## Understanding (8/3)^-1

This expression represents a **negative exponent** applied to a fraction. Let's break down the concept:

### Negative Exponents

A negative exponent indicates the **reciprocal** of the base raised to the positive value of the exponent. In simpler terms, it means flipping the fraction and then applying the exponent.

### Applying the Concept to (8/3)^-1

**Flip the fraction:**The reciprocal of 8/3 is 3/8.**Apply the exponent:**(3/8)^1 = 3/8

Therefore, **(8/3)^-1 = 3/8**

### Key Takeaways

- Negative exponents represent reciprocals.
- To calculate a negative exponent, flip the base and apply the positive value of the exponent.

Understanding negative exponents allows you to simplify expressions and work with fractions more efficiently.