This is a summarized version of my Fractional Psi Levels Scale. Eventually this table will extend much further than the one given in the above link. Lexical Letters, BEAF/Bird expressions and FGH ordinals are given when applicable.
Level | Number (Psi Array/Bird Variant) | Letters | Ordinal |
---|---|---|---|
0 | 0 | ||
0.1 | 1 | E0 | |
0.2 | 2 | E0~2 | |
0.3 | 3 | E0~3 | |
0.4 | 4 | E0~4 | |
0.5 | 5 | E0~5 | |
0.6 | 6 | E0~6 | |
0.7 | 7 | E0~7 | |
0.8 | 8 | E0~8 | |
0.9 | 9 | E0~9 | |
1.0 | 10 | E1 | |
1.1 | 15 | E1~15 | |
1.2 | 25 | E1~25 | |
1.3 | 50 | E1~5 | |
1.4 | 100 | E2 | |
1.5 | 300 | E2~3 | |
1.6 | 1000 | E3 | |
1.7 | 10,000 | E4 | |
1.8 | 1,000,000 | E6 | |
1.9 | 100,000,000 | E8 | |
2.0 | 1010 | E10 = F2 | 1 |
2.1 | 1015 | F2~1~15 | |
2.2 | 1025 | F2~1~25 | |
2.3 | 1050 | F2~1~5 | |
2.4 | 10100 | F2~2 | |
2.5 | 10300 | F2~2~3 | |
2.6 | 101000 | F2~3 | |
2.7 | 10104 | F2~4 | |
2.8 | 10106 | F2~6 | |
2.9 | 10108 | F2~8 | |
3.0 | 101010 | F3 | |
3.1 | 101015 | F3~1~15 | |
3.2 | 101025 | F3~1~25 | |
3.3 | 101050 | F3~1~5 | |
3.4 | 1010100 | F3~2 | |
3.5 | 1010300 | F3~2~3 | |
3.6 | 1010103 | F3~3 | |
3.7 | 1010104 | F3~4 | |
3.8 | 1010106 | F3~6 | |
3.9 | 1010108 | F3~8 | |
4.0 | 10101010 | F4 | |
4.1 | 10101015 | F4~1~15 | |
4.2 | 10101025 | F4~1~25 | |
4.3 | 10101050 | F4~1~5 | |
4.4 | 101010100 | F4~2 | |
4.5 | 101010300 | F4~2~3 | |
4.6 | 101010103 | F4~3 | |
4.7 | 101010104 | F4~4 | |
4.8 | 101010106 | F4~6 | |
4.9 | 101010108 | F4~8 | |
5.0 | 1010101010 | F5 | |
5.1 | 1010101015 | F5~1~15 | |
5.2 | 1010101030 | F5~1~3 | |
5.3 | 10101010100 | F5~2 | |
5.4 | 10101010103 | F5~3 | |
5.5 | 101010101010 | F6 | |
5.6 | 1010101010100 | F6~2 | |
5.7 | 10↑↑7 | F7 | |
5.8 | 10↑↑8 | F8 | |
5.9 | 10↑↑9 | F9 | |
6.0 | 10↑↑10 | F10 = G2 | 2 |
6.1 | 10↑↑15 | G2~1~1~15 | |
6.2 | 10↑↑30 | G2~1~1~3 | |
6.3 | 10↑↑100 | G2~1~2 | |
6.4 | 10↑↑10000 | G2~1~4 | |
6.5 | 10↑↑1010 | G2~2 | |
6.6 | 10↑↑10100 | G2~2~2 | |
6.7 | 10↑↑10↑↑3 | G2~3 | |
6.8 | 10↑↑10↑↑4 | G2~4 | |
6.9 | 10↑↑10↑↑6 | G2~6 | |
7.0 | 10↑↑10↑↑10 | G3 | |
7.1 | 10↑↑10↑↑100 | G3~1~2 | |
7.2 | 10↑↑10↑↑10000 | G3~1~4 | |
7.3 | 10↑↑10↑↑1010 | G3~2 | |
7.4 | 10↑↑10↑↑10↑↑3 | G3~3 | |
7.5 | 10↑↑10↑↑10↑↑10 | G4 | |
7.6 | 10↑↑10↑↑10↑↑1010 | G4~2 | |
7.7 | 10↑↑↑5 | G5 | |
7.8 | 10↑↑↑6 | G6 | |
7.9 | 10↑↑↑8 | G8 | |
8.0 | 10↑↑↑10 | G10 = H2 | 3 |
8.1 | 10↑↑↑100 | H2~1~1~2 | |
8.2 | 10↑↑↑1010 | H2~1~2 | |
8.3 | 10↑↑↑10↑↑3 | H2~1~3 | |
8.4 | 10↑↑↑10↑↑10 | H2~2 | |
8.5 | 10↑↑↑↑3 | H3 | |
8.6 | 10↑↑↑↑4 | H4 | |
8.7 | 10↑↑↑↑5 | H5 | |
8.8 | 10↑↑↑↑6 | H6 | |
8.9 | 10↑↑↑↑8 | H8 | |
9.0 | 10↑↑↑↑10 | H10 = J4 | 4 |
