In Exercises 101–108, simplify by reducing the index of the radical. ⁴√7^2

Radical expressions involve roots, such as square roots or fourth roots. The expression ⁴√7² represents the fourth root of 7 squared. Understanding how to manipulate these expressions is crucial for simplification, as it allows us to rewrite them in a more manageable form.

The index of a radical indicates the degree of the root being taken. In the expression ⁴√7², the index is 4, meaning we are looking for a number that, when raised to the fourth power, equals 7². Reducing the index involves simplifying the expression to make calculations easier.

Properties of exponents govern how to simplify expressions involving powers. For instance, the property a^(m/n) = n√(a^m) allows us to express roots in terms of exponents. This is essential for simplifying radical expressions, as it helps in rewriting them in a form that is easier to evaluate or manipulate.