Difference between remainder theorem and long division
Answers
Answer:
The two theorems are similar, but refer to different things.
Step-by-step explanation:
Explanation:
The remainder theorem tells us that for any polynomial f(x), if you divide it by the binomial x−a, the remainder is equal to the value of f(a).
The factor theorem tells us that if a is a zero of a polynomial f(x), then (x−a) is a factor of f(x), and vice-versa.
For example, let's consider the polynomial
f(x)=x2−2x+1
Using the remainder theorem
We can plug in 3 into f(x).
f(3)=32−2(3)+1
f(3)=9−6+1
f(3)=4
Therefore, by the remainder theorem, the remainder when you divide x2−2x+1 by x−3 is 4.
You can also apply this in reverse. Divide x2−2x+1 by x−3, and the remainder you get is the value of f(3).
Using the factor theorem
The quadratic polynomial f(x)=x2−2x+1 equals 0when x=1.
This tells us that (x−1) is a factor of x2−2x+1.
We can also apply the factor theorem in reverse:z
We can factor x2−2x+1 into (x−1)2, therefore 1 is a zero of f(x).
Basically, the remainder theorem links the remainder of division by a binomial with the value of a function at a point, while the factor theorem links the factors of a polynomial to its zeroes.