9.1 | 10↑↑↑↑100 | J4•2~[–3]~2 | |
9.2 | 10↑↑↑↑1010 | J4•2~1~1~2 | |
9.3 | 10↑↑↑↑10↑↑10 | J4•2~1~2 | |
9.4 | 10↑↑↑↑↑3 | J4•3 | |
9.5 | 10↑↑↑↑↑10 | J5 | 5 |
9.6 | 10↑↑↑↑↑↑3 | J5•3 | |
9.7 | 10↑610 | J6 | 6 |
9.8 | 10↑710 | J7 | 7 |
9.9 | 10↑810 | J8 | 8 |
10.0 | 10↑1010 | J10 = K2 | ω |
10.1 | 10↑1510 | K2~[–3]~15 | |
10.2 | 10↑2510 | K2~[–3]~25 | |
10.3 | 10↑5010 | K2~[–3]~5 | |
10.4 | 10↑10010 | K2~1~1~2 | |
10.5 | 10↑30010 | K2~1~1~2~3 | |
10.6 | 10↑100010 | K2~1~1~3 | |
10.7 | 10↑10,00010 | K2~1~1~4 | |
10.8 | 10↑1,000,00010 | K2~1~1~6 | |
10.9 | 10↑10810 | K2~1~1~8 | |
11.0 | 10↑101010 | K2~1~2 | |
11.1 | 10↑101510 | K2~1~2~1~15 | |
11.2 | 10↑103010 | K2~1~2~1~3 | |
11.3 | 10↑1010010 | K2~1~2~2 | |
11.4 | 10↑10100010 | K2~1~2~3 | |
11.5 | 10↑10↑↑310 | K2~1~3 | |
11.6 | 10↑10↑↑1010 | K2~2 | |
11.7 | 10↑10↑↑↑1010 | K2~3 | |
11.8 | 10↑10↑↑↑↑1010 | K2~4 | |
11.9 | 10↑10↑61010 | K2~6 | |
12.0 | 10↑10↑101010 | K3 | |
12.1 | 10↑10↑1001010 | K3~1~1~2 | |
12.2 | [1,0]2(1010) | K3~1~2 | |
12.3 | [1,0]2(10↑↑10) | K3~2 | |
12.4 | [1,0]2(10↑↑↑10) | K3~3 | |
12.5 | [1,0]310 | K4 | |
12.6 | [1,0]3(10↑1010) | K4~2 | |
12.7 | [1,1]5 | K5 | |
12.8 | [1,1]6 | K6 | |
12.9 | [1,1]8 | K8 | |
13.0 | [1,1]10 | K10 = L2 | ω+1 |
13.1 | [1,1]15 | L2~[–4]~15 | |
13.2 | [1,1]30 | L2~[–4]~3 | |
13.3 | [1,1]100 | L2~[–3]~2 | |
13.4 | [1,1]1000 | L2~[–3]~3 | |
13.5 | [1,1](1010) | L2~1~1~2 | |
13.6 | [1,1](10↑↑10) | L2~1~2 | |
13.7 | [1,1](10↑↑↑10) | L2~1~3 | |
13.8 | [1,1](10↑1010) | L2~2 | |
13.9 | [1,1]23 | L2~3 | |
14.0 | [1,1]210 | L3 | |
14.1 | [1,1]2(1010) | L3~1~1~2 | |
14.2 | [1,1]2(10↑↑10) | L3~1~2 | |
14.3 | [1,1]2(10↑1010) | L3~2 | |
14.4 | [1,1]33 | L3~3 | |
14.5 | [1,1]310 | L4 | |
14.6 | [1,1]3(10↑1010) | L4~2 | |
14.7 | [1,2]5 | L5 | |
14.8 | [1,2]6 | L6 | |
14.9 | [1,2]8 | L8 | |
15.0 | [1,2]10 | L10 = M2 | ω+2 |
15.1 | [1,2]15 | M2•2~[–5]~15 | |
15.2 | [1,2]30 | M2•2~[–5]~3 | |
15.3 | [1,2]100 | M2•2~[–4]~2 | |
15.4 | [1,2](1010) | M2•2~[–3]~2 | |
15.5 | [1,2](10↑1010) | M2•2~1~2 | |
15.6 | [1,2][1,1]10 | M2•2~2 | |
15.7 | [1,2][1,2]10 | M2•3 | |
15.8 | [1,3]4 | M2•4 | |
15.9 | [1,3]6 | M2•6 | |
16.0 | [1,3]10 | M3 | ω+3 |
16.1 | [1,3]100 | M3•2~[–5]~2 | |
16.2 | [1,3](1010) | M3•2~[–4]~2 | |
16.3 | [1,3](10↑↑10) | M3•2~[–3]~2 | |
16.4 | [1,3](10↑1010) | M3•2~1~1~2 | |
16.5 | [1,4]3 | M3•3 | |
16.6 | [1,4]10 | M4 | ω+4 |
16.7 | [1,5]10 | M5 | ω+5 |
16.8 | [1,6]10 | M6 | ω+6 |
16.9 | [1,8]10 | M8 | ω+8 |
17.0 | [2,0]10 | M10 = N2 | ω×2 |
17.1 | [2,0]15 | N2♢0•2~[–6]~15 | |
17.2 | [2,0]30 | N2♢0•2~[–6]~3 | |
17.3 | [2,0]100 | N2♢0•2~[–5]~2 | |
17.4 | [2,0]1000 | N2♢0•2~[–5]~3 | |
