%2F(x-2)-synthetic-division.jpeg "(2x^3-5x^2+3x+7)/(x-2) Synthetic Division")
Solving (2x^3 - 5x^2 + 3x + 7) / (x - 2) Using Synthetic Division
Synthetic division is a shortcut method for dividing a polynomial by a linear expression of the form (x - a). It offers a more efficient way to perform polynomial division compared to the traditional long division method.
Let's illustrate how to use synthetic division to solve (2x^3 - 5x^2 + 3x + 7) / (x - 2).
Steps:
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Identify the coefficients of the polynomial: In our example, the coefficients are 2, -5, 3, and 7.
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Identify the value of 'a' from the divisor: Our divisor is (x - 2), so a = 2.
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Set up the synthetic division table: Write the value of 'a' to the left of a horizontal line. Place the coefficients of the polynomial to the right of the line.
2 | 2 -5 3 7 ------------------ -
Bring down the first coefficient: Bring down the first coefficient (2) below the line.
2 | 2 -5 3 7 ------------------ 2 -
Multiply and add:
- Multiply the number you just brought down (2) by the value of 'a' (2), resulting in 4.
- Write the product (4) under the next coefficient (-5).
- Add the two numbers (-5 + 4 = -1).
2 | 2 -5 3 7 ------------------ 2 -1 -
Repeat steps 5 and 6 for the remaining coefficients:
- Multiply -1 by 2, resulting in -2. Write -2 under 3.
- Add 3 and -2, resulting in 1.
- Multiply 1 by 2, resulting in 2. Write 2 under 7.
- Add 7 and 2, resulting in 9.
2 | 2 -5 3 7 ------------------ 2 -1 1 9 -
Interpret the results:
- The numbers below the line represent the coefficients of the quotient polynomial.
- The last number (9) is the remainder.
Therefore, the result of dividing (2x^3 - 5x^2 + 3x + 7) by (x - 2) is:
2x² - x + 1 + 9 / (x - 2)
Conclusion:
Synthetic division offers a concise and efficient method for dividing polynomials by linear expressions. By following the simple steps outlined above, you can easily solve polynomial divisions without the complexity of traditional long division.