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Showing 192 dice roll(s) where player character name is 'GM rolls'
Search results only go back to 8/16/2019 4:06:30 AM.

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Roll IDCharacterCampaignRoll resultDate
208466GM rolls5th Ed WaterdeepOrc SvDex DC13 [1d20+1] = 4+1 = 5,[1d20+1] = 8+1 = 9,[1d20+1] = 10+1 = 11,[1d20+1] = 6+1 = 78/15/2020 1:14:27 AM
208425GM rolls5th Ed WaterdeepEncounter? [1d12] = 88/14/2020 1:23:15 AM
208424GM rolls5th Ed WaterdeepEncounter? [1d12] = 18/14/2020 1:23:05 AM
208373GM rolls5th Ed WaterdeepOrcs initiatiative [1d20+1] = 8+1 = 98/13/2020 1:27:57 AM
198121GM rolls5th Ed WaterdeepPrayer of Healing [2d8+10] = 11+10 = 214/8/2020 2:58:10 PM
198072GM rolls5th Ed WaterdeepReligion DC10, 15 [1d20+3] = 10+3 = 134/8/2020 1:26:28 AM
197661GM rolls5th Ed WaterdeepUnseen advantage [1d20+4] = 8+4 = 124/3/2020 3:06:25 PM
197660GM rolls5th Ed WaterdeepUnseen [1d20+4] = 15+4 = 19, [3d6] = 84/3/2020 3:04:54 PM
197658GM rolls5th Ed WaterdeepUnssen AoO [1d20+4] = 7+4 = 11, [3d6] = 154/3/2020 2:39:18 PM
197237GM rolls5th Ed Waterdeep#4 bite [1d20+3] = 18+3 = 21, [2d4] = 73/28/2020 2:42:40 AM
197236GM rolls5th Ed WaterdeepChairs r us [1d20+4] = 14+4 = 18, [1d20+4] = 11+4 = 15, [2d4] = 53/28/2020 2:40:24 AM
197062GM rolls5th Ed WaterdeepChaiman? [1d20+2] = 2+2 = 4, [1d20+2] = 19+2 = 213/24/2020 12:31:27 PM
197061GM rolls5th Ed Waterdeep#4, #6 bites [1d20+3] = 10+3 = 13, [1d20+3] = 7+3 = 10, [2d4] = 5, [2d4] = 43/24/2020 12:11:54 PM
197059GM rolls5th Ed Waterdeep3 bites [1d20+3] = 5+3 = 8, [2d4] = 43/24/2020 10:31:37 AM
196986GM rolls5th Ed Waterdeep#4, #6 bites [1d20+3] = 15+3 = 18, [1d20+3] = 12+3 = 15, [2d4] = 6, [2d4] = 43/23/2020 5:14:32 AM
196983GM rolls5th Ed Waterdeep#3 bites [1d20+3] = 10+3 = 13, [4d4] = 123/23/2020 3:11:32 AM
196982GM rolls5th Ed WaterdeepChair 2 [1d20+4] = 2+4 = 6, [1d20+4] = 19+4 = 23, [2d4] = 53/23/2020 2:44:10 AM
196981GM rolls5th Ed WaterdeepSpider DEX saves DC15 [1d20+1] = 7+1 = 83/23/2020 2:14:36 AM
196945GM rolls5th Ed WaterdeepChair [1d20+4] = 10+4 = 14, [1d20+4] = 7+4 = 11, [2d4] = 53/22/2020 5:27:29 AM
196917GM rolls5th Ed WaterdeepSpider DEX saves DC15 [1d20+1] = 18+1 = 19, [1d20+1] = 15+1 = 163/21/2020 5:48:28 AM
196884GM rolls5th Ed Waterdeep#1 [1d20+3] = 13+3 = 16, [2d4] = 43/20/2020 5:55:12 AM
196403GM rolls5th Ed WaterdeepDarren init [1d20] = 203/12/2020 4:50:26 AM
196402GM rolls5th Ed Waterdeep Something else's Init [1d20+2] = 12+2 = 143/12/2020 4:41:35 AM
