Format of complex number in Python - python

I am wondering about the way Python (3.3.0) prints complex numbers. I am looking for an explanation, not a way to change the print.
Example:
>>> complex(1,1)-complex(1,1)
0j
Why doesn't it just print "0"? My guess is: to keep the output of type complex.
Next example:
>>> complex(0,1)*-1
(-0-1j)
Well, a simple "-1j" or "(-1j)" would have done. And why "-0"?? Isn't that the same as +0? It doesn't seem to be a rounding problem:
>>> (complex(0,1)*-1).real == 0.0
True
And when the imaginary part gets positive, the -0 vanishes:
>>> complex(0,1)
1j
>>> complex(0,1)*-1
(-0-1j)
>>> complex(0,1)*-1*-1
1j
Yet another example:
>>> complex(0,1)*complex(0,1)*-1
(1-0j)
>>> complex(0,1)*complex(0,1)*-1*-1
(-1+0j)
>>> (complex(0,1)*complex(0,1)*-1).imag
-0.0
Am I missing something here?

It prints 0j to indicate that it's still a complex value. You can also type it back in that way:
>>> 0j
0j
The rest is probably the result of the magic of IEEE 754 floating point representation, which makes a distinction between 0 and -0, the so-called signed zero. Basically, there's a single bit that says whether the number is positive or negative, regardless of whether the number happens to be zero. This explains why 1j * -1 gives something with a negative zero real part: the positive zero got multiplied by -1.
-0 is required by the standard to compare equal to +0, which explains why (1j * -1).real == 0.0 still holds.
The reason that Python still decides to print the -0, is that in the complex world these make a difference for branch cuts, for instance in the phase function:
>>> phase(complex(-1.0, 0.0))
3.141592653589793
>>> phase(complex(-1.0, -0.0))
-3.141592653589793
This is about the imaginary part, not the real part, but it's easy to imagine situations where the sign of the real part would make a similar difference.

The answer lies in the Python source code itself.
I'll work with one of your examples. Let
a = complex(0,1)
b = complex(-1, 0)
When you doa*b you're calling this function:
real_part = a.real*b.real - a.imag*b.imag
imag_part = a.real*b.imag + a.imag*b.real
And if you do that in the python interpreter, you'll get
>>> real_part
-0.0
>>> imag_part
-1.0
From IEEE754, you're getting a negative zero, and since that's not +0, you get the parens and the real part when printing it.
if (v->cval.real == 0. && copysign(1.0, v->cval.real)==1.0) {
/* Real part is +0: just output the imaginary part and do not
include parens. */
...
else {
/* Format imaginary part with sign, real part without. Include
parens in the result. */
...
I guess (but I don't know for sure) that the rationale comes from the importance of that sign when calculating with elementary complex functions (there's a reference for this in the wikipedia article on signed zero).

0j is an imaginary literal which indeed indicates a complex number rather than an integer or floating-point one.
The +-0 ("signed zero") is a result of Python's conformance to IEEE 754 floating point representation since in Python, complex is by definition a pair of floating point numbers. Due to the latter, there's no need to print or specify zero fraction parts for a complex too.
The -0 part is printed in order to accurately represent the contents as repr()'s documentation demands (repr() is implicitly called whenever an operation's result is output to the console).
Regarding the question why (-0+1j) = 1j but (1j*-1) = (-0+1j).
Note that (-0+0j) or (-0.0+0j) aren't single complex numbers but expressions - an int/float added to a complex. To compute the result, first the first number is converted to a complex (-0-> (0.0,0.0) since integers don't have signed zeros, -0.0-> (-0.0,0.0)). Then its .real and .imag are added to the corresponding ones of 1j which are (+0.0,1.0). The result is (+0.0,1.0) :^) . To construct a complex directly, use complex(-0.0,1).

As far as the first question is concerned: if it just printed 0 it would be mathematically correct, but you wouldn't know you were dealing with a complex object vs an int. As long as you don't specify .real you will always get a J component.
I'm not sure why you would ever get -0; it's not technically incorrect (-1 * 0 = 0) but it's syntactically odd.
As far as the rest goes, it's strange that it isn't consistent, however none are technically correct, just an artifact of the implementation.

Related

Testing a "very close number" in Python with doctest [duplicate]

