. . . "The earliest extant Chinese illustration of 'Pascal's Triangle' is from Yang's book Xiangjie Jiuzhang Suanfa (\u8BE6\u89E3\u4E5D\u7AE0\u7B97\u6CD5) of 1261 AD, in which Yang acknowledged that his method of finding square roots and cubic roots using \"Yang Hui's Triangle\" was invented by mathematician Jia Xian who expounded it around 1100 AD, about 500 years before Pascal. In his book (now lost) known as Ruji Shisuo (\u5982\u79EF\u91CA\u9501) or Piling-up Powers and Unlocking Coefficients, which is known through his contemporary mathematician Liu Ruxie (\u5218\u6C5D\u8C10). Jia described the method used as 'li cheng shi suo' (the tabulation system for unlocking binomial coefficients). It appeared again in a publication of Zhu Shijie's book Jade Mirror of the Four Unknowns (\u56DB\u5143\u7389\u9274) of 1303 AD."@es . . . "Yang Hui"@es . . . . . . "The earliest extant Chinese illustration of 'Pascal's Triangle' is from Yang's book Xiangjie Jiuzhang Suanfa (\u8BE6\u89E3\u4E5D\u7AE0\u7B97\u6CD5) of 1261 AD, in which Yang acknowledged that his method of finding square roots and cubic roots using \"Yang Hui's Triangle\" was invented by mathematician Jia Xian who expounded it around 1100 AD, about 500 years before Pascal. In his book (now lost) known as Ruji Shisuo (\u5982\u79EF\u91CA\u9501) or Piling-up Powers and Unlocking Coefficients, which is known through his contemporary mathematician Liu Ruxie (\u5218\u6C5D\u8C10). Jia described the method used as 'li cheng shi suo' (the tabulation system for unlocking binomial coefficients). It appeared again in a publication of Zhu Shijie's book Jade Mirror of the Four Unknowns (\u56DB\u5143\u7389\u9274) of 1303 AD. Around 1275 AD, Yang finally had two published mathematical books, which were known as the Xugu Zhaiqi Suanfa (\u7EED\u53E4\u6458\u5947\u7B97\u6CD5) and the Suanfa Tongbian Benmo (\u7B97\u6CD5\u901A\u53D8\u672C\u672B). In the former book, Yang wrote of arrangement of natural numbers around concentric and non concentric circles, known as magic circles and vertical-horizontal diagrams of complex combinatorial arrangements known as magic squares' and magic circles, providing rules for their construction. In his writing, he harshly criticized the earlier works of Li Chunfeng (\u674E\u6DF3\u98A8) and Liu Yi (\u5218\u76CA), the latter of whom were both content with using methods without working out their theoretical origins or principle. Displaying a somewhat modern attitude and approach to mathematics, Yang once said: The men of old changed the name of their methods from problem to problem, so that as no specific explanation was given, there is no way of telling their theoretical origin or basis. In his written work, Yang provided theoretical proof for the proposition that the complements of the parallelograms which are about the diameter of any given parallelogram are equal to one another. This was the same idea expressed in Euclid's forty-third proposition of his first book, only Yang used the case of a rectangle and gnomon. There were also a number of other geometrical problems and theoretical mathematical propositions posed by Yang that were strikingly similar to the Euclidean system. However, the first books of Euclid to be translated into Chinese was by the cooperative effort of Matteo Ricci and Xu Guangqi in the early 17th century. Yang's writing represents the first in which quadratic equations with negative coefficients of 'x' appear, although he attributes this to the earlier Liu Yi. Yang was also well known for his ability to manipulate decimal fractions. When he wished to multiply the figures in a rectangular field with a breadth of 24 paces 3 4\u204410 ft. and length of 36 paces 2 8\u204410, Yang expressed them in decimal parts of the pace, as 24.68 X 36.56 = 902.3008."@es .