196401GM rolls5th Ed WaterdeepSomething's Init [1d20+1] = 4+1 = 53/12/2020 4:39:41 AM
195651GM rolls5th Ed Waterdeepswarm #5 v Woody dam [2d6] = 72/27/2020 10:12:55 AM
195559GM rolls5th Ed WaterdeepDarren Radiant Word [1d6] = 52/26/2020 2:31:39 AM
195558GM rolls5th Ed Waterdeep#5, #6, #1 Save DC14 [1d20] = 16, [1d20] = 13, [1d20] = 132/26/2020 2:30:52 AM
195557GM rolls5th Ed Waterdeep#2, #3, #4 Save DC14 [1d20] = 9, [1d20] = 6, [1d20] = 62/26/2020 2:29:55 AM
195556GM rolls5th Ed Waterdeep#2, #3, #4 save DC14 [1d20] = 20, [1d20] = 17, [1d20] = 172/26/2020 2:28:33 AM
195409GM rolls5th Ed Waterdeep#2, #3 pierce damage [4d6] = 11, [2d6] = 72/24/2020 3:12:06 AM
195342GM rolls5th Ed Waterdeep#5, #6, #1 bites [1d20+3] = 16+3 = 19, [1d20+3] = 13+3 = 16, [1d20+3] = 13+3 = 162/22/2020 7:49:06 AM
195341GM rolls5th Ed Waterdeep#2, #3, #4 bites [1d20+3] = 12+3 = 15, [1d20+3] = 9+3 = 12, [1d20+3] = 9+3 = 122/22/2020 7:47:04 AM
195340GM rolls5th Ed Waterdeep#5, #6, #1 save DC14 [1d20] = 18, [1d20] = 15, [1d20] = 152/22/2020 7:29:43 AM
195339GM rolls5th Ed Waterdeep#2, #3, #4 save DC14 [1d20] = 20, [1d20] = 17, [1d20] = 172/22/2020 7:28:53 AM
195338GM rolls5th Ed Waterdeep#6, #1 bites [1d20+3] = 5+3 = 8, [1d20+3] = 2+3 = 52/22/2020 5:16:31 AM
195337GM rolls5th Ed Waterdeep#4, #5 bites [1d20+3] = 6+3 = 9, [1d20+3] = 3+3 = 62/22/2020 5:15:31 AM
195161GM rolls5th Ed Waterdeep#2, #3 bites [1d20+3] = 18+3 = 21, [1d20+3] = 15+3 = 182/21/2020 4:21:56 AM
195124GM rolls5th Ed WaterdeepS5, S6 init disadvantaged [1d20+1] = 6+1 = 7, [1d20+1] = 3+1 = 4, [1d20+1] = 3+1 = 4, [1d20+1] = 18+1 = 192/20/2020 5:23:18 PM
195123GM rolls5th Ed WaterdeepS3, S4 init disadvantaged [1d20+1] = 14+1 = 15, [1d20+1] = 11+1 = 12, [1d20+1] = 11+1 = 12, [1d20+1] = 6+1 = 7 2/20/2020 5:21:29 PM
195122GM rolls5th Ed WaterdeepS1, S2 init disadvantaged [1d20+1] = 1+1 = 2, [1d20+1] = 18+1 = 19, [1d20+1] = 18+1 = 19, [1d20+1] = 13+1 = 142/20/2020 5:19:57 PM
193271GM rolls5th Ed WaterdeepSue's scorching [2d6] = 101/24/2020 5:10:33 PM
191331GM rolls5th Ed WaterdeepGG Investigation [1d20+8] = 15+8 = 2312/31/2019 3:04:37 AM
190989GM rolls5th Ed WaterdeepVic falls [1d4] = 212/23/2019 12:32:52 PM
190642GM rolls5th Ed WaterdeepDarren History, Insight [1d20+2] = 13+2 = 15, [1d20+5] = 10+5 = 1512/18/2019 3:03:12 AM
189847GM rolls5th Ed WaterdeepGG Investigation, Perception [1d20+8] = 20+8 = 28, [1d20+5] = 17+5 = 2212/6/2019 10:52:55 AM
189833GM rolls5th Ed WaterdeepGrovelling goblin Insight DC15 [1d20-1] = 10-1 = 912/6/2019 3:19:26 AM
