How can an open-form of recurrence be converted into its equivalent closedform. Furthermore, what are some commonly used closed-forms that are usually used efficiently.
I think you are talking about recursive functions and math.
e.g. consider the following sum recursive function
this form is not closed. A closed form is
For your question, how to convert a open-form formula into a closed form. The answer is there is no general rule to transform all open-form into closed form because some of the open forms don't have equivalent closed forms.
You may refer to Concrete Mathematics for a serious treatment of this subject. The book's primary goal is to convert a large family of recursive function/open forms into their closed forms.
An open form is normally given as an equation that is to be solved. For example,
To convert it into closed form, you solve the recurrence relation. In this case, repeated substitution until you reach the base case gives you
This is more efficient, because powers can be evaluated in logarithmic time in n (i.e. proportional to log n) whereas the original recurrence relation takes time linear in n.
There are many techniques used to solve recurrence relations. Some examples can be found in the wikipedia article. It is important to realise that not all recurrence relations can be solved, however - in fact, most cannot be solved (which is why programming is important!)