It's well known that comparing floats for equality is a little fiddly due to rounding and precision issues.
For example: Comparing Floating Point Numbers, 2012 Edition
What is the recommended way to deal with this in Python?
Is a standard library function for this somewhere?
Python 3.5 adds the math.isclose and cmath.isclose functions as described in PEP 485.
If you're using an earlier version of Python, the equivalent function is given in the documentation.
def isclose(a, b, rel_tol=1e-09, abs_tol=0.0):
return abs(a-b) <= max(rel_tol * max(abs(a), abs(b)), abs_tol)
rel_tol is a relative tolerance, it is multiplied by the greater of the magnitudes of the two arguments; as the values get larger, so does the allowed difference between them while still considering them equal.
abs_tol is an absolute tolerance that is applied as-is in all cases. If the difference is less than either of those tolerances, the values are considered equal.
Something as simple as the following may be good enough:
return abs(f1 - f2) <= allowed_error
I would agree that Gareth's answer is probably most appropriate as a lightweight function/solution.
But I thought it would be helpful to note that if you are using NumPy or are considering it, there is a packaged function for this.
numpy.isclose(a, b, rtol=1e-05, atol=1e-08, equal_nan=False)
A little disclaimer though: installing NumPy can be a non-trivial experience depending on your platform.
Use Python's decimal module, which provides the Decimal class.
From the comments:
It is worth noting that if you're
doing math-heavy work and you don't
absolutely need the precision from
decimal, this can really bog things
down. Floats are way, way faster to
deal with, but imprecise. Decimals are
extremely precise but slow.
The common wisdom that floating-point numbers cannot be compared for equality is inaccurate. Floating-point numbers are no different from integers: If you evaluate "a == b", you will get true if they are identical numbers and false otherwise (with the understanding that two NaNs are of course not identical numbers).
The actual problem is this: If I have done some calculations and am not sure the two numbers I have to compare are exactly correct, then what? This problem is the same for floating-point as it is for integers. If you evaluate the integer expression "7/3*3", it will not compare equal to "7*3/3".
So suppose we asked "How do I compare integers for equality?" in such a situation. There is no single answer; what you should do depends on the specific situation, notably what sort of errors you have and what you want to achieve.
Here are some possible choices.
If you want to get a "true" result if the mathematically exact numbers would be equal, then you might try to use the properties of the calculations you perform to prove that you get the same errors in the two numbers. If that is feasible, and you compare two numbers that result from expressions that would give equal numbers if computed exactly, then you will get "true" from the comparison. Another approach is that you might analyze the properties of the calculations and prove that the error never exceeds a certain amount, perhaps an absolute amount or an amount relative to one of the inputs or one of the outputs. In that case, you can ask whether the two calculated numbers differ by at most that amount, and return "true" if they are within the interval. If you cannot prove an error bound, you might guess and hope for the best. One way of guessing is to evaluate many random samples and see what sort of distribution you get in the results.
Of course, since we only set the requirement that you get "true" if the mathematically exact results are equal, we left open the possibility that you get "true" even if they are unequal. (In fact, we can satisfy the requirement by always returning "true". This makes the calculation simple but is generally undesirable, so I will discuss improving the situation below.)
If you want to get a "false" result if the mathematically exact numbers would be unequal, you need to prove that your evaluation of the numbers yields different numbers if the mathematically exact numbers would be unequal. This may be impossible for practical purposes in many common situations. So let us consider an alternative.
A useful requirement might be that we get a "false" result if the mathematically exact numbers differ by more than a certain amount. For example, perhaps we are going to calculate where a ball thrown in a computer game traveled, and we want to know whether it struck a bat. In this case, we certainly want to get "true" if the ball strikes the bat, and we want to get "false" if the ball is far from the bat, and we can accept an incorrect "true" answer if the ball in a mathematically exact simulation missed the bat but is within a millimeter of hitting the bat. In that case, we need to prove (or guess/estimate) that our calculation of the ball's position and the bat's position have a combined error of at most one millimeter (for all positions of interest). This would allow us to always return "false" if the ball and bat are more than a millimeter apart, to return "true" if they touch, and to return "true" if they are close enough to be acceptable.
So, how you decide what to return when comparing floating-point numbers depends very much on your specific situation.
As to how you go about proving error bounds for calculations, that can be a complicated subject. Any floating-point implementation using the IEEE 754 standard in round-to-nearest mode returns the floating-point number nearest to the exact result for any basic operation (notably multiplication, division, addition, subtraction, square root). (In case of tie, round so the low bit is even.) (Be particularly careful about square root and division; your language implementation might use methods that do not conform to IEEE 754 for those.) Because of this requirement, we know the error in a single result is at most 1/2 of the value of the least significant bit. (If it were more, the rounding would have gone to a different number that is within 1/2 the value.)
Going on from there gets substantially more complicated; the next step is performing an operation where one of the inputs already has some error. For simple expressions, these errors can be followed through the calculations to reach a bound on the final error. In practice, this is only done in a few situations, such as working on a high-quality mathematics library. And, of course, you need precise control over exactly which operations are performed. High-level languages often give the compiler a lot of slack, so you might not know in which order operations are performed.
There is much more that could be (and is) written about this topic, but I have to stop there. In summary, the answer is: There is no library routine for this comparison because there is no single solution that fits most needs that is worth putting into a library routine. (If comparing with a relative or absolute error interval suffices for you, you can do it simply without a library routine.)
math.isclose() has been added to Python 3.5 for that (source code). Here is a port of it to Python 2. It's difference from one-liner of Mark Ransom is that it can handle "inf" and "-inf" properly.
def isclose(a, b, rel_tol=1e-09, abs_tol=0.0):
'''
Python 2 implementation of Python 3.5 math.isclose()
https://github.com/python/cpython/blob/v3.5.10/Modules/mathmodule.c#L1993
'''
# sanity check on the inputs
if rel_tol < 0 or abs_tol < 0:
raise ValueError("tolerances must be non-negative")
# short circuit exact equality -- needed to catch two infinities of
# the same sign. And perhaps speeds things up a bit sometimes.
if a == b:
return True
# This catches the case of two infinities of opposite sign, or
# one infinity and one finite number. Two infinities of opposite
# sign would otherwise have an infinite relative tolerance.
# Two infinities of the same sign are caught by the equality check
# above.
if math.isinf(a) or math.isinf(b):
return False
# now do the regular computation
# this is essentially the "weak" test from the Boost library
diff = math.fabs(b - a)
result = (((diff <= math.fabs(rel_tol * b)) or
(diff <= math.fabs(rel_tol * a))) or
(diff <= abs_tol))
return result
I'm not aware of anything in the Python standard library (or elsewhere) that implements Dawson's AlmostEqual2sComplement function. If that's the sort of behaviour you want, you'll have to implement it yourself. (In which case, rather than using Dawson's clever bitwise hacks you'd probably do better to use more conventional tests of the form if abs(a-b) <= eps1*(abs(a)+abs(b)) + eps2 or similar. To get Dawson-like behaviour you might say something like if abs(a-b) <= eps*max(EPS,abs(a),abs(b)) for some small fixed EPS; this isn't exactly the same as Dawson, but it's similar in spirit.
If you want to use it in testing/TDD context, I'd say this is a standard way:
from nose.tools import assert_almost_equals
assert_almost_equals(x, y, places=7) # The default is 7
In terms of absolute error, you can just check
if abs(a - b) <= error:
print("Almost equal")
Some information of why float act weird in Python:
Python 3 Tutorial 03 - if-else, logical operators and top beginner mistakes
You can also use math.isclose for relative errors.
This is useful for the case where you want to make sure two numbers are the same 'up to precision', and there isn't any need to specify the tolerance:
Find minimum precision of the two numbers
Round both of them to minimum precision and compare
def isclose(a, b):
astr = str(a)
aprec = len(astr.split('.')[1]) if '.' in astr else 0
bstr = str(b)
bprec = len(bstr.split('.')[1]) if '.' in bstr else 0
prec = min(aprec, bprec)
return round(a, prec) == round(b, prec)
As written, it only works for numbers without the 'e' in their string representation (meaning 0.9999999999995e-4 < number <= 0.9999999999995e11)
Example:
>>> isclose(10.0, 10.049)
True
>>> isclose(10.0, 10.05)
False
For some of the cases where you can affect the source number representation, you can represent them as fractions instead of floats, using integer numerator and denominator. That way you can have exact comparisons.
See Fraction from fractions module for details.
I liked Sesquipedal's suggestion, but with modification (a special use case when both values are 0 returns False). In my case, I was on Python 2.7 and just used a simple function:
if f1 ==0 and f2 == 0:
return True
else:
return abs(f1-f2) < tol*max(abs(f1),abs(f2))
If you want to do it in a testing or TDD context using the pytest package, here's how:
import pytest
PRECISION = 1e-3
def assert_almost_equal():
obtained_value = 99.99
expected_value = 100.00
assert obtained_value == pytest.approx(expected_value, PRECISION)
I found the following comparison helpful:
str(f1) == str(f2)
To compare up to a given decimal without atol/rtol:
def almost_equal(a, b, decimal=6):
return '{0:.{1}f}'.format(a, decimal) == '{0:.{1}f}'.format(b, decimal)
print(almost_equal(0.0, 0.0001, decimal=5)) # False
print(almost_equal(0.0, 0.0001, decimal=4)) # True
This maybe is a bit ugly hack, but it works pretty well when you don't need more than the default float precision (about 11 decimals).
The round_to function uses the format method from the built-in str class to round up the float to a string that represents the float with the number of decimals needed, and then applies the eval built-in function to the rounded float string to get back to the float numeric type.
The is_close function just applies a simple conditional to the rounded up float.
def round_to(float_num, prec):
return eval("'{:." + str(int(prec)) + "f}'.format(" + str(float_num) + ")")
def is_close(float_a, float_b, prec):
if round_to(float_a, prec) == round_to(float_b, prec):
return True
return False
>>>a = 10.0
10.0
>>>b = 10.0001
10.0001
>>>print is_close(a, b, prec=3)
True
>>>print is_close(a, b, prec=4)
False
Update:
As suggested by #stepehjfox, a cleaner way to build a rount_to function avoiding "eval" is using nested formatting:
def round_to(float_num, prec):
return '{:.{precision}f}'.format(float_num, precision=prec)
Following the same idea, the code can be even simpler using the great new f-strings (Python 3.6+):
def round_to(float_num, prec):
return f'{float_num:.{prec}f}'
So, we could even wrap it up all in one simple and clean 'is_close' function:
def is_close(a, b, prec):
return f'{a:.{prec}f}' == f'{b:.{prec}f}'
If you want to compare floats, the options above are great, but in my case, I ended up using Enum's, since I only had few valid floats my use case was accepting.
from enum import Enum
class HolidayMultipliers(Enum):
EMPLOYED_LESS_THAN_YEAR = 2.0
EMPLOYED_MORE_THAN_YEAR = 2.5
Then running:
testable_value = 2.0
HolidayMultipliers(testable_value)
If the float is valid, it's fine, but otherwise it will just throw an ValueError.
Use == is a simple good way, if you don't care about tolerance precisely.
# Python 3.8.5
>>> 1.0000000000001 == 1
False
>>> 1.00000000000001 == 1
True
But watch out for 0:
>>> 0 == 0.00000000000000000000000000000000000000000001
False
The 0 is always the zero.
Use math.isclose if you want to control the tolerance.
The default a == b is equivalent to math.isclose(a, b, rel_tol=1e-16, abs_tol=0).
If you still want to use == with a self-defined tolerance:
>>> class MyFloat(float):
def __eq__(self, another):
return math.isclose(self, another, rel_tol=0, abs_tol=0.001)
>>> a == MyFloat(0)
>>> a
0.0
>>> a == 0.001
True
So far, I didn't find anywhere to config it globally for float. Besides, mock is also not working for float.__eq__.

