Before answering your question, let me define some of the terms that are used here...

1) Spanning Tree : Spanning tree of a given graph is a tree which covers all the vertices in that graph.

2) Minimum spanning tree (MST) : MST of a given graph is a spanning tree whose length is minimum among all the possible spanning trees of that graph. More clearly, for a given graph, list all the possible spanning trees (which can be very large) and pick the one whose sum of edge weights is minimum.

3) Minimum Bottleneck spanning tree (MBST) : MBST of a given graph is a spanning tree whose maximum edge weight is minimum among all the possible spanning trees. More clearly, for a given graph, list all the possible spanning trees and the maximum edge weight for each of the spanning trees. Among these pick the spanning tree whose maximum edge weight is minimum.

Now let us look at the following picture with a four node graph...

Graph-A is the given original graph. If I list all the possible spanning trees for this graph and pick the one whose sum of edge weights is minimum, then I will get the Graph-B.
So Graph-B is the Minimum Spanning Tree(MST). Note that its total weight is 1+2+3=6.

Now, if I pick a spanning tree whose maximum edge weight is minimum (i.e MBST), then I may end up picking up either Graph-B (or) Graph-C. Note that both of these spanning trees have maximum edge weight 3, which is minimum among all the possible spanning trees.

From the Graph-B and Graph-C, it is clear that even though the Graph-C is a MBST, it is not MST. Because its total weight is 1+3+3=7, which is greater than the total weight of MST drawn in Graph-B (i.e 6).

So MBST not necessarily be a MST of a given graph. But the MST must be MBST.