# Python cosine function precision

From mathematics we know that the cosine of a 90 degree angle is 0 but Python says it's a bit more than that.

``````import math
6.123233995736766e-17
``````

What's the matter between Python and the number "0"?

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Floating point arithmetic is inaccurate - when you're converting 90 degrees to radians, it automatically becomes inaccurate, hence the 'incorrect' answer. –  Volatility Feb 16 '13 at 11:25
Solution: enter the exact radian value :-) –  ring0 Feb 16 '13 at 11:38
Like they say "Close enough for government contractor work". –  martineau Feb 16 '13 at 11:57

Repeat after me:

Computers cannot process real numbers.

Python uses double precision IEEE floats, which round to 53 binary digits of precision and have limits on range. Since π/2 is an irrational number, the computer rounds it to the nearest representable number (or to a close representable number — some operations have exact rounding, some have error greater than 1/2 ULP).

Therefore, you never asked the computer to compute `cos(π/2)`, you really asked it to compute `cos(π/2+ε)`, where ε is the roundoff error for computing π/2. The result is then rounded again.

## Why does Excel (or another program) show the correct result?

Possibility 1: The program does symbolic computations, not numeric ones. This applies to programs like Mathematica and Maxima, not Excel.

Possibility 2: The program is hiding the data (most likely). Excel will only show you the digits you ask for, e.g.,

``````>>> '%.10f' % math.cos(math.radians(90))
'0.0000000000'
``````

Python has a finely tuned function for printing out floats so that they survive a round trip to text and back. This means that Python prints more digits by default than, for example, `printf`.

Possibility 3: The program you are using had two round-off errors that canceled.

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Computers cannot process real numbers. @Dietrich: Many other computer-based programs would return 0 (i.e. calculators, excel). I tried to use the round function as well but the maximum I get is 0.0, and not 0. –  NormalAnomaly Feb 16 '13 at 11:39
@NormalAnomaly: In Python `0.0 == 0` –  martineau Feb 16 '13 at 12:00
@Dietrich Epp : I repeated the phrase you asked me to repeat "Computers cannot process real numbers" but it just doesn't sound right to me. That means to me computers cannot process 1 + 1 = 2. –  NormalAnomaly Feb 16 '13 at 12:10
@NormalAnomaly Nope, real numbers are decimals/irrational. 1 is an integer, perfectly representable without any loss of precision. Excel and calculators use some tricks to print 0, but internally they don't do better than 6.123233995736766e-17 –  grasGendarme Feb 16 '13 at 12:57
@NormalAnomaly: you understand the point exactly then. "Real numbers" is a technical term from math. 90 degrees in radians isn't possible to represent precisely with the clumsier float representation. Since the input to the function isn't precisely 90 degrees, the result isn't precisely zero. –  Ned Batchelder Feb 16 '13 at 14:17

As Dietrich points out, the included Math package uses numerical approximations to calculate trig functions - pi has some level of precision represented through a float. But there are a bunch of good python packages for doing symbolic calculations too - Sympy is an easy way do more precise calculations, if you'd like.

consider:

import math

math.cos( 3*math.pi/2 )

--> -1.8369701987210297e-16

as apposed to

import sympy

sympy.cos( 3*sympy.pi/2 )

--> 0

There aren't a lot of cases where this makes a difference, and sympy is considerably slower. I tested how many cosine calculations my computer could do in five seconds with math, and with sympy, and the it did 38 times more calculations with math. It depends what you're looking for.

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