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We know, for instance, that ${\displaystyle {\exp }^{\prime }(x)=\exp (x+0),}$ ${\displaystyle {\sin }^{\prime }x=\sin (x+\frac{\pi }{2}),}$ and ${\displaystyle {\cos }^{\prime }x=\cos (x+\frac{\pi }{2}).}$ But since all these are connected through Euler's formula, I was wondering whether there might not be other (non-exponential) functions with the same general property. — 79.118.167.195 (talk) 08:46, 22 May 2014 (UTC)

If a is fixed and not zero, then you can recover a solution by imposing basically aribitrary data in the form of a smooth function in [0,a] (with appropriate compatibility conditions at the end points) just by integration, I believe. Sławomir Biały (talk) 11:35, 22 May 2014 (UTC)

Note 'smooth' here has a precise definition, see smooth function. Dmcq (talk) 12:17, 22 May 2014 (UTC)

F(x) = 0 is a trivial solution for any a. Gandalf61 (talk) 12:26, 22 May 2014 (UTC)

Note that it suffices to consider a = 0 and a = 1. Count Iblis (talk) 14:45, 22 May 2014 (UTC)

You also have ${\displaystyle {\exp }^{\prime }(x)=\exp (x+2in\pi ),}$ for all integer n (including zero). The same function but more values for a. You can obviously add 2nTemplate:Pi to Template:Pi/2 in the trigonometric relations too. This suggests there are no more functions as the trigonometric and exponential functions satisfy F'(x) = F(x+a) for so many values.--JohnBlackburne^words_deeds 15:04, 22 May 2014 (UTC)

I don't really know anything about this equation, but it is a delay differential equation (linear with discrete delay), and that article contains a little bit of general information. —Kusma (t·c) 20:57, 22 May 2014 (UTC)