What duality can you quote that says supremum always exists $\implies$ infimum always exists of a bounded set?

What duality can you quote that says supremum always exists $\implies$
infimum always exists of a bounded set?

Say you've proven that for a subset of the reals bounded above, there
exists a supremum of the set in the reals. How do you prove the dual
version for infimum without going through all the steps again?