(2x^4y^5)(-3x^2y^7)

2 min read Jun 16, 2024
(2x^4y^5)(-3x^2y^7)

Multiplying Monomials: A Step-by-Step Guide

This article will guide you through the process of multiplying the monomials $(2x^4y^5)(-3x^2y^7)$.

Understanding Monomials

Monomials are algebraic expressions consisting of a single term. They are formed by multiplying constants and variables raised to non-negative integer powers. For example, $2x^4y^5$ and $-3x^2y^7$ are both monomials.

The Multiplication Process

To multiply monomials, we follow these steps:

  1. Multiply the coefficients: In our case, this is $2 \times (-3) = -6$.
  2. Multiply the variables with the same base by adding their exponents:
    • For x, we have $x^4 \times x^2 = x^{4+2} = x^6$.
    • For y, we have $y^5 \times y^7 = y^{5+7} = y^{12}$.

Final Result

Combining the results from steps 1 and 2, we get the final product:

$(2x^4y^5)(-3x^2y^7) = \boxed{-6x^6y^{12}}$

Key Points to Remember:

  • Commutative Property of Multiplication: The order of multiplication doesn't affect the result.
  • Associative Property of Multiplication: Grouping factors differently doesn't change the result.
  • Exponent Rules: When multiplying variables with the same base, we add their exponents.

By understanding these concepts, you can confidently multiply monomials and simplify complex algebraic expressions.

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