How many digits are in the repeating cycle of 17/27 ?(1 point)
The fraction 17/27 is a repeating decimal. To determine the length of the repeating cycle, we can perform long division:
0.629629... (repeating)
--------------
27 | 17.000000...
162
------
80
81
----
-10
We obtain a remainder of 10, which means the pattern repeats after the first two digits. Therefore, the repeating cycle of 17/27 is 62.
So, there are 2 digits in the repeating cycle. Answer: \boxed{2}.