Let \(X\) be a metric space and \((x_n)\) a convergent sequence , then \((x_n)\) is bounded set .
Proof
It is bounded since it is a Cauchy sequence according to (0x671bf819)
and every Cauchy sequence is bounded
.
Let \(X\) be a metric space and \((x_n)\) a convergent sequence , then \((x_n)\) is bounded set .