Decimal | Fraction | Percentage |
---|---|---|

8.3333 | ^{83333}/_{10000} |
833.33% |

8.3332 | ^{83332}/_{10000} |
833.32% |

8.3358 | ^{83333}/_{9997} |
833.58% |

8.33497 | ^{83333}/_{9998} |
833.497% |

Then, What is 3.83 with the 3 Repeating as a fraction?

3.833333333 as a **fraction** is **3** 5/6.

Considering this, What is 0.75 as a fraction?

Percent | Decimal | Fraction |
---|---|---|

75% | 0.75 | ^{3}/_{4} |

80% | 0.8 | ^{4}/_{5} |

90% | 0.9 | ^{9}/_{10} |

99% | 0.99 | ^{99}/_{100} |

**25 Related Questions and Answers Found ðŸ’¬**

Table of Contents

**What is repeating as a fraction?**

Remember: Infinite **repeating** decimals are usually represented by putting a line over (sometimes under) the shortest block of **repeating** decimals. Every infinite **repeating** decimal can be expressed as a **fraction**. Since 100 n and 10 n have the same fractional part, their difference is an integer.

**What is 0.16 as a fraction?**

Decimal | Fraction | Percentage |
---|---|---|

0.24 | ^{6}/_{25} |
24% |

0.2 | ^{5}/_{25} |
20% |

0.16 | ^{4}/_{25} |
16% |

0.12 | ^{3}/_{25} |
12% |

**What is 1.5 Repeating as a fraction?**

There are a couple ways to turn a **repeating** decimal into a **fraction**. Here’s the mathematical way to derive it: Our number is a whole (1) plus a decimal portion (0.55555). So our original number 1.55555 is equal to 1+59 , which is 149 .

**What is .15 repeating as a fraction?**

0.151515. in **fraction** form is 5/33.

**What is 3.75 as a fraction?**

**3.75** in **fraction** form is 15/4.

**What is 0.23 repeating as a fraction?**

Explanation: **0.23** with 3 **repeating** can be written as 0.2. 3 , where the dot on top of the 3 means a **repeating** number or pattern of numbers.

**What is 0.083 as a fraction in simplest form?**

Decimal | Fraction | Percentage |
---|---|---|

0.086 | ^{86}/_{1000} |
8.6% |

0.085 | ^{85}/_{1000} |
8.5% |

0.084 | ^{84}/_{1000} |
8.4% |

0.083 | ^{83}/_{1000} |
8.3% |

**What is 0.06 repeating as a fraction?**

Repeating Decimal | Equivalent Fraction |
---|---|

0.8888 | 8/9 |

0.0909 | 1/11 |

0.1818 | 2/11 |

0.08333 | 1/12 |

**What is .15 repeating as a fraction?**

0.151515. in **fraction** form is 5/33.

**How do you write 0.18 repeating as a fraction?**

**1 Answer**

- We first let 0.18 be x .
- Since x is recurring in 2 decimal places, we multiply it by 100.
- Lastly, we divide both sides by 99 to get x as a fraction.

**Is Pi a rational number?**

**Pi** is **an irrational number**, which means that it is a real **number** that cannot be expressed by a simple fraction. That’s because **pi** is what mathematicians call an “infinite decimal” â€” after the decimal point, the digits go on forever and ever. (These **rational** expressions are only accurate to a couple of decimal places.)

**What is .36 repeating as a fraction?**

The **repeating** decimal 0.36363636. . . is written as the **fraction** 411 .

**What is 2.083 as a fraction?**

**What is 1.3 Repeating as a fraction?**

1.33333. . . is equivalent to the **fraction** 4/3.

**What is 3.33333 as a fraction?**

**3.33333** in **fraction** form is 333333/100000.

**What is 0.24 as a fraction?**

Decimal | Fraction | Percentage |
---|---|---|

0.32 | ^{8}/_{25} |
32% |

0.28 | ^{7}/_{25} |
28% |

0.24 | ^{6}/_{25} |
24% |

0.2 | ^{5}/_{25} |
20% |

**What is .62 as a fraction?**

Decimal | Fraction | Percentage |
---|---|---|

0.66 | ^{33}/_{50} |
66% |

0.64 | ^{32}/_{50} |
64% |

0.62 | ^{31}/_{50} |
62% |

0.6 | ^{30}/_{50} |
60% |

**What is .09 repeating as a fraction?**

Since there are 2 digits in **09**, the very last digit is the “100th” decimal place. So we can just say that . **09** is the same as **09**/100.

**What is 1.88888 as a fraction?**

**1.88888**1 = (**1.88888** Ã— 100000)(1 Ã— 100000) = 188888100000. Step 3: Simplify (or reduce) the above **fraction** by dividing both numerator and denominator by the GCD (Greatest Common Divisor) between them. In this case, GCD(188888,100000) = 8.

**What is 0.06 repeating as a fraction?**

Yes zero is a **rational number**. We know that the integer **0** can be written in any one of the following forms. For example, **0**/1, **0**/-1, **0**/2, **0**/-2, **0**/3, **0**/-3, **0**/4, **0**/-4 and so on â€¦.. Thus, **0** can be written as, where a/b = **0**, where a = **0** and b is any non-zero integer.

**What is repeating as a decimal?**

Explanation: **0.23** with 3 **repeating** can be written as 0.2. 3 , where the dot on top of the 3 means a **repeating** number or pattern of numbers.

**What is 0.18 repeating as a fraction?**

We first let **0.18** be x . Since x is **recurring** in 2 decimal places, we multiply it by 100. Next, we subtract them. Lastly, we divide both sides by 99 to get x as a **fraction**.

**What is repeating as a fraction?**

Remember: Infinite **repeating** decimals are usually represented by putting a line over (sometimes under) the shortest block of **repeating** decimals. Every infinite **repeating** decimal can be expressed as a **fraction**. Since 100 n and 10 n have the same fractional part, their difference is an integer.

**What is repeating as a fraction?**

0.6 **repeating as a fraction** is equal to 2/3. In order to change a **repeating** decimal into a **fraction**, we can set the decimal equal to x and then solve

**What is .99999 repeating as a fraction?**

= 1/9 and 1/9 * 9 = 9/9 = 1. Thus, 0.9999â€¦ = 1. Part of the ‘**repeating**‘ component implies that no such **fraction** can truly exist.

**What is .11 as a fraction?**

Decimal | Fraction |
---|---|

0.88888889 | 8/9 |

0.9 | 9/10 |

1.1 | 11/10 |

1.2 | 6/5 |

**Is a repeating decimal a rational number?**

Also any **decimal number** that is **repeating** can be written in the form a/b with b not equal to zero so it is a **rational number**. **Repeating decimals** are considered **rational numbers** because they can be represented as a ratio of two integers.

**What is 0.6 Repeating as a fraction?**

**0.6 repeating as a fraction** is equal to 2/3. In order to change a **repeating** decimal into a **fraction**, we can set the decimal equal to x and then solve

**What is 0.23 repeating as a fraction?**

Decimal | Fraction |
---|---|

0.88888889 | 8/9 |

0.9 | 9/10 |

1.1 | 11/10 |

1.2 | 6/5 |

**What is 0.75 as a fraction?**

Percent | Decimal | Fraction |
---|---|---|

75% | 0.75 | ^{3}/_{4} |

80% | 0.8 | ^{4}/_{5} |

90% | 0.9 | ^{9}/_{10} |

99% | 0.99 | ^{99}/_{100} |

**What is 0.25 as a fraction?**

Explanation: **0.23** with 3 **repeating** can be written as 0.2. 3 , where the dot on top of the 3 means a **repeating** number or pattern of numbers.