189832GM rolls5th Ed Waterdeepgoblin's head, doorway is 7 [1d12] = 312/6/2019 2:44:21 AM
189794GM rolls5th Ed WaterdeepGoblin #3 acrobatics DC12, [1d20+2] = 15+2 = 1712/5/2019 11:10:34 AM
189793GM rolls5th Ed WaterdeepGoblin #3 Wis save, DC12 [1d20-1] = 3-1 = 212/5/2019 11:07:06 AM
189791GM rolls5th Ed WaterdeepGoblin #2 stealth [1d20+6] = 2+6 = 812/5/2019 10:55:59 AM
189570GM rolls5th Ed WaterdeepGoblin #2 Acrobatics DC10 (disadvantaged) [1d20+2] = 6+2 = 8, [1d20+2] = 3+2 = 512/1/2019 5:47:05 AM
189569GM rolls5th Ed WaterdeepGoblin #2 Acrobatics DC10 (disadvantaged) [1d20+2] = 20+2 = 22, [1d20+2] = 17+2 = 1912/1/2019 5:46:14 AM
189537GM rolls5th Ed WaterdeepCreatures NE=1,SE=2 etc [1d4] = 3, [1d4] = 411/30/2019 4:17:48 AM
189536GM rolls5th Ed WaterdeepGoblin #1 WIS save DC12 [1d20-1] = 12-1 = 1111/30/2019 3:00:44 AM
189535GM rolls5th Ed WaterdeepGoblin #3 bow [1d20+4] = 19+4 = 23,[1d20+4] = 16+4 = 20, [1d6+2] = 2+2 = 411/30/2019 2:57:40 AM
189534GM rolls5th Ed WaterdeepGoblin #2 bow [1d20+4] = 2+4 = 6, [1d20+4] = 19+4 = 23, [1d6+2] = 5+2 = 711/30/2019 2:56:04 AM
189533GM rolls5th Ed WaterdeepGoblin #1 dagger [1d20+4] = 8+4 = 12, [1d20+4] = 5+4 = 9, [1d4+2] = 1+2 = 311/30/2019 2:29:35 AM
189532GM rolls5th Ed WaterdeepGoblin #3 stealth [1d20+6] = 16+6 = 2211/30/2019 2:27:46 AM
189531GM rolls5th Ed WaterdeepGoblin #2 stealth [1d20+6] = 19+6 = 2511/30/2019 2:27:03 AM
189530GM rolls5th Ed WaterdeepGoblin #1 stealth [1d20+6] = 16+6 = 2211/30/2019 2:25:29 AM
189463GM rolls5th Ed WaterdeepGoblin #3 bow [1d20+4] = 14+4 = 18, [1d6+2] = 5+2 = 711/28/2019 12:05:35 PM
189462GM rolls5th Ed WaterdeepGoblin #2 bow [1d20+4] = 10+4 = 14, [1d6+2] = 6+2 = 811/28/2019 12:01:05 PM
189460GM rolls5th Ed WaterdeepGoblin #1 dagger [1d20+4] = 10+4 = 14, [1d4+2] = 4+2 = 611/28/2019 11:42:10 AM
189458GM rolls5th Ed WaterdeepGoblin #3 stealth [1d20+6] = 11+6 = 1711/28/2019 11:15:08 AM
189457GM rolls5th Ed WaterdeepGoblin #2 stealth [1d20+6] = 1+6 = 711/28/2019 11:13:42 AM
189456GM rolls5th Ed WaterdeepGoblin #1 stealth [1d20+6] = 15+6 = 2111/28/2019 11:12:28 AM
189261GM rolls5th Ed WaterdeepGoblin #3 bow [1d20+4] = 10+4 = 14, [1d6+2] = 5+2 = 711/22/2019 3:53:21 AM
189260GM rolls5th Ed WaterdeepGolbine #1 bow disadvantaged [1d20+4] = 1+4 = 5, [1d20+4] = 18+4 = 22, [1d6+2] = 2+2 = 411/22/2019 3:48:11 AM
189259GM rolls5th Ed WaterdeepGoblin #3 DC14 stealth [1d20+6] = 17+6 = 2311/22/2019 3:42:52 AM
189258GM rolls5th Ed WaterdeepGoblin #1 DC14 stealth [1d20+6] = 6+6 = 1211/22/2019 3:42:15 AM
