find the reciprocal of the second fraction (swap the numerator and denominator).
  • Multiply the first fraction by the reciprocal of the second fraction.
  • Simplify the resulting fraction, if possible.

Rule 4: Divide by the Greatest Common Divisor (GCD)

To simplify a fraction, divide the numerator and the denominator by their greatest common divisor (GCD).

Steps:

  • Find the GCD of the numerator and the denominator.
  • Divide both the numerator and the denominator by the GCD.

Rule 5: Convert Between Mixed Numbers and Improper Fractions

To convert a mixed number to an improper fraction, multiply the whole number by the denominator, add the numerator, and write the result over the original denominator. To convert an improper fraction to a mixed number, divide the numerator by the denominator to get the whole number and the remainder. Write the remainder over the original denominator.

Understanding and applying these rules will help you work with fractions efficiently and accurately in various mathematical contexts.

5. How to Add Fractions

Adding fractions involves combining parts of a whole. The process varies slightly depending on whether the fractions have the same denominator (like fractions) or different denominators (unlike fractions). Understanding these methods is crucial for accurate fraction addition.

Adding Fractions with the Same Denominator

When fractions have the same denominator, adding them is straightforward because the parts are already divided into equal sections.

Steps:

  • Add the numerators.
  • Keep the denominator the same.
  • Simplify the fraction, if necessary.

Adding Fractions with Different Denominators

When fractions have different denominators, you need to find a common denominator before adding them. This common denominator should be the least common multiple (LCM) of the original denominators.

Steps:

  • Find the least common denominator (LCD) of the fractions.
  • Convert each fraction to an equivalent fraction with the LCD.
  • Add the numerators of the converted fractions.
  • Keep the common denominator.
  • Simplify the resulting fraction, if possible.

Adding Mixed Numbers

When adding mixed numbers, you can either convert them to improper fractions or add the whole numbers and fractions separately.

Steps:

  • Add the whole numbers.
  • Add the fractions separately, using the methods above.
  • If the fractional sum exceeds a whole, convert and combine.
6. How to Subtract Fractions?

Subtracting fractions involves a process similar to adding fractions. The approach varies depending on whether the fractions have the same denominator (like fractions) or different denominators (unlike fractions). Mastering these methods is crucial for the accurate subtraction of fractions.

Subtracting Fractions with the Same Denominator

When fractions have the same denominator, subtracting them is straightforward because the parts are already divided into equal sections.

Steps:

  • Subtract the numerators.
  • Keep the denominator the same.
  • Simplify the fraction, if necessary.

Subtracting Fractions with Different Denominators

When fractions have different denominators, you need to find a common denominator before subtracting them. This common denominator should be the least common multiple (LCM) of the original denominators.

Steps:

  • Find the least common denominator (LCD) of the fractions.
  • Convert each fraction to an equivalent fraction with the LCD.
  • Subtract the numerators of the converted fractions.
  • Keep the common denominator.
  • Simplify the resulting fraction, if possible.

Subtracting Mixed Numbers

When subtracting mixed numbers, you can either convert them to improper fractions or subtract the whole numbers and fractions separately.

Steps:

  • Subtract the whole numbers.
  • Subtract the fractions separately, using the methods above.
  • If the fractional part of the minuend is smaller than the fractional part of the subtrahend, borrow 1 from the whole number.
7. How to multiply fractions

Multiplying fractions is a straightforward process that involves multiplying the numerators and denominators of the fractions. This operation does not require a common denominator, making it simpler than addition or subtraction of fractions.

Steps to Multiply Fractions

  • Multiply the Numerators: Multiply the numerators (top numbers) of the fractions to get the numerator of the product.
  • Multiply the Denominators: Multiply the denominators (bottom numbers) of the fractions to get the denominator of the product.
  • Simplify the Fraction: Simplify the resulting fraction if possible by dividing the numerator and the denominator by their greatest common divisor (GCD).

Example 1:

2/3 × 4/5

Multiply the Numerators: 2 × 4 = 8

Multiply the Denominators: 3 × 5 = 15

Result: 2/3 × 4/5 = 8/15

The fraction 8/15 is already in its simplest form.

Multiplying Mixed Numbers

To multiply mixed numbers, first convert them to improper fractions and then follow the steps for multiplying fractions.

Multiplying by Whole Numbers

To multiply a fraction by a whole number, convert the whole number to a fraction by putting it over 1, then multiply as usual.