17.5 | [2,0](1010) | N2♢0•2~[–4]~2 | |
17.6 | [2,0](10↑↑10) | N2♢0•2~[–3]~2 | |
17.7 | [2,0](10↑1010) | N2♢0•2~1~1~2 | |
17.8 | [2,1]3 | N2♢0•3 | |
17.9 | [2,1]5 | N2♢0•5 | |
18.0 | [2,1]10 | N2♢1 | ω×2+1 |
18.1 | [2,1]100 | N2♢1•2~[–6]~2 | |
18.2 | [2,1](1010) | N2♢1•2~[–5]~2 | |
18.3 | [2,1](10↑1010) | N2♢1•2~[–3]~2 | |
18.4 | [2,2]3 | N2♢1•3 | |
18.5 | [2,2]10 | N2♢2 | ω×2+2 |
18.6 | [2,3]3 | N2♢2•3 | |
18.7 | [2,3]10 | N2♢3 | ω×2+3 |
18.8 | [2,4]10 | N2♢4 | ω×2+4 |
18.9 | [2,6]10 | N2♢6 | ω×2+6 |
19.0 | [3,0]10 | N3 | ω×3 |
19.1 | [3,0](1010) | N3♢0•2~[–7]~2 | |
19.2 | [3,1]3 | N3♢0•3 | |
19.3 | [3,1]10 | N3♢1 | ω×3+1 |
19.4 | [3,2]10 | N3♢2 | ω×3+2 |
19.5 | [4,0]10 | N4 | ω×4 |
19.6 | [4,1]10 | N4♢1 | ω×4+1 |
19.7 | [5,0]10 | N5 | ω×5 |
19.8 | [6,0]10 | N6 | ω×6 |
19.9 | [8,0]10 | N8 | ω×8 |
20.0 | [1,0,0]10 | N10 = P2 | ω2 |
20.1 | [1,0,0]15 | P2~100•2~[–7]~15 | |
20.2 | [1,0,0]25 | P2~100•2~[–7]~25 | |
20.3 | [1,0,0]50 | P2~100•2~[–7]~5 | |
20.4 | [1,0,0]100 | P2~100•2~[–6]~2 | |
20.5 | [1,0,0]300 | P2~100•2~[–6]~2~3 | |
20.6 | [1,0,0]1000 | P2~100•2~[–6]~3 | |
20.7 | [1,0,0]10000 | P2~100•2~[–6]~4 | |
20.8 | [1,0,0](106) | P2~100•2~[–6]~6 | |
20.9 | [1,0,0](108) | P2~100•2~[–6]~8 | |
21.0 | [1,0,0](1010) | P2~100•2~[–5]~2 | |
21.1 | [1,0,0](10↑↑3) | P2~100•2~[–5]~3 | |
21.2 | [1,0,0](10↑↑10) | P2~100•2~[–4]~2 | |
21.3 | [1,0,0](10↑↑↑10) | P2~100•2~[–4]~3 | |
21.4 | [1,0,0](10↑1010) | P2~100•2~[–3]~2 | |
21.5 | [1,0,0]210 | P2~100•3 | |
21.6 | [1,0,0]2(10↑1010) | P2~100•3~[–3]~2 | |
21.7 | [1,0,1]4 | P2~100•4 | |
21.8 | [1,0,1]5 | P2~100•5 | |
21.9 | [1,0,1]7 | P2~100•7 | |
22.0 | [1,0,1]10 | P2~101 | ω2+1 |
22.1 | [1,0,1](10↑↑10) | P2~101•2~[–5]~2 | |
22.2 | [1,0,1](10↑1010) | P2~101•2~[–4]~2 | |
22.3 | [1,0,2]3 | P2~101•3 | |
22.4 | [1,0,2]4 | P2~101•4 | |
22.5 | [1,0,2]10 | P2~102 | ω2+2 |
22.6 | [1,0,3]3 | P2~102•3 | |
22.7 | [1,0,3]10 | P2~103 | ω2+3 |
22.8 | [1,0,4]10 | P2~104 | ω2+4 |
22.9 | [1,0,6]10 | P2~106 | ω2+6 |
23.0 | [1,1,0]10 | P2~1♢1 | ω2+ω |
23.1 | [1,1,0](1010) | P2~110•2~[–8]~2 | |
23.2 | [1,1,0](10↑↑10) | P2~110•2~[–7]~2 | |
23.3 | [1,1,0](10↑1010) | P2~110•2~[–6]~2 | |
23.4 | [1,1,1]3 | P2~110•3 | |
23.5 | [1,1,1]10 | P2~111 | ω2+ω+1 |
23.6 | [1,1,2]10 | P2~112 | ω2+ω+2 |
23.7 | [1,2,0]10 | P2~12 | ω2+ω×2 |
23.8 | [1,2,1]10 | P2~121 | ω2+ω×2+1 |
23.9 | [1,3,0]10 | P2~16 | ω2+ω×3 |
24.0 | [2,0,0]10 | P2~2 | ω2×2 |
24.1 | [2,0,0](1010) | P2~200•2~[–E1~13]~2 | |
24.2 | [2,0,1]3 | P2~200•3 | |
24.3 | [2,0,1]10 | P2~201 | ω2×2+1 |
24.4 | [2,0,2]10 | P2~202 | ω2×2+2 |
24.5 | [2,1,0]10 | P2~21 | ω2×2+ω |
