To divide the polynomial x4 + 9x2 – 9 by x2 + 3x, we can use polynomial long division.
Firstly, we set it up similar to numeric long division:
- Dividend: x4 + 0x3 + 9x2 + 0x – 9
- Divisor: x2 + 3x
Next, we divide the leading term of the dividend by the leading term of the divisor:
- x4 ÷ x2 = x2
Now, we multiply the entire divisor by x2:
- x2 * (x2 + 3x) = x4 + 3x3
Next, we subtract this result from the original polynomial:
- (x4 + 9x2 – 9) – (x4 + 3x3) = -3x3 + 9x2 – 9
Now we repeat the process with the new polynomial -3x3 + 9x2 – 9.
Divide the leading term again:
- -3x3 ÷ x2 = -3x
Multiply the divisor by -3x:
- -3x * (x2 + 3x) = -3x3 – 9x2
Subtract once more:
- (-3x3 + 9x2 – 9) – (-3x3 – 9x2) = 18x2 – 9
Now, we divide the leading term again:
- 18x2 ÷ x2 = 18
Multiply the divisor by 18:
- 18 * (x2 + 3x) = 18x2 + 54x
Subtract again:
- (18x2 – 9) – (18x2 + 54x) = -54x – 9
At this point, we cannot divide anymore since the degree of the remaining polynomial -54x – 9 is less than the degree of the divisor. Thus, we identify our results:
The final quotient is x2 – 3x + 18 and the remainder is -54x – 9.
To summarize:
- Quotient: x2 – 3x + 18
- Remainder: -54x – 9