find the remainder of p(x) =x^3+1 by x+1 using remainder theorem
Answers
Answer:
According to the remainder theorem:-
Let P (x) and G (x) be any two polynomials,
Let x = a be a solution if P (x) = 0,
Then G (a) is the remainder when G(x) is divided by P (x).
Step-by-step explanation:
So here,
G (x) = x³+1
And P (x) = x+1
Taking p(x) = 0,
x = - 1
Therefore,
G (-1) = (-1)³+1
= - 1+1
= 0
In other words, the remainder is zero in this case.
And here is a notice (and request) for you, My friend...
If you have more interesting mathematical problems, then please mail me at:-
I'm a 10th graded student and I love learning mathematics. So I keep learning new topics. So please email me your problems.
This will be helpful for both of us.
And don't be worried about the standard of the problem. Even if I'm a 10th graded student, I would solve ANYTHING.
Just share.