# Analyzing an algorithm with recurrence T(n) = T(n - 1) + T(n - 2) + c?

I know that this type of equations can be solved by many methods, but I want to use to use recurrence tree method to solve the equation.Can anyone show me how it is done by recurrence tree method?

Recursion trees are used to draw out the execution of a recursive algorithm. This recurrence you're describing is basically the same recurrence as the recursive Fibonacci algorithm, where this equation:

``````F(n) = F(n-1) + F(n-2)
``````

is solved for recursively, using an algorithm like this:

``````int fib(int x) {
if (x == 0)
return 0;

if (x == 1)
return 1;

return fib(x-1)+fib(x-2); //Does this recurrence look familiar?
}
``````

Which produces this tree for input 5:

``````                    5
/ \
/   \
/     \
/       \
/         \
/           \
/             \
4               3
/ \             / \
/   \           /   1
/     \         2
3       2       / \
/ \     / \     1   0
/   \   /   \
2     1 1     0
/ \
/   \
1     0
``````

Above, I have drawn a very simple recurrence tree for the Fibonacci sequence. I simply plugged in the first number (5) and continued to produce a simple tree from it's subsequent recursive calls. You can see that the height of the tree is N and the branching factor is 2, so our upper bound must be O(2^n). You can generalize this to get the answer to your specific question and any other recurrences you want to find using this method.