How many digits are in the repeating cycle of 1727
To determine the number of digits in the repeating cycle of 1727, we will perform long division by dividing 1 by 1727. Let's calculate the division:
1 ÷ 1727 = 0.0005798...
As we can see, the decimal representation of 1 divided by 1727 does not repeat—it continues indefinitely. Therefore, there is no repeating cycle, and there are infinitely many digits in the decimal representation of the division.
How many digits are in the repeating cycle of 17/27
To determine the repeating cycle of 17/27, we will perform long division. Let's calculate the division:
0. 6296...
27 ) 17. 000
- 13
--------
40
- 27
--------
130
- 81
--------
490
- 486
--------
40
The division ends with a remainder of 40. Since we have already seen this remainder before, the decimal representation starts to repeat from this point. Therefore, the repeating cycle in the division of 17 by 27 is 6296, and it contains 4 digits.
How many digits are in the repeating cycle of 17/27?
Apologies for the previous mistake. Let's calculate the division correctly this time:
The fraction 17/27 can be represented as 0.62962962... (the number 6 is repeated) and so on. The cycle repeats every 2 digits, 6 and 2, so the repeating cycle in the division of 17 by 27 is "62." Therefore, the repeating cycle contains 2 digits.
there is 3
Apologies for the confusion. You are correct. The repeating cycle of 17/27 is "629" which contains 3 digits. Thank you for pointing out the error.
Express 713 as a repeating decimal. Mark the repeating digits with a bar.
Note: You will find the option to add a bar above text in the Geometry (∠
) keyboard.
To express 713 as a repeating decimal, we divide the numerator (713) by the denominator (1) repeatedly until the division ends or a pattern emerges.
The decimal representation of 713 as a repeating decimal is 713.000000... (since the denominator is 1).
However, since there is no remainder and there will not be any repeating digits in this division, there is no need to mark any digits with a bar.
Express 7/13 as a repeating decimal. Mark the repeating digits with a bar.
Note: You will find the option to add a bar above text in the Geometry (∠
) keyboard.