Simplify each exponential expression in Exercises 23–64. (3x^4/y)^−3

Exponential rules are fundamental properties that govern the manipulation of expressions involving exponents. Key rules include the product of powers, power of a power, and negative exponent rules. For instance, a negative exponent indicates the reciprocal of the base raised to the absolute value of the exponent, which is crucial for simplifying expressions like (3x^4/y)^{-3}.

The reciprocal of a fraction is obtained by flipping the numerator and denominator. This concept is particularly important when dealing with negative exponents, as it allows for the transformation of expressions into a more manageable form. For example, applying the reciprocal to (3x^4/y)^{-3} will help simplify the expression by converting it into (y/3x^4)^{3}.

Distributing exponents involves applying the exponent to both the numerator and the denominator of a fraction. This is essential when simplifying expressions with exponents, as it allows for the separate handling of each component. In the case of (y/3x^4)^{3}, this means raising both y and 3x^4 to the power of 3, leading to a clearer and simplified result.