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Long Division of Polynomials: (x³ + x² + x + 2) ÷ (x² - 1)
Long division of polynomials is a process used to divide one polynomial by another. This process is similar to the long division of numbers, with some key differences. Let's walk through the steps of dividing (x³ + x² + x + 2) by (x² - 1):
1. Set up the Division:
Write the dividend (x³ + x² + x + 2) inside the division symbol and the divisor (x² - 1) outside.
________
x² - 1 | x³ + x² + x + 2
2. Divide the Leading Terms:
- Divide the leading term of the dividend (x³) by the leading term of the divisor (x²). This gives us x.
- Write x above the division symbol, aligned with the x³ term.
x
x² - 1 | x³ + x² + x + 2
3. Multiply and Subtract:
- Multiply the divisor (x² - 1) by the term you just wrote (x). This gives us x³ - x.
- Write this result below the dividend, aligning terms with matching exponents.
- Subtract the result from the dividend.
x
x² - 1 | x³ + x² + x + 2
-(x³ - x)
_________
x² + 2x + 2
4. Bring Down the Next Term:
- Bring down the next term of the dividend (+2) to the bottom row.
x
x² - 1 | x³ + x² + x + 2
-(x³ - x)
_________
x² + 2x + 2
5. Repeat Steps 2-4:
- Divide the new leading term (x²) by the leading term of the divisor (x²). This gives us 1.
- Write 1 next to the x in the quotient.
- Multiply the divisor (x² - 1) by 1 and subtract the result.
x + 1
x² - 1 | x³ + x² + x + 2
-(x³ - x)
_________
x² + 2x + 2
-(x² - 1)
_________
2x + 3
6. Determine the Remainder:
- The degree of the remaining polynomial (2x + 3) is less than the degree of the divisor (x² - 1). Therefore, we have reached our final remainder.
7. Express the Result:
The result of the division is:
(x³ + x² + x + 2) ÷ (x² - 1) = x + 1 + (2x + 3)/(x² - 1)
This means that the quotient is x + 1, and the remainder is 2x + 3.
Key Points to Remember:
- The process continues until the degree of the remainder is less than the degree of the divisor.
- If the remainder is zero, the divisor is a factor of the dividend.
- Long division can be used to factor polynomials, find the roots of a polynomial, and simplify expressions involving polynomials.