Hi All,
I'd like to ask you all to give me some advice on my MAGIC SQUARE idea.
I had a dream last night. It is about a MAGIC SQUARE!
Please look below.
2 9 4
7 5 3
6 1 8
I'm sure you all have seen it.
I'll transform it into roulette terms in even chance.
B R B E O E
R R R O O O
B R B E O E
I've got these 2 MAGIC SQUARES. Low/High is also possible, I think.
My idea is to select the outcomes of the 2nd and 3rd of the THIRD ROW.
I'll try to explain it.
For the 2nd of the THIRD ROW,
(1) If the 1st & the 3rd of the SECOND ROWare the same, I'll bet the same as the 2nd of the FIRST ROW.
(2) If the 1st & the 3rd of the SECOND ROWare opposite, I'll bet the opposite of the 2nd of the FIRST ROW.
See the example,
RBR
RRR
R?
In this formation, I'll bet the BLACK.
See again,
RBR
RRR
R?
In this formation, I'll bet the RED.
Let's see more.
For the 3rd of the THIRD ROW,
(1) If the 1st of the THIRD ROW & the 3rd of the FIRST ROWare the same, I'll bet the same as the 1st of the FIRST ROW.
(2) If the 1st of the THIRD ROW & the 3rd of the FIRST ROWare opposite, I'll bet the opposite of the 1st of the FIRST ROW.
See the example,
[/color]RBR
RRR
RB?
In this formation, I'll bet the RED[/b].
See again,
[/color]RBB
RRR
RB?
In this formation, I'll bet the BLACK[/b].
Please look at a few testing list.
RBR
RRR
RBB WL
RBB WL
BRB WL
BBB WL
BBB LW
RBR WW
BBR WL
BRB WW
BBB WL
BRR WL
BRB WW
BBR LW
BRR LL
BBR LW
RRB LW
RRR WW
I'll appreciate all your advice.
I also want to know which MM is suitsble for this idea.
WELCOME TO ALL!!!
A very interesting First Post tayzar.
Welcome to the forum. :thumbsup:
I think the 'Matrix Boys' will be over to have a look at Ur handy work here, tho in reading it, I think U should re-check some of Ur post, and maybe post it again. Seems to be a few errors in there!
Great 1st post tho.
cheers.
thanks chris!!!
I hope we all can discover some advantages in the this magic square.
8 1 63 5 74 9 2
It is also the opposite of the roulette table display!
