Problem:
Consider the polynomial
P(x)=k=0β10β(x2k+2k)=(x+1)(x2+2)(x4+4)β―(x1024+1024).
The coefficient of x2012 is equal to 2a. What is a ?
Answer Choices:
A. 5
B. 6
C. 7
D. 10
E. 24
Solution:
A factor in the product defining P(x) has degree 2012 if and only if the sum of the exponents in x is equal to 2012. Because there is only one way to write 2012
as a sum of distinct powers of 2, namely the one corresponding to its binary expansion 2012=111110111002β, it follows that the coefficient of x2012 is equal to 20β
21β
25=26β.
Note: In general, if 0β€nβ€2047 and n=βjβAβ2j for Aβ{0,1,2,β¦,10}, then the coefficient of xn is equal to 2a where a=(112β)ββjβAβj.
The problems on this page are the property of the MAA's American Mathematics Competitions