# FILE NAME: 00019-00000001.toc # TITLE: 2010 Oakland City Council - District 4 # DESCRIPTION: Obtained from the toi by adding the unranked alternatives at the bottom # DATA TYPE: toc # MODIFICATION TYPE: imbued # RELATES TO: 00019-00000001.toi # RELATED FILES: # PUBLICATION DATE: 2014-07-09 # MODIFICATION DATE: 2022-09-16 # NUMBER ALTERNATIVES: 8 # NUMBER VOTERS: 20981 # NUMBER UNIQUE ORDERS: 356 # ALTERNATIVE NAME 1: Jill Broadhurst # ALTERNATIVE NAME 2: Ralph Kanz # ALTERNATIVE NAME 3: Melanie Shelby # ALTERNATIVE NAME 4: Libby Schaaf # ALTERNATIVE NAME 5: Clinton Killian # ALTERNATIVE NAME 6: Daniel Swafford # ALTERNATIVE NAME 7: Jason Gillen # ALTERNATIVE NAME 8: Write-In 1604: 4,{1,2,3,5,6,7,8} 988: 1,{2,3,4,5,6,7,8} 906: 4,1,{2,3,5,6,7,8} 722: 4,6,1,{2,3,5,7,8} 640: 4,1,6,{2,3,5,7,8} 594: 4,1,3,{2,5,6,7,8} 552: 3,{1,2,4,5,6,7,8} 544: 1,4,{2,3,5,6,7,8} 439: 4,6,{1,2,3,5,7,8} 411: 6,{1,2,3,4,5,7,8} 380: 1,4,6,{2,3,5,7,8} 379: 4,1,5,{2,3,6,7,8} 340: 4,3,1,{2,5,6,7,8} 338: 1,4,3,{2,5,6,7,8} 337: 6,4,1,{2,3,5,7,8} 307: 4,1,2,{3,5,6,7,8} 265: 1,4,5,{2,3,6,7,8} 236: 2,6,4,{1,3,5,7,8} 223: 1,3,4,{2,5,6,7,8} 218: 4,6,3,{1,2,5,7,8} 204: 5,{1,2,3,4,6,7,8} 181: 4,3,5,{1,2,6,7,8} 179: 1,3,5,{2,4,6,7,8} 176: 1,4,2,{3,5,6,7,8} 173: 6,1,4,{2,3,5,7,8} 169: 3,4,1,{2,5,6,7,8} 169: 4,5,1,{2,3,6,7,8} 168: 4,1,7,{2,3,5,6,8} 167: 4,3,{1,2,5,6,7,8} 163: 1,6,4,{2,3,5,7,8} 156: 4,3,6,{1,2,5,7,8} 152: 3,1,4,{2,5,6,7,8} 146: 4,6,2,{1,3,5,7,8} 144: 6,4,{1,2,3,5,7,8} 141: 1,2,4,{3,5,6,7,8} 137: 6,4,3,{1,2,5,7,8} 127: 4,5,3,{1,2,6,7,8} 126: 3,5,1,{2,4,6,7,8} 125: 4,2,1,{3,5,6,7,8} 120: 4,2,6,{1,3,5,7,8} 120: 1,4,7,{2,3,5,6,8} 119: 4,6,5,{1,2,3,7,8} 119: 3,5,6,{1,2,4,7,8} 111: 4,6,7,{1,2,3,5,8} 