(link:://rouletteforum.cc/data:image/png;base64,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)(link:://rouletteforum.cc/data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAPQAAAERCAIAAADDsx0sAAAdJElEQVR4nO2d32/d1n3Av8DSulPj1LQtRZFlxaIj25rlOhPdxLG9RB6O0iLR0MIbgboOBGfYaKRYNTeIwQFzkcZFUKIJ0jz4ocTQlwbF3DvAMAysDyFgxAP2VMKAsdcS0j9g2n+ADu8ezjVF3V/iJb9fXpL3+8FFcO9VzEOe87mH5wfP9wAwDMMwDMMwDFN1giDo89cwDAs7k/z0P9tqXQuTiyAILMvq/D75ZaPRKPCMshOGoW3bmqa1fe+6bvzetu1iTyoLfX6B/OMcgCAIOt0Nw9A0Te8pQzmxDHS9FgBIXkvJ5Wg0Grqut+V58r5qGEbhJ1VlOvW1bdu27f5tlXLSeS2e5wkhKvETDcNQ5Xnb2dq23Wg01I+zioUyTDoL3jRN9aYSN/EkXX+ouq4DgKZpVbmc5FWEYWgYRqPRKPk9p6R0rdXCMHQcB6rmd68aOu5aVOJyklehGirqfSVOvlz0uWU7jtPZPysz/ZsfVbmczqsIgkCZzX4PRiXaoynpfy1VubP3uoqq/DhLRH8h4ntiJdjxh1qJy+l1FVX5cZaIzoEn3/fVe9d1q3Uf7DpaEr93HCc55l1a+vxEy/njLOnEmed5qqcV98fjfqTjOOp9VfB9X12L67pqyEz9SnVdd13XcZyqzEYl5fZ9P5ZDXcWQTqo7vSbOyjsJGARBbRriYRh6nhffi8pMcoQqzn9N0zRNU1qX8LZTp0lAZgiU/MdZp0lAhtlGnSYBGWYbdZoEZJht1GkSkGG2UbEuY3T9xrBPAYHmf/5Xc31j2GeRl+bjJ9HN0g2SJKnSJGDzwcPNsYlhnwUC8sTpGvxKo9t35dTcsM+iH1WaBIxuuvLZyea9+8M+kbzIycPy/FvDPou8RKuW/NaB5uMnwz6R7nROnJV6EjC6cGlzbKLqdV7zwUM5eVjOLgz7RPIiT5zeHJuIbt8d9olA8/GTlM288k4CytmFzbEJeXZ52CeSi+imuzk2IQ8dr3qzW87Mb45NRKtd1rkWSfTFLTk1F1lrwz2NXDQfP5HTRzfHJqpe58kVc3NsoiR1XmbU/WdzbEKeOD20c3j8RL75fbnvRTk1V9rWUSqa9+7LvTM1qPPk/KmW3MOu8/IQffyJugo5Mz+cE7jpygNHNscm5Phs8+4fh3IOaETWmsrNStd58f1nuHVefuL7j5w83HzwsMikm+sbcvGcquk2xybkm98vMnUS5LHFWG65Yg77dDKiGtytqzhwpLo3U9X/adU1RXXxm/fuy7PLce1Q9Txs0VzfUPeg+FZY0UuSi+fiq6juyE90+25ccRbTC4puunJ2QbXyt9LdO1PyWaRUJNskLS0qeFXN9Y324in3JEgv5NnlbVcxeZho8qG5vhGtXVPDMp0vuXiOItGttAmPnqDz8uTcyWKSRqTzJ1p8gzU/zfWNZMOAtKG4OTYhv3Wgu9lkv6gWcvFcATVodNNN3gSrq0XXGqhy/Ydo7VqXqyBr+zbv3Y/WrsnFc3LuZakdLK52az5+UoDfcTtV7ntRad1qmVy4RJouLtEXt7Y6+Hum5fhsRbtEcVeyNc799KKo+w/R5Styaq7Q1ja136orKffOyNmF5r378oyIvrjVmqqsVLdStVPl9NFo7Vq0akW//Z188/tK8ehXnw/77NIS3b4rtYNy74xcPNdc35ArZvTxJ+qORNqtjC5fiX71eXT9Rvy7oktrG6R+R9aa3DMd1wryjFApqvZrVbqVzfWNzbEJ+cqS6qVEq5ZqLzbv3ZdTcxXqP8izy8laU7Wpmo+fqMd+iBqKymxITItGa9coEupO8/GTRydP229+z0bn3X+033tv6+P0oa3377237U8l58I/bL1feNm+eKn7n0rOxUv21atbH1861vNPSLhnXk/e2eTMvJw8XPQUtXfnjrV/0vvJTz1Kvjy+SHp8z/MMw6BOwlt+2/v0M9IUHMexLIs0Cc/zvjz9Bm0C310Rc0eTmsmzy0PognueZ1+9St2/VM0SUoQgTyJultDheZ5N/zA+qWeqNdJWHM1794fQ0VK5Sd2/ZLlTUnW543Z2AcWxM3FukvrNcqek0nLHZkPZ5AZKv1nulFRX7qTZUEK5gcxvljslFZW7zWwop9xA4zfLnZIqyt1pNpRWbiDwm+VOSeXk7mo2lFluwPab5U5JteTuZTaUXG5A9ZvlTkmF5O5jNpRfbsDzm+VOSVXk7m82VEJuQPKb5U5JJeTe0WyoityA4TfLnZLyy53GbKiQ3JDbb5Y7JSWXO6XZUC25IZ/fLHdKyix3erOhcnJDDr9Z7pSUVu6BzIYqyg1Z/Wa5U1JOuQc1GyoqN2Tym+VOSQnlzmA2VFduGNxvljslZZM7m9lQablhQL9Z7pSUSu7MZkPV5YZB/Ga5U1IeufOYDTWQG1L7zXKnpCRy5zQb6iE3pPOb5U5JGeTObzbURm5I4fcfjn5bhbNoNBo50+pFkXL7vh9vHodLwXL7vu+6rutuFRyK2VAnuaG332EYGoZhTU6HYai27zYMQ23BhksBudl4Q9gXW4EOk0IgUpjcjuPoum5ZVrIssMyGmskNPfw2TVPTtGSzRAhBceWF1dyGYQAAxe8TCpHb9339m8/quu5t3/wO0Wyon9zQw28hRFJuosIrsllCt0MztdzqhmPs0cIwTH6PazbQFEfbOe/8J/Tc7PRb1/U2uSnkKEbuxocfAdnvE4jlVmZrmvbouz9Ifo9uNmAXh+u6nbeaZMuwe6ZR5GbSb7XVsT19SP3J931N0yi6lcXIrdrcdN1iOrmDINA0TSWRHC2hMBvU7fr4K3LFzB9CNggCVTG3yW2aZhycsKCaWxH7Heep6pVblkU0zlCM3PrUFPS9P+aETm6VP5qmmaYpxp9Xb/y/+3uiKONCCLWXg9pTPPrV5/ljBSbl9jxPCOH13zObLjdjv+Pjq1qciALkDi5cpE6IqDjiCkXdyuWKGYahsX8cOqpDLFQuJXcGlOOzcsXMM1GQPNW4catpWs8cI23k+V99JZ7bY7/5vV++2Nr+i2gEDQqR233tdaBscANZcahjmmarNSJXzOjyleDffgZk+aYO27x3P95oJd5cQc4uyLPL0fUbg4re+TsMgqDV7o0zrfngYfPeffXyPv3Mvngp/oj4ct//AAD8T38tJw/L46841hUA0HbvDn5/iyI5YZyiOGzyZU6/CAD+b/6DLgmi4jCOHAWAxocfqY+bYxPR5SvNp26RFof89mtdtzVTW+TIQ8fl/Cm1H0sGuRWO46imLwBA9PNfRquWennLb9sLL8cfsV7BhYvarl3xkTfHJuTxV6wj8wBAkVy0aompaYrDJl/aXzyjfX0XaRJExdEq91UrWrXk/kPy0PHO74mKQ86d7CW32tFTHjgi509F1lpmuXt2gYjug47jQGKmQ377Nbl4LvjoYyC+D9KhctZcOk+dCmmHUo2NqNESdUW0zZKO/Wk3xybkoeNydkGef2vQlkmf7kH3wWXSRl6MPCNU/xIqK7e6ItXWooOoOHRdF0LEo35KbtVaJeoFtTqUiW3FW8Mm129k3hmnbbQkfu84TverIO2ex510NYnjf/UVALgX30FPDujlbs26//4WaSpExWFZlrF/PB71kyumuqmqi6JACBF9cUvumc4/ThIEgWoI2Lad9ErXddd1HcfpOe1Adx+0LCsWTp4RYRgKIazLl4ni25PK3VJh33jmEkoJUXGEP3pXGxuLa7tH3/2BYRiGYdAN2Ash5Mw81gh3J2EYep63w5wJ6VCgbdumadq2bU8fMk1T3TuI4tsTya0eClU1nL77ucaHHxFNQikoikO1RoIgiPfRM6cO2rZNZzYACCGGv5VuQc9Ybl+sQOE3L1boStfZ9QJ2zavhU4G96FyJg+43y91Jr+dGWG5Mui4zw/Wb5W6jzxNRLDcmvdZQIvrNcifp/6wfy41JnwXCWH6z3DE7PsXKcmPSf/U7it8styLN89ksNyY7hnbI7zfLDalXHrDcmKSJW5LTb5Y7/ZoalhuTlEF58vg94nIPtFqM5cYkfcSpzH6PstyDroNkuTEZKJxaNr9HVu4MK3xZbkwGjRWYwe/RlDvb2nWWG5MMgTAH9XsE5c4clYHlxiRblNeB/B41ufPEG2G5Mckcwji93yMld85IOiw3Jnnic6f0e3Tkzh8jiuXGJGfw+TR+j4jcKNHPWG5M8u+ssKPfoyA3Vlw/lhsTlG1D+vtde7kRI1ay3Jhg7YnTx+96y40bi5XlxgRxw6deftdYbvQowyw3Jri7mfXavwExia4MRW6K+NksNyboW/V1+l1LuYkiw7PcmFDsQ9nmd/3kJjIbWG5ciDZZTfpdM7npzAaWGxe6HYRjv+skN6nZwHLjQro9tvJbHJunS0JRkNwn/prUbBgpuVV8W1r27KM9/tKS9swz4tg8bSpT08I4RZqCsX9c37efNAkhhBh/njyJkshd9ZpbIZaWiOLHxlDX3NHlK5714yL3fqeD5cZECEEUPzaGVG7Vzi5s73fqJFhuTFRukvpNJ3fcg2S5MamZ3EDpN5HcybERlhuT+skNZH5TyN026sdyY1JLuYHGb3S5O8ezWW5M6io3EPiNK3fXmRqWG5Mayw3YfiPK3WsOkuXGpN5yA6rfWHL3mV1nuTGpvdyA5zeK3P2fG2G5MRkFuQHJ7/xy7/hEFMuNyYjIDRh+55Q7zbN+LDcmoyM35PY7j9wpn2JluTEZKbkhn9+Z5U7/fDbLjcmoyQ05/M4m90ArD1huTEZQbsjqdwa5B11Tw3JjMppyQya/B5U7w2oxlhuTkZUbBvd7ILmzrYNkuTEZZblhQL/Ty515hS/LjcmIyw2D+J1S7jxr11luTFhuSO13GrlzRmVguTFhuRVp/N5R7vzxRlhuTFjumB397i83SiQdlhsTljtJf7/7yI0VI4rlxqSA3PR935qc1jQNAEzTDMOQIhWs3Ozjt3WkPaiV53mAGtePtDj6HLnRaOCmRSF3H3O6/4labt/3Hcd59OpSGIaWZQGAaZJUG4i52dXvIAjE1LR98ZKdALAjVtIVRxAEAGAYhhDbIk5pmkYhIu4xXdfVdV1VJckv4/fdM63IZglRna3Azc1Ovy3L8pbfbmuWoEespCsO27Z931fv42ZJGIaapinvcUEsjiAIlDltcpum6T1lODW3Iim3ap+gg179JP0OgkDTtMYbIik3RSzWgtvcpmkSJSeEiD7+pPngIeIxk3J7nieEaNO9yz8oTG6VUPJuggjFvTX2WzWoAEDbvVudP1GU4SLlbjQauq7TdYHk4jmpHZRzJ6ObbvPxk/zHTKps27au6wCgaVrPHCsmNx+9umTb9s4/tRwQdc+V395Pfmrbtr77OfWle+Z1oijDhckdhqGu6+j9yBghRHN9Q04e3hyb2BybkDPz0YVLOSvyTnmCIFD1znDa3I7jWJalPfM1TdMcx6FLiG7sKa6/o1XLsa4AgDY2RlThFSa3qmvoklAHj6w1JXdL8cnDcu5ktHYt25qPXjWj4zjd27oF5GYQBPb0IZU8XVqkRaX8lsdfkd95wz4vgKxxVYzcf/obAU/HT4jYiks6u5D0u2X53hl56LicXYhWrei3v2uub6Q5Zi+5t1U00c9+IVdM9fry9Bv2S8fij1SvCf0PxmsAoH/zWaIkxPjztJdwdlnVPX/+27cAgCjTiikO4+vfoE5lqzjmT3XK3UX38dnMcgOAan93+QeFdSi7nwES1FNi0eUr8tiinDysxk+IMq2A4rBtW//ms6TDspAojq419+bYhKq55YoZXb+RspXSNloSv3ccp/uNtEi5hRB0fpPKrcZGolUrun330cnTABCPGeNCXRxqTFPdRUlptbnXrsm9M1tCawdbTZHbd9OPnwRBoHpr8VC9+q+u667rOo7Ts1tcpNyGYcRjaujQyR2P+qlnS9zPP9d3fYMovj11cahZSVnIsyXbRksOHJErJmIY0TAMPc/boYopTG5VZ9B1YojkTo5nR6tWePe/dV337twhim9PWhzq3h0EQTFyy/Nvtarq6zdQxrkHhig3DcNIjv09enVJCEF0K1dQyN1YWgYA27ZVCzW4cFEYp5QiRPHt6eRWM+3q4MXIHVlr1Dsb7gBRbsbH1HXdNE17+hDpwBMQyB1dvuL/6wdqBFPTNNM0rSPzwe9vxf8Dhd90cluWFc9HFiM3dRI7Q3of9DxPOV2V57ljkq0R3/fVVXQ+z43uNz/PjQkvVuik13MjXRcr4PrNcmPCcrfR54moXitxEP1muTFhuZP0f9avzzIzLL9ZbkxY7pgdn2Ltv0AYxW+WGxOWW5Hm+ewdQzvk95vlxoTlhtQrD9IE5cnpN8uNCcudfk1NynBqefxmuTEZcbkHWi2WPhBmZr9ZbkxGWe5B10EOFMI4m98sNyYjK3eGFb6DBp/P4DfLjcloyp1t7XqGbUMG9ZvlxmQE5c4clSHbhk8D+c1yYzJqcueJN5J5q770frPcmIyU3Dkj6eTZZDWl3yw3JqMjd/4YUTm3x07jN8uNyYjIjRL9LKfckMJvlhuTUZAbK65ffrlhJ79ZbkxqLzdixEoUuaGv3yw3JvWWGzcWK5bc0NtvlhuTGsuNHmUYUW7o4TfLjUld5aaIn40rN3Tzm+XGpJZyE0WGR5cbOvxmuTGpn9xEZgON3LDdb5Ybk5rJTWc2kMkNCb9ZbkzqJDep2UApN2zfn4QoiZgRklvXdUHNnn3UKWi7dom5o7RpTE0L4xTh8ZeWjLFn9f3jhEkoEvtQ0jFstetSc0eXr4i5o6RJAHHNrfDu3LEnp4niI8eMUM1ddblVa6SA3CxCbs+zr14lio8cw3JjQid33M6uj9y2TRQfOYblxoRI7mQPsk5yA1n8bwXLjQmF3G1jIzWTGyj9ZrkxQZe7c9SvfnIDmd8sNya4cncdz66l3EDjN8uNCaLcvWZq6io3EPjNcmOCJXefOcgayw3YfrPcmKDI3X92vd5yA6rfLDcm+eXe8bmR2ssNeH6z3JjklDvNE1GjIDcg+c1yY5JH7pTP+o2I3IDhN8uNSWa50z/FOjpyQ26/WW5Mssk90PPZIyU35POb5cYkg9yDrjwYNbkhh98sNyaDyp1hTc0Iyg1Z/Wa5MRlI7myrxUZTbsjkN8uNSXq5M6+DHFm5YXC/WW5MUsqdZ4XvKMsNA/rNcmOSRu6ca9dHXG4YxG+WG5Md5c4flYHlhtR+s9yY9JcbJd4Iy61I4zfLjUlSbt/3G41G/BErkk4BuRn+8LL7/ge2bbuuG4YhRRIoxdHH7zAMXdc1pw4KIWzbJroKGE25fd/XNM11W/mOGCOKOjcbjYa++7nGhx8BQBAEQgjP89BTwSqOrn77vq/revIbXdeJ/B45uZXZABAEAWDH9SPNTfVr9FcuxM2SRqOhaRq6GYjF0em3YRiO44RhKFdM13VVWViWhZJcGxTF0Se3u/+pMLl93xdCaJqmKg/0uH50cgdBoGmaZVmdbW7HcXDTwi2OpN+u68Y3TNXmVh+V4ujgFofrurqut90q48sBgO6ZVozcfzr5qhDC9311HhQRK+nkVvnTaDQ65TZN5J4ZenEk48fGX1arQxkEgaqY2+Q2TdN7ytBq7jAMrcnpMAxVPddYWqaIxUont7rVhGGYlFvlJnqiFMXR2T5RcqtLMAwDNzmFEELuexF3XXNSbs/zdu72UMsdhqFlWY9eXYI4hDZNlOGChwJVtlZCbujwO9ksoegWg4oofdOVe6bl3hk5Mx9Za831jZzHTJ6qbduq0tE0rWeOkcodhqFqjcgzolXVkcViLVhulWnoWUdXHEm/5YoZhmE/LXKjikOeOL05NqFecnxWnjidpyLv/B0GQaA6xEW3uWOzAUCeEe6Z14GgBxZDJ7dqWCfb3GEYqmpDXR0ipHVN7LdcMU3TJBonUajiaD54KCcPx363LJ8+KmcXolUruuk2HzxMf8xeNxnHcba6xdFvfxf97Bfq5b3zrn329fgj1iu89u9CP+z/03vq4+bYhDUxBQDxN+gvoR8mOrL3zrsAYLxw4M/G2ehfPvDeedd44QAA6NpeirQoiiP52hybsPe/YC1+hzSVuDjk3Mk2ubeJPjMvZ+bl4rnIWsss97beZPPBw+a9++rlffqZffFS/BHrJYxT5tJ5++Il++Il+4UZe3xK270bANQ36MmpFCkOq17u+x/oU1MAYByccawr6loaH36EnhBRcbRdyz8/85eRtUaaSlwc8ozoJ/f0UTm7IFfM6ONPMssNTzv9Xf4B+n2w/9QGXfec4rBJVLNE3c3RBwEV1P1713Uty5Jnl6nj27eaJffuy+3NEtW/lCdOR9ZadPtu8/GT9MdsGy2J3zuOkxzz3vYP6HIzHs/+zeF5AEg+UoJOMXK7738AAIZhlPnZkl4oswFArpiq/R1+8muitFodykSbRE4flWeXo9t3Bz1UEASqq2bbturkqP/quu66ruM4Pb2iy83kTI25/3nYqUbPSQFyu6+9DgCmadJdCF1xeJ4X9yBb49wbG9b+SaL6WwgRXb/RGgqcXYjWruUfCkwShqHneTt06Ilys20OUnvma0StkRhSucMwNE1T27XLsa7QpQJkxaGe6tnaaGz8eSGEruvOz39O1D4RQshDx7NV1WhQ5Gab2ap5RD0PSiS37/u2bQshHMcJf3i5WfrnuTtRz8b0+hNRfPt6PhXY9bmRgvd+x0Ld++JGSCUWK6Sh7dkSCr9rKHevJ6IqKncbdZUbCPyum9x9nvVjuVMyxL3fcf2uldz9n2JluVMyRLkB1e/6yL3j89ksd0qGKzfg+V0TudOsPGC5UzJ0uQHJ7zrInXJNDcudkjLIDRh+V17u9KvFWO6UlERuyO13teUeaB0ky52S8sgN+fyusNyDrvBluVNSKrkhh99VlTvD2nWWOyVlkxuy+l1JubNFZWC5U1JCuSGT39WTO3O8EZY7JeWUGwb3u2Jy54mkw3KnpLRyw4B+V0nunDGiWO6UlFluGMTvysidP/oZy52SkssNqf2uhtwocf1Y7pSUX25I53cF5MaKWMlyp6QSckMKv8suN2IsVpY7JVWRG3byu9Ry40YZZrlTUiG5oa/f5ZUbPX42y52SaskNvf0uqdwUkeFZ7pRUTm7o4XcZ5aYwG1ju1FRRbujmd+nkJjIbWO7UVFRu6PC7XHLTmQ0sd2qqKzds97tEcpOaDSx3aiotNyT8biuO5vrGQAFdcfA8zzr6V571Y4+SL48vkh7f8zzDMKiT8Jbf9j79jDQFx3EsyyJNwvO8L0+/QXj0O3e+nFsQx+aTmsmzy9GFS0XLHf7oXfu8sKmZPkSeRAEsvGxfvDTsk8DgpWO0x7969TczL23bP21mXh44UmjlTd0aiSmgWVIABTRLiqGAfSiT7e/mg4dyZn5zbCJau0adbovCzAaWu2QUIDck/I4+/qQVf352oYB0CzUbWO6SUYzc8NRvVW2rPUNI9yoBKNxsYLlLRhHNkvUNtSegnF2Qu1/Y2jxk8Rxxwnf/SJtAZ4r/878Fp0hB8+H/DWE8i4CBdn/MgByflfsPdd++bPIwdeoMQ0hzfSO6cClujbT7fXZ52CfIMPloPn4SXb8hZxfk3pm2yjv64tawz45hMIi+uCUXz8nx2S2/p+bq0cBjGAC14ercybgWj1YJd55nmCEQXb+h9hSW+16sx9ATw2zRXN+QryzJPdNyam7Y58IwBEQ3XakdjKy1YZ8IwxDQfPyEh00YhmEYhmEYhmEYhmG6EgRBn7+GYVjYmTAMGkEQWFaXqfjkl41Go8AzYhgkgiDodDcMQ9M04wX1QzkxhkGgU1+1iL5/W4VhKkCn3KbZWghn04coYhhCujY8wjB0HAfYb6bS9GlVO46jaVqRJ8MwmHCXkakt/eXWdb2wM2EYZNrkDoLA93313nVdbnMzVcXzPDVf02g01Exk3I90HEe9Z5j6EAQBN8QZhmEYhmEYhmGYAvl/C5ULgmglH2QAAAAASUVORK5CYII=)
thanks chris!!!
I hope we all can discover some advantages in the this magic square.
8 1 6
3 5 7
4 9 2
It is also the opposite of the roulette table display!
Hello tayzar,
Your MAGIC SQUARE concept made me look at CODE 4......
