The special code is for ∧@o. ^@o. 0j1 * 0.5 * i.4 1 0j1 _1 0j_1 ^@o. 0j1 * 1e9 + 0.5 * i.4 1 0j1 _1 0j_1
http://www.jsoftware.com/jwiki/Essays/Euler's_Identity On Tue, Dec 6, 2011 at 10:08 AM, Kip Murray <k...@math.uh.edu> wrote: > NB. Roger is justly proud of > > ^@o.@j. 1 NB. e ^ pi * i is _1 > _1 > > 0 = 1 + ^@o.@j. 1 NB. Euler's 0 = 1 + e ^ pi * i five constants > 1 > > ^ o. j. 1 NB. Approximates _1 > _1j1.22465e_16 > > NB. special code for ^@o.@j. > > On 12/6/2011 3:08 AM, Roger Hui wrote: > > ^@o.@j. 0 0.5 1 1.5 > > 1 0j1 _1 0j_1 > > > > ^@o.@j. 0.5 * i.5 4 > > 1 0j1 _1 0j_1 > > 1 0j1 _1 0j_1 > > 1 0j1 _1 0j_1 > > 1 0j1 _1 0j_1 > > 1 0j1 _1 0j_1 > > > > ^@o.@j. 1e9 + 0.5 * i.5 4 > > 1 0j1 _1 0j_1 > > 1 0j1 _1 0j_1 > > 1 0j1 _1 0j_1 > > 1 0j1 _1 0j_1 > > 1 0j1 _1 0j_1 > > > > 2011/12/6 Linda Alvord<lindaalv...@verizon.net> > > > >> Can you make a simple example that looks like this u@v@w ? Please > use > ... > ---------------------------------------------------------------------- > For information about J forums see http://www.jsoftware.com/forums.htm > ---------------------------------------------------------------------- For information about J forums see http://www.jsoftware.com/forums.htm