(One)
Theory is very simple, it does not go beyond the traditional mathematical concepts.
1,2 chase with a negative cable, first under a basic code, lost the next two elementary straight sets twice a cable is broken.
Next, put the cable divided into two parts 1,2.
The first part is the basic code of two consecutive wins, the probability of occurrence are:
(+ +) 1/4 (+ - +) 1/8 (- ++) 1/8 (- + - +) 1/16
1/4 + 1/8 + 1/8 + 1/16 = 9/16
The second part is not to win two in a row after a cable on the basic code,
The probability of occurrence is: (- -) 1/4 (- + -) 1/16 (+ -) 1/8
1/4 + 1/16 + 1/8 = 7/16
The probability of this happening is greater than the first part of the second portion of the probability of occurrence, which is a continuous probability to win two basic codes is greater than the probability that no two consecutive wins to the basic code after breaking cables.
9/16 greater than 7/16
(B)
123456789 .... Such a staircase cable Why not work? Because the stakes eventually not return to the origin.
Stairs cable each level the speed of the rise and fall of probability is 50:50
If our bet is 7/16 the speed of the rise and fall of the speed is 9/16
So eventually they can return to the origin of profit.
But in such a way to design stakes, the stakes are still rising rapidly. Well soon exceed the limit of red.
Furthermore, we have designed a better bet.
The first layer win two basic codes (probability is 9/16) - Upgrade to win the second floor are two basic codes (probability 9/16) - and then back to the first layer win two basic code (probability 9/16)
That is: the first layer of win - win a second layer - the first layer win
(Note code to speed 9 / 16-7 / 16 from left to right)
The first layer win - win a second layer - the third layer win - win a second layer - the first layer win
(Note code to speed 9 / 16-7 / 16 from left to right)
The first layer win - win a second layer - the third layer win - win a fourth layer - the third layer win - win a second layer - the first layer win
(Note code to speed 9 / 16-7 / 16 from left to right)
The first layer win - win a second layer - the third layer win - win the first N-1 layer - layer N Win - win the first N-1 layer - the third layer win - win a second layer - The first layer win
(Note code to speed 9 / 16-7 / 16 from left to right)
(three)
Size N values, determines the size of the amplitude.
If there is enough strong capital, this way alone can achieve a win.
