numpy.finfo#

classnumpy.finfo(dtype)[source]#

Machine limits for floating point types.

Parameters:

dtypefloat, dtype, or instance

Kind of floating point or complex floating pointdata-type about which to get information.

See also

iinfo

The equivalent for integer data types.

spacing

The distance between a value and the nearest adjacent number

nextafter

The next floating point value after x1 towards x2

Notes

For developers of NumPy: do not instantiate this at the module level.The initial calculation of these parameters is expensive and negativelyimpacts import times. These objects are cached, so callingfinfo()repeatedly inside your functions is not a problem.

Note thatsmallest_normal is not actually the smallest positiverepresentable value in a NumPy floating point type. As in the IEEE-754standard[1], NumPy floating point types make use of subnormal numbers tofill the gap between 0 andsmallest_normal. However, subnormal numbersmay have significantly reduced precision[2].

This function can also be used for complex data types as well. If used,the output will be the same as the corresponding real float type(e.g. numpy.finfo(numpy.csingle) is the same as numpy.finfo(numpy.single)).However, the output is true for the real and imaginary components.

References

[1]

IEEE Standard for Floating-Point Arithmetic, IEEE Std 754-2008,pp.1-70, 2008,https://doi.org/10.1109/IEEESTD.2008.4610935

[2]

Wikipedia, “Denormal Numbers”,https://en.wikipedia.org/wiki/Denormal_number

Examples

Try it in your browser!

>>>importnumpyasnp>>>np.finfo(np.float64).dtypedtype('float64')>>>np.finfo(np.complex64).dtypedtype('float32')

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Attributes:

bitsint

The number of bits occupied by the type.

dtypedtype

Returns the dtype for whichfinfo returns information. For complexinput, the returned dtype is the associatedfloat* dtype for itsreal and complex components.

epsfloat

The difference between 1.0 and the next smallest representable floatlarger than 1.0. For example, for 64-bit binary floats in the IEEE-754standard,eps=2**-52, approximately 2.22e-16.

epsnegfloat

The difference between 1.0 and the next smallest representable floatless than 1.0. For example, for 64-bit binary floats in the IEEE-754standard,epsneg=2**-53, approximately 1.11e-16.

iexpint

The number of bits in the exponent portion of the floating pointrepresentation.

machepint

The exponent that yieldseps.

maxfloating point number of the appropriate type

The largest representable number.

maxexpint

The smallest positive power of the base (2) that causes overflow.

minfloating point number of the appropriate type

The smallest representable number, typically-max.

minexpint

The most negative power of the base (2) consistent with therebeing no leading 0’s in the mantissa.

negepint

The exponent that yieldsepsneg.

nexpint

The number of bits in the exponent including its sign and bias.

nmantint

The number of bits in the mantissa.

precisionint

The approximate number of decimal digits to which this kind offloat is precise.

resolutionfloating point number of the appropriate type

The approximate decimal resolution of this type, i.e.,10**-precision.

tinyfloat

Return the value for tiny, alias of smallest_normal.

smallest_normalfloat

Return the value for the smallest normal.

smallest_subnormalfloat

The smallest positive floating point number with 0 as leading bit inthe mantissa following IEEE-754.