Asked by dee

To determine which of the fractions are equivalent to 35, we can express each fraction in decimal form or cross-multiply to compare them with 35.

1. **35 as a fraction**:
- 35 can be expressed as \( \frac{35}{1} \).

Now let's analyze each option:

1. **\( \frac{1220}{208} \)**
- Simplifying: \( \frac{1220 \div 208}{208 \div 208} = \frac{35}{1} \)
- Equivalent to 35.

2. **\( \frac{108}{10} \)**
- Simplifying: \( \frac{108 \div 10.8}{10 \div 10.8} = \frac{10}{1} = 10.8 \)
- Not equivalent to 35.

3. **\( \frac{1215}{15} \)**
- Simplifying: \( \frac{1215 \div 15}{15 \div 15} = \frac{81}{1} = 81 \)
- Not equivalent to 35.

4. **\( \frac{5030}{50} \)**
- Simplifying: \( \frac{5030 \div 50.3}{50 \div 50.3} = \frac{100.6}{1} \)
- Not equivalent to 35.

5. **\( \frac{2135}{35} \)**
- Simplifying: \( \frac{2135 \div 35}{35 \div 35} = \frac{61}{1} = 61 \)
- Not equivalent to 35.

Therefore, the only fraction that is equivalent to 35 is **1220/208**.

To summarize:

- \( \frac{1220}{208} \) -> equivalent to 35
- \( \frac{108}{10} \) -> not equivalent
- \( \frac{1215}{15} \) -> not equivalent
- \( \frac{5030}{50} \) -> not equivalent
- \( \frac{2135}{35} \) -> not equivalent

Thus, there seems to be only one fraction equivalent to 35. If there were three intended to choose from, they may not have been listed correctly. Only **\( \frac{1220}{208} \)** is the fraction equivalent to 35 from the options given.