Each successive recursive call for `palidrome`

should bring you closer to the base-case which is here:

```
if (i == 0) return "S";
if (i == 1) return "T";
```

so theoritcally saying

palidrome(i-1) and palidrome(i-2) will never reach (i == 0) or (i ==
1)

is wrong as those statements will be eventually reached but after the `i`

changes to satisfy the condition.

How would var `i`

change you are probably wondering! well through this statement:

```
return palidrome(i-2)
+ palidrome(i-1)
+ palidrome(i-2);
```

Here you are calling `palidrome`

recursively but (`i`

is decreased), this will eventually lead you to the **base-case**.

if your function never hit the `base-case`

then you'll have an infinite recursion and this is not the case over here.

**To simplify things lets take a look at this Example:**

assume that you have a generous neighbor that will give you one apple if you visit him once, also another one if you visit him twice then he'll start giving you as mush as he gave you that last 2 times (that's actually a `fibonacci`

sequence) so the **general-case** here is:
`numberOfApplesThatYouGet= numberOfApplesThatYou'veGotIn(currentVisitNumber-1(Which is Last Visit))+numberOfApplesThatYou'veGotIn(currentVisitNumber-2)`

and lets assume that
`currentVisitNumber = n and numberOfApplesThatYouGet = a method called fib`

so **general rule** would be -->

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

But we still need a `base-case`

to terminate an infinite recursion and here the **base-case** is your first visit condition which is

```
if(n==0) return 0;//if you didn't visit him you'll get nothing
if(n==1) return 1;//if you did you'll get an apple
```

so the Method will look like this:

```
public int fib(int n) {
if(n == 0)
return 0;
else if(n == 1)
return 1;
else
return fib(n - 1) + fib(n - 2);
}
```

lets assume that you bare him three visits, how many apples would you get?

```
fib(3)->fib(2)+fib(1)
fib(2)->fib(1)+fib(0)->1+0->1
fib(1)->1
1+1=2
#done
```

Also take a look at this to form a better understanding of recursion.

"palidrome(i-1) and palidrome(i-2) will never reach (i == 0) or (i == 1)".. this is correct, it doesn't satisfy these checks, but your method doesn't stop there, so keep reading it ... Also this code is incomplete, since it can't handle negative`i`

values.