Understanding these steps allows you to multiply fractions accurately, whether dealing with proper fractions, mixed numbers, or whole numbers.

8. How to divide fractions

Dividing fractions involves a simple process that requires multiplying by the reciprocal (or multiplicative inverse) of the second fraction. This method ensures accurate results and is straightforward once understood.

Steps to Divide Fractions

  • Find the Reciprocal of the Second Fraction: The reciprocal of a fraction is obtained by swapping its numerator and denominator.
  • Multiply the First Fraction by the Reciprocal: Follow the steps for multiplying fractions.
  • Simplify the Resulting Fraction: Simplify the fraction if possible by dividing the numerator and the denominator by their greatest common divisor (GCD).

Example 1:

3/4 ÷ 2/5

Find the Reciprocal of the Second Fraction: The reciprocal of 2/5 is 5/2.

Multiply the First Fraction by the Reciprocal: 3/4 × 5/2

Multiply the Numerators: 3 × 5 = 15

Multiply the Denominators: 4 × 2 = 8

Result: 3/4 × 5/2 = 15/8

Simplify if Necessary: The fraction 15/8 is already in its simplest form, or it can be converted to a mixed number: 1 7/8

Dividing Mixed Numbers

To divide mixed numbers, first convert them to improper fractions and then follow the steps for dividing fractions.

Dividing by Whole Numbers

To divide a fraction by a whole number, convert the whole number to a fraction by putting it over 1, then multiply by the reciprocal.

By understanding these steps, you can accurately divide fractions, whether dealing with proper fractions, mixed numbers, or whole numbers.

9. How to Use the Fraction Calculator

The Fraction Calculator is a versatile tool designed to help you easily add, subtract, multiply, and divide fractions. Here’s how you can use it for different operations:

Step-by-Step Guide

  • Select the Operation: Choose whether you want to add, subtract, multiply, or divide fractions.
  • Enter the Numerators and Denominators: For each fraction, enter the numerator (top number) and the denominator (bottom number) in the respective fields.
  • Perform the Calculation: Click on the "Calculate" button to perform the chosen operation.
  • View the Result: The result will be displayed immediately, showing the simplified fraction or mixed number if applicable.

Example: Adding Fractions

  • Select "Addition" from the operation menu.
  • Enter the first fraction:
    • Numerator: 1
    • Denominator: 4
  • Enter the second fraction:
    • Numerator: 1
    • Denominator: 2
  • Click "Calculate" to get the result: The calculator will display 1/4 + 1/2 = 3/4

Example: Subtracting Fractions

  • Select "Subtraction" from the operation menu.
  • Enter the first fraction:
    • Numerator: 3
    • Denominator: 5
  • Enter the second fraction:
    • Numerator: 1
    • Denominator: 5
  • Click "Calculate" to get the result: The calculator will display 3/5 − 1/5 = 2/5

Example: Multiplying Fractions

  • Select "Multiplication" from the operation menu.
  • Enter the first fraction:
    • Numerator: 2
    • Denominator: 3
  • Enter the second fraction:
    • Numerator: 4
    • Denominator: 5
  • Click "Calculate" to get the result: The calculator will display 2/3 × 4/5 = 8/15

Example: Dividing Fractions

  • Select "Division" from the operation menu.
  • Enter the first fraction:
    • Numerator: 7
    • Denominator: 8
  • Enter the second fraction:
    • Numerator: 2
    • Denominator: 5
  • Click "Calculate" to get the result: The calculator will display 7/8 ÷ 2/5 = 35/16 = 2 3/16
10. How to Use the Mixed Numbers Calculator

The Mixed Numbers Calculator helps you perform arithmetic operations with mixed numbers, which are numbers consisting of a whole number and a fraction. Here’s how to use it effectively:

Step-by-Step Guide:

  • Select the Operation: Choose whether to add, subtract, multiply, or divide mixed numbers.
  • Enter the Whole Numbers, Numerators, and Denominators: For each mixed number, enter the whole number, numerator (top number), and denominator (bottom number) in the respective fields.
  • Perform the Calculation: Click on the "Calculate" button to perform the chosen operation.
  • View the Result: The result will be displayed immediately, showing the simplified mixed number or improper fraction if applicable.

