GIVING MANY POINTS! Let p=x^999 − x^100+3x^9 − 5 and q=x + 1. Since q has degree 1, it follows that the remainder when p is divided by q is a constant function k, for some k. Wha…

Question

asked Dec 15, 2020 132k views

1 Answer

← Prev Question Next Question →

Ask a Question

Peter Badida · Answer 1 · 2020-12-21T22:13:27+0000

The polynomial remainder theorem gives an immediate answer. It says that the remainder upon dividing
p(x) by
x-c is exactly
p(c) . In this case
$q=x+1\implies c=-1$ , and we have

k=p(-1)=(-1)^(999)-(-1)^(100)+3(-1)^9-5=-1-1-3-5=-10

GIVING MANY POINTS! Let p=x^999 − x^100+3x^9 − 5 and q=x + 1. Since q has degree 1, it follows that the remainder when p is divided by q is a constant function k, for some k. Wha…

0 Comments

Please log in or register to add a comment.

Please log in or register to answer this question.

1 Answer

0 Comments

Please log in or register to add a comment.

No related questions found

Other Questions