Find each product. Assume all variables represent positive real numbers. (p^1/2-p^-1/2)(p^1/2+p^-1/2)

The difference of squares is a fundamental algebraic identity that states that for any two terms a and b, the expression (a - b)(a + b) equals a² - b². This identity is crucial for simplifying expressions involving binomials, particularly when one term is the square root of a variable and the other is its reciprocal.

Exponents represent repeated multiplication of a base number, while radicals are the inverse operation, indicating the root of a number. Understanding how to manipulate exponents, including negative and fractional exponents, is essential for simplifying expressions like p^1/2 and p^-1/2, which correspond to the square root and reciprocal of the square root, respectively.

Simplifying algebraic expressions involves combining like terms and applying algebraic identities to reduce expressions to their simplest form. This process is vital for solving equations and finding products, as it allows for clearer interpretation and easier calculations, especially when dealing with complex expressions involving variables and exponents.