108: 3,5,7,{1,2,4,6,8} 104: 4,5,6,{1,2,3,7,8} 104: 3,1,5,{2,4,6,7,8} 100: 4,5,{1,2,3,6,7,8} 100: 2,{1,3,4,5,6,7,8} 97: 3,4,{1,2,5,6,7,8} 96: 1,5,3,{2,4,6,7,8} 91: 7,{1,2,3,4,5,6,8} 89: 1,2,3,{4,5,6,7,8} 88: 3,4,5,{1,2,6,7,8} 86: 3,5,4,{1,2,6,7,8} 80: 6,3,4,{1,2,5,7,8} 80: 1,3,{2,4,5,6,7,8} 79: 4,2,{1,3,5,6,7,8} 76: 1,5,4,{2,3,6,7,8} 74: 6,4,5,{1,2,3,7,8} 74: 3,5,{1,2,4,6,7,8} 73: 6,1,{2,3,4,5,7,8} 71: 5,4,1,{2,3,6,7,8} 70: 6,4,2,{1,3,5,7,8} 69: 4,3,7,{1,2,5,6,8} 68: 1,6,{2,3,4,5,7,8} 65: 4,3,2,{1,5,6,7,8} 64: 4,5,7,{1,2,3,6,8} 64: 6,3,1,{2,4,5,7,8} 63: 5,3,7,{1,2,4,6,8} 63: 2,1,4,{3,5,6,7,8} 63: 1,5,7,{2,3,4,6,8} 62: 4,2,3,{1,5,6,7,8} 61: 4,7,1,{2,3,5,6,8} 60: 1,2,5,{3,4,6,7,8} 60: 5,3,1,{2,4,6,7,8} 58: 3,4,6,{1,2,5,7,8} 57: 1,2,{3,4,5,6,7,8} 55: 4,7,6,{1,2,3,5,8} 53: 1,6,7,{2,3,4,5,8} 53: 1,5,6,{2,3,4,7,8} 52: 3,1,{2,4,5,6,7,8} 51: 4,5,2,{1,3,6,7,8} 51: 6,2,4,{1,3,5,7,8} 51: 6,1,5,{2,3,4,7,8} 51: 4,2,5,{1,3,6,7,8} 51: 8,{1,2,3,4,5,6,7} 50: 5,3,6,{1,2,4,7,8} 49: 3,6,4,{1,2,5,7,8} 49: 5,1,4,{2,3,6,7,8} 48: 1,6,3,{2,4,5,7,8} 48: 5,3,4,{1,2,6,7,8} 47: 3,6,7,{1,2,4,5,8} 47: 1,3,6,{2,4,5,7,8} 46: 6,3,{1,2,4,5,7,8} 45: 6,1,3,{2,4,5,7,8} 45: 5,1,3,{2,4,6,7,8} 44: 3,6,1,{2,4,5,7,8} 44: 1,2,6,{3,4,5,7,8} 43: 4,2,7,{1,3,5,6,8} 43: 6,4,7,{1,2,3,5,8} 43: 1,5,{2,3,4,6,7,8} 42: 1,3,2,{4,5,6,7,8} 41: 5,4,3,{1,2,6,7,8} 41: 1,7,4,{2,3,5,6,8} 41: 6,1,2,{3,4,5,7,8} 41: 2,4,1,{3,5,6,7,8} 41: 1,3,7,{2,4,5,6,8} 40: 1,6,2,{3,4,5,7,8} 40: 5,3,{1,2,4,6,7,8} 39: 2,4,6,{1,3,5,7,8} 38: 6,7,1,{2,3,4,5,8} 36: 3,4,2,{1,5,6,7,8} 36: 3,1,7,{2,4,5,6,8} 35: 1,6,5,{2,3,4,7,8} 35: 6,5,3,{1,2,4,7,8} 35: 2,1,3,{4,5,6,7,8} 34: 5,7,3,{1,2,4,6,8} 33: 3,7,5,{1,2,4,6,8} 33: 4,7,2,{1,3,5,6,8} 33: 5,4,6,{1,2,3,7,8} 33: 