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Adding and subtracting polynomials

Adding and subtracting polynomials involves combining like terms. Like terms are terms that have the same variables and the same exponents. To add polynomials, terms are grouped by their like terms and the coefficients are combined by adding them. To subtract polynomials, the process is the same as adding the opposite of the second polynomial. The opposite of each term is found by changing its sign. Then the like terms are combined in the same way as when adding.

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Introduction to adding and subtracting polynomial expressions.

To add polynomials, combine like terms with the same base and exponent by adding coefficients.

Detailed examples of adding monomials and polynomials by identifying and combining like terms.

Subtraction of polynomials is rewriting the subtraction as addition of the opposite terms.

Examples demonstrating how to subtract polynomials by converting to addition and combining like terms.

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Adding and Subtracting Polynomials
Adding Polynomials When adding polynomials, you are simply combining like terms. Remember that “like terms” must have the same base and the same exponent. You add the coefficients.
Add or subtract. Additional Example 1: Adding and Subtracting Monomials A. 12p3 + 11p2 + 8p3 12p3 + 11p2 + 8p3 12p3 + 8p3 + 11p2 20p3 + 11p2 Identify like terms. Rearrange terms so that like terms are together. Combine like terms. B. 5x2 – 6 – 3x + 8 5x2 – 6 – 3x + 8 5x2 – 3x + 8 – 6 5x2 – 3x + 2 Identify like terms. Rearrange terms so that like terms are together. Combine like terms.
Add or subtract. Additional Example 1: Adding and Subtracting Monomials C. t2 + 2s2 – 4t2 – s2 t2 – 4t2 + 2s2 – s2 t2 + 2s2 – 4t2 – s2 –3t2 + s2 Identify like terms. Rearrange terms so that like terms are together. Combine like terms. D. 10m2 n + 4m2 n – 8m2 n 10m2 n + 4m2 n – 8m2 n 6m2 n Identify like terms. Combine like terms.
Add. Additional Example 2: Adding Polynomials A. (4m2 + 5) + (m2 – m + 6) (4m2 + 5) + (m2 – m + 6) (4m2 + m2 ) + (–m) + (5 + 6) 5m2 – m + 11 Identify like terms. Group like terms together. Combine like terms. B. (10xy + x) + (–3xy + y) (10xy + x) + (–3xy + y) (10xy – 3xy) + x + y 7xy + x + y Identify like terms. Group like terms together. Combine like terms.
To subtract polynomials, remember that subtracting is the same as adding the opposite. To find the opposite of a polynomial, you must write the opposite of each term in the polynomial: –(2x3 – 3x + 7) = –2x3 + 3x – 7
Subtract. Additional Example 3A: Subtracting Polynomials (x3 + 4y) – (2x3 ) (x3 + 4y) + (–2x3 ) (x3 + 4y) + (–2x3 ) (x3 – 2x3 ) + 4y –x3 + 4y Rewrite subtraction as addition of the opposite. Identify like terms. Group like terms together. Combine like terms.
Subtract. Additional Example 3B: Subtracting Polynomials (7m4 – 2m2 ) – (5m4 – 5m2 + 8) (7m4 – 2m2 ) + (–5m4 + 5m2 – 8) (7m4 – 5m4 ) + (–2m2 + 5m2 ) – 8 (7m4 – 2m2 ) + (–5m4 + 5m2 – 8) 2m4 + 3m2 – 8 Rewrite subtraction as addition of the opposite. Identify like terms. Group like terms together. Combine like terms.

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Adding and subtracting polynomials

  • 1.
  • 2.
    Adding Polynomials When addingpolynomials, you are simply combining like terms. Remember that “like terms” must have the same base and the same exponent. You add the coefficients.
  • 3.
    Add or subtract. AdditionalExample 1: Adding and Subtracting Monomials A. 12p3 + 11p2 + 8p3 12p3 + 11p2 + 8p3 12p3 + 8p3 + 11p2 20p3 + 11p2 Identify like terms. Rearrange terms so that like terms are together. Combine like terms. B. 5x2 – 6 – 3x + 8 5x2 – 6 – 3x + 8 5x2 – 3x + 8 – 6 5x2 – 3x + 2 Identify like terms. Rearrange terms so that like terms are together. Combine like terms.
  • 4.
    Add or subtract. AdditionalExample 1: Adding and Subtracting Monomials C. t2 + 2s2 – 4t2 – s2 t2 – 4t2 + 2s2 – s2 t2 + 2s2 – 4t2 – s2 –3t2 + s2 Identify like terms. Rearrange terms so that like terms are together. Combine like terms. D. 10m2 n + 4m2 n – 8m2 n 10m2 n + 4m2 n – 8m2 n 6m2 n Identify like terms. Combine like terms.
  • 5.
    Add. Additional Example 2:Adding Polynomials A. (4m2 + 5) + (m2 – m + 6) (4m2 + 5) + (m2 – m + 6) (4m2 + m2 ) + (–m) + (5 + 6) 5m2 – m + 11 Identify like terms. Group like terms together. Combine like terms. B. (10xy + x) + (–3xy + y) (10xy + x) + (–3xy + y) (10xy – 3xy) + x + y 7xy + x + y Identify like terms. Group like terms together. Combine like terms.
  • 6.
    To subtract polynomials,remember that subtracting is the same as adding the opposite. To find the opposite of a polynomial, you must write the opposite of each term in the polynomial: –(2x3 – 3x + 7) = –2x3 + 3x – 7
  • 7.
    Subtract. Additional Example 3A:Subtracting Polynomials (x3 + 4y) – (2x3 ) (x3 + 4y) + (–2x3 ) (x3 + 4y) + (–2x3 ) (x3 – 2x3 ) + 4y –x3 + 4y Rewrite subtraction as addition of the opposite. Identify like terms. Group like terms together. Combine like terms.
  • 8.
    Subtract. Additional Example 3B:Subtracting Polynomials (7m4 – 2m2 ) – (5m4 – 5m2 + 8) (7m4 – 2m2 ) + (–5m4 + 5m2 – 8) (7m4 – 5m4 ) + (–2m2 + 5m2 ) – 8 (7m4 – 2m2 ) + (–5m4 + 5m2 – 8) 2m4 + 3m2 – 8 Rewrite subtraction as addition of the opposite. Identify like terms. Group like terms together. Combine like terms.