2023 AMC 10A Problems/Problem 21
Revision as of 17:57, 9 November 2023 by Aiden22gao (talk | contribs)
Let be the unique polynomial of minimal degree with the following properties:
has a leading coefficient
,
is a root of
,
is a root of
,
is a root of
, and
is a root of
.
The roots of are integers, with one exception. The root that is not an integer can be written as
, where
and
are relatively prime integers. What is
?
Solution 1 From the problem statement, we know P(1)=1, P(2-2)=0, P(9)=0 and 4P(4)=0 therefore we know P(x) must at least have the factors x(x-9)(x-4) and we can assume the last factor to be (x-a) where a is the fractional factor. Then we can use the fact that P(1)=1 to obtain that a 1-a must be 1/24 and a is 23/24. The answer is then 47. ~aiden22gao