189257GM rolls5th Ed WaterdeepGoblin #3 bow [1d20+4] = 3+4 = 711/22/2019 3:33:19 AM
189256GM rolls5th Ed WaterdeepGoblin #1 bow [1d20+4] = 16+4 = 20, [1d6+2] = 1+2 = 311/22/2019 3:32:45 AM
189255GM rolls5th Ed WaterdeepGoblin #2 dagger disadvantaged [1d20+4] = 1+4 = 5, [1d20+4] = 19+4 = 23, [1d4+2] = 2+2 = 411/22/2019 3:26:28 AM
189254GM rolls5th Ed WaterdeepGoblins init [1d20+2] = 1+2 = 311/22/2019 2:49:05 AM
189253GM rolls5th Ed WaterdeepGoblin 2 stealth DC9 [1d20+6] = 9+6 = 1511/22/2019 2:37:03 AM
189252GM rolls5th Ed WaterdeepGoblin 2 stealth DC14 [1d20+6] = 4+6 = 1011/22/2019 2:35:54 AM
189251GM rolls5th Ed WaterdeepGoblin stealth DC14 [1d20+6] = 15+6 = 2111/22/2019 2:35:07 AM
188546GM rolls5th Ed WaterdeepUnbar erception disadvantaged [1d20+2] = 6+2 = 8, [1d20+2] = 3+2 = 511/6/2019 10:46:01 AM
188395GM rolls5th Ed WaterdeepGoblin initiative [1d20+2] = 1+2 = 311/4/2019 2:34:50 AM
188394GM rolls5th Ed Waterdeeperr11/4/2019 2:34:22 AM
188174GM rolls5th Ed WaterdeepDarren Advantage [1d20] = 1210/30/2019 5:31:20 AM
188173GM rolls5th Ed WaterdeepTentqcle crit [1d4] = 110/30/2019 5:30:18 AM
188172GM rolls5th Ed WaterdeepTentacles & bite advantaged [1d20+8] = 11+8 = 19, [1d20+4] = 8+4 = 1210/30/2019 5:27:30 AM
188171GM rolls5th Ed WaterdeepDarren Advantage [1d20] = 910/30/2019 4:42:42 AM
188170GM rolls5th Ed WaterdeepDarren CON DC13 [1d20+2] = 8+2 = 1010/30/2019 4:39:12 AM
188169GM rolls5th Ed WaterdeepDarren CON DC13 [1d20+2] = 4+2 = 610/30/2019 4:38:04 AM
188168GM rolls5th Ed WaterdeepBite [1d20+4] = 11+4 = 15, [2d4+2] = 5+2 = 710/30/2019 4:18:11 AM
188167GM rolls5th Ed WaterdeepBite [1d20+4, [2d4+2] = 5+2 = 710/30/2019 4:17:46 AM
188166GM rolls5th Ed WaterdeepTentacles [1d20+8] = 12+8 = 20, [1d4+2] = 1+2 = 310/30/2019 4:15:38 AM
188165GM rolls5th Ed WaterdeepTenttacles [1d20+8] = 18+8 = 26, [1d4+2] = 3+2 = 510/30/2019 4:14:13 AM
188044GM rolls5th Ed WaterdeepDarren [1d20+3] = 17+3 = 2010/26/2019 2:07:31 AM
188043GM rolls5th Ed WaterdeepDarren warhammer [1d20+3] = 5+3 = 8, [1d8+3] = 2+3 = 510/26/2019 2:04:22 AM
188042GM rolls5th Ed WaterdeepDarren [1d20+3] = 13+3 = 16, [1d8+3] = 3+3 = 610/26/2019 2:03:24 AM
188041GM rolls5th Ed WaterdeepDarren [1d20+2] = 20+2 = 2210/26/2019 1:36:28 AM
188040GM rolls5th Ed WaterdeepDarren [1d20+2] = 12+2 = 1410/26/2019 1:35:09 AM
188039GM rolls5th Ed Waterdeep#T3 tentacles, bite [1d20+8] = 11+8 = 19, [1d20+4] = 8+4 = 12, [1d4+2] = 4+2 = 6, [2d4+2] = 4+2 = 610/26/2019 1:33:47 AM
188038GM rolls5th Ed Waterdeep#T2 tentacles, bite [1d20+8] = 18+8 = 26, [1d20+4] = 15+4 = 19, [1d4+2] = 2+2 = 4, [2d4+2] = 6+2 = 810/26/2019 1:31:54 AM
