Mega Millions | Results for May 26 | 12 20 37 41 64 (rollover!)
Lucky Clover
Statistics for Lotomania
Statistics of real draws
Lotomania (until the draw 2474 on May 29, 2023)

Quantity of prime numbers

Occurrences of prime numbers in draws

Quantity of prime numbers drawn
Actual frequency
Expected frequency
0
3
3
1
33
33
2
140
132
3
292
315
4
474
499
5
553
559
6
481
458
7
270
280
8
173
130
9
40
46
10
10
12
11
5
2
12
0
13
0
14
0
15
0
16
0
17
0
18
0
19
0
20
0
Quantity
of prime nos. drawn
Actual
occurrences
Expected
occurrences
Last
draw
Shortest
interval
Longest
interval
Current
interval
Average
interval
0
3
3
1596
138
1003
878
532.00
1
33
33
2308
5
307
166
69.94
2
140
132
2468
1
105
6
17.63
3
292
315
2461
1
40
13
8.43
4
474
499
2452
1
37
22
5.17
5
553
559
2474
1
22
0
4.47
6
481
458
2466
1
31
8
5.13
7
270
280
2457
1
43
17
9.10
8
173
130
2469
1
87
5
14.27
9
40
46
2473
2
212
1
61.83
10
10
12
2001
3
732
473
200.10
11
5
2
2383
17
1238
91
476.60
12
0
0.00
13
0
0.00
14
0
0.00
15
0
0.00
16
0
0.00
17
0
0.00
18
0
0.00
19
0
0.00
20
0
0.00
  • The table shows data on the occurrences of prime numbers on draws, considering all draws of lotomania (with the current matrix).
  • Actual occurrences are the real total occurrences of a determined quantity of prime numbers on draws.
  • Expected occurrences are the expected occurrences of a determined quantity of prime numbers on draws, according to mathematical probability.
  • Last draw is the most recent draw in which occurred a determined quantity of prime numbers.
  • Shortest interval is the shortest gap between draws in which occurred a determined quantity of prime numbers.
  • Longest interval is the longest gap between draws in which occurred a determined quantity of prime numbers.
  • Current interval is the current interval since the last draw in which occurred a determined quantity of prime numbers.
  • Average interval is the general average of intervals between draws in which occurred a determined quantity of prime numbers (until the last draw in which occurred a determined quantity of prime numbers).
  • The actual and expected occurrences tend to get closer to each other the largest the sample.