So everybody seems to agree that i need to convert this to iterative... can anybody give some code? I can't seem to write any iterative code that works...
Are you asking for a fish, or asking to be taught how to catch fish? If the point of this exercise is to learn how to convert recursive code to iterative code then you're not well served by just getting the answer.
To convert recursive code to iterative code there are lots of possible ways to do it. The easiest way in this case is to simply work out the pattern. What does the code do? It computes:
(1 + 1 / (2.0 * 1 + 1)) *
(1 + 2 / (2.0 * 2 + 1)) *
(1 + 3 / (2.0 * 3 + 1)) *
(1 + 4 / (2.0 * 4 + 1)) *
(1 + 5 / (2.0 * 5 + 1)) *
(1 + 6 / (2.0 * 6 + 1)) *
(1 + 7 / (2.0 * 7 + 1)) *
(1 + 9999/ (2.0 * 9999+ 1)) *
Now can you write a loop that computes that? Sure.
double product = 1.0;
for (int i = 9999; i >= 0; --i)
product *= (1 + i / (2.0 * i + 1));
That's the easiest way to do it. But there are lots of ways to solve this problem.
You could use an aggregator. Consider the "total" operation; that's an example of an aggregator. You have a sequence of things and you keep a running total of them, accumulating the result in an accumulator. The standard query operators have an aggregation operation supplied for you:
double seed = 1.0;
(product, i) => product * (1 + i / (2.0 * i + 1))
Or, you could keep your algorithm recursive but eliminate the stack overflow by:
- building your own stack structure on the heap
- defining a virtual machine, writing your program in the virtual machine language, and then implementing the virtual machine to keep its stack on the heap.
- rewriting your program in Continuation Passing Style; every step along the way then returns a continuation to the caller, which invokes the next continuation; the stack never gets deep
Explaining those techniques takes too long for one answer. I have a six-part blog series on how to use those techniques to turn recursive programs into programs that don't consume much stack; start reading it here: