Question

When a polynomial f(x) is divided by x-3 and x+6 , the respective remainders are 7 and 22. What is the remainder when f(x) is divided by (x-3)(x+6)
#take points​

Answer 1

When ever a polynomial of degree N is divided by another polynomial of degree < N, the remainder will always be a polynomial ONE degree less than degree of denominator.

Remainder Theorem states that if a function f(x) is divided by (x-a), then f(a) is the remainder.

Taking cognizance of above two facts, we know the remainder when f(x) is divided by (x-3)(x+6) will be linear polynomial of degree ONE.

Let the remainder be represented by Ax + B

If f(x) is divided by x-3, remainder is 7

=> 3A + B = 7

If f(x) is divided by x-(-6), remainder is 22

=> -6A + B = 22

Solving the two equations, we get A = -15/9 & B = 12

So final remainder is -15x/9 + 12

Hope it helpful for you please mark me brainlist

Answer 2

Explanation:

REFER TO THE ATTACHMENT ❤️

$\:$