There seems to be a bug in Matlab quad function for evaluating integrals using quadrature formula. Running

quad(@(x) (2/sqrt(2*pi))*(x.^2).*exp(-x.^2/2), 0, 10)

give back 1.0000 which is the correct answer but increasing the upper limit say to 100, that is

quad(@(x) (2/sqrt(2*pi))*(x.^2).*exp(-x.^2/2), 0, 100)

gives back 3.4715e-8. This seems to be the case also for quadl. The integral command, however, seems to work fine. Is this a known issue or am I missing something?

  • 2
    Interesting. Increasing lower bound only to .01 gives back 1 – Luis Mendo Sep 21 '13 at 15:02

Reading quad's documentation, it looks like it might be a good idea to use quadgk instead. In this case it gives the correct results with the integration interval (0,100):

>> quadgk(@(x) (2/sqrt(2*pi))*(x.^2).*exp(-x.^2/2), 0, 100)

ans =

  • Thanks, that might be right choice then. Though it is still strange that the other quad functions are so unstable. – passerby51 Sep 21 '13 at 15:11
  • Agree. And it's not really clear if quadgk is always the best choice, or when to select each variant – Luis Mendo Sep 21 '13 at 15:13
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    @passerby51, et al.: Quadrature is just like numerical integration - there are many methods and one needs to use a method appropriate for the function at hand and/or use the appropriate settings. Exponential, logarithmic, and periodic functions often need special care. For example, in double precision, this function evaluates to zero for x greater than 38.7. quad can actually be used if the tolerance option is set sufficiently small, e.g. 1e-12. But quadgk (or integral in newer versions) is almost always a better first choice. – horchler Sep 21 '13 at 15:47

Running both expressions with quad and quadl on octave resulted to 1. Something might be wrong with the machine.

  • It might have to do with MATLAB version, implementation, etc. It might have been fixed in the more recent version. (I have found it in R2012a on a Linux machine.) – passerby51 Sep 21 '13 at 15:07

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