## Understanding (n^3)^2 without Exponents

The expression (n^3)^2 might seem intimidating at first, but it's actually quite straightforward once you understand the rules of exponents.

### Breaking Down the Expression

**n^3:**This means n multiplied by itself three times: n * n * n.**(n^3)^2:**This means taking the entire result of n^3 and multiplying it by itself twice: (n * n * n) * (n * n * n).

### Simplifying with the Power of a Power Rule

The key to simplifying this expression lies in the **power of a power rule**. This rule states that when raising a power to another power, you multiply the exponents.

In our case, we have (n^3)^2. Applying the power of a power rule:

(n^3)^2 = n^(3 * 2) = n^6

### Expressing without Exponents

Finally, we can express n^6 without exponents by writing:

**n^6 = n * n * n * n * n * n**

Therefore, (n^3)^2 is equivalent to n multiplied by itself six times.