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What is 121 repeating as a fraction?
120/99
What is 0.121 repeating in a fraction?
To find the fractional form for a completely repeating fraction, the numerator will be the repeating number and the denominator will be a number of nines equal to the amount of digits in the repeating number. Reduce if possible. Example: .121121121... = 121/999 .1212121212... = 12/99 = 4/33 .66666666... = 6/9 = 2/3 Hope that helped!
What is 121 as a fraction?
-1.21 = -121/100 and reduces to: -1 21/100
What is 0.194 as a repeating fraction?
what is 0.194 as a repeating fraction
What is 1.4 repeating as a fraction?
0.14 repeating as a fraction = 14/99
What is 121 repeating as a fraction?
120/99
What is 22 divided by 121 in a fraction and decimal?
0.1818
What is 0.121 repeating in a fraction?
To find the fractional form for a completely repeating fraction, the numerator will be the repeating number and the denominator will be a number of nines equal to the amount of digits in the repeating number. Reduce if possible. Example: .121121121... = 121/999 .1212121212... = 12/99 = 4/33 .66666666... = 6/9 = 2/3 Hope that helped!
What is 121 percentage as a fraction in simplest from?
121% as a fraction in its simplest form is 121/100
What is 121 as a fraction?
-1.21 = -121/100 and reduces to: -1 21/100
What is 0.194 as a repeating fraction?
what is 0.194 as a repeating fraction
What is 0.78 repeating as a fraction?
0.78 repeating as a fraction = 78/99
What is 1.4 repeating as a fraction?
0.14 repeating as a fraction = 14/99
What is 0.15 repeating as a fraction?
If you mean: 0.151515.....repeating then as a fraction it is 5/33
What is 3.1 repeating into a fraction?
3.1 repeating, as a rational fraction is 28/9.
What is 1.49 ( 4 and 9 repeating) in a fraction?
What is 1.49 repeating (9 is repeating)
What is 53.3 repeating in fraction form?
In fraction form, 53.3 repeating can be expressed as 533/9. To convert a decimal with a repeating decimal point to a fraction, we first determine the non-repeating part of the decimal (in this case, 53), then subtract it from the entire decimal to isolate the repeating part (0.3 repeating). Next, we express the repeating part as a fraction over 9 (since there is one digit repeating). Thus, 53.3 repeating is equal to 533/9 in fraction form.
