What is 1/8 as a repeating decimal?
Table of Contents
- 1 What is 1/8 as a repeating decimal?
- 2 How do you write .63 repeating as a fraction?
- 3 What is 0.36 repeating as a fraction?
- 4 Is 1 8 a terminating or repeating decimal?
- 5 What is the recurring decimal 0.123 as a fraction in its simplest form?
- 6 Is 0.3636 a terminating decimal?
- 7 What is the value of a repeating decimal that repeats forever?
- 8 How do you write a fraction that has a repeating period?
What is 1/8 as a repeating decimal?
The Decimal Expansion of All Fractions (1/d) from 1/2 through 1/70
Fraction | Exact Decimal Equivalent or Repeating Decimal Expansion |
---|---|
1 / 8 | 0.125 |
1 / 9 | 0.111111111111111111 (1/3 times 1/3) or (1/3)^2 |
1 / 10 | 0.1 |
1 / 11 | 0.090909090909090909 (Only 2 repeating digits) |
How do you write .63 repeating as a fraction?
We let 0.63 (63 being repeated) be x .
- x=0.6363…
- 100x=63.6363…
- 0.6363…= 711.
How do you know what a repeating decimal is?
Just divide the numerator by the denominator . If you end up with a remainder of 0 , then you have a terminating decimal. Otherwise, the remainders will begin to repeat after some point, and you have a repeating decimal.
What is 0.2 recurring as a fraction?
1/5
Answer: 0.2 when converted into a fraction is 1/5.
What is 0.36 repeating as a fraction?
411
The repeating decimal 0.36363636. . . is written as the fraction 411 .
Is 1 8 a terminating or repeating decimal?
Let’s look at the fraction 1/8. In decimal form it is 0.125, which is a terminating decimal.
What is 0.1 Repeating as a fraction?
0. 1 is a pure repeating bicimal with a repeating cycle of one digit, so the fraction it converts to is 1/1; in other words, 1.
Is 9.373 a repeating decimal?
The number 9.373 is not a repeating decimal. It is a terminating decimal because the decimal has a distinct ending number.
What is the recurring decimal 0.123 as a fraction in its simplest form?
1231000
The simplest exact fraction for the decimal number 0.123 is 1231000 .
Is 0.3636 a terminating decimal?
Yes, 0.363636… is a repeating decimal. It can be written as 0.
How do you convert a repeating decimal to a fraction?
Convert a Repeating Decimal to a Fraction. Create an equation such that x equals the decimal number. Count the number of decimal places, y. Create a second equation multiplying both sides of the first equation by 10 y . Subtract the second equation from the first equation. Solve for x.
How do you convert a repeating block to a fraction?
Step 1: To convert 0. 3 repeating into a fraction, begin writing this simple equation: Step 2: Notice that there is 1 digits in the repeating block (3), so multiply both sides by 1 followed by 1 zeros, i.e., by 10.
What is the value of a repeating decimal that repeats forever?
For a repeating decimal such as 1.8333… where the 3 repeats forever, enter 1.83 and since the 3 is the only one trailing decimal place that repeats, enter 1 for decimal places to repeat. The answer is 1 5/6
How do you write a fraction that has a repeating period?
Written as a decimal, after the decimal point, it has (n-1) zeros followed by a ‘1’, repeating forever. You can make ‘n’ big enough to get a reptend as long as you like. You can make one of any length. If you had some string n that was x digits long, the fraction n / (10^x – 1) would have a repeating period of x digits.