In Exercises 53–58, simplify each expression using the power rule. (x⁶)¹⁰

The power rule is a fundamental property of exponents that states when raising a power to another power, you multiply the exponents. Mathematically, this is expressed as (a^m)^n = a^(m*n), where 'a' is the base, 'm' is the exponent of the first power, and 'n' is the exponent of the second power. This rule simplifies expressions involving exponents significantly.

Exponential notation is a way to represent repeated multiplication of a number by itself. For example, x^n means x is multiplied by itself n times. Understanding this notation is crucial for manipulating expressions with exponents, as it allows for concise representation and simplification of large products.

Simplification of expressions involves reducing an expression to its simplest form, making it easier to work with. This often includes combining like terms, applying the power rule, and reducing fractions. Mastering simplification techniques is essential for solving algebraic problems efficiently and accurately.