24.6 | [2,1,1]10 | P2~211 | ω2×2+ω+1 |
24.7 | [2,2,0]10 | P2~22 | ω2×2+ω×2 |
24.8 | [2,2,1]10 | P2~221 | ω2×2+ω×2+1 |
24.9 | [2,3,0]10 | P2~23 | ω2×2+ω×3 |
25.0 | [3,0,0]10 | P2~3 | ω2×3 |
25.1 | [3,0,1]3 | P2~300•3 | |
25.2 | [3,0,1]10 | P2~301 | ω2×3+1 |
25.3 | [3,0,2]10 | P2~302 | ω2×3+2 |
25.4 | [3,1,0]10 | P2~31 | ω2×3+ω |
25.5 | [4,0,0]10 | P2~4 | ω2×4 |
25.6 | [4,0,1]10 | P2~401 | ω2×4+1 |
25.7 | [5,0,0]10 | P2~5 | ω2×5 |
25.8 | [6,0,0]10 | P2~6 | ω2×6 |
25.9 | [8,0,0]10 | P2~8 | ω2×8 |
26.0 | [1,0,0,0]10 | P3 | ω3 |
26.1 | [1,0,0,0](1010) | P3~1000•2~[–E1~14]~2 | |
26.2 | [1,0,0,1]3 | P3~1000•3 | |
26.3 | [1,0,0,1]10 | P3~1001 | ω3+1 |
26.4 | [1,0,0,2]10 | P3~1002 | ω3+2 |
26.5 | [1,0,1,0]10 | P3~101 | ω3+ω |
26.6 | [1,1,0,0]10 | P3~11 | ω3+ω2 |
26.7 | [1,2,0,0]10 | P3~12 | ω3+ω2×2 |
26.8 | [1,3,0,0]10 | P3~13 | ω3+ω2×3 |
26.9 | [1,5,0,0]10 | P3~15 | ω3+ω2×5 |
27.0 | [2,0,0,0]10 | P3~2 | ω3×2 |
27.1 | [2,0,0,1]3 | P3~2000•3 | |
27.2 | [2,0,0,1]10 | P3~2001 | ω3×2+1 |
27.3 | [2,0,1,0]10 | P3~201 | ω3×2+ω |
27.4 | [2,1,0,0]10 | P3~21 | ω3×2+ω2 |
27.5 | [3,0,0,0]10 | P3~3 | ω3×3 |
27.6 | [3,0,0,1]10 | P3~3001 | ω3×3+1 |
27.7 | [4,0,0,0]10 | P3~4 | ω3×4 |
27.8 | [5,0,0,0]10 | P3~5 | ω3×5 |
27.9 | [7,0,0,0]10 | P3~7 | ω3×7 |
28.0 | [1,0,0,0,0]10 | P4 | ω4 |
28.1 | [1,0,0,0,1]3 | P4~10000•3 | |
28.2 | [1,0,0,0,1]10 | P4~10001 | ω4+1 |
28.3 | [1,0,0,1,0]10 | P4~1001 | ω4+ω |
28.4 | [1,1,0,0,0]10 | P4~11 | ω4+ω3 |
28.5 | [2,0,0,0,0]10 | P4~2 | ω4×2 |
28.6 | [2,0,1,0,0]10 | P4~201 | ω4×2+1 |
28.7 | [3,0,0,0,0]10 | P4~3 | ω4×3 |
28.8 | [4,0,0,0,0]10 | P4~4 | ω4×4 |
28.9 | [6,0,0,0,0]10 | P4~6 | ω4×6 |
29.0 | [1,0,0,0,0,0]10 | P5 | ω5 |
29.1 | [1,0,0,0,0,1]10 | P5~100001 | ω5+1 |
29.2 | [1,0,0,1,0,0]10 | P5~1001 | ω5+ω2 |
29.3 | [1,1,0,0,0,0]10 | P5~11 | ω5+ω4 |
29.4 | [2,0,0,0,0,0]10 | P5~2 | ω5×2 |
29.5 | [1,0,0,0,0,0,0]10 | P6 | ω6 |
29.6 | [2,0,0,0,0,0,0]10 | P6~2 | ω6×2 |
29.7 | [1,0,0,0,0,0,0,0]10 | P7 | ω7 |
29.8 | [1,0,0,0,0,0,0,0,0]10 | P8 | ω8 |
29.9 | [1 (1) 0]9 | P9 | ω9 |
30.0 | [1 (1) 0]10 | P10 = Q2 | ωω |
30.1 | [1 (1) 0]15 | Q2~1~10~100•2~[–8]~15 | |
30.2 | [1 (1) 0]25 | Q2~1~10~100•2~[–8]~25 | |
30.3 | [1 (1) 0]50 | Q2~1~10~100•2~[–8]~5 | |
30.4 | [1 (1) 0]100 | Q2~1~10~100•2~[–7]~2 | |
30.5 | [1 (1) 0]300 | Q2~1~10~100•2~[–7]~2~3 | |
30.6 | [1 (1) 0]1000 | Q2~1~10~100•2~[–7]~3 | |
30.7 | [1 (1) 0]10000 | Q2~1~10~100•2~[–7]~4 | |
30.8 | [1 (1) 0](106) | Q2~1~10~100•2~[–7]~6 | |
30.9 | [1 (1) 0](108) | Q2~1~10~100•2~[–7]~8 | |
31.0 | [1 (1) 0](1010) | Q2~1~10~100•2~[–6]~2 | |
31.1 | [1 (1) 0](10↑↑3) | Q2~1~10~100•2~[–6]~3 | |
31.2 | [1 (1) 0](10↑↑10) | Q2~1~10~100•2~[–5]~2 | |
31.3 | [1 (1) 0](10↑1010) | Q2~1~10~100•2~[–4]~2 | |
31.4 | [1 (1) 0][1,0,0]10 | Q2~1~10~100•2~2 | |
31.5 | [1 (1) 0]210 | Q2~1~10~100•3 | |
31.6 | [1 (1) 0]2(10↑1010) | Q2~1~10~100•3~[–4]~2 | |
31.7 | [1 (1) 1]4 | Q2~1~10~100•4 | |
31.8 | [1 (1) 1]5 | Q2~1~10~100•5 | |
31.9 | [1 (1) 1]7 | Q2~1~10~100•7 | |
32.0 | [1 (1) 1]10 | Q2~1~10~101 | ωω+1 |
32.1 | [1 (1) 1](1010) | Q2~1~10~101•2~[–7]~2 | |
32.2 | [1 (1) 1](10↑1010) | Q2~1~10~101•2~[–5]~2 | |
32.3 | [1 (1) 1][1 (1) 0]10 | Q2~1~10~101•2~2 | |
32.4 | [1 (1) 2]3 | Q2~1~10~101•3 | |
32.5 | [1 (1) 2]10 | Q2~1~10~102 | ωω+2 |
32.6 | [1 (1) 3]3 | Q2~1~10~102•3 | |
32.7 | [1 (1) 3]10 | Q2~1~10~103 | ωω+3 |
32.8 | [1 (1) 4]10 | Q2~1~10~104 | ωω+4 |
32.9 | [1 (1) 6]10 | Q2~1~10~106 | ωω+6 |
33.0 | [1 (1) 1,0]10 | Q2~1~10~11 | ωω+ω |
33.1 | [1 (1) 1,1]3 | Q2~1~10~11~10•3 | |
33.2 | [1 (1) 1,1]10 | Q2~1~10~11~11 | ωω+ω+1 |
33.3 | [1 (1) 2,0]10 | Q2~1~10~11~2 | ωω+ω×2 |
33.4 | [1 (1) 3,0]10 | Q2~1~10~11~3 | ωω+ω×3 |
33.5 | [1 (1) 1,0,0]10 | Q2~1~10~12 | ωω+ω2 |
33.6 | [1 (1) 2,0,0]10 | Q2~1~10~12~2 | ωω+ω2×2 |
33.7 | [2 (1) 0]3 | Q2~1~10~13 | ωω+ω3 |
33.8 | [2 (1) 0]4 | Q2~1~10~14 | ωω+ω4 |
33.9 | [2 (1) 0]6 | Q2~1~10~16 | ωω+ω6 |
34.0 | [2 (1) 0]10 | Q2~1~10~2 | ωω×2 |
34.1 | [2 (1) 1]10 | Q2~1~10~201 | ωω×2+1 |
34.2 | [2 (1) 1,0]10 | Q2~1~10~21 | ωω×2+ω |
34.3 | [2 (1) 1,0,0,0]10 | Q2~1~10~23 | ωω×2+ω3 |
34.4 | [3 (1) 0]6 | Q2~1~10~26 | ωω×2+ω6 |
34.5 | [3 (1) 0]10 | Q2~1~10~3 | ωω×3 |
34.6 | [3 (1) 1,0]10 | Q2~1~10~31 | ωω×3+ω |
34.7 | [4 (1) 0]10 | Q2~1~10~4 | ωω×4 |
34.8 | [5 (1) 0]10 | Q2~1~10~5 | ωω×5 |
34.9 | [7 (1) 0]10 | Q2~1~10~7 | ωω×7 |
35.0 | [1,0 (1) 0]10 | Q2~1~11 | ωω+1 |
35.1 | [1,0 (1) 1]10 | Q2~1~11~1001 | ωω+1+1 |
35.2 | [1,0 (1) 1,0]10 | Q2~1~11~101 | ωω+1+ω |
35.3 | [1,1 (1) 1]4 | Q2~1~11~104 | ωω+1+ω4 |
35.4 | [1,1 (1) 1]10 | Q2~1~11~11 | ωω+1+ωω |
35.5 | [2,0 (1) 0]10 | Q2~1~11~2 | ωω+1×2 |
35.6 | [3,0 (1) 0]10 | Q2~1~11~3 | ωω+1×3 |
35.7 | [4,0 (1) 0]10 | Q2~1~11~4 | ωω+1×4 |
35.8 | [5,0 (1) 0]10 | Q2~1~11~5 | ωω+1×5 |
35.9 | [7,0 (1) 0]10 | Q2~1~11~7 | ωω+1×7 |
36.0 | [1,0,0 (1) 0]10 | Q2~1~12 | ωω+2 |
36.1 | [1,0,0 (1) 1]10 | Q2~1~12~10001 | ωω+2+1 |
36.2 | [1,0,1 (1) 0]10 | Q2~1~12~101 | ωω+2+ωω |
36.3 | [2,0,0 (1) 0]10 | Q2~1~12~2 | ωω+2×2 |
36.4 | [3,0,0 (1) 0]10 | Q2~1~12~3 | ωω+2×3 |
36.5 | [1,0,0,0 (1) 0]10 | Q2~1~13 | ωω+3 |
36.6 | [2,0,0,0 (1) 0]10 | Q2~1~13~2 | ωω+3×2 |
36.7 | [1 (1)(1) 0]4 | Q2~1~14 | ωω+4 |
36.8 | [1 (1)(1) 0]5 | Q2~1~15 | ωω+5 |
36.9 | [1 (1)(1) 0]7 | Q2~1~17 | ωω+7 |
37.0 | [1 (1)(1) 0]10 | Q2~1~2 | ωω×2 |
37.1 | [1 (1)(1) 1]0 | Q2~1~20~1001 | ωω×2+1 |
