Distributive Property for Multi-Step Equations

The Distributive Property is a fundamental concept in mathematics, particularly in solving multi-step equations. It states that when multiplying a sum by a number, each term inside the parentheses must be multiplied by that number individually before performing any addition or subtraction. This property plays a crucial role in simplifying expressions and solving equations involving variables. Understanding and applying the Distributive Property effectively allows for efficient manipulation of equations, leading to accurate solutions. In multi-step equations, its application streamlines the process of isolating the variable and finding its value, serving as a cornerstone in algebraic problem-solving.