3,4,7,{1,2,5,6,8} 32: 4,7,3,{1,2,5,6,8} 31: 1,7,6,{2,3,4,5,8} 31: 3,1,6,{2,4,5,7,8} 31: 5,1,6,{2,3,4,7,8} 31: 1,7,3,{2,4,5,6,8} 31: 3,5,2,{1,4,6,7,8} 30: 6,5,7,{1,2,3,4,8} 30: 6,3,7,{1,2,4,5,8} 30: 6,2,7,{1,3,4,5,8} 29: 1,5,2,{3,4,6,7,8} 29: 4,7,5,{1,2,3,6,8} 29: 3,6,5,{1,2,4,7,8} 29: 5,4,{1,2,3,6,7,8} 28: 6,1,7,{2,3,4,5,8} 28: 6,7,3,{1,2,4,5,8} 28: 6,3,5,{1,2,4,7,8} 28: 3,6,{1,2,4,5,7,8} 28: 5,1,{2,3,4,6,7,8} 27: 6,5,1,{2,3,4,7,8} 27: 6,7,4,{1,2,3,5,8} 27: 4,7,{1,2,3,5,6,8} 25: 2,1,{3,4,5,6,7,8} 24: 5,6,3,{1,2,4,7,8} 24: 5,6,7,{1,2,3,4,8} 24: 6,5,4,{1,2,3,7,8} 24: 3,1,2,{4,5,6,7,8} 24: 7,3,5,{1,2,4,6,8} 23: 3,2,1,{4,5,6,7,8} 23: 3,7,1,{2,4,5,6,8} 23: 3,7,4,{1,2,5,6,8} 22: 7,3,1,{2,4,5,6,8} 22: 5,3,2,{1,4,6,7,8} 22: 3,2,4,{1,5,6,7,8} 22: 7,6,5,{1,2,3,4,8} 22: 3,7,{1,2,4,5,6,8} 21: 4,8,{1,2,3,5,6,7} 20: 1,2,7,{3,4,5,6,8} 20: 3,2,5,{1,4,6,7,8} 20: 5,6,4,{1,2,3,7,8} 20: 7,6,4,{1,2,3,5,8} 20: 5,6,1,{2,3,4,7,8} 20: 2,1,5,{3,4,6,7,8} 20: 7,4,6,{1,2,3,5,8} 19: 7,6,2,{1,3,4,5,8} 19: 2,4,3,{1,5,6,7,8} 19: 3,7,6,{1,2,4,5,8} 19: 2,3,4,{1,5,6,7,8} 19: 4,1,8,{2,3,5,6,7} 19: 1,7,5,{2,3,4,6,8} 19: 2,3,5,{1,4,6,7,8} 19: 2,4,{1,3,5,6,7,8} 18: 1,7,2,{3,4,5,6,8} 18: 6,3,2,{1,4,5,7,8} 18: 7,5,3,{1,2,4,6,8} 18: 6,2,1,{3,4,5,7,8} 18: 6,2,{1,3,4,5,7,8} 18: 1,7,{2,3,4,5,6,8} 17: 7,1,4,{2,3,5,6,8} 17: 3,6,2,{1,4,5,7,8} 17: 5,4,2,{1,3,6,7,8} 16: 5,1,7,{2,3,4,6,8} 16: 6,7,5,{1,2,3,4,8} 16: 6,2,5,{1,3,4,7,8} 16: 6,7,{1,2,3,4,5,8} 15: 7,1,5,{2,3,4,6,8} 15: 2,3,1,{4,5,6,7,8} 15: 2,4,7,{1,3,5,6,8} 15: 7,4,2,{1,3,5,6,8} 15: 3,2,{1,4,5,6,7,8} 14: 6,2,3,{1,4,5,7,8} 14: 5,2,3,{1,4,6,7,8} 14: 7,3,4,{1,2,5,6,8} 14: 2,6,7,{1,3,4,5,8} 14: 6,5,{1,2,3,4,7,8} 13: 6,7,2,{1,3,4,5,8} 13: 2,6,1,{3,4,5,7,8} 13: 