## Understanding (p^2)^4 without Exponents

The expression (p^2)^4 might seem intimidating at first, especially if you're not comfortable working with exponents. But let's break it down step by step.

### What Does (p^2)^4 Mean?

The expression (p^2)^4 essentially means we're multiplying p^2 by itself four times:

**(p^2)^4 = p^2 * p^2 * p^2 * p^2**

### Expanding the Expression

To get rid of the exponents, we can expand each p^2:

**p^2 = p * p**

Substituting this back into our original expression:

**(p^2)^4 = (p * p) * (p * p) * (p * p) * (p * p)**

Now, we have a series of multiplications.

### Simplifying the Expression

By multiplying all the p's together, we get:

**(p^2)^4 = p * p * p * p * p * p * p * p**

Finally, we can write this as:

**(p^2)^4 = ** **p^8**

### Key Takeaway

The expression (p^2)^4, when expanded and simplified, is equivalent to **p^8**. This illustrates a fundamental rule of exponents: **when raising a power to another power, you multiply the exponents.**