(7x^3+x^2+x)/(x^2+1) Long Division

4 min read Jun 16, 2024
(7x^3+x^2+x)/(x^2+1) Long Division

Long Division of Polynomials: (7x^3 + x^2 + x) / (x^2 + 1)

Long division of polynomials is a method used to divide two polynomials, much like long division with numbers. In this article, we'll step through the process of dividing (7x³ + x² + x) by (x² + 1).

Step 1: Set up the Division

First, set up the long division problem. Write the dividend (7x³ + x² + x) inside the division symbol and the divisor (x² + 1) outside.

        ________
x² + 1 | 7x³ + x² + x 

Step 2: Divide the Leading Terms

Focus on the leading terms of the dividend and the divisor: 7x³ and x².

  • Ask yourself: "What do I multiply x² by to get 7x³?"
  • The answer is 7x.

Write 7x above the division symbol, aligned with the x² term.

        7x______
x² + 1 | 7x³ + x² + x 

Step 3: Multiply and Subtract

Multiply the divisor (x² + 1) by the quotient term (7x):

  • (x² + 1) * (7x) = 7x³ + 7x

Write this result below the dividend:

        7x______
x² + 1 | 7x³ + x² + x 
         7x³ + 7x 

Subtract this result from the dividend:

        7x______
x² + 1 | 7x³ + x² + x 
         7x³ + 7x 
         -------
             x² - 6x 

Step 4: Bring Down the Next Term

Bring down the next term of the dividend (which is +x):

        7x______
x² + 1 | 7x³ + x² + x 
         7x³ + 7x 
         -------
             x² - 6x + x

Step 5: Repeat Steps 2-4

Now repeat steps 2-4 with the new polynomial (x² - 6x + x):

  • Focus on the leading terms: x² and x².
  • What do you multiply x² by to get x²? The answer is 1.
  • Write 1 above the division symbol, aligned with the x term:
        7x + 1___
x² + 1 | 7x³ + x² + x 
         7x³ + 7x 
         -------
             x² - 6x + x
  • Multiply (x² + 1) * (1) = x² + 1 and subtract it from the current polynomial:
        7x + 1___
x² + 1 | 7x³ + x² + x 
         7x³ + 7x 
         -------
             x² - 6x + x
             x² + 1 
             -----
              -6x 

Step 6: The Remainder

We can't divide any further since the degree of the remaining polynomial (-6x) is less than the degree of the divisor (x²).

Therefore, the result of dividing (7x³ + x² + x) by (x² + 1) is 7x + 1 with a remainder of -6x.

We can write this in the form:

(7x³ + x² + x) / (x² + 1) = 7x + 1 - (6x)/(x² + 1)

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