The tolerance of using `==` to compare floating numbers in Python [duplicate]

It's well known that comparing floats for equality is a little fiddly due to rounding and precision issues.
For example: Comparing Floating Point Numbers, 2012 Edition
What is the recommended way to deal with this in Python?
Is a standard library function for this somewhere?
Python 3.5 adds the math.isclose and cmath.isclose functions as described in PEP 485.
If you're using an earlier version of Python, the equivalent function is given in the documentation.
def isclose(a, b, rel_tol=1e-09, abs_tol=0.0):
return abs(a-b) <= max(rel_tol * max(abs(a), abs(b)), abs_tol)
rel_tol is a relative tolerance, it is multiplied by the greater of the magnitudes of the two arguments; as the values get larger, so does the allowed difference between them while still considering them equal.
abs_tol is an absolute tolerance that is applied as-is in all cases. If the difference is less than either of those tolerances, the values are considered equal.
Something as simple as the following may be good enough:
return abs(f1 - f2) <= allowed_error
I would agree that Gareth's answer is probably most appropriate as a lightweight function/solution.
But I thought it would be helpful to note that if you are using NumPy or are considering it, there is a packaged function for this.
numpy.isclose(a, b, rtol=1e-05, atol=1e-08, equal_nan=False)
A little disclaimer though: installing NumPy can be a non-trivial experience depending on your platform.
Use Python's decimal module, which provides the Decimal class.
From the comments:
It is worth noting that if you're
doing math-heavy work and you don't
absolutely need the precision from
decimal, this can really bog things
down. Floats are way, way faster to
deal with, but imprecise. Decimals are
extremely precise but slow.
The common wisdom that floating-point numbers cannot be compared for equality is inaccurate. Floating-point numbers are no different from integers: If you evaluate "a == b", you will get true if they are identical numbers and false otherwise (with the understanding that two NaNs are of course not identical numbers).
The actual problem is this: If I have done some calculations and am not sure the two numbers I have to compare are exactly correct, then what? This problem is the same for floating-point as it is for integers. If you evaluate the integer expression "7/3*3", it will not compare equal to "7*3/3".
So suppose we asked "How do I compare integers for equality?" in such a situation. There is no single answer; what you should do depends on the specific situation, notably what sort of errors you have and what you want to achieve.
Here are some possible choices.
If you want to get a "true" result if the mathematically exact numbers would be equal, then you might try to use the properties of the calculations you perform to prove that you get the same errors in the two numbers. If that is feasible, and you compare two numbers that result from expressions that would give equal numbers if computed exactly, then you will get "true" from the comparison. Another approach is that you might analyze the properties of the calculations and prove that the error never exceeds a certain amount, perhaps an absolute amount or an amount relative to one of the inputs or one of the outputs. In that case, you can ask whether the two calculated numbers differ by at most that amount, and return "true" if they are within the interval. If you cannot prove an error bound, you might guess and hope for the best. One way of guessing is to evaluate many random samples and see what sort of distribution you get in the results.
Of course, since we only set the requirement that you get "true" if the mathematically exact results are equal, we left open the possibility that you get "true" even if they are unequal. (In fact, we can satisfy the requirement by always returning "true". This makes the calculation simple but is generally undesirable, so I will discuss improving the situation below.)
If you want to get a "false" result if the mathematically exact numbers would be unequal, you need to prove that your evaluation of the numbers yields different numbers if the mathematically exact numbers would be unequal. This may be impossible for practical purposes in many common situations. So let us consider an alternative.
A useful requirement might be that we get a "false" result if the mathematically exact numbers differ by more than a certain amount. For example, perhaps we are going to calculate where a ball thrown in a computer game traveled, and we want to know whether it struck a bat. In this case, we certainly want to get "true" if the ball strikes the bat, and we want to get "false" if the ball is far from the bat, and we can accept an incorrect "true" answer if the ball in a mathematically exact simulation missed the bat but is within a millimeter of hitting the bat. In that case, we need to prove (or guess/estimate) that our calculation of the ball's position and the bat's position have a combined error of at most one millimeter (for all positions of interest). This would allow us to always return "false" if the ball and bat are more than a millimeter apart, to return "true" if they touch, and to return "true" if they are close enough to be acceptable.
So, how you decide what to return when comparing floating-point numbers depends very much on your specific situation.
As to how you go about proving error bounds for calculations, that can be a complicated subject. Any floating-point implementation using the IEEE 754 standard in round-to-nearest mode returns the floating-point number nearest to the exact result for any basic operation (notably multiplication, division, addition, subtraction, square root). (In case of tie, round so the low bit is even.) (Be particularly careful about square root and division; your language implementation might use methods that do not conform to IEEE 754 for those.) Because of this requirement, we know the error in a single result is at most 1/2 of the value of the least significant bit. (If it were more, the rounding would have gone to a different number that is within 1/2 the value.)
Going on from there gets substantially more complicated; the next step is performing an operation where one of the inputs already has some error. For simple expressions, these errors can be followed through the calculations to reach a bound on the final error. In practice, this is only done in a few situations, such as working on a high-quality mathematics library. And, of course, you need precise control over exactly which operations are performed. High-level languages often give the compiler a lot of slack, so you might not know in which order operations are performed.
