Difference between revisions of "AIME 2020(MOCK) Problems"
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Let <math>K</math> be a set of polynomials <math>P(x)</math> with integral coefficients such that the roots of <math>P(x)</math> are <math>cos \frac{\pi}{7}</math>, <math>cos \frac{\pi}{11}</math>, and <math>cos \frac{\pi}{17}</math>. What is the least possible sum of the coefficients of <math>P(x)</math>? | Let <math>K</math> be a set of polynomials <math>P(x)</math> with integral coefficients such that the roots of <math>P(x)</math> are <math>cos \frac{\pi}{7}</math>, <math>cos \frac{\pi}{11}</math>, and <math>cos \frac{\pi}{17}</math>. What is the least possible sum of the coefficients of <math>P(x)</math>? | ||
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Revision as of 11:11, 11 June 2020
Problem 1
Let 
be 
. What is the remainder when is divided by 
?
Problem 2
Let 
be a set of polynomials 
with integral coefficients such that the roots of are 
, 
, and 
. What is the least possible sum of the coefficients of ?
