Yes winsumloosesum, it works with pick3 data by putting a 0 to the 4th position. We may wait for cotoneyedjoe input before using it for pick3.
Below is the analysis for 30 drawing of OKl. pick3:
Statistical analysis of Pick 3 data, May 03, 2019
Results of 30 drawings have been analyzed.
1st Digit Frequencies | 2nd Digit Frequencies | 3rd Digit Frequencies | 4th Digit Frequencies
| | |
Observed : Expected | Observed : Expected | Observed : Expected | Observed : Expected
8: 6 : 3.0 | 5: 7 : 3.0 | 2: 5 : 3.0 | 0: 30 : 3.0
9: 5 : 3.0 | 0: 5 : 3.0 | 5: 5 : 3.0 | 1: 0 : 3.0
5: 4 : 3.0 | 2: 5 : 3.0 | 3: 4 : 3.0 | 2: 0 : 3.0
7: 4 : 3.0 | 1: 4 : 3.0 | 1: 3 : 3.0 | 3: 0 : 3.0
1: 3 : 3.0 | 3: 2 : 3.0 | 6: 3 : 3.0 | 4: 0 : 3.0
2: 3 : 3.0 | 6: 2 : 3.0 | 7: 3 : 3.0 | 5: 0 : 3.0
0: 2 : 3.0 | 8: 2 : 3.0 | 8: 3 : 3.0 | 6: 0 : 3.0
3: 2 : 3.0 | 4: 1 : 3.0 | 9: 2 : 3.0 | 7: 0 : 3.0
6: 1 : 3.0 | 7: 1 : 3.0 | 0: 1 : 3.0 | 8: 0 : 3.0
4: 0 : 3.0 | 9: 1 : 3.0 | 4: 1 : 3.0 | 9: 0 : 3.0
chi^2 = 10.0000 chi^2 = 13.3333 chi^2 = 6.0000 chi^2 = 270.0000
p = 0.350485 p = 0.148094 p = 0.739918 p = 0.000000
Digit Frequencies in All Positions
Observed : Expected
0: 38 : 12.0
5: 16 : 12.0
2: 13 : 12.0
8: 11 : 12.0
1: 10 : 12.0
3: 8 : 12.0
7: 8 : 12.0
9: 8 : 12.0
6: 6 : 12.0
4: 2 : 12.0
chi^2 = 73.5000
p = 0.000000
Group F digits = [0, 5, 2, 8, 1], Group I digits = [3, 7, 9, 6, 4]
Observed : Expected
0F,4I : 0 : 1.88
1F,3I : 0 : 7.50
2F,2I : 10 : 11.25
3F,1I : 12 : 7.50
4F,0I : 8 : 1.88
chi^2 = 32.2222
p = 0.000002
Frequencies of Unordered Pairs in any positions. A homogeneous pair such as 11
occupying any two positions is expected to occur in 5.23% of drawings. A heterogeneous
pair such as 12 occupying any two positions is expected to occur in 9.74% of drawings.
Pair : Observed : Expected
00 : 8 : 1.57
05 : 13 : 2.92
02 : 11 : 2.92
08 : 11 : 2.92
01 : 9 : 2.92
03 : 8 : 2.92
07 : 8 : 2.92
09 : 7 : 2.92
06 : 6 : 2.92
35 : 6 : 2.92
55 : 3 : 1.57
12 : 4 : 2.92
18 : 4 : 2.92
28 : 4 : 2.92
22 : 2 : 1.57
15 : 3 : 2.92
27 : 3 : 2.92
57 : 3 : 2.92
59 : 3 : 2.92
68 : 3 : 2.92
04 : 2 : 2.92
13 : 2 : 2.92
29 : 2 : 2.92
37 : 2 : 2.92
39 : 2 : 2.92
56 : 2 : 2.92
58 : 2 : 2.92
67 : 2 : 2.92
78 : 2 : 2.92
11 : 1 : 1.57
99 : 1 : 1.57
16 : 1 : 2.92
17 : 1 : 2.92
19 : 1 : 2.92
23 : 1 : 2.92
24 : 1 : 2.92
26 : 1 : 2.92
34 : 1 : 2.92
38 : 1 : 2.92
45 : 1 : 2.92
69 : 1 : 2.92
79 : 1 : 2.92
89 : 1 : 2.92
14 : 0 : 2.92
25 : 0 : 2.92
33 : 0 : 1.57
36 : 0 : 2.92
44 : 0 : 1.57
46 : 0 : 2.92
47 : 0 : 2.92
48 : 0 : 2.92
49 : 0 : 2.92
66 : 0 : 1.57
77 : 0 : 1.57
88 : 0 : 1.57
Frequencies of Distinct/Repeated Digit Forms: Singles (ABCD), Doubles (AABC, BACA, etc.)
Double-Doubles (AABB, ABAB, etc.), Triples (AAAB, ABAA, etc.), Quadruples (AAAA)
Observed : Expected
Singles : 16 : 15.12
Doubles : 13 : 12.96
Double-Doubles : 1 : 0.81
Triples : 0 : 1.08
Quadruples : 0 : 0.03
chi^2 = 1.2059
p = 0.877125
Frequencies of Sums, Min = 0, Max = 36
Sum : Observed : Expected
0 : 0 : 0.00
1 : 0 : 0.01
2 : 0 : 0.03
3 : 1 : 0.06
4 : 1 : 0.10
5 : 0 : 0.17
6 : 0 : 0.25
7 : 1 : 0.36
8 : 0 : 0.49
9 : 4 : 0.66
10 : 2 : 0.85
11 : 3 : 1.04
12 : 0 : 1.25
13 : 2 : 1.44
14 : 1 : 1.62
15 : 5 : 1.78
16 : 2 : 1.90
17 : 2 : 1.98
18 : 4 : 2.01
19 : 0 : 1.98
20 : 0 : 1.90
21 : 1 : 1.78
22 : 0 : 1.62
23 : 1 : 1.44
24 : 0 : 1.25
25 : 0 : 1.04
26 : 0 : 0.85
27 : 0 : 0.66
28 : 0 : 0.49
29 : 0 : 0.36
30 : 0 : 0.25
31 : 0 : 0.17
32 : 0 : 0.10
33 : 0 : 0.06
34 : 0 : 0.03
35 : 0 : 0.01
36 : 0 : 0.00
chi^2 = 67.3754
p = 0.001173
Frequencies of Spreads: Difference between max digit and min digit. Min = 0, Max = 9
Spread : Observed : Expected
0 : 0 : 0.03
1 : 0 : 0.38
2 : 2 : 1.20
3 : 0 : 2.31
4 : 1 : 3.49
5 : 4 : 4.53
6 : 1 : 5.21
7 : 5 : 5.31
8 : 10 : 4.62
9 : 7 : 2.92
chi^2 = 20.4662
p = 0.015244
Frequencies of Root Sums: Repeatedly add the digits until
you reach a number between 0 and 9
R.Sum : Observed : Expected
0 : 0 : 0.00
1 : 2 : 3.33
2 : 3 : 3.33
3 : 2 : 3.33
4 : 3 : 3.33
5 : 2 : 3.33
6 : 5 : 3.33
7 : 3 : 3.33
8 : 2 : 3.33
9 : 8 : 3.33
chi^2 = 9.6040
p = 0.383487
Proportion of subsequent drawings that have at least one digit in common
with the prior drawing, in any postion
Theoretical expected proportion is 0.80449750.
Actual observed proportion is 1.00000000.
chi^2 = 7.0473
p = 0.007938
How Many Distinct Digits Appear in 3 Consecutive Drawings
How Many Distinct : Frequency
1 distinct: 0
2 distinct: 0
3 distinct: 0
4 distinct: 0
5 distinct: 3
6 distinct: 9
7 distinct: 7
8 distinct: 8
9 distinct: 1
10 distinct: 0
Average amount of distinct dgits in 3 consecutive drawings: 6.821
How Many Distinct Digits Appear in 4 Consecutive Drawings
How Many Distinct : Frequency
1 distinct: 0
2 distinct: 0
3 distinct: 0
4 distinct: 0
5 distinct: 0
6 distinct: 2
7 distinct: 10
8 distinct: 7
9 distinct: 7
10 distinct: 1
Average amount of distinct dgits in 4 consecutive drawings: 7.815