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b2-43? -- b3-9 1a 29? 22? 15? 29? 77?
b3-10 -- b3-16 1b 7 (6) 14
b3-17-- b3-23 1c (8) 7
b3-24-- b3-35 2a 25 18 12 (11, 10) 25
b3-36-- b3-41 2b (7, 8) 6 (5) (14, 15) 13
b3-42-- b4-1 2c (8) 7
b4-2-- b4-10 3a 22 15 9 (8, 7) 23
b4-11-- b4-16 3b (7, 8) 6 (5) 14
b4-17-- b4-24 3c (9) 8
b4-25-- b4-38 4a 28 21 14 (13, 12) 29 116
b4-39-- b4-45 4b (8, 9) 7 15
b4-46-- b5-2 4c 8
b5-3 -- b5-9 5a1 58 (57) 51 7  58
b5-10-- b5-47 5a2 38 (37)
b5-48 -- b5-53 5b (7) 6 (5) (14) 13
b5-54 -- b6-3 5c (8) 7
b6-4 -- b6-18 6a 29 22 15 29
b6-19 -- b6-25 6b 7 14
b6-26-- b6-32 6c 7
b6-33-- b6-34 - 2
This is an upgraded table so far. I have retained as a marker of end that 'sitting shark' which resembles Eb6-19, i.e. Hb5-9, thereby dividing 5a into 5a1 and 5a2.

Question marks indicate that we have to take into consideration appearances and structures before these 192 glyphs too (at some future time). I have at the same time, however, 'secured' the end as a separat 2-glyph sequence (Hb6-33 -- 34). This gives a good number: 314 - 48 - 28 + 2 = 240 for the glyphs of the calendar. See though a summary table which does not express 314 openly.

Within parentheses are alternative numbers for what would happen with alternative possible relocations. Numbers without such parentheses seem 'secured'. A number within parenthesis at right is mirrored by a number within parenthesis at left on the row below.

Magenta shows the effect of moving ragi (GD22) from the end of b to the beginning of c.