Rus Articles Journal

# Let`s open a microcosm - it is happiness for Mankind of

to the Wise man the guest came and called himself the seeker Istin. Wise man: - If so, then at you has to be present, at least one Istin? Guest: - No! I am a passionate seeker Istin. Wise man: - To you parable. Two zoologists argue with fervency that whether the mole has eyes. The gardener brought them a live mole. They flatly refused a mole, having explained that they argue in principle. So that you are a seeker Istin in principle. The guest recognized the mistakes.

Disputes in principle and number of seekers of Istin can be reduced sharply, having created the volume 6th-dimensional screen, the size 2mkh2mkh2m - rubik about 10 Art. 21 - the virtual world, on the basis of the computer which is increasing, reducing and carrying out 10 Art. 12 operations per second. 10 Art. 12 = 1 trillion - after 1 cost 12 zero, 10 Art. - 12 = 1piko, 10 Art. 21=1sekstillion - after 1 cost 20 zero. In one part of the virtual world to place each ancestor and us, and in other part - what has to be in an ideal look. Delivering data in the computer, we learn that the ideal woman who reached 30 - summer age consists from 360kh10st. 21, and man, 366kh10st. 21- 366 sekstillion of cages. And each cage has the size 10 of the Art. - 21 = 1butto - is indivisible, at the same time the person - a clone. - 1butto there is an absolute black (impenetrable) body, and +1butto there is an absolute white (transparent) body. Then the part is equal to whole. And still increasing each cage - a clone to 183 cm, we learn: how many personal and others` cages - clones, who is who, and is not present dead bodies. Each ideal person consists of a skeleton, external and internals. Are known their weight, coordinate relatively from the beginning - the center - a navel, the sizes and forms. All created bodies leave from one place, there will never return. There, from where left, the Father - God - the Count puts. There is a Father, there has to be Mother - the Goddess - the Countess, and she releases. Each person is uniform and God is uniform, the Man - God, the Woman - the Goddess. Each integer - is uniform, has a name, each person can appropriate the only code - number. Then men have odd a code - the last right figure: 1, 3, 5, 7, 9 in odd years, and women - an even code - the last right figure are also given birth: 0, 2, 4, 6, 8 are also born in even years. There is no number, at the same time are odd and even, there is no person, at the same time there was a man and the woman. A code - number and the number of men and women are counted in integers. Still it is necessary to notice that in game of chess there are 20 beginnings - the first course white: one of 8 pawns on 1 course forward - 8 options to advance on 2 cages - 8 options, each 2 horses have 2 options of the course. Black figures also have 20 courses of the answer. Means, in the world all live, and we act along a live corridor. Therefore carefully enter legs, wipe a face from drops and dust it is gentle, and that you will offend billions of people at once. Now the quicker - slowly we will create 6 - the measured virtual world, we will see and to communicate with ancestors and friends in an ideal look.

Natural numbers through each 3 categories pass into the following numeral systems. Means, the basis of natural numbers are 1000 = 10 Art. 3. We know that it is possible to construct a big cube of 1000 identical sizes of a cube - rubik about 10. 10 Art. 2 are the basis of this rubik. Each natural number it is replaceable 1 (units) and we will remember school days. Take number 10, and replace with 1 (units) so: 0111111111 and 1111111110. It is clear, that 10 + 10 =20. At multiplication in a column receive: 0123456789876543210. If you have a calculator 20 - digit, then it is very simple. If you increase 10 units by 10 units, then receive 0123456789876543210.

From there is conclusion: any natural number n can be replaced with 1 (units) and at multiplication we will receive: 0123 … (n - 2) (n - 1) n(n+1)n (n - 1) (n - 2) … 3210 and 123 … (n - 2) (n - 1) n (n - 1) (n - 2) … 321. Surprisingly that 0+1+2 ++ … + (n - 2)+ (n - 1) +n+ (n - 1)+ (n - 2)+ … +2+1+0 =n of Art. 2.