5,2,4,{1,3,6,7,8} 13: 2,5,6,{1,3,4,7,8} 13: 3,2,6,{1,4,5,7,8} 13: 5,4,7,{1,2,3,6,8} 13: 7,1,2,{3,4,5,6,8} 13: 7,6,1,{2,3,4,5,8} 13: 7,4,1,{2,3,5,6,8} 12: 2,1,6,{3,4,5,7,8} 12: 2,4,5,{1,3,6,7,8} 12: 7,4,5,{1,2,3,6,8} 12: 7,2,1,{3,4,5,6,8} 12: 5,7,1,{2,3,4,6,8} 12: 6,5,2,{1,3,4,7,8} 12: 5,1,2,{3,4,6,7,8} 12: 2,5,{1,3,4,6,7,8} 12: 2,3,{1,4,5,6,7,8} 12: 1,8,{2,3,4,5,6,7} 11: 7,5,6,{1,2,3,4,8} 11: 5,7,4,{1,2,3,6,8} 11: 2,5,3,{1,4,6,7,8} 11: 7,2,4,{1,3,5,6,8} 11: 5,7,6,{1,2,3,4,8} 11: 1,4,8,{2,3,5,6,7} 11: 3,2,7,{1,4,5,6,8} 11: 7,1,3,{2,4,5,6,8} 11: 2,5,4,{1,3,6,7,8} 11: {1,2},{3,4,5,6,7,8} 10: 3,7,2,{1,4,5,6,8} 10: 5,2,7,{1,3,4,6,8} 10: 7,2,6,{1,3,4,5,8} 10: 2,5,1,{3,4,6,7,8} 10: 5,7,{1,2,3,4,6,8} 10: 7,6,{1,2,3,4,5,8} 9: 2,3,6,{1,4,5,7,8} 9: 5,2,1,{3,4,6,7,8} 9: 4,6,8,{1,2,3,5,7} 9: 7,3,6,{1,2,4,5,8} 9: 7,4,3,{1,2,5,6,8} 9: 2,1,7,{3,4,5,6,8} 9: 3,5,8,{1,2,4,6,7} 9: 2,6,3,{1,4,5,7,8} 9: 2,3,7,{1,4,5,6,8} 9: 7,6,3,{1,2,4,5,8} 9: 7,5,2,{1,3,4,6,8} 9: 7,3,{1,2,4,5,6,8} 8: 2,7,4,{1,3,5,6,8} 8: 5,6,2,{1,3,4,7,8} 8: 7,1,6,{2,3,4,5,8} 8: 7,5,1,{2,3,4,6,8} 8: 5,7,2,{1,3,4,6,8} 8: 2,7,3,{1,4,5,6,8} 8: 6,8,{1,2,3,4,5,7} 7: 4,3,8,{1,2,5,6,7} 7: 7,3,2,{1,4,5,6,8} 7: 2,7,1,{3,4,5,6,8} 7: 7,5,4,{1,2,3,6,8} 7: 5,2,{1,3,4,6,7,8} 7: 3,8,{1,2,4,5,6,7} 7: 7,4,{1,2,3,5,6,8} 6: 7,2,3,{1,4,5,6,8} 6: 2,6,5,{1,3,4,7,8} 6: 7,2,5,{1,3,4,6,8} 6: 7,5,{1,2,3,4,6,8} 6: 2,7,{1,3,4,5,6,8} 5: 5,2,6,{1,3,4,7,8} 5: 5,6,{1,2,3,4,7,8} 5: 5,8,{1,2,3,4,6,7} 5: 2,6,{1,3,4,5,7,8} 4: 2,7,5,{1,3,4,6,8} 4: 5,6,8,{1,2,3,4,7} 4: 2,8,{1,3,4,5,6,7} 4: 7,2,{1,3,4,5,6,8} 4: 4,{1,2},{3,5,6,7,8} 3: 3,6,8,{1,2,4,5,7} 3: 6,8,4,{1,2,3,5,7} 3: 8,5,3,{1,2,4,6,7} 3: 2,5,7,{1,3,4,6,8} 3: 1,6,8,{2,3,4,5,7} 3: 4,6,{1,2},{3,5,7,8} 3: {1,2},4,6,{3,5,7,8} 