Tuesday, May 28, 2019
Egyptian Math Essay -- History Mathematics Research Papers
Egyptian Math The use of organized mathematics in Egypt has been dated back to the third millennium BC. Egyptian mathematics was dominated by arithmetic, with an emphasis on measurement and calculation in geometry. With their vast cognition of geometry, they were able to correctly calculate the areas of tri locomotes, rectangles, and trapezoids and the volumes of figures such as bricks, cylinders, and pyramids. They were also able to build the Great Pyramid with extreme accuracy. Early surveyors found that the maximum hallucination in fixing the length of the sides was only 0.63 of an inch, or less than 1/14000 of the total length. They also found that the error of the angles at the corners to be only 12, or virtually 1/27000 of a right angle (Smith 43). Three theories from mathematics were found to have been used in building the Great Pyramid. The frontmost theory states that four equilateral triangles were placed together to build the pyramidal surface. The second theory states that the ratio of one of the sides to half of the height is the approximate set of P, or that the ratio of the perimeter to the height is 2P. It has been discovered that early pyramid builders may have conceived the idea that P equaled about 3.14. The third theory states that the angle of elevation of the passage leading to the principal chamber determines the latitude of the pyramid, about 30o N, or that the passage itself points to what was then known as the pole star (Smith 44). antiquated Egyptian mathematics was based on two very elementary concepts. The first concept was that the Egyptians had a thorough knowledge of the twice-times table. The second concept was that they had the capacity to find two-thirds of any number (Gillings 3). This number could be either integral or fractional. The Egyptians used the fraction 2/3 used with sums of unit fractions (1/n) to state all other fractions. Using this system, they were able to solve all problems of arithmetic that involved fr actions, as well as somewhat elementary problems in algebra (Berggren). The intelligence of mathematics was further advanced in Egypt in the fourth millennium BC than it was anywhere else in the world at this time. The Egyptian calendar was introduced about 4241 BC. Their year consisted of 12 months of 30 days each with 5 festival days at the end of the year. These festival days were dedicated t... ...alking about. If they found some exact method on how to do something, they never asked why it worked. They never sought to establish its universal truth by an argument that would show distinctly and logically their thought processes. Instead, what they did was explain and define in an ordered sequence the steps necessary to do it again, and at the conclusion they added a verification or proof that the steps outlined did lead to a correct solution of the problem (Gillings 232-234). Maybe this is why the Egyptians were able to discover so many numeral formulas. They never argued why something worked, they just believed it did. Works CitedBerggren, J. Lennart. Mathematics. Computer Software. Microsoft, Encarta 97 Encyclopedia. 1993-1996. CD- ROM. Dauben, Joseph Warren and Berggren, J. Lennart. Algebra. Computer Software. Microsoft, Encarta 97 Encyclopedia. 1993-1996. CD- ROM. Gillings, Richard J. Mathematics in the Time of the Pharaohs. New York Dover Publications, Inc., 1972. Smith, D. E. chronicle of Mathematics. Vol. 1. New York Dover Publications, Inc., 1951. Weigel Jr., James. Cliff Notes on Mythology. Lincoln, Nebraska Cliffs Notes, Inc., 1991
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