37.2 | [2 (1)(1) 0]10 | Q2~1~20~2 | ωω×2×2 |
37.3 | [1,0 (1)(1) 0]10 | Q2~1~21 | ωω×2+1 |
37.4 | [1,0,0 (1)(1) 0]10 | Q2~1~22 | ωω×2+2 |
37.5 | [1 (1)(1)(1) 0]10 | Q2~1~3 | ωω×3 |
37.6 | [1,0 (1)(1)(1) 0]10 | Q2~1~31 | ωω×3+1 |
37.7 | [1 (2) 0]4 | Q2~1~4 | ωω×4 |
37.8 | [1 (2) 0]5 | Q2~1~5 | ωω×5 |
37.9 | [1 (2) 0]7 | Q2~1~7 | ωω×7 |
38.0 | [1 (2) 0]10 | Q2~2 | ωω2 |
38.1 | [1 (2) 1]3 | Q2~2~100~1000•3 | |
38.2 | [1 (2) 1]10 | Q2~2~100~1001 | ωω2+1 |
38.3 | [1 (2) 1 (1) 0]10 | Q2~2~100~11 | ωω2+ωω |
38.4 | [2 (2) 0]10 | Q2~2~100~2 | ωω2×2 |
38.5 | [1,0 (2) 0]10 | Q2~2~101 | ωω2+1 |
38.6 | [1 (1)(2) 0]10 | Q2~2~11 | ωω2+ω |
38.7 | [1 (2)(2) 0]10 | Q2~2~2 | ωω2×2 |
38.8 | [1 (2)(2)(2) 0]10 | Q2~2~3 | ωω2×3 |
38.9 | [1 (3) 0]5 | Q2~2~5 | ωω2×5 |
39.0 | [1 (3) 0]10 | Q2~3 | ωω3 |
39.1 | [1 (3) 1]10 | Q2~3~1000~10001 | ωω3+1 |
39.2 | [2 (3) 0]10 | Q2~3~1000~2 | ωω3×2 |
39.3 | [1,0 (3) 0]10 | Q2~3~1001 | ωω3+1 |
39.4 | [1 (3)(3) 0]10 | Q2~3~2 | ωω3×2 |
39.5 | [1 (4) 0]10 | Q2~4 | ωω4 |
39.6 | [1,0 (4) 0]10 | Q2~4~10001 | ωω4+1 |
39.7 | [1 (5) 0]10 | Q2~5 | ωω5 |
39.8 | [1 (6) 0]10 | Q2~5 | ωω6 |
39.9 | [1 (8) 0]10 | Q2~7 | ωω8 |
40.0 | [1 (1,0) 0]10 | Q3 | ωωω |
40.1 | [1 (1,0) 0]15 | Q3~1~10~100~1000•2~[–E1~38]~15 | |
40.2 | [1 (1,0) 0]25 | Q3~1~10~100~1000•2~[–E1~38]~25 | |
40.3 | [1 (1,0) 0]50 | Q3~1~10~100~1000•2~[–E1~38]~5 | |
40.4 | [1 (1,0) 0]100 | Q3~1~10~100~1000•2~[–E1~37]~2 | |
40.5 | [1 (1,0) 0]300 | Q3~1~10~100~1000•2~[–E1~37]~2~3 | |
40.6 | [1 (1,0) 0]1000 | Q3~1~10~100~1000•2~[–E1~37]~3 | |
40.7 | [1 (1,0) 0]10000 | Q3~1~10~100~1000•2~[–E1~37]~4 | |
40.8 | [1 (1,0) 0](106) | Q3~1~10~100~1000•2~[–E1~37]~6 | |
40.9 | [1 (1,0) 0](108) | Q3~1~10~100~1000•2~[–E1~37]~8 | |
41.0 | [1 (1,0) 0](1010) | Q3~1~10~100~1000•2~[–E1~36]~2 | |
41.1 | [1 (1,0) 0](10↑↑10) | Q3~1~10~100~1000•2~[–E1~35]~2 | |
41.2 | [1 (1,0) 0](10↑1010) | Q3~1~10~100~1000•2~[–E1~34]~2 | |
41.3 | [1 (1,0) 0][1 (1) 0]10 | Q3~1~10~100~1000•2~[–E1~29]~2 | |
41.4 | [1 (1,0) 0]210 | Q3~1~10~100~1000•3 | |
41.5 | [1 (1,0) 1]10 | Q3~1~10~100~1001 | ωωω+1 |
41.6 | [2 (1,0) 0]10 | Q3~1~10~100~2 | ωωω×2 |
41.7 | [1,0 (1,0) 0]10 | Q3~1~10~101 | ωωω+1 |
41.8 | [1 (1)(1,0) 0]10 | Q3~1~10~11 | ωωω+ω |
41.9 | [1 (1,0)(1,0) 0]10 | Q3~1~10~2 | ωωω×2 |
42.0 | [1 (1,1) 0]10 | Q3~1~11 | ωωω+1 |
42.1 | [1 (1,1) 1]10 | Q3~1~11~1000~10001 | ωωω+1+1 |
42.2 | [2 (1,1) 0]10 | Q3~1~11~1000~2 | ωωω+1×2 |
42.3 | [1,0 (1,1) 0]10 | Q3~1~11~1001 | ω(ωω+1+1) |
42.4 | [1 (1,1)(1,1) 0]10 | Q3~1~11~2 | ω(ωω+1×2) |
42.5 | [1 (1,2) 0]10 | Q3~1~12 | ωωω+2 |
42.6 | [1 (1,2)(1,2) 0]10 | Q3~1~12~2 | ω(ωω+2×2) |
