(9c-1)^3

2 min read Jun 16, 2024
(9c-1)^3

Expanding (9c - 1)³

This article explores the expansion of the expression (9c - 1)³.

Understanding the Problem

The expression (9c - 1)³ represents the product of (9c - 1) multiplied by itself three times:

(9c - 1)³ = (9c - 1) * (9c - 1) * (9c - 1)

Expanding the Expression

To expand this expression, we can use the distributive property and FOIL method:

  1. Expand the first two terms: (9c - 1) * (9c - 1) = 81c² - 9c - 9c + 1 = 81c² - 18c + 1

  2. Multiply the result by the third term: (81c² - 18c + 1) * (9c - 1) = 729c³ - 162c² + 9c - 81c² + 18c - 1

  3. Combine like terms: 729c³ - 243c² + 27c - 1

Final Result

Therefore, the expanded form of (9c - 1)³ is 729c³ - 243c² + 27c - 1.

Key Points

  • Distributive property: This property allows us to multiply each term within a set of parentheses by a factor outside of the parentheses.
  • FOIL method: This acronym stands for "First, Outer, Inner, Last" and helps us multiply two binomials by systematically multiplying each term of the first binomial by each term of the second binomial.

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