188037GM rolls5th Ed Waterdeep#T1 [1d20+8] = 20+8 = 28, [1d4+2] = 1+2 = 310/26/2019 1:18:18 AM
187403GM rolls5th Ed WaterdeepUnbar fall dam DEX Save disadvantaged D13 to avoid [1d6] = 410/14/2019 4:30:00 PM
187401GM rolls5th Ed WaterdeepBrown robes dam, poison [3d6] = 14, [2d6] = 1110/14/2019 4:15:14 PM
187399GM rolls5th Ed WaterdeepBrown robes damage plus 1 poison [3d6] = 8, [2d6]10/14/2019 4:14:28 PM
187398GM rolls5th Ed WaterdeepBrown robes advantaged [1d20+4] = 17+4 = 21, [1d20+4] = 15+4 = 1910/14/2019 4:09:59 PM
187093GM rolls5th Ed WaterdeepNoises advantaged [1d20+6] = 19+6 = 25, [1d20+6] = 16+6 = 2210/10/2019 10:32:13 AM
187092GM rolls5th Ed WaterdeepNoises [1d20+6] = 7+6 = 1310/10/2019 10:31:17 AM
186978GM rolls5th Ed WaterdeepGG Green flame blade advantage [1d20+7] = 10+7 = 1710/8/2019 1:22:07 AM
186746GM rolls5th Ed WaterdeepIsaril rapier [1d20+6] = 11+6 = 17, [1d20+6] = 8+6 = 14, [1d6+4] = 5+4 = 910/4/2019 3:21:25 AM
186745GM rolls5th Ed WaterdeepIsaril stealth [1d20+6] = 16+6 = 2210/4/2019 3:19:36 AM
186744GM rolls5th Ed WaterdeepChicken goblin short sword [1d20+4] = 17+4 = 21, [1d20+4] = 14+4 = 18, [1d6+2] = 2+2 = 410/4/2019 2:50:47 AM
186743GM rolls5th Ed WaterdeepChicken goblin knife [1d20+4] = 9+4 = 13, [1d20+4] = 7+4 = 11, [1d4+2] = 2+2 = 4 10/4/2019 2:46:18 AM
186742GM rolls5th Ed WaterdeepKitchen goblin bow[1d20+4] = 9+4 = 13, [1d20+4] = 6+4 = 10 [1d6+2] = 4+2 = 610/4/2019 2:35:18 AM
186741GM rolls5th Ed WaterdeepGoblin #2 WIS save DC12 [1d20-1] = 15-1 = 1410/4/2019 2:14:32 AM
186739GM rolls5th Ed WaterdeepGoblin stealth [1d20+6] = 11+6 = 17, [1d20+6] = 8+6 = 14, [1d20+6] = 8+6 = 1410/3/2019 11:48:35 PM
186463GM rolls5th Ed WaterdeepGoblin #2, #3 positions [2d6+10] = 11+10 = 21, [2d6+10] = 3+10 = 139/29/2019 3:56:16 PM
186462GM rolls5th Ed WaterdeepGoblin #2, #3 positions [10+2d6] = err, [10+2d6] = err9/29/2019 3:55:17 PM
186461GM rolls5th Ed WaterdeepGoblin WIS save DC12 [1d20-1] = 13-1 = 129/29/2019 3:12:21 PM
186439GM rolls5th Ed WaterdeepGoblins disadvantaged with chickens [1d20+2] = 1+2 = 3, [1d20+2] = 18+2 = 209/29/2019 3:08:12 AM
186438GM rolls5th Ed WaterdeepGoblin init [1d20+2] = 17+2 = 199/29/2019 3:05:49 AM
186437GM rolls5th Ed Waterdeeperr9/29/2019 3:05:20 AM
186388GM rolls5th Ed Waterdeep#1 fist advantaged [1d20+4] = 18+4 = 22, [1d20+4] = 15+4 = 19, [1d8+2] = 6+2 = 89/28/2019 10:38:57 AM
186337GM rolls5th Ed WaterdeepIsaril bow crit [1d8] = 19/28/2019 1:42:27 AM
