I have the following sequences and think the first 2 converge and the 3rd doesn't. Am I correct?
- $(a_{n})=2^{-n}$ with respect to the euclidean metric.
- in $C[0,1]$ the sequence $f_{n}(x)=\frac {x}{2^{n}}$ with metric $|f-g|=\max\{|f(x)-g(x)|:x \in [0,1]\}$.
- $(a_{n})=2^{-n}$ with respect to the discrete metric.