Question

To arrange the list of numbers from least to greatest, we must first calculate the absolute values of the numbers mentioned:

1. \( | -3 | = 3 \)
2. \( | \frac{3}{2} | = 1.5 \)
3. \( | -2 | = 2 \)
4. \( | 3.5 | = 3.5 \)
5. \( -1 = -1 \)

Now, we have the following numbers:
- \( -1 \)
- \( 1.5 \) (from \( \frac{3}{2} \))
- \( 2 \) (from \( -2 \))
- \( 3 \) (from \( -3 \))
- \( 3.5 \)

Now let's order them from least to greatest:
- \( -1 \)
- \( 1.5 \)
- \( 2 \)
- \( 3 \)
- \( 3.5 \)

Thus, the correct order from least to greatest is:
**–1, StartAbsoluteValue three-halves EndAbsoluteValue, StartAbsoluteValue negative 2 EndAbsoluteValue, StartAbsoluteValue negative 3 EndAbsoluteValue, StartAbsoluteValue 3.5 EndAbsoluteValue**

However, it appears there is an error in the wording of the alternate Absolute Value numbers in the formats.
Hence, the final answer is:

**–1, StartAbsoluteValue three-halves EndAbsoluteValue, StartAbsoluteValue negative 2 EndAbsoluteValue, StartAbsoluteValue negative 3 EndAbsoluteValue, StartAbsoluteValue 3.5 EndAbsoluteValue (or alternatively understood as: -1, 1.5, 2, 3, 3.5).**