Example: Adding Mixed Numbers

  • Select "Addition" from the operation menu.
  • Enter the first mixed number:
    • Whole Number: 2
    • Numerator: 1
    • Denominator: 3
  • Enter the second mixed number:
    • Whole Number: 1
    • Numerator: 1
    • Denominator: 4
  • Click "Calculate" to get the result: The calculator will display 2 1/3 + 1 1/4 = 3 7/12

Example: Subtracting Mixed Numbers

  • Select "Subtraction" from the operation menu.
  • Enter the first mixed number:
    • Whole Number: 3
    • Numerator: 2
    • Denominator: 5
  • Enter the second mixed number:
    • Whole Number: 1
    • Numerator: 3
    • Denominator: 10
  • Click "Calculate" to get the result: The calculator will display 3 2/5 − 1 3/10 = 1 13/20

Example: Multiplying Mixed Numbers

  • Select "Multiplication" from the operation menu.
  • Enter the first mixed number:
    • Whole Number: 1
    • Numerator: 1
    • Denominator: 2
  • Enter the second mixed number:
    • Whole Number: 2
    • Numerator: 2
    • Denominator: 3
  • Click "Calculate" to get the result: The calculator will display 1 1/2 × 2 2/3 = 4

Example: Dividing Mixed Numbers

  • Select "Division" from the operation menu.
  • Enter the first mixed number:
    • Whole Number: 4
    • Numerator: 3
    • Denominator: 4
  • Enter the second mixed number:
    • Whole Number: 2
    • Numerator: 1
    • Denominator: 2
  • Click "Calculate" to get the result: The calculator will display 4 3/4 ÷ 2 1/2 = 1 9/10
11. How to Use the Simplify Fractions Calculator

The Simplify Fractions Calculator is designed to reduce fractions to their simplest form. Simplifying a fraction makes it easier to understand and use in calculations.

Step-by-Step Guide:

  • Enter the Numerator and Denominator: Input the numerator (top number) and the denominator (bottom number) of the fraction you want to simplify.
  • Click on "Simplify": The calculator will automatically find the greatest common divisor (GCD) of the numerator and the denominator.
  • View the Result: The calculator will display the fraction in its simplest form, showing both the original and the simplified fraction.

Example:

  • Enter the fraction:
    • Numerator: 16
    • Denominator: 24
  • Click "Simplify" to get the result: The calculator will display 16/24 simplified to 2/3.

Conclusion:

This tool is helpful for reducing fractions to their simplest form quickly and accurately.

12. How to Use the Decimal to Fraction Calculator

The Decimal to Fraction Calculator converts decimal numbers to fractions, making it easier to work with non-integer values in fractional form

Step-by-Step Guide:

  • Enter the Decimal Number: Input the decimal number you want to convert to a fraction.
  • Click on "Convert": The calculator will automatically convert the decimal to a fraction.
  • View the Result: The calculator will display the decimal as a fraction, simplified if possible.

Example:

  • Enter the decimal number:
    • Decimal: 0.75
  • Click "Convert" to get the result: The calculator will display 0.75 as 3/4.

Conclusion:

This tool is useful for converting decimals to fractions for easier manipulation and calculation.

13. How to Use the Big Number Fraction Calculator

The Big Number Fraction Calculator is designed to handle fractions with large numerators and denominators, making it easy to perform operations with big numbers.

Step-by-Step Guide:

  • Enter the Numerators and Denominators: Input the large numerators and denominators for the fractions you want to work with.
  • Select the Operation: Choose whether you want to add, subtract, multiply, or divide the fractions.
  • Click on "Calculate": The calculator will perform the chosen operation on the large numbers.
  • View the Result: The calculator will display the result, simplified if possible.

Example:

  • Enter the fractions:
    • Numerator 1: 123456789
    • Denominator 1: 987654321
    • Numerator 2: 111111111
    • Denominator 2: 222222222
  • Select "Addition" and click "Calculate" to get the result: The calculator will display the sum of the fractions.

Conclusion:

This tool is ideal for working with fractions that have very large numbers, ensuring accurate calculations.

14. Benefits of Using Our Fraction Calculators

Using our fraction calculators offers numerous advantages, making fraction calculations easier, faster, and more accurate. Here are some key benefits:

Advantages of Our Fraction Calculators:

  • Accuracy: Our calculators ensure precise calculations, eliminating the risk of manual errors.
  • Speed: Instantly perform complex fraction operations, saving you time and effort.
  • Ease of Use: User-friendly interfaces make it simple to input values and obtain results, even for those with limited mathematical knowledge.
  • Versatility: Handle various operations, including addition, subtraction, multiplication, division, simplification, and conversions, all in one place.
  • Simplification: Automatically simplify fractions to their simplest form, making them easier to understand and use.
  • Conversion: Effortlessly convert decimals to fractions and vice versa, enhancing your ability to work with different numerical formats.
  • Big Number Handling: Accurately perform operations with large numerators and denominators, ensuring no limits on the size of numbers you can work with.
  • Educational Tool: Great for learning and teaching fractions, providing step-by-step solutions and explanations.
  • Accessibility: Available online anytime, anywhere, offering a reliable tool for students, teachers, and professionals.
  • Comprehensive: All-in-one solution for all your fraction calculation needs, from basic operations to advanced conversions and simplifications.

