# Tail Recursive function or not

Can anyone help me with this please?

``````(define f (lambda (x)
(cond
((null? x) 0)
(#t (+ (* (car x) (car x)) (f (cdr x)))))))
``````

I couldn't understand if this function is tail recursive or not? If it is, what is the reason?

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No, you have to keep the results of (* (car x) (car x)) on the stack while you wait for (f (cdr x)) to be evaluated. In a tail call you could throw it away and get the same answer. –  WorBlux Jul 30 '13 at 0:55

It's not tail recursive because the last thing the function does before returning is to evaluate `(+ ...)`. In order to be tail recursive the last operation before returning has to be the recursive call.

Making a function tail recursive usually involves a helper function which takes an accumulator parameter:

``````(define f0 (lambda (x acc)
(if (null? x)
acc
(f0 (cdr x) (+ acc (* (car x)(car x)))))))

(define f (lambda (x)
(f0 x 0)))
``````
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Ok thanks for your help. –  user2631892 Jul 29 '13 at 21:34
Hey can you please provide the tail recursive code so i can understand it more easily. –  user2631892 Jul 29 '13 at 22:02
I get it now. Thankyou so much. –  user2631892 Jul 29 '13 at 23:11
You don't need an aculumulator per se, just some way to pass the state of the recursion along to the next call. –  WorBlux Jul 30 '13 at 0:58