(x^2+8x+15)/(x+5) Long Division

3 min read Jun 17, 2024
(x^2+8x+15)/(x+5) Long Division

Long Division of Polynomials: (x^2 + 8x + 15) / (x + 5)

Long division of polynomials is a method for dividing two polynomials. It is similar to the long division of numbers, but we work with variables and coefficients.

In this example, we will divide the polynomial (x^2 + 8x + 15) by the polynomial (x + 5). Here's how to do it:

1. Set up the division:

          _______
x + 5 | x^2 + 8x + 15 

2. Divide the leading terms:

  • The leading term of the divisor (x + 5) is 'x'.
  • The leading term of the dividend (x^2 + 8x + 15) is 'x^2'.
  • Divide x^2 by x, which gives us 'x'.
  • Write 'x' above the x^2 term in the quotient.
          x _______
x + 5 | x^2 + 8x + 15 

3. Multiply the quotient by the divisor:

  • Multiply 'x' (the quotient term) by (x + 5), which gives us 'x^2 + 5x'.
          x _______
x + 5 | x^2 + 8x + 15 
         x^2 + 5x

4. Subtract:

  • Subtract 'x^2 + 5x' from the dividend.
          x _______
x + 5 | x^2 + 8x + 15 
         x^2 + 5x
         -------
              3x 

5. Bring down the next term:

  • Bring down the next term from the dividend, which is '+ 15'.
          x _______
x + 5 | x^2 + 8x + 15 
         x^2 + 5x
         -------
              3x + 15

6. Repeat steps 2-5:

  • Divide the leading term of the new dividend ('3x') by the leading term of the divisor ('x'), which gives us '3'.
  • Write '3' next to 'x' in the quotient.
  • Multiply '3' by (x + 5), which gives us '3x + 15'.
  • Subtract '3x + 15' from the dividend.
          x + 3
x + 5 | x^2 + 8x + 15 
         x^2 + 5x
         -------
              3x + 15
              3x + 15
              -------
                    0

7. Result:

Since the remainder is 0, the division is complete. Therefore:

(x^2 + 8x + 15) / (x + 5) = x + 3

Important Note: You can check your answer by multiplying the quotient (x + 3) by the divisor (x + 5). The result should be the original dividend (x^2 + 8x + 15).

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