Conclusion:

Using our fraction calculators, you can enhance your mathematical skills, improve accuracy, and streamline your workflow, whether for educational purposes, professional tasks, or everyday calculations.

Section 15: Frequently Asked Questions (FAQs)

  1. How to put a fraction in a calculator?
    To enter a fraction in a calculator, look for the fraction button, often labeled as "a b/c" or similar. Enter the numerator, press the fraction button, and then enter the denominator.
  2. Which fraction is bigger calculator?
    To compare which fraction is bigger, enter the fractions into the calculator, and it will determine the larger one by converting them to a common form or decimal equivalent.
  3. How to make a fraction on a calculator?
    To make a fraction on a calculator, use the fraction button. Enter the numerator, press the fraction button, then enter the denominator.
  4. How to do a fraction on a calculator?
    To perform operations with fractions on a calculator, enter the fractions using the fraction button and then use the standard arithmetic operations (addition, subtraction, multiplication, division).
  5. How to convert a fraction to a decimal without a calculator?
    To convert a fraction to a decimal without a calculator, divide the numerator by the denominator using long division.
  6. How do you put a fraction into a calculator?
    To put a fraction into a calculator, use the fraction button. Enter the numerator, press the fraction button, then enter the denominator.
  7. How to write a fraction on a calculator?
    Use the fraction button on the calculator to write a fraction. Enter the numerator, press the fraction button, and then enter the denominator.
  8. How to get a fraction on a calculator?
    To get a fraction on a calculator, use the fraction input feature. Enter the numerator, press the fraction button, then enter the denominator.
  9. How to put a fraction in a calculator on a computer?
    For online or computer-based calculators, look for a fraction function or input field. Enter the fraction using the numerator and denominator fields provided.
  10. How to put a fraction on a calculator?
    Press the fraction button, enter the numerator, press the fraction button again, and enter the denominator.
  11. How to turn a decimal into a fraction on a calculator ti-30x?
    For the TI-30X calculator, enter the decimal, then press the "Math" button followed by "Enter" to convert the decimal to a fraction.
  12. What is the fraction symbol on a calculator?
    The fraction symbol on a calculator is often "a b/c" or "n/d," representing the fraction input mode.
  13. Where is the fraction button on a calculator?
    The fraction button on a calculator is typically labeled as "a b/c" or "n/d" and can be found on the keypad.
  14. How to write a fraction in a calculator?
    Use the fraction button to enter the fraction. First, enter the numerator, press the fraction button, and then enter the denominator.
  15. How to make a fraction in a calculator?
    To make a fraction in a calculator, press the fraction button, enter the numerator, press the fraction button again, and then enter the denominator.
  16. How to turn a fraction into a decimal on a calculator?
    Enter the fraction using the fraction button, then press the "=" button to convert it to a decimal.
  17. How to convert a decimal to a fraction on a calculator?
    Enter the decimal, press the "Math" button (if available), and select the option to convert it to a fraction.
  18. How to put a fraction in a scientific calculator?
    Use the fraction function, often labeled "a b/c" or "n/d." Enter the numerator, press the fraction button, and enter the denominator.
  19. How to enter a fraction on a calculator?
    Press the fraction button, enter the numerator, press the fraction button again, and enter the denominator.
  20. What is the fraction sign on a calculator?
    The fraction sign on a calculator is typically "a b/c" or "n/d," indicating the fraction input mode.
  21. How to write a fraction on a calculator?
    Use the fraction button. Enter the numerator, press the fraction button, and then enter the denominator.
  22. How to use a fraction on a calculator?
    To use a fraction on a calculator, enter the numerator, press the fraction button, and then enter the denominator. Perform any arithmetic operations as needed.
  23. How to type a fraction into a calculator?
    Type the numerator, press the fraction button, and then type the denominator.
