(3x^3y^2)(-6y^5)

2 min read Jun 16, 2024
(3x^3y^2)(-6y^5)

Simplifying the Expression (3x^3y^2)(-6y^5)

This article will guide you through the process of simplifying the expression (3x^3y^2)(-6y^5).

Understanding the Basics

To simplify this expression, we need to understand a few key concepts:

  • Coefficients: Numbers that multiply variables are called coefficients. In our expression, 3 and -6 are the coefficients.
  • Variables: Letters representing unknown values. In our expression, x and y are the variables.
  • Exponents: Numbers that indicate how many times a variable is multiplied by itself. In our expression, 3, 2, and 5 are exponents.

Applying the Rules

To simplify the expression, we use the following rules:

  1. Multiply coefficients: Multiply the coefficients together: (3) * (-6) = -18

  2. Multiply variables with the same base: When multiplying variables with the same base, add their exponents: x^3 * x^0 = x^(3+0) = x^3

  3. Multiply variables with different bases: We keep them separate.

Simplifying the Expression

Applying these rules to our expression:

(3x^3y^2)(-6y^5) = (-18)(x^3)(y^(2+5))

Simplifying further:

(-18)(x^3)(y^7)

Therefore, the simplified form of the expression (3x^3y^2)(-6y^5) is -18x^3y^7.

Related Post