(5x^3)(4xy^2)

2 min read Jun 16, 2024
(5x^3)(4xy^2)

Simplifying the Expression: (5x^3)(4xy^2)

This expression involves multiplying two monomials. Let's break down the process of simplifying it.

Understanding Monomials

Monomials are algebraic expressions consisting of a single term, formed by the product of constants and variables raised to non-negative integer powers. In our example, both (5x^3) and (4xy^2) are monomials.

Multiplication of Monomials

To multiply monomials, we follow these steps:

  1. Multiply the coefficients: Multiply the numerical coefficients of each monomial. In our case, 5 x 4 = 20.
  2. Multiply the variables: For each variable, multiply their powers by adding their exponents.
    • x^3 * x = x^(3+1) = x^4
    • y^2 * y = y^(2+1) = y^3

Simplifying the Expression

Combining the results from the previous steps, we get:

(5x^3)(4xy^2) = 20x^4y^3

Therefore, the simplified form of the expression (5x^3)(4xy^2) is 20x^4y^3.

Related Post


Featured Posts