Question

To find how many digits are in the repeating cycle of the fraction \( \frac{17}{27} \), we can perform long division to express it as a decimal.

When we divide 17 by 27, we note that 27 goes into 17 zero times, so we extend to \( 170 \):

1. **27 into 170** goes **6** times because \( 27 \times 6 = 162 \).
- Subtract: \( 170 - 162 = 8 \).

2. Bring down a 0 to make it \( 80 \):
- **27 into 80** goes **2** times because \( 27 \times 2 = 54 \).
- Subtract: \( 80 - 54 = 26 \).

3. Bring down a 0 to make it \( 260 \):
- **27 into 260** goes **9** times because \( 27 \times 9 = 243 \).
- Subtract: \( 260 - 243 = 17 \).

At this point, we've reached \( 17 \) again, which means the numbers will start repeating.

The decimal representation of \( \frac{17}{27} \) is \( 0.629629629...\), where \( 629 \) is the repeating sequence.

Therefore, the repeating cycle of \( \frac{17}{27} \) consists of **3 digits** (629).

**Final Answer: 3 digits**.