  24. How to convert a decimal to a fraction on a calculator?
    Enter the decimal, then use the calculator’s function (such as the "Math" button) to convert it to a fraction.
  25. How to make a fraction on a calculator on Google?
    For Google’s online calculator, use the fraction input method provided, usually by entering the numerator, a slash ("/"), and the denominator.
  26. How to get the Casio calculator out of fraction mode?
    To exit fraction mode on a Casio calculator, press the "MODE" button and select the desired mode, such as "COMP" for standard calculations.
  27. How to change a decimal to a fraction on a calculator ti-84?
    For the TI-84 calculator, enter the decimal, press the "MATH" button, and select the "Frac" option to convert the decimal to a fraction.
  28. What is a fraction?
    A fraction represents a part of a whole, expressed as a numerator (top number) divided by a denominator (bottom number).
  29. How to convert a decimal to a fraction?
    To convert a decimal to a fraction, write the decimal as the numerator with a denominator of a power of 10, then simplify.
  30. What is an improper fraction?
    An improper fraction is a fraction where the numerator is greater than or equal to the denominator.
  31. What fraction is equivalent to 1/3?
    Fractions equivalent to ⅓ include 2/6, 3/9, and 4/12, obtained by multiplying both the numerator and the denominator by the same number.
  32. What is 1.5 as a fraction?
    1.5 as a fraction is 3/2.
  33. How to simplify a fraction?
    To simplify a fraction, divide the numerator and the denominator by their greatest common divisor (GCD).
  34. What is an equivalent fraction?
    Equivalent fractions are fractions that represent the same value, even though they have different numerators and denominators.
  35. What is 0.25 as a fraction?
    0.25 as a fraction is 1/4.
  36. How to divide a fraction?
    To divide a fraction, multiply by the reciprocal of the divisor.
  37. What is 0.75 as a fraction?
    0.75 as a fraction is 3/4.
  38. What is 2.5 as a fraction?
    2.5 as a fraction is 5/2.
  39. What is 0.5 as a fraction?
    0.5 as a fraction is 1/2.
  40. How to multiply a fraction by a whole number?
    To multiply a fraction by a whole number, multiply the numerator by the whole number and keep the denominator the same.
  41. What is 0.4 as a fraction?
    0.4 as a fraction is 2/5.
  42. What is 0.8 as a fraction?
    0.8 as a fraction is 4/5.
  43. What is 0.375 as a fraction?
    0.375 as a fraction is 3/8.
  44. How to divide a fraction by a whole number?
    To divide a fraction by a whole number, multiply by the reciprocal of the whole number.
  45. What is 0.125 as a fraction?
    0.125 as a fraction is 1/8.
  46. What is 0.6 as a fraction?
    0.6 as a fraction is 3/5.
  47. How to square a fraction?
    To square a fraction, square the numerator and square the denominator.
  48. How to turn a fraction into a percent?
    To turn a fraction into a percent, multiply the fraction by 100.
  49. What is 0.625 as a fraction?
    0.625 as a fraction is ⅝.
  50. How do you write 50% as a fraction?
    50% as a fraction is 1/2.
  51. What is 3.5 as a fraction?
    3.5 as a fraction is 3 1/2 or 7/2.
  52. How to reduce a fraction?
    To reduce a fraction, divide the numerator and the denominator by their greatest common divisor (GCD).
  53. What fraction is equivalent to 1/2?
    Fractions equivalent to ½ include 2/4, 3/6, and 4/8, obtained by multiplying both the numerator and the denominator by the same number.
  54. What is 1.2 as a fraction?
    1.2 as a fraction is 6/5.
  55. What is 1.6 as a fraction?
    1.6 as a fraction is 1 3/5.
  56. What is 0.875 as a fraction?
    0.875 as a fraction is 7/8.
  57. What is 4.5 as a fraction?
    4.5 as a fraction is 4 ½ or 9/2.
  58. What fraction is equivalent to 3/4?
    Fractions equivalent to ¾ include 6/8, 9/12, and 12/16, obtained by multiplying both the numerator and the denominator by the same number.
  59. What is 0.75 as a fraction?
    0.75 as a fraction is 3/4.
  60. What is 0.4 as a fraction?
    0.4 as a fraction is 2/5.
  61. How to turn an improper fraction into a mixed number?
    To turn an improper fraction into a mixed number, divide the numerator by the denominator to get the whole number, and use the remainder as the new numerator over the original denominator.
  62. How do you write 0.16 as a fraction?
    0.16 as a fraction is 4/25.
  63. What is 0.7 as a fraction?
    0.7 as a fraction is 7/10.