Weird Dice
ray1246 zombieadd C_K_Yang liuguangxi edded a_forsteri Burloq abcd eulerscheZahl madbat2 Akorlith Min_25 smutley Philippe_57721 Mushin Apprentice56 rygar DrOptix kumaus faust gerrob atomicenergy zilet hallvabo yehuju stuvtro Mart rijman harvey korkinsson mathpseudo mihtanat leojay nireal kwisatz petr0v sinan caveman666 xmadx hervas sirpoot AliceInDlbrtlnd benito255 tehron Zeta2 LKM Chaosdreamer lesnik7 R2D2 djcomidi lordoric HvT Madvillain Ch0W UnTaran Caesum bai.li walek20 clytorock s_ha_dum st0le mtoader Buri totoiste Hertz teebee Ryan dloser Spaulding Juampi yachoor Veric CommComm nielkh phoenix1204 TheHiveMind elasolova
Public  12/10/09  3xp  Probability  72.7% 
Find two six sided dice, such that the probability of each sum from 2 to 12 is the same as two standard dice. Each side must have least one dot. Negative numbers are not allowed. There is another answer besides two standard 123456 dice. Format of the answer should be 111222,113344 (just an example) where first integer is the smaller and integers acquired by concatenation increasingly.
New Members
 nebula001 2d:21h
 PeterisP 1w
 Arun_CoDeR 1w
 hankim 2w:3d
 chfmoe 3w
Fresh Problems

Kimberling Sequence 1d:2h
solved by 6 
Palindromic Infinite Sequence 1w:1d
solved by 3 
Convergents of infinite sum 1w:5d
solved by 5 
Permutation Order II 2w:1d
solved by 8 
Integral circle packings 2 2w:4d
solved by 3