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Double factorial [wp34s]
02-12-2016, 06:27 AM
Post: #2
Paul Dale Offline
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RE: Double factorial [wp34s]
Nice Smile Functions I considered implementing natively at one point....


cos(pi x) can be replaced by (-1)^x which should save a few steps at the start and be faster and more accurate.

The "XEQ C RTN LBL C" sequence can be simplified to LBL C too I think. Likewise, the "XEQ C RTN" at the end can be replaced by GTO C Smile


- Pauli
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Messages In This Thread
RE: Double factorial [wp34s] - Paul Dale - 02-12-2016 06:27 AM
RE: Double factorial [wp34s] - Dieter - 02-12-2016, 07:49 AM
RE: Double factorial [wp34s] - Dieter - 02-12-2016, 07:54 PM
RE: Double factorial [wp34s] - Paul Dale - 02-13-2016, 12:14 AM
RE: Double factorial [wp34s] - Paul Dale - 02-12-2016, 10:45 AM
RE: Double factorial [wp34s] - Paul Dale - 02-12-2016, 10:33 PM
RE: Double factorial [wp34s] - Paul Dale - 02-13-2016, 10:41 PM
RE: Double factorial [wp34s] - Dieter - 02-15-2016, 07:03 AM
RE: Double factorial [wp34s] - emece67 - 02-13-2016, 12:57 AM
RE: Double factorial [wp34s] - Paul Dale - 02-13-2016, 04:46 AM
RE: Double factorial [wp34s] - Dieter - 02-13-2016, 06:53 AM
RE: Double factorial [wp34s] - Paul Dale - 02-13-2016, 07:05 AM
RE: Double factorial [wp34s] - Dieter - 02-13-2016, 07:00 PM
RE: Double factorial [wp34s] - emece67 - 02-13-2016, 09:15 AM
RE: Double factorial [wp34s] - John Keith - 02-14-2016, 03:24 PM



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