User talk:61.245.153.63

==Hello. I have no editing experience on wikipedia, so I apologize for the inevitable errors. I would like to point out that the Factor Theorem can be easily extended to non-linear divisors. Perhaps you could consider the possibility of inserting a simple example on the page, like the following.==

Let $$ \ f=2x^{15} + 5x^3 +x^2-3x+3 \quad \text{and} \quad m=x^3 -2 \ $$. Substituting $$ \ 2 \ $$ for  $$ \ x^3 \  $$   in  $$ \ f(x) \  $$  we obtain

$$ \ 2\cdot2^5 + 5\cdot2 + x^2 - 3x + 3 = 64 + 10+x^2-3x+3 =x^2-3x+ 77$$

which is the remainder of $$ \ f \ $$ on division by $$ \ m$$. Then $$ \ x^3-2 \ $$ does not divide  $$ \ 2x^{15} + 5x^3 + x^2-3x +3 \ $$ .

Flaudano (talk) 23:12, 28 March 2019 (UTC)