What is 3.384384384... as a Fraction?

What is 3.384384384... as a fraction?

Quick Answer

3.384 as a fraction = 1127/333

The repeating decimal 3.384384384... equals the fraction 1127/333 in simplest form.

Recurring Decimal to Fraction Calculator

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Example 1

Suppose you want to input the decimal 1.01484848...

In this case you'll have:

  • Integer part = 1
  • Non-repeating part = 01
  • Repeating part = 48

Example 2

Suppose you want to input the decimal 0.88888...

In this case you'll have:

  • Integer part = 0
  • Non-repeating part = "" (leave in blank)
  • Repeating part = 8
Ex.: 0, 7, 21, etc.
Ex.: 00, 3, 20, 8, etc. or leave in blank.
Ex.: 3, 23, 325644, etc.

Fraction Result
1127/333

Step-by-Step Solution

3.384 equals 1127333 as a fraction.

How do you turn 3.384 repeating into a fraction?

Detailed Answer:

Step 1: To convert 3.384 repeating into a fraction, begin writing this simple equation:

n = 3.384 (equation 1)

Step 2: Notice that there are 3 digits in the repeating block (384), so multiply both sides by 103 = 1000.

1000 × n = 3384.384 (equation 2)

Step 3: Now subtract equation 1 from equation 2 to cancel the repeating block (or repetend) out.

1000 × n = 3384.384
   1 × n = 3.384
 999 × n = 3381

3381999 could be the answer, but it still can be put in the simplest form, i.e., reduced.

To simplify this fraction, divide the numerator and denominator by 3 (the GCF - greatest common factor).

n = 3381999 = 3381 ÷ 3999 ÷ 3 = 1127333. So,

3.384 = 1127333 as the lowest possible fraction.

As the numerator is greater than the denominator, we have an improper fraction, so we can also express it as a mixed number, thus 1127333 is also equal to 3128333 when expressed as a mixed number.

The repeating decimal 3.384 (vinculum notation) has a repeated block length of 3. It is also represented as 3.384384384... (ellipsis notation) which equals approximately 3.384384384384384 (decimal approximation)(*).

The recurring decimal 3.384 can be written as a ratio of two integers having 1127 as the numerator and 333 as the denominator. So, it is a rational number (named after ratio). It can be shown that a number is rational if its decimal representation is repeating or terminating.

(*) At present, there is no single universally accepted notation or phrasing for repeating decimals.

Use the repeating decimal to fraction calculator or converter below to find the equivalent fraction to 3.384384384..., as well as the step-by-step solution.

Similar Decimals to Fractions Table

Nearby Repeating Decimals

Repeating Decimal Fraction
2.384... 794/333
3.0384... 5059/1665
3.0384... 5059/1665
3.384384384... 1127/333
3.1384... 10451/3330
3.2384... 5392/1665
4.384... 1460/333

Sample Conversions

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