(-2y^5+y^3-2y)-(y^5-4y^3+6)=

2 min read Jun 16, 2024
(-2y^5+y^3-2y)-(y^5-4y^3+6)=

Simplifying Polynomial Expressions

This article will guide you through the process of simplifying the polynomial expression:

(-2y^5 + y^3 - 2y) - (y^5 - 4y^3 + 6)

Understanding the Concepts

Before we begin, let's recall some fundamental concepts:

  • Polynomials: Expressions consisting of variables and coefficients combined using addition, subtraction, and multiplication.
  • Terms: Individual parts of a polynomial separated by addition or subtraction.
  • Like Terms: Terms with the same variable and exponent.
  • Combining Like Terms: Adding or subtracting coefficients of like terms.

Step-by-Step Simplification

  1. Distribute the Negative Sign:

    • The minus sign in front of the second parenthesis means we multiply each term inside the parenthesis by -1.
    • This gives us:
      -2y^5 + y^3 - 2y - y^5 + 4y^3 - 6
  2. Identify Like Terms:

    • y^5 terms: -2y^5 - y^5
    • y^3 terms: y^3 + 4y^3
    • y terms: -2y
    • Constant term: -6
  3. Combine Like Terms:

    • y^5 terms: -2y^5 - y^5 = -3y^5
    • y^3 terms: y^3 + 4y^3 = 5y^3
    • y terms: -2y
    • Constant term: -6
  4. Write the Simplified Expression:

    • Combining all the simplified terms, we get: -3y^5 + 5y^3 - 2y - 6

Conclusion

Therefore, the simplified form of the polynomial expression (-2y^5 + y^3 - 2y) - (y^5 - 4y^3 + 6) is -3y^5 + 5y^3 - 2y - 6.

Related Post


Featured Posts