There is much more that could be (and is) written about this topic, but I have to stop there. In summary, the answer is: There is no library routine for this comparison because there is no single solution that fits most needs that is worth putting into a library routine. (If comparing with a relative or absolute error interval suffices for you, you can do it simply without a library routine.)
math.isclose() has been added to Python 3.5 for that (source code). Here is a port of it to Python 2. It's difference from one-liner of Mark Ransom is that it can handle "inf" and "-inf" properly.
def isclose(a, b, rel_tol=1e-09, abs_tol=0.0):
'''
Python 2 implementation of Python 3.5 math.isclose()
https://github.com/python/cpython/blob/v3.5.10/Modules/mathmodule.c#L1993
'''
# sanity check on the inputs
if rel_tol < 0 or abs_tol < 0:
raise ValueError("tolerances must be non-negative")
# short circuit exact equality -- needed to catch two infinities of
# the same sign. And perhaps speeds things up a bit sometimes.
if a == b:
return True
# This catches the case of two infinities of opposite sign, or
# one infinity and one finite number. Two infinities of opposite
# sign would otherwise have an infinite relative tolerance.
# Two infinities of the same sign are caught by the equality check
# above.
if math.isinf(a) or math.isinf(b):
return False
# now do the regular computation
# this is essentially the "weak" test from the Boost library
diff = math.fabs(b - a)
result = (((diff <= math.fabs(rel_tol * b)) or
(diff <= math.fabs(rel_tol * a))) or
(diff <= abs_tol))
return result
I'm not aware of anything in the Python standard library (or elsewhere) that implements Dawson's AlmostEqual2sComplement function. If that's the sort of behaviour you want, you'll have to implement it yourself. (In which case, rather than using Dawson's clever bitwise hacks you'd probably do better to use more conventional tests of the form if abs(a-b) <= eps1*(abs(a)+abs(b)) + eps2 or similar. To get Dawson-like behaviour you might say something like if abs(a-b) <= eps*max(EPS,abs(a),abs(b)) for some small fixed EPS; this isn't exactly the same as Dawson, but it's similar in spirit.
If you want to use it in testing/TDD context, I'd say this is a standard way:
from nose.tools import assert_almost_equals
assert_almost_equals(x, y, places=7) # The default is 7
In terms of absolute error, you can just check
if abs(a - b) <= error:
print("Almost equal")
Some information of why float act weird in Python:
Python 3 Tutorial 03 - if-else, logical operators and top beginner mistakes
You can also use math.isclose for relative errors.
This is useful for the case where you want to make sure two numbers are the same 'up to precision', and there isn't any need to specify the tolerance:
Find minimum precision of the two numbers
Round both of them to minimum precision and compare
def isclose(a, b):
astr = str(a)
aprec = len(astr.split('.')[1]) if '.' in astr else 0
bstr = str(b)
bprec = len(bstr.split('.')[1]) if '.' in bstr else 0
prec = min(aprec, bprec)
return round(a, prec) == round(b, prec)
As written, it only works for numbers without the 'e' in their string representation (meaning 0.9999999999995e-4 < number <= 0.9999999999995e11)
Example:
>>> isclose(10.0, 10.049)
True
>>> isclose(10.0, 10.05)
False
For some of the cases where you can affect the source number representation, you can represent them as fractions instead of floats, using integer numerator and denominator. That way you can have exact comparisons.
See Fraction from fractions module for details.
I liked Sesquipedal's suggestion, but with modification (a special use case when both values are 0 returns False). In my case, I was on Python 2.7 and just used a simple function:
if f1 ==0 and f2 == 0:
return True
else:
return abs(f1-f2) < tol*max(abs(f1),abs(f2))
If you want to do it in a testing or TDD context using the pytest package, here's how:
import pytest
PRECISION = 1e-3
def assert_almost_equal():
obtained_value = 99.99
expected_value = 100.00
assert obtained_value == pytest.approx(expected_value, PRECISION)
I found the following comparison helpful:
str(f1) == str(f2)
To compare up to a given decimal without atol/rtol:
def almost_equal(a, b, decimal=6):
return '{0:.{1}f}'.format(a, decimal) == '{0:.{1}f}'.format(b, decimal)
print(almost_equal(0.0, 0.0001, decimal=5)) # False
print(almost_equal(0.0, 0.0001, decimal=4)) # True
This maybe is a bit ugly hack, but it works pretty well when you don't need more than the default float precision (about 11 decimals).
The round_to function uses the format method from the built-in str class to round up the float to a string that represents the float with the number of decimals needed, and then applies the eval built-in function to the rounded float string to get back to the float numeric type.
The is_close function just applies a simple conditional to the rounded up float.
def round_to(float_num, prec):
return eval("'{:." + str(int(prec)) + "f}'.format(" + str(float_num) + ")")
def is_close(float_a, float_b, prec):
if round_to(float_a, prec) == round_to(float_b, prec):
return True
return False
>>>a = 10.0
10.0
>>>b = 10.0001
10.0001
>>>print is_close(a, b, prec=3)
True
>>>print is_close(a, b, prec=4)
False
Update:
As suggested by #stepehjfox, a cleaner way to build a rount_to function avoiding "eval" is using nested formatting:
def round_to(float_num, prec):
return '{:.{precision}f}'.format(float_num, precision=prec)
Following the same idea, the code can be even simpler using the great new f-strings (Python 3.6+):
def round_to(float_num, prec):
return f'{float_num:.{prec}f}'
So, we could even wrap it up all in one simple and clean 'is_close' function:
def is_close(a, b, prec):
return f'{a:.{prec}f}' == f'{b:.{prec}f}'
If you want to compare floats, the options above are great, but in my case, I ended up using Enum's, since I only had few valid floats my use case was accepting.
from enum import Enum
class HolidayMultipliers(Enum):
EMPLOYED_LESS_THAN_YEAR = 2.0
EMPLOYED_MORE_THAN_YEAR = 2.5
Then running:
testable_value = 2.0
HolidayMultipliers(testable_value)
If the float is valid, it's fine, but otherwise it will just throw an ValueError.
Use == is a simple good way, if you don't care about tolerance precisely.
# Python 3.8.5
>>> 1.0000000000001 == 1
False
>>> 1.00000000000001 == 1
True
But watch out for 0:
>>> 0 == 0.00000000000000000000000000000000000000000001
False
The 0 is always the zero.
Use math.isclose if you want to control the tolerance.
The default a == b is equivalent to math.isclose(a, b, rel_tol=1e-16, abs_tol=0).
If you still want to use == with a self-defined tolerance:
>>> class MyFloat(float):
def __eq__(self, another):
return math.isclose(self, another, rel_tol=0, abs_tol=0.001)
>>> a == MyFloat(0)
>>> a
0.0
>>> a == 0.001
True
So far, I didn't find anywhere to config it globally for float. Besides, mock is also not working for float.__eq__.