42.7 | [1 (1,3) 0]10 | Q3~1~13 | ωωω+3 |
42.8 | [1 (1,4) 0]10 | Q3~1~14 | ωωω+4 |
42.9 | [1 (1,6) 0]10 | Q3~1~16 | ωωω+6 |
43.0 | [1 (2,0) 0]10 | Q3~1~2 | ωωω2 |
43.1 | [1 (2,0) 1]10 | Q3~1~20~10000~100001 | ωωω2+1 |
43.2 | [2 (2,0) 1]10 | Q3~1~20~10000~2 | ωωω2×2 |
43.3 | [1,0 (2,0) 1]10 | Q3~1~20~10001 | ω(ωω2+1) |
43.4 | [1 (2,0)(2,0) 0]10 | Q3~1~20~2 | ω(ωω2×2) |
43.5 | [1 (3,0) 0]10 | Q3~1~30 | ωωω3 |
43.6 | [1,0 (3,0) 0]10 | Q3~1~30~2 | ω(ωω3×2) |
43.7 | [1 (3,1) 0]10 | Q3~1~31 | ωωω3+1 |
43.8 | [1 (4,0) 0]10 | Q3~1~4 | ωωω4 |
43.9 | [1 (5,0) 0]10 | Q3~1~5 | ωωω5 |
44.0 | [1 (1,0,0) 0]10 | Q3~2 | ωωω2 |
44.1 | [1 (1,0,0) 1]10 | Q3~2~100~1000~10001 | ωωω2+1 |
44.2 | [1,0 (1,0,0) 0]10 | Q3~2~100~1001 | ω(ωω2+1) |
44.3 | [1 (1,0,1) 0]10 | Q3~2~101 | ωωω2+1 |
44.4 | [1 (2,0,0) 0]10 | Q3~2~2 | ωωω22 |
44.5 | [1 (1,0,0,0) 0]10 | Q3~3 | ωωω3 |
44.6 | [1 (1,0,0,1) 0]10 | Q3~3~1001 | ωωω3+1 |
44.7 | [1 (1 (1) 0) 0]4 | Q3~4 | ωωω4 |
44.8 | [1 (1 (1) 0) 0]5 | Q3~5 | ωωω5 |
44.9 | [1 (1 (1) 0) 0]7 | Q3~7 | ωωω7 |
45.0 | [1 (1 (1) 0) 0]10 | Q4 | ωωωω |
45.1 | [1 (1 (1) 0) 1]10 | Q4~1~10~100~1000~10001 | ωωωω+1 |
45.2 | [2 (1 (1) 0) 0]10 | Q4~1~10~100~1000~2 | ωωωω×2 |
45.3 | [1,0 (1 (1) 0) 0]10 | Q4~1~10~100~1001 | ω(ωωω+1) |
45.4 | [1 (1(1)0)(1(1)0) 0]10 | Q4~1~10~100~2 | ω(ωωω×2) |
45.5 | [1 (1(1)1) 0]10 | Q4~1~10~101 | ωω(ωω+1) |
45.6 | [1 (2(1)0) 0]10 | Q4~1~10~2 | ωω(ωωx2) |
45.7 | [1 (1,0(1)0) 0]10 | Q4~1~11 | ωωωω+1 |
45.8 | [1 (1(1)(1)0) 0]10 | Q4~1~2 | ωωωωx2 |
45.9 | [1 (1 (2) 0) 0]4 | Q4~1~4 | ωωωωx4 |
46.0 | [1 (1 (2) 0) 0]10 | Q4~2 | ωωωω2 |
46.1 | [1 (1 (2) 0) 1]10 |
Q3~2~100~1000~10000~ 100001 |
ωωωω2+1 |
46.2 | [1 (1 (2) 1) 0]10 | Q3~2~100~1001 | ωω(ωω2+1) |
46.3 | [1 (1,0 (2) 0) 0]10 | Q4~2~101 | ωωωω2+1 |
46.4 | [1 (1 (2)(2) 0) 0]10 | Q4~2~2 | ωωωω22 |
46.5 | [1 (1 (3) 0) 0]10 | Q4~3 | ωωωω3 |
46.6 | [1 (1,0 (3) 0) 1]10 | Q4~3~1001 | ωωωω3+1 |
46.7 | [1 (1 (4) 0) 0]10 | Q4~4 | ωωωω4 |
46.8 | [1 (1 (5) 0) 0]10 | Q4~5 | ωωωω5 |
46.9 | [1 (11 (7) 0) 0]10 | Q4~7 | ωωωω7 |
47.0 | [1 (1 (1,0) 0) 0]10 | Q5 | ωωωωω |
47.1 | [1 (1 (1,0) 0) 1]10 |
Q5~1~10~100~1000~10000~ 100001 |
ωωωωω+1 |
47.2 | [1,0 (1 (1,0) 0) 0]10 | Q5~1~10~100~1000~10001 | ω(ωωωω+1) |
47.3 | [1 (1)(1(1,0)0) 0]10 | Q5~1~10~100~1001 | ωω(ωωω+1) |
47.4 | [1 (1,0 (1,0) 0) 0]10 | Q5~1~10~101 | ωωω(ωω+1) |
47.5 | [1 (1 (1,1) 0) 0]10 | Q5~1~11 | ωωωωω+1 |
47.6 | [1 (1 (2,0) 0) 0]10 | Q5~1~2 | ωωωωω2 |
47.7 | [1 (1 (1,0,0) 0) 0]10 | Q5~2 | ωωωωω2 |
47.8 | [1 (1(1(1)0)0) 0]3 | Q5~3 | ωωωωω3 |
47.9 | [1 (1(1(1)0)0) 0]5 | Q5~5 | ωωωωω5 |
48.0 | [1 (1(1(1)0)0) 0]10 | Q6 | ωωωωωω |
