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Python. Why error float?
a=0.005 b=5 print(b//a) Why 999.0?
10 odpowiedzi
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Коко Ша ,
The floor division operator // produces a float if either operand is a float or both operands are floats. The only time it produces int is if both operands are int.
Don't believe the comments in that part of the Introduction to Python course that make the wrong assumption that since / produces float, // must produce int. They're dead wrong, and the lesson never says that.
Get the definitive truth from the source below. Scroll down to the table and read the footnotes about //.
https://docs.python.org/3/library/stdtypes.html#numeric-types-int-float-complex
+ 4
Коко Ша ,
Ah.
I can't be sure, but I suspect the reason has to do with tiny binary floating point errors.
I've been told by other people here that tiny floating point errors are a real problem with all binary processors and that there are libraries written for various languages to try to work around it.
Probably somewhere in the chain of processor operations leading to the answer, the value happened to be something like this because of a tiny error.
999.9999999999994
That then got rounded toward negative infinity to 999.0.
Here's what python.org has to say about the problem in general.
https://docs.python.org/3/tutorial/floatingpoint.html#floating-point-arithmetic-issues-and-limitations
+ 2
0.5 is a power of two (2 to the power of negative 1) and can be stored without loss.
To be more precise, 0.5 has a finite number of digits in base 2, or binary number system. Even more precise, the number of digits is finite and fewer than can be stored in 32 (64) bits.
+ 2
Коко Ша ,
The link in my second post explained how binary is capable of perfectly expressing any fraction composed of negative powers of 2 (given enough bits). Similar to what Gordie said.
Negative powers of any other primes are impossible to express in binary and can only be approximated.
Take this binary floating-point number.
111.111
From the leftmost place to the rightmost place, these are the equivalent values of each in decimal.
2^(2) = 4/1 = 4
2^(1) = 2/1 = 2
2^(0) = 1/1 = 1
.
2^(-1) = 1/2 = 0.5
2^(-2) = 1/4 = 0.25
2^(-3) = 1/8 = 0.125
Add them up, and you get
7 and 7/8
or
7.875.
That can be expressed perfectly in binary.
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Maybe this post gives you inspiration.
https://www.sololearn.com/Discuss/3249016/?ref=app
+ 1
I might be wrong but i believe the question is why 5/0.005 is 999 and not 1000...
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Gordie , you are right
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Rain ,
I asked why answer is 999.0
Not 1000.0?
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Rain
Why if a=0.5
Result will 10.0?
not 9.0
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Esta bien chica la app