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I am trying to find the largest cube root that is a whole number, that is less than 12,000.

processing = True
n = 12000
while processing:
    n -= 1
    if n ** (1/3) == #checks to see if this has decimals or not

I am not sure how to check if it is a whole number or not though! I could convert it to a string then use indexing to check the end values and see whether they are zero or not, that seems rather cumbersome though. Is there a simpler way?

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it would make it easier to work from the cube root n --> (n * n * n < 12000) –  suspectus Feb 5 at 17:09

5 Answers 5

up vote 23 down vote accepted

To check if a float value is a whole number, use the float.is_integer() method:

>>> (1.0).is_integer()
True
>>> (1.555).is_integer()
False

The method was added to the float type in Python 2.6.

Take into account that in Python 2, 1/3 is 0 (floor division for integer operands!), and that floating point arithmetic can be imprecise (a float is an approximation using binary fractions, not a precise real number). But adjusting your loop a little this gives:

>>> for n in range(12000, -1, -1):
...     if (n ** (1.0/3)).is_integer():
...         print n
... 
27
8
1
0

which means that anything over 3 cubed, (including 10648) was missed out due to the aforementioned imprecision:

>>> (4**3) ** (1.0/3)
3.9999999999999996
>>> 10648 ** (1.0/3)
21.999999999999996

You'd have to check for numbers close to the whole number instead, or not use float() to find your number. Like rounding down the cube root of 12000:

>>> int(12000 ** (1.0/3))
22
>>> 22 ** 3
10648
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1  
Oh, how have I never seen that! –  Juri Robl Feb 5 at 17:10
    
never know this !! –  zhangxaochen Feb 5 at 17:10
    
Martijin Pieters teaches me something new almost every day :P –  Joran Beasley Feb 5 at 17:13
    
Not knowing python, this sort of statement would make me nervous as it seems to require perfect math to work in the real world. –  Peter M Feb 5 at 17:16
    
@PeterM: The method indeed only returns True if there are no decimals at all. There may be a misunderstanding on the part of the OP about floating point arithmetic and precision, of course. –  Martijn Pieters Feb 5 at 17:17

You could use this:

if k == int(k):
    print(str(k) + "is a whole number!"
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it fails for larger numbers while .is_integer() continues to work. –  J.F. Sebastian Oct 19 at 11:49
    
Your link IMHO doesn't show that it doesn't work. It just shows that large floats lose precision. is_integer uses a similar method (o = (floor(x) == x) ? Py_True : Py_False;). But I agree, one should use is_integer() as it is much clearer. –  Juri Robl Oct 19 at 11:57
    
yes. It just shows that large float may lose precision i.e., large_float == large_int may fail even if large_float == float(large_int). –  J.F. Sebastian Oct 19 at 12:11
    
Do you have an example where it fails? I tested it with large numbers (e.g. the one in your link) and for them it works. –  Juri Robl Oct 19 at 12:14
    
123456789012345678901234567890.0 != 123456789012345678901234567890 but 123456789012345678901234567890.0 == float(123456789012345678901234567890) –  J.F. Sebastian Oct 19 at 12:33

You don't need to loop or to check anything. Just take a cube root of 12,000 and round it down:

r = int(12000**(1/3.0))
print r*r*r # 10648
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This is a reasonable answer. –  hughdbrown Feb 5 at 17:38

Wouldn't it be easier to test the cube roots? Start with 20 (20**3 = 8000) and go up to 30 (30**3 = 27000). Then you have to test fewer than 10 integers.

for i in range(20, 30):
    print("Trying {0}".format(i))
    if i ** 3 > 12000:
        print("Maximum integral cube root less than 12000: {0}".format(i - 1))
        break
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Moreover, floats have round-off errors so that you can miss number when calculating if n**(1/3) is integer. For example on my computer ` 10648**(1/3)=21.999999999999996 ` instead of 22: problem! With this answer's method there is no such problem. I think this is the only correct solution from a mathematic point of view (others solutions are Python-correct). –  JPG Feb 5 at 17:16

You can use a modulo operation for that.

if (n ** (1.0/3)) % 1 != 0:
    print("We have a decimal number here!")
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