186336GM rolls5th Ed WaterdeepIsaril bow advantaged [1d20+6] = 3+6 = 9, [1d20+6] = 20+6 = 26, [1d8+4] = 8+4 = 129/28/2019 1:41:21 AM
186335GM rolls5th Ed WaterdeepIsaril initiative advantaged [1d20+4] = 19+4 = 23, [1d20+4] = 16+4 = 209/28/2019 1:35:17 AM
186334GM rolls5th Ed WaterdeepIsaril stealth DC10 [1d20+6] = 18+6 = 249/28/2019 1:34:08 AM
186281GM rolls5th Ed Waterdeep#2 fist disadvantaged [1d20+4] = 19+4 = 23, [1d20+4] = 16+4 = 20, [1d8+2] = 8+2 = 109/27/2019 7:16:12 AM
186280GM rolls5th Ed Waterdeep#1 fist [1d20+4] = 11+4 = 15, [1d8+2] = 4+2 = 69/27/2019 7:13:30 AM
186177GM rolls5th Ed WaterdeepGoblin bow advantaged [1d20+4] = 10+4 = 14, [1d20+4] = 7+4 = 11, [1d6+2] = 5+2 = 79/26/2019 1:28:35 AM
186171GM rolls5th Ed WaterdeepGoblin stealth advantaged [1d20+6] = 7+6 = 13, [1d20+6] = 4+6 = 109/26/2019 12:37:39 AM
186083GM rolls5th Ed Waterdeep#3 warhammer two-handed [1d20+5] = 11+5 = 16, [1d10+3] = 8+3 = 119/25/2019 4:26:50 AM
186082GM rolls5th Ed Waterdeep#2 fist [1d20+4] = 8+4 = 12, [1d8+2] = 1+2 = 39/25/2019 4:24:22 AM
186081GM rolls5th Ed Waterdeep#1 fist [1d20+4] = 19+4 = 23, [1d8+2] = 4+2 = 69/25/2019 4:22:18 AM
186080GM rolls5th Ed WaterdeepRetrospective Amber #4 DEX save [1d20-1] = 5-1 = 49/25/2019 3:43:07 AM
186079GM rolls5th Ed WaterdeepX initiative [1d20+2] = 15+2 = 179/25/2019 2:24:50 AM
186078GM rolls5th Ed WaterdeepX bow advantaged [1d20+4] = 1+4 = 5, [1d20+4] = 19+4 = 23, [1d6+2] = 6+2 = 89/25/2019 1:51:40 AM
186077GM rolls5th Ed WaterdeepX stealth advantaged [1d20+6] = 11+6 = 17, [1d20+6] = 8+6 = 149/25/2019 1:50:35 AM
185990GM rolls5th Ed WaterdeepX stealth advantaged [1d20+6] = 7+6 = 13, [1d20+6] = 4+6 = 109/24/2019 2:12:09 AM
185989GM rolls5th Ed WaterdeepX arrow advantaged [1d20+4] = 9+4 = 13, [1d20+4] = 6+4 = 10, [1d6+2] = 6+2 = 89/24/2019 2:05:14 AM
185710GM rolls5th Ed WaterdeepIsaril arrow dam [1d6+4] = 3+4 = 79/20/2019 2:00:47 AM
185709GM rolls5th Ed WaterdeepIsaril bow advantaged [1d20+6] = 11+6 = 17, [1d20+6] = 8+6 = 149/20/2019 1:59:39 AM
185708GM rolls5th Ed WaterdeepGoblin ""Gwerk" Perception [1d20-1] = 9-1 = 89/20/2019 1:57:15 AM
185707GM rolls5th Ed WaterdeepIsaril stealth [1d20+6] = 13+6 = 199/20/2019 1:55:22 AM
185620GM rolls5th Ed Waterdeep#2 fist [1d20+4] = 12+4 = 16, [1d8+2] = 1+2 = 39/18/2019 12:37:04 AM
185619GM rolls5th Ed Waterdeep#1 fist [1d20+4] = 6+4 = 10, [1d8+2] = 8+2 = 109/18/2019 12:36:02 AM
185599GM rolls5th Ed WaterdeepFrond crit [1d4] = 39/17/2019 4:26:33 PM
185598GM rolls5th Ed WaterdeepFrond attack [1d20+6] = 20+6 = 26, [1d20+6] = 17+6 = 23, [1d4+2] = 1+2 = 39/17/2019 4:25:26 PM
