From Scott Dattalo

Scott says:

The other day I stated that there is a faster Multiplication algorithm than the one posted by Martin, which is a variation of the one on James' Web page, which in turn is variation of the one found in three different places of the ECH. (Martin's routine is one cycle shorter, however if you allow the other routines to pass one of the multiplicands in W then they'd be one cycle shorter too.) The algorithm to which I referred is also found in the ECH - at least I thought it was. I was unable to find it. (Perhaps I was dreaming...) But it goes something like this:If the first bit tested in the shift-and-add multiplication algorithm is zero, then there's no need to perform the shift-and-add operation for the first iteration. If the next bit is zero too, you can skip that one as well. The first non-zero bit encountered doesn't need to be added, but it does need to be shifted.

Here's an example of the algorithm. However, I'm not sure if this is the optimum. It has a worst case execution time of 36 cycles excluding the return and call and has a best case excution time of 21 cycles and an average right around 34 cycles. So on average it saves one cycle over the other inline multiplication functions, but it takes 50% more code to do so. Unless I was desparate to save one cycle, I'd probably stick with the other versions.

; ; Multiply x*y and produce a 16bit result. The high byte of the ;result is aliased with x. ; multiply mov W, x ;; or save a cycle by letting the caller init. ;) clrb C clr res_lo snb y.0 jmp l0 snb y.1 jmp l1 snb y.2 jmp l2 snb y.3 jmp l3 snb y.4 jmp l4 snb y.5 jmp l5 snb y.6 jmp l6 snb y.7 jmp l7 clr x ;Dmitry Kiryashov says: otherwise y==0 but x isn't jmp l8 ;; or return l0 rr x rr res_lo snb y.1 add W, x l1 rr x rr res_lo snb y.2 add W, x l2 rr x rr res_lo snb y.3 add W, x l3 rr x rr res_lo snb y.4 add W, x l4 rr x rr res_lo snb y.5 add W, x l5 rr x rr res_lo snb y.6 add W, x l6 rr x rr res_lo snb y.7 add W, x l7 rr x rr res_lo l8 ret

file: /Techref/scenix/lib/math/mul/8x8-sd_sx.htm, 2KB, , updated: 2004/6/10 14:40, local time: 2024/7/18 03:53, |

©2024 These pages are served without commercial sponsorship. (No popup ads, etc...).Bandwidth abuse increases hosting cost forcing sponsorship or shutdown. This server aggressively defends against automated copying for any reason including offline viewing, duplication, etc... Please respect this requirement and DO NOT RIP THIS SITE. Questions?<A HREF="http://piclist.com/techref/scenix/lib/math/mul/8x8-sd_sx.htm"> SX Microcontroller Math Method </A> |

Did you find what you needed? |

PICList 2024 contributors:
o List host: MIT, Site host massmind.org, Top posters @none found - Page Editors: James Newton, David Cary, and YOU!
* Roman Black of Black Robotics donates from sales of Linistep stepper controller kits. * Ashley Roll of Digital Nemesis donates from sales of RCL-1 RS232 to TTL converters. * Monthly Subscribers: Gregg Rew. on-going support is MOST appreciated!
* Contributors: Richard Seriani, Sr. |

## Welcome to piclist.com! |

.