Prove by induction.Every partial order on a nonempty finite set at least one minimal element.
How can I solve that question ?
If the partial order has size 1, it is obvious.
Assume it is true for partial orders
It is trivially true if there is only one element in the poset. Now suppose it is true for all sets of size < n. Compare the nth element to the minimal element of the (n-1) poset, which we know to exist. It will either be the new minimal or not or incomparable. It doesn't matter either way. (Why?)