**sixteen twenty-fourths**(16/24).

##
What fractions are equivalant to 2 3s?

**So, here are some examples:**

- 4 6 is equivalent to 2 3 because 4 x 3 = 6 x 2 = 12
- 6 9 is equivalent to 2 3 because 6 x 3 = 9 x 2 = 18
- 8 12 is equivalent to 2 3 because 8 x 3 = 12 x 2 = 24

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What is the fraction 2 over 3 as a decimal?

What is **2** **over** **3** **as a decimal**? 1.5 Answer: **3**/**2** **as a decimal** is expressed as 1.5. What …

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How do you create an equivalent fraction?

- Equivalent fractions are two fractions that are written differently but have the same size.
- The two fractions: 1 / 3 and 2 / 6 are equivalent fractions.
- We can multiply the numerator The number on the top of the fraction, above the dividing line of ‘1’ by two to get a new numerator of ‘2’.

##
What are the rules of equivalent fractions?

**Equivalent** **Fractions** **Rule**. A **rule** stating that if the numerator and denominator of a **fraction** are multiplied by the same nonzero number, the result is a **fraction** that is **equivalent** to the original **fraction**. This **rule** can be represented as: a//b = (n * a)//(n * b).

Definition of an Equivalent Fraction

An equivalent fraction for a/b is found by multiplying the numerator and denominator by a common integer (n).

Whatever you multiply the numerator (top) by, you must multiply the denominator (bottom) by the same number):

How to Find an Equivalent Fraction

We’ll start with 2 and keep increasing by 1 through 20 to find a bunch of equivalent fractions:

What are Equivalent Fractions?

Equivalent fractions are** fractions with different numbers representing the same part of a whole. ** They have different numerators and denominators, but their fractional values are the same.

How to make a fraction equivalent?

**Multiply both the numerator and denominator of a fraction by the same whole number. ** As long** as you multiply both top and bottom of the fraction by the same number, you won’t change the value of the fraction **, and you’ll create an equivalent fraction.

What is half of a fraction?

For example, think about the fraction 1/2. It means half of something. You can also say that 6/12 is half, and that 50/100 is half. They represent the same part of the whole. These equivalent fractions contain different numbers but they mean the same thing: 1/2 = 6/12 = 50/100

Addition

Unlike adding and subtracting integers such as 2 and 8, fractions require a common denominator to undergo these operations. One method for finding a common denominator involves multiplying the numerators and denominators of all of the fractions involved by the product of the denominators of each fraction.

Subtraction

Fraction subtraction is essentially the same as fraction addition. A common denominator is required for the operation to occur. Refer to the addition section as well as the equations below for clarification.

Multiplication

Multiplying fractions is fairly straightforward. Unlike adding and subtracting, it is not necessary to compute a common denominator in order to multiply fractions. Simply, the numerators and denominators of each fraction are multiplied, and the result forms a new numerator and denominator. If possible, the solution should be simplified.

Division

The process for dividing fractions is similar to that for multiplying fractions. In order to divide fractions, the fraction in the numerator is multiplied by the reciprocal of the fraction in the denominator. The reciprocal of a number a is simply

1

a

.

Simplification

It is often easier to work with simplified fractions. As such, fraction solutions are commonly expressed in their simplified forms.

220

440

for example, is more cumbersome than

1

2

. The calculator provided returns fraction inputs in both improper fraction form as well as mixed number form.

Converting between fractions and decimals

Converting from decimals to fractions is straightforward. It does, however, require the understanding that each decimal place to the right of the decimal point represents a power of 10; the first decimal place being 10 1, the second 10 2, the third 10 3, and so on.

Common Engineering Fraction to Decimal Conversions

In engineering, fractions are widely used to describe the size of components such as pipes and bolts. The most common fractional and decimal equivalents are listed below.

How to convert distance in mm to inches fraction?

Imagine you want to buy new tires for your bike, or you’re preparing a spot for your new TV. You take out your** ruler or meterstick, ** and get to measuring. But it’s in mm, or cm, or another metric unit your not exactly familiar with. So, is there an easy way to convert mm to inches fraction?

Can you convert length to inches?

You can** convert any length unit to inches, but you don’t have to remember all the formulas by heart – just use our inches to ** **fraction calculator, and ** choose one of the most common length units.