The two theorems are basically use the same principles. The difference is:
-In remainder theorem, in a polynomial f(x), when you divide the f(x) by the binomial (a-x), the remainder is equal to the f(a). This saves you from doing the long division as you only substitute the x for a.
-The factor theorem, on the other hand, tells us that the binomial (x-a) is the factor of the polynomial f(x) when after the substitution for x with a gives a zero.
Explanation:-
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)=3^2−2(3)+1
f(3)=9−6+1
f(3)=4
Therefore, by the remainder theorem, the remainder when you divide x^2−2x+1 by x−3 is 4.
You can also apply this in reverse. Divide x^2−2x+1 by x−3, and the remainder you get is the value of f(3).
Using the factor theorem
The quadratic polynomial f(x)=x^2−2x+1 equals 0 when x=1.
This tells us that (x−1) is a factor of x^2−2x+1.
We can also apply the factor theorem in reverse:
We can factor x^2−2x+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 zeros.