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Pascal's Trianglefinnish_translation.jpg

Pascalin kolmio

blaise_pascal_potret.jpgBlaise Pascal did not invent the pattern, because even the ancient Chinese have known it. However, Pascal found the usefulness of the triangle to mathematical problems.

From the point of view of EP-calculation; it is important that the rows are countable up to the sixth row. After the sixth row, numbers run away from the comprehensionThe sum of the half sixth row, is a high degree of accuracy the golden section ratio of 1.618. This is the letter phi of the Greek alphabet.

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viisikulmiot.jpgStudies show that people are able to manage up to five simultaneous events, and in some cases, the most talented to ten events. The same idea can be used for the calculation. Number five as the proportion steps, is the limit of the proportionality.

Pascal's triangle is said to increase the sum of each row, having the coefficient 11 => 1 x 11 = 11 => 11 x 11 = 121, which can be seen in the table. There is no coefficient 11 in the nature. The coefficient 1.1 has the connection to the natural occurring phenomena, and the EP-calculation is based partly on this coefficient, especially in the context of the deflection.

                            1.1

                       1.1 x 1.1                  = 1.21

                  1.1 x 1.1 x 1.1             = 1.331

            1.1 x 1.1 x 1.1 x 1.1          = 1.4641

        1.1 x 1.1 x 1.1 x 1.1 x 1.1     = 1.61051        Golden Ratio

Looking at the horizontal rows of numbers, the sum of each line is doubled compared to the upper rowLooking at the horizontal lines to form a number that is obtained by multiplying by 11 the previous line number1331 x 11 = 14 641The above is described in matematiiikassa odysseya correlation can be found in the sea route to India in the form of discovery in 1492Figure 11 is true, but in the wild do not have access to the coefficient 11A factor of 1.1 instead of an infinite number of possibilities for the calculation.

                         1                             1

                   1         1                        2

               1        2        1                   4

          1        3       3       1                8

      1       4        6       4      1            16

  1     6        1        1       6      1        32

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