Use the Distributive Property to write an 1. \( x(x+3)= \) 3. \( (y-2) x= \) 5. \( 3 x-6= \) 7. \( y \cdot 3+z \cdot 3= \)

First additional information: The Distributive Property is a fundamental algebraic principle that allows us to simplify expressions by distributing a factor across terms in parentheses. For example, in the expression \( x(x + 3) \), you distribute \( x \) to both \( x \) and \( 3 \), resulting in \( x^2 + 3x \)! It's like giving each term a sprinkle of the factor! Second additional information: The real-world application of the Distributive Property can be seen in budgeting, where you might need to calculate costs. Imagine you need to buy \( x \) books for \( $3 \) each and \( y \) pencils for \( $2 \) each. By using the property, you could express your total cost as \( 3x + 2y \), making it easier to manage your budget. Who knew math could help save your pennies?