3: 4,5,8,{1,2,3,6,7} 3: 2,7,6,{1,3,4,5,8} 3: 4,2,8,{1,3,5,6,7} 3: 1,2,8,{3,4,5,6,7} 3: 6,4,8,{1,2,3,5,7} 3: 7,8,{1,2,3,4,5,6} 3: 7,1,{2,3,4,5,6,8} 2: 1,3,8,{2,4,5,6,7} 2: 2,4,8,{1,3,5,6,7} 2: 5,3,8,{1,2,4,6,7} 2: 6,3,8,{1,2,4,5,7} 2: {1,2},4,5,{3,6,7,8} 2: 4,8,1,{2,3,5,6,7} 2: 8,1,3,{2,4,5,6,7} 2: 3,4,8,{1,2,5,6,7} 2: 5,4,8,{1,2,3,6,7} 2: 3,1,8,{2,4,5,6,7} 2: 8,3,4,{1,2,5,6,7} 2: 4,7,8,{1,2,3,5,6} 2: 8,2,3,{1,4,5,6,7} 2: 1,5,8,{2,3,4,6,7} 2: 5,1,8,{2,3,4,6,7} 2: {1,2},6,7,{3,4,5,8} 2: 4,{1,2},7,{3,5,6,8} 2: 3,7,8,{1,2,4,5,6} 2: {1,2},4,{3,5,6,7,8} 2: 8,6,{1,2,3,4,5,7} 2: 6,{1,2},{3,4,5,7,8} 1: 4,{1,2},6,{3,5,7,8} 1: 4,{1,2},3,{5,6,7,8} 1: 7,8,2,{1,3,4,5,6} 1: 6,4,{1,2},{3,5,7,8} 1: 3,5,{1,2},{4,6,7,8} 1: 8,3,1,{2,4,5,6,7} 1: 6,5,{1,2},{3,4,7,8} 1: 7,4,{1,2},{3,5,6,8} 1: 6,{1,2},5,{3,4,7,8} 1: 1,8,3,{2,4,5,6,7} 1: 4,8,5,{1,2,3,6,7} 1: 3,4,{1,2},{5,6,7,8} 1: 7,2,8,{1,3,4,5,6} 1: 4,7,{1,2},{3,5,6,8} 1: 8,4,3,{1,2,5,6,7} 1: 7,{1,2},4,{3,5,6,8} 1: 6,8,2,{1,3,4,5,7} 1: 1,8,4,{2,3,5,6,7} 1: 1,8,5,{2,3,4,6,7} 1: 4,8,3,{1,2,5,6,7} 1: 4,5,{1,2},{3,6,7,8} 1: {1,2},5,3,{4,6,7,8} 1: 3,{1,2},7,{4,5,6,8} 1: 2,8,7,{1,3,4,5,6} 1: 6,8,7,{1,2,3,4,5} 1: 4,{1,2},5,{3,6,7,8} 1: 7,3,{1,2},{4,5,6,8} 1: 6,{1,2},3,{4,5,7,8} 1: 6,1,8,{2,3,4,5,7} 1: 8,5,2,{1,3,4,6,7} 1: {1,2},4,3,{5,6,7,8} 1: 7,8,1,{2,3,4,5,6} 1: 3,2,8,{1,4,5,6,7} 1: 2,6,8,{1,3,4,5,7} 1: 4,8,2,{1,3,5,6,7} 1: 8,7,5,{1,2,3,4,6} 1: 5,7,8,{1,2,3,4,6} 1: 4,{1,2},8,{3,5,6,7} 1: 3,6,{1,2},{4,5,7,8} 1: 3,8,5,{1,2,4,6,7} 1: 8,6,1,{2,3,4,5,7} 1: 1,8,2,{3,4,5,6,7} 1: 7,1,8,{2,3,4,5,6} 1: 6,7,8,{1,2,3,4,5} 1: 8,5,1,{2,3,4,6,7} 1: {1,2},5,4,{3,6,7,8} 1: {1,2},7,{3,4,5,6,8} 1: 5,{1,2},{3,4,6,7,8} 1: 3,{1,2},{4,5,6,7,8} 1: 8,4,{1,2,3,5,6,7}