48.1 | [1 (1(1(1)0)1) 0]10 | ωω(ωωωω+1) | |
48.2 | [1(1(1,0(1)0)0)0]10 | ωωωωωω+1 | |
48.3 | [1(1(1(1)(1)0)0)0]10 | ωωωωω2 | |
48.4 | [1 (1(1(2)0)0) 0]10 | (ω↑)62 | |
48.5 | [1(1(1(1,0)0)0)0]10 | Q7 | ω↑↑7 |
48.6 | [1(1(1(1,0)0)1)0]10 | (ω↑)2(ω↑↑5+1) | |
48.7 | [1(1(1(1,1)0)0)0]10 | Q7~1~11 | (ω↑)6(ω+1) |
48.8 | [1(1(1(2,0)0)0)0]10 | Q7~1~2 | (ω↑)6(ω2) |
48.9 | [1(1(1(1,0,0)0)0)0]10 | Q7~2 | (ω↑)72 |
49.0 | [1(1(1(1(1)0)0)0)0]10 | Q8 | ω↑↑8 |
49.1 | [1(1,0(1(1(1)0)0)0)0]10 | (ω↑)3(ω↑↑5+1) | |
49.2 | [1(1(1(1,0(1)0)0)0)0]10 | Q8~1~11 | (ω↑)7(ω+1) |
49.3 | [1(1(1(1(1)(1)0)0)0)0]10 | Q8~1~2 | (ω↑)7(ω2) |
49.4 | [1(1(1(1(2)0)0)0)0]10 | Q8~2 | (ω↑)82 |
49.5 | [1(1(1(1(1,0)0)0)0)0]10 | Q9 | ω↑↑9 |
49.6 | [1(1,0(1(1(1,0)0)0)0)0]10 | (ω↑)3(ω↑↑6+1) | |
49.7 | [1(1(1(1(1,1)0)0)0)0]10 | Q9~1~11 | (ω↑)8(ω+1) |
49.8 | [1(1(1(1(2,0)0)0)0)0]10 | Q9~1~2 | (ω↑)8(ω2) |
49.9 | [1(1(1(1(1,0,0)0)0)0)0]10 | Q9~2 | (ω↑)92 |
50.0 | [1(1(1(1(1(1)0)0)0)0)0]10 | Q10 = R2 | ε0 |
50.1 | [1(1(1(1(1(2)0)0)0)0)0]10 | R2~1~100~10~10~100•2~[–9]~10~2 | |
50.2 | [1 (0\1) 0]11 | R2~1~100~10~10~100•2~[–9]~11 | |
50.3 | [1 (0\1) 0]12 | R2~1~100~10~10~100•2~[–9]~12 | |
50.4 | [1 (0\1) 0]15 | R2~1~100~10~10~100•2~[–9]~15 | |
50.5 | [1 (0\1) 0]20 | R2~1~100~10~10~100•2~[–9]~2 | |
50.6 | [1 (0\1) 0]40 | R2~1~100~10~10~100•2~[–9]~4 | |
50.7 | [1 (0\1) 0]100 | R2~1~100~10~10~100•2~[–8]~2 | |
50.8 | [1 (0\1) 0]1000 | R2~1~100~10~10~100•2~[–8]~3 | |
50.9 | [1 (0\1) 0]100000 | R2~1~100~10~10~100•2~[–8]~5 | |
51.0 | [1 (0\1) 0][1]10 | R2~1~100~10~10~100•2~[–7]~2 | |
51.1 | [1 (0\1) 0][2]3 | R2~1~100~10~10~100•2~[–7]~3 | |
51.2 | [1 (0\1) 0][2]10 | R2~1~100~10~10~100•2~[–6]~2 | |
51.3 | [1 (0\1) 0][1,0]10 | R2~1~100~10~10~100•2~[–5]~2 | |
51.4 | [1 (0\1) 0][1,1]10 | R2~1~100~10~10~100•2~[–4]~2 | |
51.5 | [1 (0\1) 0][2,0]10 | R2~1~100~10~10~100•2~1~1~2 | |
51.6 | [1 (0\1) 0][1,0,0]10 | R2~1~100~10~10~100•2~1~2 | |
51.7 | [1 (0\1) 0][1 (1) 0]10 | R2~1~100~10~10~100•2~2 | |
51.8 | [1 (0\1) 1]3 | R2~1~100~10~10~100•3 | |
51.9 | [1 (0\1) 1]5 | R2~1~100~10~10~100•5 | |
52.0 | [1 (0\1) 1]10 | R2~1~100~10~10~101 | ε0+1 |
52.1 | [1 (0\1) 1][1]10 | R2~1~100~10~10~101•2~[–8]~2 | |
52.2 | [1 (0\1) 2]3 | R2~1~100~10~10~101•3 | |
52.3 | [1 (0\1) 2]10 | R2~1~100~10~10~102 | ε0+2 |
52.4 | [1 (0\1) 3]3 | R2~1~100~10~10~102•3 | |
52.5 | [1 (0\1) 3]10 | R2~1~100~10~10~103 | ε0+3 |
52.6 | [1 (0\1) 4]3 | R2~1~100~10~10~103•3 | |
52.7 | [1 (0\1) 4]10 | R2~1~100~10~10~104 | ε0+4 |
52.8 | [1 (0\1) 5]10 | R2~1~100~10~10~105 | ε0+5 |
52.9 | [1 (0\1) 7]10 | R2~1~100~10~10~107 | ε0+7 |
53.0 | [1 (0\1) 1,0]10 | R2~1~100~10~10~11 | ε0+ω |