First thing to notice is that you have 3 elements initially.
You can thing of constructing BST as a recursive process. Firstly, you select the root and then recursively you construct the left and the right subtree - both of them are determined by the root.
If you have
n items, the probability that you select one of them as a root of the tree is clearly
1/n (I assume that random means uniformly random and independently of previous choices).
Of course, if you have 1 element or 0 elements there are only one tree possible, so the probability of constructing that tree is equal to
Pr = Pr(select B as a root of a whole tree)
* Pr(tree consisting of 1 element because only A is less than B)
* Pr(tree consisting of 1 element because only C is greater than B)
= 1/3 * 1 * 1 = 1/3
Pr = Pr(select A as a root of a whole tree)
* Pr(tree of 0 elements because none of elements is less than A)
* Pr(select B as a root of tree of elements greater than A)
* Pr(tree of 0 elements because none of remaining elements is less than B)
* Pr(tree of 1 element because C is greater than B)
= 1/3 * 1 * 1/2 * 1 * 1 = 1/6
Cases 3, 4, 5:
Constructing any of these trees is analogous to the Case 2 because they share the same structure - you can compute the probabilities and check it.
Of course every possible BST on 3 elements is listed above, so the probability of these trees should sum up to 1, let's check it:
Pr(Case 1) + 4 * Pr(Case 2) = 1/3 + 4 * 1/6 = 1/3 + 4/6 = 1
You can figure out the answer to your second question examining the above method.