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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?
Two thirds of 100. If you divide 100 by 3 you get 33.333333 continued to an infinite amount of places. x2 gives 66.666666 to an infinite amount of places. Recurring means it just keeps going
What is 0.4285714286 as a fraction?
0.4285714286 = 4285714286/10000000000 = 2142857143/5000000000 which is approximately 3/7
What is 0.5 recurring into simplest fration?
The decimal 0.5 recurring, represented as (0.555...), can be converted into a fraction by letting (x = 0.555...). Multiplying both sides by 10 gives (10x = 5.555...). Subtracting the original equation from this yields (9x = 5), so (x = \frac{5}{9}). Thus, 0.5 recurring in simplest fraction form is (\frac{5}{9}).
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.
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.
Which decimal fraction multiplied by itself gives 1.44?
1.2
Which gives the equivalent decimal form of the fraction 1332?
0.40625
What is 5 7 as a recurring decimal?
Oh, dude, you're hitting me with some math vibes! So, 5 divided by 7 as a recurring decimal is 0.714285... You know, just keep that 714285 party going on forever. It's like a never-ending decimal dance floor, man.
