(p+7)-(6p^2+13p)

2 min read Jun 16, 2024
(p+7)-(6p^2+13p)

Simplifying the Expression: (p+7)-(6p^2+13p)

This article will guide you through simplifying the algebraic expression (p+7)-(6p^2+13p).

Understanding the Expression

The expression consists of two terms:

  • (p+7): This is a binomial with two terms, p and 7.
  • (6p^2+13p): This is also a binomial with two terms, 6p^2 and 13p.

We are asked to simplify the expression by subtracting the second binomial from the first.

Simplifying the Expression

  1. Distribute the negative sign: Since we are subtracting the second binomial, we need to distribute the negative sign to each term inside the parentheses. This gives us: (p+7) + (-1)(6p^2+13p)

  2. Simplify: Multiplying -1 with each term in the second binomial, we get: (p+7) - 6p^2 - 13p

  3. Combine like terms: Combine the 'p' terms and the constant terms: -6p^2 + (p-13p) + 7 -6p^2 - 12p + 7

Final Simplified Expression

Therefore, the simplified form of the expression (p+7)-(6p^2+13p) is -6p^2 - 12p + 7.

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