What is the best way to compare floats for almost-equality in Python?

It's well known that comparing floats for equality is a little fiddly due to rounding and precision issues.
For example: Comparing Floating Point Numbers, 2012 Edition
What is the recommended way to deal with this in Python?
Is a standard library function for this somewhere?
Python 3.5 adds the math.isclose and cmath.isclose functions as described in PEP 485.
If you're using an earlier version of Python, the equivalent function is given in the documentation.
def isclose(a, b, rel_tol=1e-09, abs_tol=0.0):
return abs(a-b) <= max(rel_tol * max(abs(a), abs(b)), abs_tol)
rel_tol is a relative tolerance, it is multiplied by the greater of the magnitudes of the two arguments; as the values get larger, so does the allowed difference between them while still considering them equal.
abs_tol is an absolute tolerance that is applied as-is in all cases. If the difference is less than either of those tolerances, the values are considered equal.
Something as simple as the following may be good enough:
return abs(f1 - f2) <= allowed_error
I would agree that Gareth's answer is probably most appropriate as a lightweight function/solution.
But I thought it would be helpful to note that if you are using NumPy or are considering it, there is a packaged function for this.
numpy.isclose(a, b, rtol=1e-05, atol=1e-08, equal_nan=False)
A little disclaimer though: installing NumPy can be a non-trivial experience depending on your platform.
Use Python's decimal module, which provides the Decimal class.
From the comments:
It is worth noting that if you're
doing math-heavy work and you don't
absolutely need the precision from
decimal, this can really bog things
down. Floats are way, way faster to
deal with, but imprecise. Decimals are
extremely precise but slow.
The common wisdom that floating-point numbers cannot be compared for equality is inaccurate. Floating-point numbers are no different from integers: If you evaluate "a == b", you will get true if they are identical numbers and false otherwise (with the understanding that two NaNs are of course not identical numbers).
The actual problem is this: If I have done some calculations and am not sure the two numbers I have to compare are exactly correct, then what? This problem is the same for floating-point as it is for integers. If you evaluate the integer expression "7/3*3", it will not compare equal to "7*3/3".
So suppose we asked "How do I compare integers for equality?" in such a situation. There is no single answer; what you should do depends on the specific situation, notably what sort of errors you have and what you want to achieve.
Here are some possible choices.
If you want to get a "true" result if the mathematically exact numbers would be equal, then you might try to use the properties of the calculations you perform to prove that you get the same errors in the two numbers. If that is feasible, and you compare two numbers that result from expressions that would give equal numbers if computed exactly, then you will get "true" from the comparison. Another approach is that you might analyze the properties of the calculations and prove that the error never exceeds a certain amount, perhaps an absolute amount or an amount relative to one of the inputs or one of the outputs. In that case, you can ask whether the two calculated numbers differ by at most that amount, and return "true" if they are within the interval. If you cannot prove an error bound, you might guess and hope for the best. One way of guessing is to evaluate many random samples and see what sort of distribution you get in the results.
Of course, since we only set the requirement that you get "true" if the mathematically exact results are equal, we left open the possibility that you get "true" even if they are unequal. (In fact, we can satisfy the requirement by always returning "true". This makes the calculation simple but is generally undesirable, so I will discuss improving the situation below.)
If you want to get a "false" result if the mathematically exact numbers would be unequal, you need to prove that your evaluation of the numbers yields different numbers if the mathematically exact numbers would be unequal. This may be impossible for practical purposes in many common situations. So let us consider an alternative.
A useful requirement might be that we get a "false" result if the mathematically exact numbers differ by more than a certain amount. For example, perhaps we are going to calculate where a ball thrown in a computer game traveled, and we want to know whether it struck a bat. In this case, we certainly want to get "true" if the ball strikes the bat, and we want to get "false" if the ball is far from the bat, and we can accept an incorrect "true" answer if the ball in a mathematically exact simulation missed the bat but is within a millimeter of hitting the bat. In that case, we need to prove (or guess/estimate) that our calculation of the ball's position and the bat's position have a combined error of at most one millimeter (for all positions of interest). This would allow us to always return "false" if the ball and bat are more than a millimeter apart, to return "true" if they touch, and to return "true" if they are close enough to be acceptable.
So, how you decide what to return when comparing floating-point numbers depends very much on your specific situation.
As to how you go about proving error bounds for calculations, that can be a complicated subject. Any floating-point implementation using the IEEE 754 standard in round-to-nearest mode returns the floating-point number nearest to the exact result for any basic operation (notably multiplication, division, addition, subtraction, square root). (In case of tie, round so the low bit is even.) (Be particularly careful about square root and division; your language implementation might use methods that do not conform to IEEE 754 for those.) Because of this requirement, we know the error in a single result is at most 1/2 of the value of the least significant bit. (If it were more, the rounding would have gone to a different number that is within 1/2 the value.)
Going on from there gets substantially more complicated; the next step is performing an operation where one of the inputs already has some error. For simple expressions, these errors can be followed through the calculations to reach a bound on the final error. In practice, this is only done in a few situations, such as working on a high-quality mathematics library. And, of course, you need precise control over exactly which operations are performed. High-level languages often give the compiler a lot of slack, so you might not know in which order operations are performed.
