## Understanding (7/3)^-1 Without Exponents

The expression (7/3)^-1 might look intimidating, but it's actually quite simple to understand. Let's break it down:

### Negative Exponents: The Reciprocal Rule

In mathematics, a negative exponent indicates the reciprocal of the base raised to the positive value of the exponent. In simpler terms:

**x^-n = 1/x^n**

Applying this rule to our expression (7/3)^-1, we get:

**(7/3)^-1 = 1 / (7/3)^1**

### Simplifying the Expression

Since any number raised to the power of 1 is itself, we have:

**1 / (7/3)^1 = 1 / (7/3)**

To divide by a fraction, we multiply by its reciprocal:

**1 / (7/3) = 1 * (3/7)**

Finally, we perform the multiplication:

**1 * (3/7) = 3/7**

### Conclusion

Therefore, (7/3)^-1 without exponents is equal to **3/7**.