You note the first 2 patterns and play against the third pattern as its LOGICAL continuation......
3C2A
3C1C
3C2A......LOGICAL continuation, BET against 3C2A
I think it might produce the same results as standard CODE 4, maybe not..........
M^2, nice concept........
MAGICAL thing MIGHT be that you are playing against 4 triples forming?.?.?.?
3C2A 3C2A
3C1C = 3C2A
3C2A. 3C2A
Very rare.......
Any thoughts out there?
I am going to explain my magic square idea again in more clear ways.
Please look below.
2 9 4
7 5 3
6 1 8
I'm sure you all have seen this magic square.
I'll transform it into roulette terms in even chance.
B R B E O E
R R R O O O
B R B E O E
NOW, I'll apply on only RED/BLACK.
To be clear,
I'll use algebra notations - a,b,c for columns and 1,2,3 for rows.
a b c
B R B 1
R R R 2
B R B 3
I''l bet for the outcomes of b3 & c3. But,
If my first bet, b3 wins, I won't bet on c3, and reset.
Only if my first bet, b3 loses, I'll bet my second bet, c3;then whether win or lose, reset.
Bet Selection
(1) b3 bet is in two possible ways:
If a2 & c2 are in the same color, bet the same color as b1. If b1 is RED, bet RED; (or) b1 is BLACK, bet BLACK.
(OR)
If a2 & c2 are in the opposite colors, bet the opposite color of b1. If b1 is RED, bet BLACK; (or) b1 is BLACK, bet RED.
Similarly
(1) c3 bet is in two possible ways:
If a3 & c1 are in the same color, bet the same color as a1. If a1 is RED, bet RED; (or) a1 is BLACK, bet BLACK.
(OR)
If a3 & c1 are in the opposite colors, bet the opposite color of a1. If a1 is RED, bet BLACK; (or) a1 is BLACK, bet RED.
But you should remember that c3 bet is possible only if b3 bet is lost.
Now let's see it!!
Hello tayzar,
I don know......
Do you have any stats?......
Hi tayzar
sorry to burst your bubble, but I did an excel sheet and tested it using your rules, and sorry to say it tanks like any other system. Using a progression it tanks even faster.
I liked the idea though, I found it quite novel.
Better luck next time.
TTT
Hmmmm ! I might have to eat my words .....
I've been playing on BV real money with divisor plan ( aggressive EC mode ) and it's been doing ok.
Will keep you updated on my results.
TTT
Yes I'm definitely swallowing a few vowels.
There's something magical in the air after all.
I'm now playing R/B E/O at the same time using two separate progressions.
TTT
Quote from: TicTacToe on Jul 30, 08:02 PM 2011
Hi tayzar
sorry to burst your bubble, but I did an excel sheet and tested it using your rules, and sorry to say it tanks like any other system. Using a progression it tanks even faster.
I liked the idea though, I found it quite novel.
Better luck next time.
TTT
Were you playing differently at the beginning? What was the "mistake"? How deep you went?
Hi ALL,
Thanks for your comments!
I appreciate yours!
Today I went to a local casino and played some games. The results are below.
RBBBRBRRBRBBRRRBBRBBRBRB
I played every spin with 2-step martingale, 1,2 unit.
Please look at my record.
RBB
BRB
RRB LW +1
BBR
BRR
BR W +2
BRB
RRB
RB W +3
RBR
RBR
BB W +4
BRR
BRB
BR W +5
RRB
RBB
RRR LL +2
BRB
BRR
RB W +3
RBB
RRR
BB W +4
BBR
RRB
BR W +5
BRR
RBB
RB W +6
RRR
BBR
BB W +7
RRB
BRB
BR W +8
RBB
RBB
RBR LL +5
BRB
BRB
RB L +4
Then the session was over and I came home.
Would you all advise me which progression/ MM may be better for this?
Good luck for ALL!
tayzar
Quote from: tayzar on Jul 31, 09:53 AM 2011
Would you all advise me which progression/ MM may be better for this?
Have you tried this: link:://rouletteforum.cc/full-systems/tank-this-if-you-can!!!!/msg61626/#msg61626 (link:://rouletteforum.cc/full-systems/tank-this-if-you-can!!!!/msg61626/#msg61626) ?
Thanks marivo!
But I want to bet on only one even chance, for example- only RED/BLACK.
PLEASE!!!!!
tayzar
Bump
Did anyone ever really give this idea a proper test?