Here is an aproximate translation of something you are trying to do..I think
It has a pair of numbers, eg 70 and 86. Ciclometrica The distance between the two is given by their difference, ie 86-70 = 16. If we denote the two numbers respectively with the letters "b"and"c"distance can be expressed algebraically as"CB". Adding the item right away you get a shift symmetric time:
70 (16) 86 (+16) is 12
Generalizing the operation carried out algebraically, indicating with "d"the number 12, we have:
d = c + (cb) => d = 2c-b
d = 2 x 86 to 70 = 172-70 = 102 (out of 90) = 12
Since the three numbers on the circumference ciclometrica form an equilateral triangle the number 12 is called "triangular closure." However, we have another chance to close a triangular symmetrical by moving counterclockwise.
54ç (-16) 70 (16) 86 (16)
This time, to derive the closure counter-clockwise "to"we must subtract from the left side"b" distance "cb":
a = b - (cb) => a = 2b-c
a = 2 x 70 - 86 = 140-86 = 54
If the basic numbers are marked with the letters "b"and"c", the two closures are obtained with the following triangular formulette:
d = 2c-b, a = 2b-c;
The isosceles triangle expresses the symmetry in ciclometria easier.
In order to have available at a glance all the symmetries between one or more pairs of numbers the Manna planted a simple statement, called ciclodinamiche before then, more appropriately, "symmetry":
On the flat line you write numbers double base, while the first column on the left are reported complementary to 90 base numbers. In inner cells, as in a multiplication table, we will cross the amounts of external values. Compile the prospectus for the pair considered 70 and 86.
For a = 70 b = 86, these are the values to be inserted on the outside line:
2nd = 2 x 70 = 50, 2b = 2 x 86 = 82;
-A = 90 - 70 = 20, b-= 90 - 86 = 4;
Omitting the sums of external values reported in the same letter, as you regain the starting numbers, here is the prospectus with the bilateral symmetry of the pair 70-86:
The problem is then proposed to deal with Manna was to be able to go back to basic numbers, generators of symmetry, the projections being known only bilateral (or triangular closure), that the internal values of the prospectus.
Let us assume that the internal numbers are known only, that is, the bilateral symmetry 12 and 54. As you climb to the torque-generating? We assign to the uncertainties of the letters "a" and "b", while describing the terms known, 12 and 54, respectively, with the letters A and B. Knowing that A = (2b-a) and B = (2a-b), to determine "a" and "b" is enough to solve a simple system of linear equations:
A = 2b-a B = 2a-b
We get "a" from the first equation and substitute the result in the second:
a = 2b-A, B = 2 (2b - A) - B isB = 3b - 2A
Since the last equation we obtain the unknown "b":
b = (2A + B): 3
Substituting the values of "b" in the first equation we can also find the unknown "to":
a = 2b-2 A = ((2A + B): 3)-A = (4A +2 B) :3-A is a = (2B + A): 3
This is the formula for DIEMME two numbers. We should add, however, some detail. Since the denominator is the number 3 has to result in a whole number is necessary that the numerator is divisible by 3: the precondition is that the numbers A and B belong to the same triple figures.
Now verify the formula for the pair Diemme Example 12-54:
a = (2B + A) 3 = (2 x 54 +12): 3 = (108 +12): 3 = 120:3 =40
b = (2A + B): 3 = (2 x 12 +54): 3 = (24 +54): 3 = 78:3 =26
The numbers 26 and 40, then, are those who through bilateral projection of the distance generate the pair 54-12. But the initial numbers were not 70 and maybe 86? Indeed they are! The numbers that we were at first considered this, but we have not committed any mistake. Using Diemme we divided the numbers by 3 and arithmetic ciclometrico clock when we divide a number by 3 we consider three modular valid: the three terms of the same triplet symmetric distance 30. These are good solutions:
a = 120: 3 = 40or 10or 70;
b = 78 3 = 26or 56or 86.
The third part of a number is equal to an entire triplet symmetric distance 30, that is an equilateral triangle. In fact, if we try to triple the elements that form a ciclometria figures above, for example 13-43-73, we get the same result:
3 x 13 = 39, 3 x 43 = 129 = 39, 3 x 73 = 219 = 39.
Now implanting the statement of symmetries for a set of three numbers abc:
We need to find relationships that allow us to go back to the original triad abc knowing the following interior elements:
A = 2c-a, B = 2a-b, C = 2b-c.
The solution, which is easily obtained by solving a system of equations with three unknowns, is as follows:
a = (A + 4B +2 C) 7 b = (4C +2 A + B) 7 c = (4A +2 B + C): 7
This is the formula Diemme, in pure form, on three numbers. In the denominator we have the number 7 and this complicates a little 'things, because it is not easy to trace the triads that make the numerator modularly divisible by this number. But the arithmetic of forms and of the remains comes to our aid. In mathematics, dividing by a number "n" means multiply by its reciprocal (1 / n). Lot of arithmetic, to form 90, the reciprocal of 1 / 7 is 13. In practice, divide by 7 means multiply by 13, and vice versa. The three formulas are thus converted into Diemme:
a = (4B +2 C + A) x 13 b = (4C +2 A + B) x 13 c = (4A +2 B + C) x 13
The formula used to calculate Diemme formations through which the game will generate the symmetries of the other, but nothing prevents us (we'll do it later) to determine a priori which features must have the training source.
Extraction No. 44 of '03 on June 3, 2004 Torino wheel diameter can trace both the 9-54, Sum 63. The additional amount of 63 to 91 is 28, numbers that track on Palermo.
We form two columns of three numbers, inserting the two diametrical, alternatively, the 1st and 3rd place.
We have to apply DIEMME to determine the three elements of the two triplets of origin, but you can do without the three formulas using a fast numerical technique, always sensed by Manna, called LINE OF SYMMETRY.
Take the first triplet, where A = 9, B and C = 28 = 54. Using the formulas we get:
a = (A + 4B + 2C) x 13 = (9 + 28 + 4 x 2 x 54) x 13 = 2977 = 7
b = (2A + B + 4C) x 13 = (2 x 4 x 9 + 28 + 54) x 13 = 3406 = 76
c = (4A + 2B + C) x 13 = (4 x 9 + 2 x 28 + 54) x13 = 1898 = 8
The three numbers 7-76-8, projecting symmetrically training 9-28-54 note, however, can be calculated in a way much more quickly. Calculated the "c", the foot of the column with the formula c = 52A +26 B +13 C,we can go back to the other two unknowns with simple calculations.
Multiply by two the "c" and subtract the value of A: 2 x 8-9 = 16-9 = 7.
So, double the number found "a", 7, and subtract B: 2 x 7 - 28 = 14-28 = 76.
2 x 8-9
2 x 7-28
Calculated on the base of the formation incognita, using the chain of symmetry we were able to reassemble it in its entirety. Proceeding similarly for the second triad we obtain:
2 x 53-54
2 x 52-28
We got two new triplets logically add up to 91. For both the middle number is 76, we drop the prediction. The other four numbers make up the rectangle 7-8-52-53, at stake for both the wheels of Palermo and Turin for a dozen hits (writing after the draw No. 46, June 9).
Note: 6th shot 7-53 on both Turin Palermo 8 th hit on 8-53.
One less flower
The vase is perfect