2012 Maya
by Henryk Szubinski
Locate the time previous to the discovery of the new world of Maya during the 1400's by columbus
and
Define 2 mathematical theories from 2 variable mathematicians as theory 1 = theory 2
Theory
1)
from Wikipedia
date, 17,09,2016
time, 10:38
Zhu Shijie (Chinese: 朱世杰; pinyin: Zhū Shìjié; Wade–Giles: Chu Shih-chieh, 1249–1314), courtesy name Hanqing (汉卿), pseudonym Songting (松庭), was one of the greatest Chinese mathematicians living during the Yuan Dynasty.
Zhu was born close to today's Beijing. Two of his mathematical works have survived. Introduction to Computational Studies (算学启蒙Suanxue qimeng), and Jade Mirror of the Four Unknowns.
Zhu's second book, Jade Mirror of the Four Unknowns, written in 1303, is his most important work. With this book, Zhu brought Chinese algebra to its highest level. The first four of the 288 problems for solution illustrate his method of the four unknowns. He shows how to convert a problem stated verbally into a system of polynomial equations (up to 14th order), by using up to four unknowns: 天Heaven, 地Earth, 人Man, 物Matter,and then how to reduce the system to a single polynomial equation in one unknown by successive elimination of unknowns. He then solved the high order equation by Southern Song dynasty mathematician Qin Jiushao's "Ling long kai fang" method published in Shùshū Jiǔzhāng (“Mathematical Treatise in Nine Sections”) in 1247 (more than 570 years before English mathematician William Horner's method using synthetic division). To do this, he makes use of the Pascal triangle, which he labels as the diagram of an ancient method first discovered by Jia Xianbefore 1050. The final equation and one of its solutions is given for each of the 288 problems. Zhu also found square and cube roots by solving quadratic and cubic equations, and added to the understanding of series and progressions, classifying them according to the coefficients of the Pascal triangle. He also showed how to solve systems of linear equations be reducing the matrix of their coefficients to diagonal form. His methods pre-date Blaise Pascal, William Horner, and modern matrix methods by many centuries. The preface of the book describes how Zhu travelled around China for 20 years as a teacher of mathematics.
The methods of Jade Mirror of the Four Unknowns form the foundation for Wu's method of characteristic set.
Theory
2)
from Wikipedia
date 17,09,2016
time, 10:39
Madhava of Sangamagrama (c. 1340 – c. 1425), was a mathematician and astronomer from the town ofSangamagrama (believed to be present-day Aloor, Irinjalakuda in Thrissur District), Kerala, India. He is considered the founder of the Kerala school of astronomy and mathematics. He was the first to use infinite series approximations for a range of trigonometric functions, which has been called the "decisive step onward from the finite procedures of ancient mathematics to treat their limit-passage to infinity".[1] One of the greatest mathematician-astronomers of the Middle Ages, Madhava made pioneering contributions to the study of infinite series, calculus, trigonometry, geometry, and algebra.
Some scholars have also suggested that Madhava's work, through the writings of the Kerala school, may have been transmitted to Europe via Jesuit missionaries and traders who were active around the ancient port ofMuziris at the time. As a result, it may have had an influence on later European developments in analysis and calculus.[5]
2)
from Wikipedia
date 17,09,2016
time, 10:39
Madhava of Sangamagrama (c. 1340 – c. 1425), was a mathematician and astronomer from the town ofSangamagrama (believed to be present-day Aloor, Irinjalakuda in Thrissur District), Kerala, India. He is considered the founder of the Kerala school of astronomy and mathematics. He was the first to use infinite series approximations for a range of trigonometric functions, which has been called the "decisive step onward from the finite procedures of ancient mathematics to treat their limit-passage to infinity".[1] One of the greatest mathematician-astronomers of the Middle Ages, Madhava made pioneering contributions to the study of infinite series, calculus, trigonometry, geometry, and algebra.
Some scholars have also suggested that Madhava's work, through the writings of the Kerala school, may have been transmitted to Europe via Jesuit missionaries and traders who were active around the ancient port ofMuziris at the time. As a result, it may have had an influence on later European developments in analysis and calculus.[5]
Any theory detials of the 1) may = any of the theory 2) as 1/2 = MAYAN SCIENCE.
The first four of the 288 problems for solution illustrate his method of the four unknowns / infinite series approximations for a range of trigonometric functions,= MAyan civilization.
288/ range =the degrees by which the expansion located the new world of Maya as the 288 degrees are referenced to the other side of the Earth as >180 degrees or half the circumference of the infinite range of the altrnate side being <360 but >180 degrees.
The question then, means that the MAYANS could have known of the remaining angle as the way towards the OLD WORLD of EUROPE by their advanced systems of mathematics.
also;
quare and cube roots by solving quadratic and cubic equations / limit passage to infinity = INCAN mathematics
to locate the center of the 288 degree angle between the quadratic of the radius and the diagonal by the limit of the angle but the rotations of the circumference without limits .So the m as matter has to equal the function of infinite rotations about it as the m=center of the circumference.
Mayan temple and the angle of it's expansion of 1 degree or more outwards towards the surface.
The first four of the 288 problems for solution illustrate his method of the four unknowns / infinite series approximations for a range of trigonometric functions,= MAyan civilization.
288/ range =the degrees by which the expansion located the new world of Maya as the 288 degrees are referenced to the other side of the Earth as >180 degrees or half the circumference of the infinite range of the altrnate side being <360 but >180 degrees.
The question then, means that the MAYANS could have known of the remaining angle as the way towards the OLD WORLD of EUROPE by their advanced systems of mathematics.
also;
quare and cube roots by solving quadratic and cubic equations / limit passage to infinity = INCAN mathematics
to locate the center of the 288 degree angle between the quadratic of the radius and the diagonal by the limit of the angle but the rotations of the circumference without limits .So the m as matter has to equal the function of infinite rotations about it as the m=center of the circumference.
Mayan temple and the angle of it's expansion of 1 degree or more outwards towards the surface.