- Divide 3x3 – 5x2 + 10x – 3 by 3x + 1
Warning: Do not write the polynomial "mixed number" in the same format as numerical mixed numbers! If you just append the fractional part to the polynomial part, this will be interpreted as polynomial multiplication, which is not what you mean!
| Note: Different books format the long division differently. When writing the expressions across the top of the division, some books will put the terms above the same-degree term, rather than above the term being worked on. In such a text, the long division above would be presented as shown here: The only difference is that the terms across the top are shifted to the right. Otherwise, everything is exactly the same. You should probably use the formatting that your instructor uses. | |
- Divide 2x3 – 9x2 + 15 by 2x – 5
- First off, I note that there is a gap in the degrees of the terms of the dividend: the polynomial 2x3 – 9x2 + 15 has no x term. My work could get very messy inside the division symbol, so it is important that I leave space for a x-term column, just in case. I can create this space by turning the dividend into 2x3 – 9x2 + 0x + 15. This is a legitimate mathematical step: since I've only added zero, I haven't actually changed the value of anything. Now that I have all the "room" I might need for my work, I'll do the division:
- Divide 4x4 + 3x3 + 2x + 1 by x2 + x + 2
- I'll add a 0x2 term to the dividend (inside the division symbol) to make space for my work, and then I'll do the division in the usual manner:
- Then my answer is:
To succeed with polyomial long division, you need to write neatly, remember to change your signs when you're subtracting, and work carefully, keeping your columns lined up properly. If you do this, then these exercises should not be very hard; annoying, maybe, but not hard.
Labels:
Long Division
Previous Article
