ent000854-140

2-degrees play, the payer croupier doesn*t pay yet; the stake ?·a just displaced to the left by the croupier. In the event of the 2-degrees play is realized* thus if asthe stake* displaced to left, is definitively winning, the Gabriel BOTtiSTB Ingaloar E.S.L - UcfineiJ | JWBBL- . - H .BUB ?╟??╟? :, 1 __ ?√ß 13 ill B Pnissv 13 Bank would must pay* theorically* 35 times the capitalized ' stake* thus pays: 36 m x 35 = 1.260 m* so 1.260 times the t state But* in fact, the payment to be doing will be smaller for the following rea- son: In this 2-degrees play* effectively* the Bark agrees* allows : -on the one hand, the capitalization of an initial stake m on a chance equivalent <>tcr cl to a full number^ -on the other hand, the Bank agrees that initial's take to be a sufficiently big fraction of the maximum stake allowed on a full number, for instance 1/8, or or even a biger fraction of the maximum stake allowed on a full number. that is, obviously, an exceptional measure* a kindness* a favour granted by the Bank to the players. In counterpart, in counterbalance of this favour*the Bank would pay only* for instance* 1.000 or 1.050 times the stake m, the round about | rate of 1.000 times the stake being preferable ?╟≤ In admitting that the Bank agrees the stake a could reach* could amount at the 1/5 of the maximum stake allowed on a full number* the payment will be 1.000 times the 1/5 of this maximum* that is to say equal to 200 times the maximum of stake allowed on a full number: that is a considerable payment* appreciable for the player, whose stake will be only the 1/5 of the maximum stake allowed on a *~t~^W(full number). The Bank, in counterpart of the stake capitalization, which stake is of big amount, and which big stake the Bank agrees to be staked by the players* in this play* pays 1.000 times the stake a, instead of 1.260 times the stake a. So will the Bank feel itself in a favourable position of this plays thus* the average gain of the Bank, on each of these 3 pairs of cases* will be jjgmitwM of much greater 4 amount than the average gain of the Bank on any full number (on any single number all is the same that if there were, on the roulette layout, 5 supplementary (additional) full numbers* bringing together, on an average, to the Bank, more than the average gain brought to the Bank by a group of 3 numbers. So, when the Bank will appreciate, by itself* at tha&ena of one month of exploitation* for instance* the interest of this Group ori pairs of cases I have created* and by the new chance I have conceived* the Bank could increase the amount of the stake which be allowed on this new chance * and could decide a greater amount than the 1/5 of the maximum stake allowed on a full number. During on?½ day* the first degree of the play will be realized often enough to attract mad to tempt the clients* the customers* on this new chance* without costing anything to the Bank, but on the contrary bringing revenue to th?½ Bank * in fact, the position, after th?½ first degree* Is just momentary and very preca- rious for the players, because the realization of the second degree is necessari- ly* is inevitably very rarely. It is obvious that the considerable payment of 1.000 times the stake* and that of a great enough stake* will provoke the covetousness and the desires of many players, even such an event occurs rarely. Obviously, many players will work ceaseless and with vehemence* at this Group of 3 pairs of cases* then on this new chance, aa much for the expected pleasure to touch a big payment from the Bank* as few the expected pleasure of touching it* in front of all the other players. The true players* therefore th?? audacious and inveterate players* who agree to lost often, but provided to touch very big money when they are winning, will and therefore will stake often, simultaneously, on the 3 right zones: ?╓¬* - iUJSH ^ play often, together, on the^chances or zones : ADVANCE, it&CGIL and BEF&illlON