http://www.bing.com:80/search?q=Orthogonal+Array+TableSearch resultshttp://www.bing.com:80/s/a/rsslogo.gifhttp://www.bing.com:80/search?q=Orthogonal+Array+TableCopyright © 2026 Microsoft. All rights reserved. These XML results may not be used, reproduced or transmitted in any manner or for any purpose other than rendering Bing results within an RSS aggregator for your personal, non-commercial use. Any other use of these results requires express written permission from Microsoft Corporation. By accessing this web page or using these results in any manner whatsoever, you agree to be bound by the foregoing restrictions.https://www.york.ac.uk/depts/maths/tables/orthogonal.htmL50: One two-level factors at 2 levels and eleven five-level factors L54: One two-level factor and twenty-five three-level factors L64: Thirty-one two-level factors L64b: Twenty-one four-level factors L81: Forty three-level factors A Library of Orthogonal Arrays by N J A Sloane Table of Taguchi DesignsFri, 03 Apr 2026 17:26:00 GMThttps://support.minitab.com/en-us/minitab/help-and-how-to/statistical-modeling/doe/supporting-topics/taguchi-designs/interactions-and-interaction-tables/Interaction tables show confounded columns, which can help you assign factors to array columns. The columns and rows represent the column numbers of the Taguchi design (orthogonal array). Each table cell contains the interactions confounded for the two columns of the orthogonal array. The following are interaction tables for each array.Sun, 05 Apr 2026 17:31:00 GMThttps://develve.net/Orthogonal%20Array.htmlThe Orthogonal Arrays constructed with a fraction of a Full factorial array but the orthogonality (in-dependency) between the factors is kept. The factors are independent from each other and in balance.Sat, 04 Apr 2026 17:39:00 GMThttps://baike.baidu.com/item/%E6%AD%A3%E4%BA%A4%E9%98%B5%E5%88%97/18898228正交阵列概念由C.R.Rao于1947年提出，1973年发展为混合正交阵列以支持多水平因子设计 [7]。正交阵列双大集 (DLOA)被用于构造多重幻方和量子纠错码，其存在性问题在 组合数学 领域持续研究 [8]。 中文名 正交阵列 外文名 orthogonal array 所属学科 数学 所属问题 组合学（组合设计理论） 简 介 一类组合设计Fri, 03 Apr 2026 00:08:00 GMThttps://www.scientificlib.com/en/Mathematics/LX/OrthogonalArray.htmlIn mathematics, in the area of combinatorial designs, an orthogonal array is a "table" (array) whose entries come from a fixed finite set of symbols (typically, {1,2,...,n}), arranged in such a way that there is an integer t so that for every selection of t columns of the table, all ordered t-tuples of the symbols, formed by taking the entries in each row restricted to these columns, appear ...Sun, 01 Mar 2026 11:39:00 GMThttps://link.springer.com/article/10.1007/s44199-024-00093-9The selection of the Taguchi orthogonal array is based on the input factors and their levels. A key aspect of the Taguchi method is selecting suitable orthogonal arrays and interactions for the appropriate columns. Taguchi simplifies the assignment of factors through the use of triangular tables and linear graphs.Sun, 05 Apr 2026 22:31:00 GMThttps://support.minitab.com/minitab/help-and-how-to/statistical-modeling/doe/supporting-topics/taguchi-designs/taguchi-designs/Taguchi designs In This Topic What is a Taguchi design (also called an orthogonal array)? A comparison of Taguchi static designs and Taguchi dynamic designs Example of a Taguchi design How does Minitab choose the default Taguchi design?Mon, 06 Apr 2026 01:59:00 GMThttps://www.ncss.com/wp-content/themes/ncss/pdf/Procedures/NCSS/Taguchi_Designs.pdfTaguchi uses the following convention for naming the orthogonal arrays: La(b^c) where a is the number of experimental runs, b is the number of levels of each factor, and c is the number of variables. Designs can have factors with several levels, although two and three level designs are the most common. The L18 design is perhaps the most popular.Mon, 06 Apr 2026 16:18:00 GMThttps://blog.csdn.net/ztf312/article/details/80408613对于多输入参数组合类的测试方法目前业界流行两种方法，一种是OATS（Orthogonal Array Testing Strategy），即正交表法；另一种是Pairwise/All-Pairs Testing，即配对测试法。Sun, 05 Apr 2026 12:44:00 GMThttps://www.york.ac.uk/depts/maths/tables/l16.htmREFERENCE--TAGUCHI, SYS. OF EXP. DES., VOL. 2, PAGE 1130. --TAGUCHI, SYS. OF EXP. DES., VOL. 1, PAGES 188-205. NOTE--THIS DESIGN IS EQUIVALENT TO A 2** (15-11) FRACTIONAL FACTORIAL DESIGN NOTE--IF POSSIBLE, THIS (AS WITH ALL EXPERIMENT DESIGNS) SHOULD BE RUN IN RANDOM ORDER (TO ASSIST IN THIS RANDOMIZATION, SEE DATAPLOT'S REFERENCE FILES OF RANDOM PERMUTATIONS). NOTE--TO READ THIS FILE INTO ...Sun, 05 Apr 2026 19:40:00 GMT