(4n+1)(2n+6) Box Method

3 min read Jun 16, 2024
(4n+1)(2n+6) Box Method

The Box Method for Multiplying (4n + 1)(2n + 6)

The box method is a visual and systematic way to multiply binomials, making it easier to understand and avoid errors. Here's how it works for multiplying (4n + 1)(2n + 6):

Setting up the Box

  1. Draw a 2x2 box: This represents the two terms in each binomial.

  2. Label the rows and columns: The top row represents the terms of (4n + 1) and the left column represents the terms of (2n + 6).

    4n 1
    2n
    6

Filling the Box

  1. Multiply each row and column: Multiply the terms that correspond to the intersection of each row and column.

    4n 1
    2n 8n² 2n
    6 24n 6

Combining the Terms

  1. Identify all the terms in the box: You have four terms: 8n², 2n, 24n, and 6.

  2. Combine like terms: Combine the terms with the same variable and exponent.

    • 8n² + 2n + 24n + 6
    • 8n² + 26n + 6

Therefore, (4n + 1)(2n + 6) = 8n² + 26n + 6.

Benefits of the Box Method

  • Visual Representation: The box method helps to visualize the multiplication process, making it easier to understand.
  • Organization: The box provides a structured way to organize all the terms, minimizing the chance of missing any.
  • Error Reduction: It makes it less likely to make mistakes with signs or coefficients.

The box method is a powerful tool for multiplying binomials and can be applied to any similar problem.

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