M MathLover New member Dec 8, 2010 #1 Give an example of sequences an , bn such that {an} n= 1 to infinity and {bn} n=1 to infinity do not converge but {an + bn} n= 1 to infinity converges Note the n's are subscripts
Give an example of sequences an , bn such that {an} n= 1 to infinity and {bn} n=1 to infinity do not converge but {an + bn} n= 1 to infinity converges Note the n's are subscripts
