Selasa, 13 Januari 2009

MATHEMATICS HISTORY of PURSUANT TO FIGURE

MATHEMATICS HISTORY of PURSUANT TO FIGURE
1. Euclid
¢ Straight line can be depicted from other titik(sembarang)titik sampai(sembarang)titik
¢ Tip of straight line can be continued to be continued by as straight line
¢ Radian can be depicted from any dot center with with the different radius
¢ All right angle;corner beside the level of equal to the other side
¢ If proportioned straight line become two straight line , angle;corner beside in line at is same side than two parallel angle;corner, if continued until ketitik do not till will be proportioned at side of where its angle;corner is compared by smaller angle;corner which is formed of two line
2. Thales
¢ divided by Radian two by two line passing its center is so-called with the diameter
¢ Level of isosceles trilateral base angle is the level of same
¢ Sudut-sudur Vertical which formed of two proportioned parallel line by a straight line traverse of equal size
¢ If its side couple, a couple of angle;corner which lay by that side of equal size nya hence that trilateral told is same wake up
3. Pythagoras
¢ Each;Every number is symbol / symbolising something that of related to metaphysics
¢ long Square is simplest form in geometry, but returning of consisted in by a irrational number
4. Archimedes
¢ Radian Form, elliptical, and hyperbola can be formed by only bagimana of[is way of we mark with lines the area
¢ Parabola is special form from taking sunshine from direction manapun and focussed at one particular dot and concentration of all energy light at narrow;tight area to be re-transmitted in binding very hot
¢ Counting wide of parabola, hyperbola, and determine the dot center the grafitasi at semicircle and one circle
5. Fibonacci
¢ Year 1202 publishing book of Liber Abaci by using what referred as with the algebra , by using numeral hindu Arabic
¢ Finding deret number called by like its own name that is deret Fibonacci that is 1, 1, 2, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 610, 987
¢ In book of Liber Abaci did explain the process aritmatik, including the way of searching number root
¢ Defining number of zero and count the atypical nature pattern and at the same time elementary member at recognition of algebra of kedunia west

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