bio | website | |
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location | Boston, MA | |
age | ||
visits | member for | 5 years, 9 months |
seen | Dec 20 at 23:59 | |
stats | profile views | 2,262 |
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May 17 |
revised |
Which floor is redundant in floor(sqrt(floor(x)))?
edited Title |
May 17 |
comment |
Which floor is redundant in floor(sqrt(floor(x)))?
I am sorry the question is still open. Could you edit it with your proof? |
May 17 |
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Which floor is redundant in floor(sqrt(floor(x)))?
Wow. Is there a hole in the solution? |
May 17 |
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Which floor is redundant in floor(sqrt(floor(x)))?
There were a lot of good proofs but this one is the sweetest. Thanks. |
May 17 |
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Fractional Part of the number question
Sweet. But this looks like pkaeding's algorithm optimized. Am i correct? |
May 17 |
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Which floor is redundant in floor(sqrt(floor(x)))?
Macker is wrong. |
May 17 |
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Which floor is redundant in floor(sqrt(floor(x)))?
Does your solution imply that an inner ceiling would also be redundant? |
May 17 |
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Which floor is redundant in floor(sqrt(floor(x)))?
the bla bla was trying to convince ourselves that it is true. |
May 17 |
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Which floor is redundant in floor(sqrt(floor(x)))?
the question really is why for the second part. |
May 17 |
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Which floor is redundant in floor(sqrt(floor(x)))?
I too tried out examples and feel it in my gut that the inner one is redundant but its damn hard to prove that i am correct. |
May 17 |
asked | Which floor is redundant in floor(sqrt(floor(x)))? |
May 17 |
comment |
Fractional Part of the number question
This is very interesting. I like the part where you check if the number is positive. I hadnt thought about that. I had hoped somebody would come with math tricks and even though subtracting one is quite tedious, i think this solution works. Thanks. |
May 17 |
revised |
Fractional Part of the number question
added 95 characters in body |
May 17 |
comment |
Fractional Part of the number question
what further info do you need? I was thinking in the same line. There has to be a neat mathematical procedure to solve this question. There arent any other constraints. Just figure out the part needed to round the number to the nearest integer. The more primitive the math operations the better. |
May 17 |
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Fractional Part of the number question
I dont think dividing by 0.5(multiplying by 2) will work. |
May 17 |
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Fractional Part of the number question
You can take 0.5 eitherway no problem. |
May 17 |
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Fractional Part of the number question
The algorithm is clever if x %1 >= 0.5 print ((x- x%1) + 1) -x else print x%1 end Can you please think of anothersolution without the %? |
May 17 |
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Fractional Part of the number question
Please no calls to somebody else's function. |
May 17 |
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Fractional Part of the number question
Sorry no castings. |
May 17 |
accepted | Functions Property Question |