185597GM rolls5th Ed WaterdeepFrond attack [1d20+6] = 17+6 = 23, [1d20+6] = 14+6 = 20, [1d4+2] = 2+2 = 49/17/2019 4:23:22 PM
185592GM rolls5th Ed WaterdeepInt loss [1d4] = 19/17/2019 3:45:24 PM
185096GM rolls5th Ed WaterdeepGray fronds advantaged [1d20+6] = 8+6 = 14, [1d20+6] = 5+6 = 11, [1d4+2] = 1+2 = 39/8/2019 3:30:50 AM
185095GM rolls5th Ed WaterdeepGray fronds advantaged [1d20+6] = 4+6 = 10, [1d20+6] = 1+6 = 7, [1d4+2] = 1+2 = 39/8/2019 3:30:12 AM
185094GM rolls5th Ed WaterdeepGray fronds advantaged [1d20+6] = 4+6 = 10, [1d20+6] = 1+6 = 7, [1d4+2] = 1+2 = 39/8/2019 3:28:40 AM
184662GM rolls5th Ed WaterdeepS4 v Woody [1d20+5] = 6+5 = 11, [1d4+3] = 3+3 = 68/30/2019 5:08:52 PM
184661GM rolls5th Ed WaterdeepR1 bites [1d20+2] = 7+2 = 9, [1d6] = 68/30/2019 5:00:36 PM
184660GM rolls5th Ed WaterdeepR3 bites [1d20+2] = 2+2 = 4, [1d6] = 58/30/2019 4:49:02 PM
184656GM rolls5th Ed WaterdeepR1 DEX DC 15 adv [1d20] = 14, [1d20] = 118/30/2019 4:05:25 PM
184535GM rolls5th Ed WaterdeepS1,S2,S3 [1d20+5] = 20+5 = 25, [1d20+5] = 17+5 = 22, [1d20+5] = 17+5 = 228/29/2019 5:06:45 AM
184534GM rolls5th Ed WaterdeepTarget: rat on 1, Jim >1 [1d4] = 4, [1d4] = 1, [1d4] = 18/29/2019 5:01:45 AM
184533GM rolls5th Ed WaterdeepS stealth [1d20+8] = 13+8 = 218/29/2019 3:52:57 AM
184532GM rolls5th Ed WaterdeepR1 bites [1d20+2] = 7+2 = 9, [2d6] = 108/29/2019 2:58:30 AM
184531GM rolls5th Ed WaterdeepR3 bites [1d20+2] = 12+2 = 14, [2d6] = 68/29/2019 2:33:19 AM
184530GM rolls5th Ed WaterdeepR2 bites [1d20+2] = 17+2 = 19, [1d6] = 28/29/2019 2:27:48 AM
184529GM rolls5th Ed WaterdeepR4 ites [1d20+2] = 18+2 = 20, [1d6] = 58/29/2019 1:28:51 AM
184528GM rolls5th Ed WaterdeepImpact fire damage DEX DC15 v R1 [1d20] = 198/29/2019 12:40:07 AM
184527GM rolls5th Ed WaterdeepDEX DC15 v R1, R3, R4 [1d20] = 13, [1d20] = 10, [1d20] = 108/29/2019 12:32:57 AM
184446GM rolls5th Ed WaterdeepRat Swarm init [1d20] = 198/28/2019 12:35:33 AM
184445GM rolls5th Ed WaterdeepRat Swarm init [1d20] = 108/28/2019 12:34:56 AM
184444GM rolls5th Ed WaterdeepRat Swarm init [1d20] = 188/28/2019 12:33:57 AM
184443GM rolls5th Ed WaterdeepRat Swarm init [1d20] = 78/28/2019 12:33:15 AM
184352GM rolls5th Ed WaterdeepSue Per DC10 [1d20+2] = 20+2 = 228/26/2019 4:40:32 AM
184351GM rolls5th Ed WaterdeepSue Per DC20 [1d20+2] = 17+2 = 198/26/2019 4:39:23 AM
184347GM rolls5th Ed WaterdeepG2 shortbow [1d20+4] = 17+4 = 21, [1d6+2] = 4+2 = 68/26/2019 1:47:54 AM
184345GM rolls5th Ed WaterdeepG2 hide [1d20+6] = 15+6 = 218/26/2019 1:36:50 AM
