%2F(x%2B3)-synthetic-division.jpeg "(x^3-4x+6)/(x+3) Synthetic Division")
Performing Synthetic Division: (x³ - 4x + 6) / (x + 3)
Synthetic division is a shortcut method for dividing polynomials, especially when the divisor is a linear expression of the form (x - a). Let's apply this method to divide (x³ - 4x + 6) by (x + 3).
Setting Up the Problem
- Identify the coefficients: In our dividend (x³ - 4x + 6), the coefficients are 1, 0, -4, and 6. Notice we need a placeholder for the missing x² term.
- Identify the divisor: Our divisor is (x + 3), so 'a' is -3.
Now, let's set up the synthetic division problem:
-3 | 1 0 -4 6
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Performing the Calculation
- Bring down the first coefficient: Bring down the '1' below the line.
-3 | 1 0 -4 6
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1
- Multiply and add: Multiply the '1' by -3 (the divisor) and write the result (-3) below the '0'. Add the numbers in the second column (0 + (-3) = -3).
-3 | 1 0 -4 6
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1 -3
- Repeat the process: Multiply the -3 by -3, and write the result (9) below the -4. Add the numbers in the third column (-4 + 9 = 5).
-3 | 1 0 -4 6
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1 -3 5
- Final step: Multiply the 5 by -3, and write the result (-15) below the 6. Add the numbers in the last column (6 + (-15) = -9).
-3 | 1 0 -4 6
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1 -3 5 -9
Interpreting the Result
The numbers below the line (1, -3, 5, and -9) represent the coefficients of the quotient and the remainder. Starting from the left, the coefficients correspond to the powers of x, decreasing by one each time.
- Quotient: x² - 3x + 5
- Remainder: -9
Therefore, the result of the division (x³ - 4x + 6) / (x + 3) is:
(x³ - 4x + 6) / (x + 3) = x² - 3x + 5 - 9/(x + 3)
Note: The remainder is expressed as a fraction with the divisor as the denominator.