There is much more that could be (and is) written about this topic, but I have to stop there. In summary, the answer is: There is no library routine for this comparison because there is no single solution that fits most needs that is worth putting into a library routine. (If comparing with a relative or absolute error interval suffices for you, you can do it simply without a library routine.)
math.isclose() has been added to Python 3.5 for that (source code). Here is a port of it to Python 2. It's difference from one-liner of Mark Ransom is that it can handle "inf" and "-inf" properly.
def isclose(a, b, rel_tol=1e-09, abs_tol=0.0):
'''
Python 2 implementation of Python 3.5 math.isclose()
https://github.com/python/cpython/blob/v3.5.10/Modules/mathmodule.c#L1993
'''
# sanity check on the inputs
if rel_tol < 0 or abs_tol < 0:
raise ValueError("tolerances must be non-negative")
# short circuit exact equality -- needed to catch two infinities of
# the same sign. And perhaps speeds things up a bit sometimes.
if a == b:
return True
# This catches the case of two infinities of opposite sign, or
# one infinity and one finite number. Two infinities of opposite
# sign would otherwise have an infinite relative tolerance.
# Two infinities of the same sign are caught by the equality check
# above.
if math.isinf(a) or math.isinf(b):
return False
# now do the regular computation
# this is essentially the "weak" test from the Boost library
diff = math.fabs(b - a)
result = (((diff <= math.fabs(rel_tol * b)) or
(diff <= math.fabs(rel_tol * a))) or
(diff <= abs_tol))
return result
I'm not aware of anything in the Python standard library (or elsewhere) that implements Dawson's AlmostEqual2sComplement function. If that's the sort of behaviour you want, you'll have to implement it yourself. (In which case, rather than using Dawson's clever bitwise hacks you'd probably do better to use more conventional tests of the form if abs(a-b) <= eps1*(abs(a)+abs(b)) + eps2 or similar. To get Dawson-like behaviour you might say something like if abs(a-b) <= eps*max(EPS,abs(a),abs(b)) for some small fixed EPS; this isn't exactly the same as Dawson, but it's similar in spirit.
If you want to use it in testing/TDD context, I'd say this is a standard way:
from nose.tools import assert_almost_equals
assert_almost_equals(x, y, places=7) # The default is 7
In terms of absolute error, you can just check
if abs(a - b) <= error:
print("Almost equal")
Some information of why float act weird in Python:
Python 3 Tutorial 03 - if-else, logical operators and top beginner mistakes
You can also use math.isclose for relative errors.
This is useful for the case where you want to make sure two numbers are the same 'up to precision', and there isn't any need to specify the tolerance:
Find minimum precision of the two numbers
Round both of them to minimum precision and compare
def isclose(a, b):
astr = str(a)
aprec = len(astr.split('.')[1]) if '.' in astr else 0
bstr = str(b)
bprec = len(bstr.split('.')[1]) if '.' in bstr else 0
prec = min(aprec, bprec)
return round(a, prec) == round(b, prec)
As written, it only works for numbers without the 'e' in their string representation (meaning 0.9999999999995e-4 < number <= 0.9999999999995e11)
Example:
>>> isclose(10.0, 10.049)
True
>>> isclose(10.0, 10.05)
False
For some of the cases where you can affect the source number representation, you can represent them as fractions instead of floats, using integer numerator and denominator. That way you can have exact comparisons.
See Fraction from fractions module for details.
I liked Sesquipedal's suggestion, but with modification (a special use case when both values are 0 returns False). In my case, I was on Python 2.7 and just used a simple function:
if f1 ==0 and f2 == 0:
return True
else:
return abs(f1-f2) < tol*max(abs(f1),abs(f2))
If you want to do it in a testing or TDD context using the pytest package, here's how:
import pytest
PRECISION = 1e-3
def assert_almost_equal():
obtained_value = 99.99
expected_value = 100.00
assert obtained_value == pytest.approx(expected_value, PRECISION)
I found the following comparison helpful:
str(f1) == str(f2)
To compare up to a given decimal without atol/rtol:
def almost_equal(a, b, decimal=6):
return '{0:.{1}f}'.format(a, decimal) == '{0:.{1}f}'.format(b, decimal)
print(almost_equal(0.0, 0.0001, decimal=5)) # False
print(almost_equal(0.0, 0.0001, decimal=4)) # True
This maybe is a bit ugly hack, but it works pretty well when you don't need more than the default float precision (about 11 decimals).
The round_to function uses the format method from the built-in str class to round up the float to a string that represents the float with the number of decimals needed, and then applies the eval built-in function to the rounded float string to get back to the float numeric type.
The is_close function just applies a simple conditional to the rounded up float.
def round_to(float_num, prec):
return eval("'{:." + str(int(prec)) + "f}'.format(" + str(float_num) + ")")
def is_close(float_a, float_b, prec):
if round_to(float_a, prec) == round_to(float_b, prec):
return True
return False
>>>a = 10.0
10.0
>>>b = 10.0001
10.0001
>>>print is_close(a, b, prec=3)
True
>>>print is_close(a, b, prec=4)
False
Update:
As suggested by #stepehjfox, a cleaner way to build a rount_to function avoiding "eval" is using nested formatting:
def round_to(float_num, prec):
return '{:.{precision}f}'.format(float_num, precision=prec)
Following the same idea, the code can be even simpler using the great new f-strings (Python 3.6+):
def round_to(float_num, prec):
return f'{float_num:.{prec}f}'
So, we could even wrap it up all in one simple and clean 'is_close' function:
def is_close(a, b, prec):
return f'{a:.{prec}f}' == f'{b:.{prec}f}'
If you want to compare floats, the options above are great, but in my case, I ended up using Enum's, since I only had few valid floats my use case was accepting.
from enum import Enum
class HolidayMultipliers(Enum):
EMPLOYED_LESS_THAN_YEAR = 2.0
EMPLOYED_MORE_THAN_YEAR = 2.5
Then running:
testable_value = 2.0
HolidayMultipliers(testable_value)
If the float is valid, it's fine, but otherwise it will just throw an ValueError.
Use == is a simple good way, if you don't care about tolerance precisely.
# Python 3.8.5
>>> 1.0000000000001 == 1
False
>>> 1.00000000000001 == 1
True
But watch out for 0:
>>> 0 == 0.00000000000000000000000000000000000000000001
False
The 0 is always the zero.
Use math.isclose if you want to control the tolerance.
The default a == b is equivalent to math.isclose(a, b, rel_tol=1e-16, abs_tol=0).
If you still want to use == with a self-defined tolerance:
>>> class MyFloat(float):
def __eq__(self, another):
return math.isclose(self, another, rel_tol=0, abs_tol=0.001)
>>> a == MyFloat(0)
>>> a
0.0
>>> a == 0.001
True
So far, I didn't find anywhere to config it globally for float. Besides, mock is also not working for float.__eq__.

