Question

if (x+1) divides x 99+100 then find the remainder​

Answer 1

Answer:

If (x+1) divides 99x+100 then the remainder is 1.

Step-by-step explanation:

In order to divide one polynomial by another we have to multiply the divisor by some quotient and then subtract the values from the matching variables of the dividend.

In this question 99x+100 is the dividend and x+1 is the divisor, here both ther variables of the terms in dividend match with the variables of the divisor.

x+1 ) 99x+100 ( 99

        99x+99

     (-)      (-)

______________

              1

The remainder when 99x+100 is divided by x+1 is 1.

Answer 2

Step-by-step explanation:

let p(x)=x^99-100

zero of x+1 of (-1)

so p(-1)= 99x -100

-p =99(-1)-100

-p = -99-100

-p = -199