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Solving Polynomial Division: (4x²−13x−5) ÷ (x−2)
This article will guide you through the process of dividing the polynomial (4x²−13x−5) by (x−2). We'll use the long division method to achieve this.
1. Set Up the Division
Begin by writing the problem in a long division format:
_______
x - 2 | 4x² - 13x - 5
2. Divide the Leading Terms
- Focus on the leading term of the divisor (x) and the leading term of the dividend (4x²).
- Ask yourself: "What do I need to multiply x by to get 4x²?".
- The answer is 4x.
- Write 4x above the dividend.
4x ______
x - 2 | 4x² - 13x - 5
3. Multiply and Subtract
- Multiply (x - 2) by 4x: 4x(x - 2) = 4x² - 8x
- Write this result below the dividend.
- Subtract the entire expression from the dividend.
4x ______
x - 2 | 4x² - 13x - 5
-(4x² - 8x)
----------
-5x - 5
4. Bring Down the Next Term
- Bring down the next term of the dividend (-5).
4x ______
x - 2 | 4x² - 13x - 5
-(4x² - 8x)
----------
-5x - 5
5. Repeat the Process
- Now, focus on the new leading term (-5x) and the leading term of the divisor (x).
- Ask: "What do I need to multiply x by to get -5x?".
- The answer is -5.
- Write -5 next to 4x above the dividend.
4x - 5 ______
x - 2 | 4x² - 13x - 5
-(4x² - 8x)
----------
-5x - 5
- Multiply (x - 2) by -5: -5(x - 2) = -5x + 10
- Write this result below the last line.
- Subtract the entire expression.
4x - 5 ______
x - 2 | 4x² - 13x - 5
-(4x² - 8x)
----------
-5x - 5
-(-5x + 10)
----------
-15
6. The Remainder
Since the degree of -15 is less than the degree of (x - 2), the division process is complete.
Therefore, (4x²−13x−5) ÷ (x−2) = 4x - 5 - 15/(x - 2).