Pitfalls of number values in Python, "How deep?"

I'm a fairly green programmer, and I'm learning Python right now. I'm up to chapter 17 in "Learn to Think Like a Computer Scientist" (Classes and Methods), and I just wrote my first doctest that failed in a way I truly do not fully understand:
class Point(object):
'''
represents a point object.
attributes: x, y
'''
def ___init___(self, x = 0, y = 0):
'''
>>> point = Point()
>>> point.y
0
>>> point = Point(4.7, 8.2)
>>> point.x
4.7
'''
self.x = x
self.y = y
The second doctest for __init__ fails, and returns 4.7000000000000002 instead of 4.7. However, if I rewrite the doctest with a "print" statement as so:
>>> point = Point(4.7, 8.2)
>>> print point.x
4.7
It runs correctly.
So I read up on how Python stores floats, and I now understand that, due to binary representation of decimal numbers, the reason for the discrepancy is that Python stores 4.7 as a string of 1s and 0s that almost but don't quite equal 4.7.
But what I don't understand is why a call to "point.x" returns 4.7000000000000002 and a call to "print point.x" returns 4.7. Under what other circumstances will Python choose to round like it does with "print"? How does this rounding work? Can these trailing significant figures lead to errors in programming (aside from, obviously, failed doctests)? Can a failure to pay attention to rounding create dangerous ambiguity?
Since this has to do with binary representation of decimal numbers, I'm sure that this is in fact a general CS issue and not one specific to Python, but what I really need to know right now is what I can do, specifically as a Python programmer, to avoid any related issues and/or bug infestations.
Also, for bonus points, is there some other way that Python can store floating point numbers aside from the default activated by a line like "a = 4.7"? I know there's the Decimal package, but I'm not totally sure how it works. Honestly, all of this dynamic typing stuff confuses me sometimes.
Edit:
I should specify that I'm using Python 2.6 (at some point I want to use NumPy and Biopython)
>>> point.x
calls repr function which is for string representation holding more technical information than strfunction, which is called when
>>> print point.x
occurs
This has to do with how computers store floating point numbers. A detailed description of this is here. However, for your case, the quick solution is to check not the printed representation of point.x but if point.x is equal to 4.7. So...
>>> point = Point(4.7, 8.2)
>>> point.x == 4.7
True
Or better:
>>> point = Point(4.7, 8.2)
>>> eps = 2**-53 #get epsilon for standard double precision number
>>> -eps <= point.x - 4.7 <= eps
True
Where eps is the maximum value for rounding errors in floating-point arithmetic. For details on epsilon, see here.
EDIT: -eps <= point.x - 4.7 <= eps is equivalent to abs(point.x - 4.7) <= eps. I only add this because not everyone is familiar with Python's chaining of comparison operators.
EDIT 2: Since you mentioned numpy, numpy has a method to get the eps without calculating it yourself. Use eps = numpy.finfo(float).eps instead of 2**-53 if you're using numpy. Note that the numpy epsilon is for some reason bigger than it should be and is equal to 2**-52 rather than 2**-53. I have no idea why this is.
When working with floating point numbers, the common approach goes like this:
a == b if abs(a-b) <= eps, where eps is the required precision.
In programming contests, eps is given along with the problem to solve.
My advice is to establish an accuracy that you need for your stuff, and use it
You get a different behavior because print truncates numbers:
In [1]: 1.23456789012334
Out[1]: 1.23456789012334
In [2]: print 1.23456789012334
1.23456789012
Note, at the precision used in Python's floats:
In [3]: 4.7 == 4.7000000000000002
Out[3]: True
This is because floats have a limited (relative) precision because they use a finite number of (binary) digits to represent real numbers. Thus, as above, different decimal representations of a given number can actually be equal for Python, after being approximated by the closest float. This is a general property of floating point numbers.
This comprehensive guide explains everything.
Here are Python-specific explanations.

