(2x-3)(2x+7)(x+1)

2 min read Jun 16, 2024
(2x-3)(2x+7)(x+1)

Expanding and Simplifying (2x-3)(2x+7)(x+1)

This expression involves multiplying three binomials together. We can do this by expanding the expression step by step.

Step 1: Expanding the first two binomials

First, we will multiply the first two binomials, (2x-3) and (2x+7), using the FOIL method:

  • First: 2x * 2x = 4x²
  • Outer: 2x * 7 = 14x
  • Inner: -3 * 2x = -6x
  • Last: -3 * 7 = -21

Combining the terms, we get: 4x² + 14x - 6x - 21 = 4x² + 8x - 21

Step 2: Expanding the result with the remaining binomial

Now, we will multiply the result from step 1 (4x² + 8x - 21) by the remaining binomial (x+1). We can do this by distributing each term of the trinomial over the binomial:

  • 4x² * (x+1) = 4x³ + 4x²
  • 8x * (x+1) = 8x² + 8x
  • -21 * (x+1) = -21x - 21

Finally, we combine all the terms: 4x³ + 4x² + 8x² + 8x - 21x - 21 = 4x³ + 12x² - 13x - 21

Final Result

Therefore, the expanded and simplified form of (2x-3)(2x+7)(x+1) is 4x³ + 12x² - 13x - 21.

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