I need a general formula to calculate the minimum height of the binary tree and the maximum height of the binary tree. (not the binary search tree)

First there may be some difference as to how computer science calculates the height of a tree, versus the way height is determined in discrete mathematics (graph theory), this may be due to the existence of data at any one node (or vertice), while in mathematics, its a pure theory approach. So maybe its best you clarify which one you need. In discrete mathematics, trees are classified as mary trees, so a binary tree is a 2ary tree. Also at any given height, there can be at most 2^h = L (leaves). This is important to notice, since it confirms that the root is at height zero, hence 2^0 = 1 leaf...1 vertice...the root. So given n vertices, the height of a tree is given by the formula n = 2^( h + 1 )  1 Since you are looking for h, you have to take the log2 of both sides of the formula n = 2^( h + 1 )  1 For a full binary tree, the max height is log2( n + 1 ) = log2( 2^( h + 1 ) ) this equals ceiling( log2( n + 1 )  1 ) = h For a nonfull binary tree, the max height = ( n  1 ) therefore if you have n vertices, the root must be subtracted to get the max height, because of the previous formula above (2^h = L) For min heights, extrapolate from the above rules. 


If you have N elements, the minimum height of a binary tree will be log2(N)+1. For a full binary tree, the maximum height will be N/2. For a nonfull binary tree, the maximum height will be N. 


Think about how the structure of the tree can change. For example, if the tree is completely unbalanced then this is the worst case  each node will have exactly one child. In the best case, the tree is completed balanced, and each node has two children. Since it sounds like homework, I'll leave it there. 


The max height is n and the min height (IE a perfect binary tree) is the (log base 2( n + 1))  1 


The minimum height is h=ceiling( log(n+1)/log(2) 1) for any binary tree. 


If a root can have any number of leafs up to 2 (0,1,2) then:
In order to obtain a minimal height every root must have as many branches as possible. In this case you'll notice that for n=1, height=0 ; for n=2 to n=3, height=1; for n=4 to n=7, height=2 ; for n=8 to n=15, height=3 etc. You can thus notice that, for every n, there exists a p such that: 2^p <= n < 2^(p+1) and p=height, so height = [log2(n)] 


The minimum height occurs when you try to pack all the nodes keeping number of levels minimum (because height is maximum level number).So if we can minimize maximum level number, we can minimize the height.So minimum height occurs when the tree is a complete tree. So minimum height is floor(log2(n)) . Maximum height occurs when you always build tree with intention of increasing one more level and so the tree looks like a chain of beads and therefore, So maximum height is n1. 

