Problem: The sum of the numerical coefficients in the complete expansion of (x2β2xy+y2)7 is:
Answer Choices:
A. 0
B. 7
C. 14
D. 128
E. 1282
Solution:
(x2β2xy+y2)7=((xβy)2)7=(xβy)14. By setting x=y=1 in the expansion of this binomial we obtain the sum s of the integer coefficients. Consequently s=(1β1)14= zero