Function to determine if two numbers are nearly equal when rounded to n significant decimal digits

I have been asked to test a library provided by a 3rd party. The library is known to be accurate to n significant figures. Any less-significant errors can safely be ignored. I want to write a function to help me compare the results:
def nearlyequal( a, b, sigfig=5 ):
The purpose of this function is to determine if two floating-point numbers (a and b) are approximately equal. The function will return True if a==b (exact match) or if a and b have the same value when rounded to sigfig significant-figures when written in decimal.
Can anybody suggest a good implementation? I've written a mini unit-test. Unless you can see a bug in my tests then a good implementation should pass the following:
assert nearlyequal(1, 1, 5)
assert nearlyequal(1.0, 1.0, 5)
assert nearlyequal(1.0, 1.0, 5)
assert nearlyequal(-1e-9, 1e-9, 5)
assert nearlyequal(1e9, 1e9 + 1 , 5)
assert not nearlyequal( 1e4, 1e4 + 1, 5)
assert nearlyequal( 0.0, 1e-15, 5 )
assert not nearlyequal( 0.0, 1e-4, 6 )
Additional notes:
Values a and b might be of type int, float or numpy.float64. Values a and b will always be of the same type. It's vital that conversion does not introduce additional error into the function.
Lets keep this numerical, so functions that convert to strings or use non-mathematical tricks are not ideal. This program will be audited by somebody who is a mathematician who will want to be able to prove that the function does what it is supposed to do.
Speed... I've got to compare a lot of numbers so the faster the better.
I've got numpy, scipy and the standard-library. Anything else will be hard for me to get, especially for such a small part of the project.
As of Python 3.5, the standard way to do this (using the standard library) is with the math.isclose function.
It has the following signature:
isclose(a, b, rel_tol=1e-9, abs_tol=0.0)
An example of usage with absolute error tolerance:
from math import isclose
a = 1.0
b = 1.00000001
assert isclose(a, b, abs_tol=1e-8)
If you want it with precision of n significant digits, simply replace the last line with:
assert isclose(a, b, abs_tol=10**-n)
There is a function assert_approx_equal in numpy.testing (source here) which may be a good starting point.
def assert_approx_equal(actual,desired,significant=7,err_msg='',verbose=True):
"""
Raise an assertion if two items are not equal up to significant digits.
.. note:: It is recommended to use one of `assert_allclose`,
`assert_array_almost_equal_nulp` or `assert_array_max_ulp`
instead of this function for more consistent floating point
comparisons.
Given two numbers, check that they are approximately equal.
Approximately equal is defined as the number of significant digits
that agree.
Here's a take.
def nearly_equal(a,b,sig_fig=5):
return ( a==b or
int(a*10**sig_fig) == int(b*10**sig_fig)
)
I believe your question is not defined well enough, and the unit-tests you present prove it:
If by 'round to N sig-fig decimal places' you mean 'N decimal places to the right of the decimal point', then the test assert nearlyequal(1e9, 1e9 + 1 , 5) should fail, because even when you round 1000000000 and 1000000001 to 0.00001 accuracy, they are still different.
And if by 'round to N sig-fig decimal places' you mean 'The N most significant digits, regardless of the decimal point', then the test assert nearlyequal(-1e-9, 1e-9, 5) should fail, because 0.000000001 and -0.000000001 are totally different when viewed this way.
If you meant the first definition, then the first answer on this page (by Triptych) is good.
If you meant the second definition, please say it, I promise to think about it :-)
There are already plenty of great answers, but here's a think:
def closeness(a, b):
"""Returns measure of equality (for two floats), in unit
of decimal significant figures."""
if a == b:
return float("infinity")
difference = abs(a - b)
avg = (a + b)/2
return math.log10( avg / difference )
if closeness(1000, 1000.1) > 3:
print "Joy!"
This is a fairly common issue with floating point numbers. I solve it based on the discussion in Section 1.5 of Demmel[1]. (1) Calculate the roundoff error. (2) Check that the roundoff error is less than some epsilon. I haven't used python in some time and only have version 2.4.3, but I'll try to get this correct.
Step 1. Roundoff error
def roundoff_error(exact, approximate):
return abs(approximate/exact - 1.0)
Step 2. Floating point equality
def float_equal(float1, float2, epsilon=2.0e-9):
return (roundoff_error(float1, float2) < epsilon)
There are a couple obvious deficiencies with this code.
Division by zero error if the exact value is Zero.
Does not verify that the arguments are floating point values.
Revision 1.
def roundoff_error(exact, approximate):
if (exact == 0.0 or approximate == 0.0):
return abs(exact + approximate)
else:
return abs(approximate/exact - 1.0)
def float_equal(float1, float2, epsilon=2.0e-9):
if not isinstance(float1,float):
raise TypeError,"First argument is not a float."
elif not isinstance(float2,float):
raise TypeError,"Second argument is not a float."
else:
return (roundoff_error(float1, float2) < epsilon)
That's a little better. If either the exact or the approximate value is zero, than the error is equal to the value of the other. If something besides a floating point value is provided, a TypeError is raised.
At this point, the only difficult thing is setting the correct value for epsilon. I noticed in the documentation for version 2.6.1 that there is an epsilon attribute in sys.float_info, so I would use twice that value as the default epsilon. But the correct value depends on both your application and your algorithm.
[1] James W. Demmel, Applied Numerical Linear Algebra, SIAM, 1997.
"Significant figures" in decimal is a matter of adjusting the decimal point and truncating to an integer.
>>> int(3.1415926 * 10**3)
3141
>>> int(1234567 * 10**-3)
1234
>>>
Oren Shemesh got part of the problem with the problem as stated but there's more:
assert nearlyequal( 0.0, 1e-15, 5 )
also fails the second definition (and that's the definition I learned in school.)
No matter how many digits you are looking at, 0 will not equal a not-zero. This could prove to be a headache for such tests if you have a case whose correct answer is zero.
There is a interesting solution to this by B. Dawson (with C++ code)
at "Comparing Floating Point Numbers". His approach relies on strict IEEE representation of two numbers and the enforced lexicographical ordering when said numbers are represented as unsigned integers.
I have been asked to test a library provided by a 3rd party
If you are using the default Python unittest framework, you can use assertAlmostEqual
self.assertAlmostEqual(a, b, places=5)
There are lots of ways of comparing two numbers to see if they agree to N significant digits. Roughly speaking you just want to make sure that their difference is less than 10^-N times the largest of the two numbers being compared. That's easy enough.
But, what if one of the numbers is zero? The whole concept of relative-differences or significant-digits falls down when comparing against zero. To handle that case you need to have an absolute-difference as well, which should be specified differently from the relative-difference.
I discuss the problems of comparing floating-point numbers -- including a specific case of handling zero -- in this blog post:
http://randomascii.wordpress.com/2012/02/25/comparing-floating-point-numbers-2012-edition/

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