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The question is as follows (same as in the title) :

What's the biggest integer n that in IEEE-754 of double precision all numbers from 0 to n are represented precisely (without rounding)?

I've been thinkin about it for some time now and couldn't think of the right solution. Could you help me? :)

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marked as duplicate by Pascal Cuoq, Eric Postpischil, Hans Passant, Mark Dickinson, Brett Hale Jun 23 '13 at 10:03

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

Not a Dup. This is talking about doubles, while the other is talking about float. There some bits of difference between the two. –  EvilTeach Jun 22 '13 at 15:10
@EvilTeach The answer covers doubles. –  Pascal Cuoq Jun 22 '13 at 16:15

1 Answer 1

The answer for the largest integer that can be accurately represented has already been given.

Maybe you are curious about the smallest integer that can not be represented:

9,007,199,254,740,993 (2^53 + 1)

It is smaller because the integers that can be represented exactly by double (binary64) are not contiguous.

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@Gabe thanks Gabe, copy-paste lost the ^. –  eznme Jun 22 '13 at 13:51
The value 9,007,199,791,611,905 is even more interesting. That is the smallest whole number n such that (float)(double)n will not yield the float which is closest to n. –  supercat Jun 23 '13 at 4:12

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