# scheme - remainder for fraction

Is there any function in Scheme that support the operation "div" for fraction?

meaning - 11 div 2.75 = 4.

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Your title says "remainder" but you don't seem to need that based on the body of the question. Can you clarify that please? –  Bill the Lizard Apr 18 '11 at 15:13
@Bill the Lizard - sorry bill. I mean that if I have 11 div 2.72, it also will give me result of 4, because (4*2.72) + (0.12) =11. 0.12<4. In other word, I try to find a function in Scheme that will give me the number of times number_1 is contained in number_2 when (number_1 > number_2 it will give me 0) I think that in other Programming language this operation call "div", but Im not sure. –  Tom Apr 18 '11 at 21:35

I think the answer to your question is: no, but you can define it:

``````#lang racket

(define (div a b)
(floor (/ a b)))

(div 11 2.72) ;; => 4.0
``````
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thank u, but it give me diffrent answers in the next case: (div 2 1) => 2, while (div 3.5 1.75) => 2.0. This is important, because I cant use eq? for comparing two answers. Thanks. –  Tom Apr 19 '11 at 5:24
In racket, you can wrap a call to inexact->exact around the result if you want an exact number. Also, it is not okay to use eq? to compare numbers, according to the racket documentation. Use = instead. –  John Clements Apr 19 '11 at 16:40

How about `/` ?

In MIT Scheme:

``````1 ]=> (/ 11 2.75)

;Value: 4.
``````

In Racket:

``````> (/ 11 2.75)
4.0
``````

Am I missing something here?

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Yes, My example is not so good. I mean that 11 div 2.75 =4, but also 11 div 2.72 = 4 (because 4*2.72=10.88 + mod (0.12)). –  Tom Apr 18 '11 at 21:30