Perelman
- 19
- 1
Homework Statement
\ell is the set of sequences of real numbers where only a finite number of terms is non-zero, and the distance metric is d(x,y) = sup|x_n - y_n|, for all n in naural-numbers
then the sequence u_k = {1,\frac{1}{2},\frac{1}{3},...,\frac{1}{k}, 0,0,0...}
and \left\{u_k\right\}^{\infty}_{k=1} is what i assume to be a sequence of sequences.
I know its a Cauchy sequence. the question ask to show that {uk} is convergent or not convergent
The Attempt at a Solution
so here i just see that it will converge to the sequence \frac{1}{k} from k=1 to infinity which converges to 0 but doesn't contain finite non-zero numbers. so the squenec doest belong to the set \ell and its not convergent in \ell
Is this correct or completely wrong. I have a feeling its not and it needs more epsilons. Hard thing with proof is that there is no way to check my answer. if its correct i have some follow-up questions