[1]杨金陵,侯双根.弃七.十一与十三验算法[J].郑州大学学报(工学版),1994,15(04):113-115.
 Yang Jinling,Hou Shuang root.Discard seven. Eleventh and 13th test algorithm[J].Journal of Zhengzhou University (Engineering Science),1994,15(04):113-115.
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弃七.十一与十三验算法()
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《郑州大学学报(工学版)》[ISSN:1671-6833/CN:41-1339/T]

卷:
15卷
期数:
1994年04期
页码:
113-115
栏目:
出版日期:
1994-12-28

文章信息/Info

Title:
Discard seven. Eleventh and 13th test algorithm
作者:
杨金陵侯双根
郑州工学院数力系,安阳大学
Author(s):
Yang Jinling Hou Shuang root
Zhengzhou Institute of Technology Digital Power Department, Anyang University
关键词:
弃十一法弃七法弃十三法弃九法等式
Keywords:
Abandon the eleven law abandon the seven methods abandon the thirteen method abandon the nine methods and equal
文献标志码:
A
摘要:
本文用初等数论的有关性质,建立了弃十一、弃七与弃十三等三种四则运算验算法,它们比通常的弃九法具有一定的优点。)解:∴f1(1358)=5,f1(2998)=6,f1(4071284)=8。又∵5×6≡8(modll)即f1(1358)×f1(2998)≡f1(4071284)(modl1)∴()正确。注:上述两例也可用弃七,弃十三法进行验算。4结束语本文所讨论的三种验算法是平行的,其中以弃十一法为最方便。值得说明的是弃十一位比常用的弃九法还只有以下优点。第一,应用法则f1()得到的最初数值一定比用弃九法得
Abstract:
This article uses the relevant nature of primary theory, and has established three four operational test algorithms, including abandoned eleventh, abandoned seven, and abandoned 13th. They have certain advantages over the usual abandoned nine -way method. ) Solution: 1F1 (1358) = 5, F1 (2998) = 6, F1 (4071284) = 8. ∵ 5 × 6 8 (MODLL) is F1 (1358) × F1 (2998) ≡F1 (4071284) (MODL1) ∴ () correct. Note: The above two cases can also be abandoned, and the thirteenth law can be used for inspection. 4 The three types of test algorithms discussed in this article are parallel, of which the eleven law is the most convenient. It is worth noting that the 11th abandonment is the following advantages. First, the initial value obtained by the application rule F1 () must be much smaller than the original value obtained by the abandonment of the nine methods; second, the number of abandoned nine -method is not verified by the same errors with the same number of numbers with the correct answer to the abacus. The result of the calculation is a two -digit calculation formula. Any errors that cannot be verified by abandoning the nine laws, the application rule F1 () can definitely find the error. The calculation result is a two -digit calculation formula. The abandonment of the nine laws sometimes verify the error. Such as 3254 × l78 = 572912? (The correct result is 579212.), This error is not found with discarding the nine -method verification, and it is wrong to immediately know that the operation result of the case is used to verify the eleven method. references
更新日期/Last Update: 1900-01-01