1. Prove that there exists a UNIQUE function f from set R+ to R+ such that
f(f(x))=6x-f(x)
2. For every n in Z+, let Rn be the minimum value of |c-d*3^(1/2)| for all
nonnegative integers c and d with c+d=n. Find, with proof, the smallest
positive real number g with Rn < or = g for all n in Z+.