# Pi, Matlab have a bug?

Hello i have one question, calculate a division in matlab and why x/(pi.^2) is that:

``````syms x
x/(pi.^2)
ans =
(281474976710656*v)/2778046668940015
``````

The correct answer is x/9.8696, so why mattlab give me this result?

Its a bug?

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that's the rational approximation MATLAB is giving you. No it is not a bug, use the numerical approximation symbolic toolbox function ( it is N[] in mathematica, forget what matlab's is) –  im so confused Oct 16 '12 at 18:25
Indeed. Note that `281474976710656/2778046668940015 ~= 1/9.8696`. The symbolic math toolbox tries to preserve as much precision as possible by deferring floating point computations. Since pi is inherently irrational, it uses this approximation. –  Matt B. Oct 16 '12 at 18:27
`double(blah)` from mathworks.com/help/symbolic/double.html –  im so confused Oct 16 '12 at 18:27
also note that if you're doing symbolic calculations with pi, etc, use `sym('pi')` to get a symbolic representation of pi rather than an approximation –  im so confused Oct 16 '12 at 18:32

You have to use the vpa() command "Variable-precision arithmetic". Check this code:

``````syms x real;       % define x as a real symbolic variable (not a complex variable)
vpa( x/(pi.^2), 5) % second argument define number of significant digits
``````

For trigonometric expressions involving pi, it is sometimes good to define sym('pi'):

``````syms x real;
pi_s = sym('pi');
expr = x/pi_s^2
``````

I try to always use the 'real' tag when using the symbolic toolbox. If you do not use it you are going to see a lot of complex conjugates and other things that are not important for your problem, because x is probably real variable.

Hope this helps,

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``````2778046668940015/281474976710656 = 9.8696