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What is 2.66667 as a fraction?
To convert 2.66667 to a fraction, we first note that the decimal repeats, indicating a recurring decimal. To convert a recurring decimal to a fraction, we can set it as x and subtract it from 10x to eliminate the repeating decimal. This gives us 10x - x = 9x = 26.66667. Therefore, 2.66667 as a fraction is 24/9, which simplifies to 8/3.
How do you write 7.833333333 as a fraction?
7.833333333 = 7 833,333,333/1,000,000,000 or 7,833,333,333/1,000,000,000 . If the decimal part were indicated as repeating/non-terminating/goes on forever, then it would be 75/6 .
What is 0.65 recurring as a fraction?
0.65 recurring can be expressed as a fraction by recognizing that the recurring decimal 0.65 is equivalent to 65/99. To convert a recurring decimal to a fraction, we set x = 0.65 recurring and multiply by 100 to shift the decimal point: 100x = 65.6565.... Subtracting the original equation from the shifted one gives 99x = 65, which simplifies to x = 65/99. Therefore, 0.65 recurring as a fraction is 65/99.
What is 0.136 recurring as a fraction?
To convert 0.136 recurring to a fraction, we can use algebraic manipulation. Let x = 0.136136... (recurring part denoted by the bar). Multiplying by 1000 to shift the decimal three places gives 1000x = 136.136... Subtracting the original equation from this new one eliminates the recurring part, giving 999x = 136. Solving for x, we get x = 136/999, which simplifies to 8/59. Therefore, 0.136 recurring is equal to 8/59 as a fraction.
What is 66.6 recurring?
66.6 recurring, often denoted as 66.6 with a bar over the six, represents a repeating decimal where the digit 6 repeats infinitely. This can be expressed as 66.666..., with the decimal point followed by an infinite string of 6s. In fraction form, this recurring decimal is equivalent to 2/3, as the fraction 2 divided by 3 results in 0.666..., which is the same as 66.6 recurring when multiplied by 10.
What is 0.4285714286 as a fraction?
0.4285714286 = 4285714286/10000000000 = 2142857143/5000000000 which is approximately 3/7
How do you write 6.66667 as a fraction?
To write 6.66667 as a fraction, we can first recognize that it is a recurring decimal. To convert it to a fraction, we can set it as x = 6.66667 and then subtract the non-recurring part to get 10x - x = 60 - 6. This simplifies to 9x = 54, which gives x = 6. Now, we can express 6.66667 as a fraction by writing it as 6 2/3 or 20/3 in simplest form.
Which decimal fraction multiplied by itself gives 1.44?
1.2
Which gives the equivalent decimal form of the fraction 1332?
0.40625
How do you put 4.6666 in fraction form?
To convert the decimal 4.6666 to a fraction, we first note that it is a recurring decimal. To express this as a fraction, we let x = 4.6666. Multiplying x by 10 gives 10x = 46.6666. Subtracting x from 10x gives 9x = 42, and dividing by 9 gives x = 42/9 = 14/3. Therefore, 4.6666 as a fraction is 14/3.
What is 5 7 as a recurring decimal?
The fraction 5/7 as a decimal is a recurring decimal, represented as 0.714285... The bar notation is used to indicate the repeating pattern, which in this case is 714285. Therefore, the decimal form of 5/7 is 0.714285 with the digits 714285 repeating indefinitely.
Which gives the equivalent fraction form of the decimal number 0.375?
3/8