184344GM rolls5th Ed WaterdeepG2 hide v Isaril Perception [1d20+6] = 17+6 = 23, [1d20+5] = 15+5 = 208/26/2019 1:36:23 AM
184305GM rolls5th Ed Waterdeep[1d3] = 38/24/2019 6:16:24 AM
184304GM rolls5th Ed WaterdeepPrimary [1d100] = 48/24/2019 5:56:44 AM
184303GM rolls5th Ed Waterdeep4 wanderer checks PPSF [1d12] = 5, [1d12] = 10, [1d12] = 6, [1d12] = 18/24/2019 5:54:20 AM
184302GM rolls5th Ed WaterdeepPrimary, Primary [1d100] = 61, [1d100] = 788/24/2019 2:12:48 AM
184301GM rolls5th Ed Waterdeep4 wanderer checks PPSF [1d12] = 5, [1d12] = 7, [1d12] = 2, [1d12] = 28/24/2019 2:10:59 AM
184300GM rolls5th Ed Waterdeep4 wanderer checks PPSF [1d12] = 10, [1d12] = 11, [1d12] = 6, [1d12] = 68/24/2019 2:08:42 AM
184298GM rolls5th Ed Waterdeep3 wanderer checks [1d12] = 7, [1d12] = 9, [1d12] = 48/24/2019 1:05:52 AM
184230GM rolls5th Ed Waterdeep3 wanderer checks [1d12] = 1, [1d12] = 2, [1d12] = 28/22/2019 7:02:25 AM
184227GM rolls5th Ed WaterdeepG2 shortbow advantaged [1d20+4] = 1+4 = 5, [1d20+4] = 18+4 = 22, [1d6+2] = 2+2 = 48/22/2019 2:42:18 AM
184226GM rolls5th Ed WaterdeepG2 hide v Isaril Perception [1d20+6] = 18+6 = 24, [1d20+5] = 16+5 = 218/22/2019 2:39:05 AM
184225GM rolls5th Ed WaterdeepIsaril shortbow [1d20+6] = 11+6 = 17, [1d6+4] = 4+4 = 88/22/2019 2:17:40 AM
184201GM rolls5th Ed WaterdeepG2 shortbow advantaged [1d20+4] = 13+4 = 17, [1d20+4] = 10+4 = 14, [1d6+2] = 2+2 = 48/21/2019 3:52:32 PM
184200GM rolls5th Ed WaterdeepG2 hide vs Isaril Perception [1d20+6] = 14+6 = 20, [1d20+5] = 12+5 = 178/21/2019 3:49:39 PM
184198GM rolls5th Ed WaterdeepG1 scimitar [1d20+4] = 16+4 = 20, [1d6+2] = 3+2 = 58/21/2019 3:39:05 PM
184196GM rolls5th Ed WaterdeepIsaril shortbow advantaged [1d20+6] = 2+6 = 8, [1d20+6] = 19+6 = 25, [1d6+4] = 3+4 = 78/21/2019 3:23:51 PM
184195GM rolls5th Ed WaterdeepIsaril init [1d20+4] = 17+4 = 218/21/2019 3:21:27 PM
184153GM rolls5th Ed WaterdeepG1, G2, G3 inits [1d20+2] = 17+2 = 19, [1d20+2] = 15+2 = 17, [1d20+2] = 14+2 = 168/21/2019 3:07:37 AM
184152GM rolls5th Ed WaterdeepR1 init disadvantage [1d20+2] = 15+2 = 17, [1d20+2] = 12+2 = 148/21/2019 3:05:00 AM
184142GM rolls5th Ed WaterdeepIsaril shortbow crit [1d6] = 38/21/2019 1:59:01 AM
184141GM rolls5th Ed WaterdeepIsaril shortbow advantaged [1d20+6] = 20+6 = 26, [1d20+6] = 17+6 = 23, [1d6+4] = 1+4 = 58/21/2019 1:57:10 AM
183969GM rolls5th Ed WaterdeepWolf2 disadvantaged bite [1d20+5] = 12+5 = 17, [1d20+5] = 9+5 = 14, [2d6+3] = 11+3 = 148/17/2019 2:56:35 AM
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