SOLUTION: If the polynomial p(x) = (x^5 - 6x + 7)^2019 - (x^5 - 6x + 9)^2020 + 5x^5 - 30x + 50 is divided by x^5 - 6x + 8, Then, find the remainder.

Algebra ->  Test -> SOLUTION: If the polynomial p(x) = (x^5 - 6x + 7)^2019 - (x^5 - 6x + 9)^2020 + 5x^5 - 30x + 50 is divided by x^5 - 6x + 8, Then, find the remainder.       Log On


   

Question 1145140: If the polynomial p(x) = (x^5 - 6x + 7)^2019 - (x^5 - 6x + 9)^2020 + 5x^5 - 30x + 50 is divided by x^5 - 6x + 8,
Then, find the remainder.
Answer by ikleyn(52879) About Me  (Show Source):
You can put this solution on YOUR website!
.
First addend,  %28x%5E5+-+6x+%2B+7%29%5E2019,  gives the remainder  (-1)^2019 = -1,  when divided by x^5 - 6x + 8.   OBVIOUSLY.


Second addend,  %28x%5E5+-+6x+%2B+9%29%5E2020,  gives the remainder  1^2020 = 1,  when divided by x^5 - 6x + 8.   OBVIOUSLY.


Third addend,  5x%5E5+-+30x+%2B+50,  gives the remainder  42,  when divided by x^5 - 6x + 8.   OBVIOUSLY.


Thus we know all three partial remainders, and are in position to answer the question now.


ANSWER.  The remainder under the question is  -1 - 1 + 42 = 40.


Solved, answered, explained and completed.


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Nice problem (!)   An Olympiad level (!)

Thanks for posting it :  it was a pleasure to me to solve it  (!)


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