(m^2-7m-11) Divided By (m-8)

3 min read Jun 16, 2024
(m^2-7m-11) Divided By (m-8)

Dividing Polynomials: (m^2 - 7m - 11) ÷ (m - 8)

This article will guide you through the process of dividing the polynomial (m^2 - 7m - 11) by (m - 8) using polynomial long division.

Setting up the Division

  1. Write the division problem:

        ___________
    m - 8 | m^2 - 7m - 11 
    
  2. Focus on the leading terms:

    • The leading term of the divisor (m - 8) is m.
    • The leading term of the dividend (m^2 - 7m - 11) is m^2.
  3. Determine the quotient term:

    • Ask yourself: "What do I need to multiply m by to get m^2?"
    • The answer is m. Write this above the line in the quotient section.
        m        
        ___________
    m - 8 | m^2 - 7m - 11 
    
  4. Multiply the quotient term by the divisor:

    • Multiply m (the quotient term) by (m - 8):
    • m * (m - 8) = m^2 - 8m
  5. Subtract:

    • Write the result (m^2 - 8m) below the dividend and subtract:
        m        
        ___________
    m - 8 | m^2 - 7m - 11 
            -(m^2 - 8m) 
            -------
                m - 11
    

Continuing the Division

  1. Bring down the next term:

    • Bring down the -11 from the dividend.
        m        
        ___________
    m - 8 | m^2 - 7m - 11 
            -(m^2 - 8m) 
            -------
                m - 11 
    
  2. Repeat steps 2-5:

    • Focus on the new leading term (m) in the dividend and the leading term (m) in the divisor.
    • What do you multiply m by to get m? The answer is 1. Write +1 in the quotient section.
    • Multiply 1 by (m - 8), giving (m - 8).
    • Subtract (m - 8) from the current dividend.
        m + 1     
        ___________
    m - 8 | m^2 - 7m - 11 
            -(m^2 - 8m) 
            -------
                m - 11 
                -(m - 8)
                -------
                      -3
    

The Result

  1. The remainder is -3.

The final result of dividing (m^2 - 7m - 11) by (m - 8) is:

m + 1 - 3/(m - 8)

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