Problem:
Consider the set of complex numbers z satisfying β£β£β£β1+z+z2β£β£β£β=4. The maximum value of the imaginary part of z can be written in the form nmββ, where m and n are relatively prime positive integers. What is m+n?
Answer Choices:
A. 20
B. 21
C. 22
D. 23
E. 24
Solution:
Completing the square gives
1+z+z2=43β+(21β+z)2
Let w=21β+z. Then β£β£β£βw2+43ββ£β£β£β=4. Because Imw=Imz, it suffices to maximize Imw. By the Triangle Inequality,