# How to find the minimum positive number that added to 1.0 gives something larger?

While translating some Fortran to Scheme/Racket I have come across the function:

``````; EPSILON(X)      The  least  positive  number  that added
;                 to 1 returns a number that is greater than 1
``````

How do I find the number in Scheme?

-

``````#lang racket/base

;; http://en.wikipedia.org/wiki/Machine_epsilon
;; approximates the machine epsilon

(require racket/flonum)

(define (compute-machine-epsilon)
(let loop ([n 1.0])
(define next-n (fl/ n 2.0))
(if (fl= 1.0 (fl+ 1.0 next-n))
n
(loop next-n))))
``````
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Correct, the only thing to look out for is that this assumes we have a base 2 number. There may be cases in other programming languages that it is a BCD. –  Thorsten S. Jul 11 '12 at 14:48

Assuming you're using IEEE-754 floating-point (which may not be the case in Scheme, I don't know), then the machine epsilon is well known: for double-precision arithmetic, it's `1.11e-16`.

For other platforms or floating-point implementations, Wikipedia shows the formula to compute it as (in Haskell):

``````main = print . last . map (subtract 1) . takeWhile (/= 1) . map (+ 1) . iterate (/2) \$ 1
``````
-

This is not a new answer -- it just bothers me that Danny's code makes it look like it's hard to do this kind of thing... it could be simplified to

``````(let loop ([n 1.0])
(if (= 1 (+ 1 (/ n 2)))
n
(loop (/ n 2))))
``````
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Maybe I should talk Neil into adding machine-epsilon to racket/math ? –  soegaard Jul 9 '12 at 22:02
IIUC, there are a whole bunch of these useful things, right? He might have some of them in the plot library already. –  Eli Barzilay Jul 9 '12 at 22:13
Could be. The Science Collection has machine-epsilon already. –  soegaard Jul 9 '12 at 22:30