Showing posts with label remainder theorem. Show all posts
Showing posts with label remainder theorem. Show all posts

Tuesday, August 31

remainder theorem


Let us learn about remainder theorem

The Remainder Theorem is very useful for calculating, evaluating polynomials at a given value of x, though it might not seem so, at least at 1st blush. This is mainly because the tool is presented as a theorem with a proof & you probably don't feel ready for proofs at this stage in student’s studies. Fortunately, student doesn’t "have" to understand the proof of the Theorem; they just need to understand how to use the remainder theorem. If f(x) is a polynomial in x & it is divided by x-a; the remainder is the value of f(x) at x = a i.e., Remainder = f (a).

Proof of remainder theorem:

Let p(x) be a polynomial divided by (x-a).
Let q(x) is the quotient and R is the remainder.
By division algorithm, Dividend = (Divisor x quotient) + Remainder
P(x) = q(x). (x-a) + R
Substitute x = a,
P (a) = q (a) (a-a) + R
P (a) = R (a - a = 0, 0 - q (a) = 0)
Hence Remainder = p (a).

In our next blog we shall learn about associate connection I hope the above explanation was useful.Keep reading and leave your comments.