After that, we learned how to find the missing coefficient in a polynomial if we already know what the remainder is. Here's how you would do this:
Let's say you have the question:
The first thing you want to do is write it out in a way that is easy to understand:
Then you plug the root of the denominator into the function:
Since we already know the remainder we can rewrite it this way:
Now all we do is isolate K with a little algebra, and solve it:
And there you have it!
Near the end of the class we managed to quickly learn the Rational Roots Theorem. This theorem allow! s us to find any rational roots of a polynomial function. Here's an example:
So you're given the equation:
The first thing to do is the find all the possible positive and negative factors of the constant term:
Now we find all the positive factors of the leading coefficient:
We then list all the possible rational roots, eliminating any duplicates:
We can then test out these roots by using synthetic division and the factor theorem to turn the function into a quadratic (Remember: If the remainder is 0, then it is a root):
This then gives you:
Now you just factor the equation and find the roots:
And there you have it! That's about all we did for today, tomorrow's scribe will be...Niwatori-san
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