КЕНО Lottery
КЕНО Z-Score — Standardized Deviation
КЕНО: how much each number deviates from the expected value
Z-Score analysis Z-Score shows how much the observed frequency of each КЕНО lottery number deviates from the expected value in units of standard deviation. A positive Z-Score means the number appears more often than expected, a negative one means less often.
Z-Score analysis of 20 draws for КЕНО: numbers with the highest deviation — 72 (Z=3.61), 75 (Z=-2.58), 11 (Z=2.07).Frequency analysis →Pearson criterion →
Analysis based on 20 draws from to
1
Anomalies (|Z| > 3)
6
Deviations (|Z| > 2)
72
Hottest (Z=3.61)
75
Coldest (Z=-2.58)
Z-Score of all numbers
Standardized deviation of frequency from expected value
Added to generator 0 / 80
Selected 0
| Ball added | Ball | Z-Score | Frequency | Status |
|---|---|---|---|---|
Add | 3.61 | 12 | Anomaly | |
Add | 2.07 | 9 | Deviation | |
Add | 2.07 | 9 | Deviation | |
Add | 2.07 | 9 | Deviation | |
Add | 1.55 | 8 | Notable | |
Add | 1.55 | 8 | Notable | |
Add | 1.55 | 8 | Notable | |
Add | 1.55 | 8 | Notable | |
Add | 1.55 | 8 | Notable | |
Add | 1.55 | 8 | Notable | |
Add | 1.55 | 8 | Notable | |
Add | 1.03 | 7 | Normal | |
Add | 1.03 | 7 | Normal | |
Add | 1.03 | 7 | Normal | |
Add | 1.03 | 7 | Normal | |
Add | 1.03 | 7 | Normal | |
Add | 1.03 | 7 | Normal | |
Add | 1.03 | 7 | Normal | |
Add | 1.03 | 7 | Normal | |
Add | 1.03 | 7 | Normal | |
Add | 0.52 | 6 | Normal | |
Add | 0.52 | 6 | Normal | |
Add | 0.52 | 6 | Normal | |
Add | 0.52 | 6 | Normal | |
Add | 0.52 | 6 | Normal | |
Add | 0.52 | 6 | Normal | |
Add | 0.52 | 6 | Normal | |
Add | 0.52 | 6 | Normal | |
Add | 0.52 | 6 | Normal | |
Add | 0.52 | 6 | Normal | |
Add | 0 | 5 | Normal | |
Add | 0 | 5 | Normal | |
Add | 0 | 5 | Normal | |
Add | 0 | 5 | Normal | |
Add | 0 | 5 | Normal | |
Add | 0 | 5 | Normal | |
Add | 0 | 5 | Normal | |
Add | 0 | 5 | Normal | |
Add | 0 | 5 | Normal | |
Add | 0 | 5 | Normal | |
Add | 0 | 5 | Normal | |
Add | 0 | 5 | Normal | |
Add | 0 | 5 | Normal | |
Add | 0 | 5 | Normal | |
Add | 0 | 5 | Normal | |
Add | -0.52 | 4 | Normal | |
Add | -0.52 | 4 | Normal | |
Add | -0.52 | 4 | Normal | |
Add | -0.52 | 4 | Normal | |
Add | -0.52 | 4 | Normal | |
Add | -0.52 | 4 | Normal | |
Add | -0.52 | 4 | Normal | |
Add | -0.52 | 4 | Normal | |
Add | -0.52 | 4 | Normal | |
Add | -0.52 | 4 | Normal | |
Add | -0.52 | 4 | Normal | |
Add | -0.52 | 4 | Normal | |
Add | -0.52 | 4 | Normal | |
Add | -0.52 | 4 | Normal | |
Add | -1.03 | 3 | Normal | |
Add | -1.03 | 3 | Normal | |
Add | -1.03 | 3 | Normal | |
Add | -1.03 | 3 | Normal | |
Add | -1.03 | 3 | Normal | |
Add | -1.03 | 3 | Normal | |
Add | -1.03 | 3 | Normal | |
Add | -1.03 | 3 | Normal | |
Add | -1.03 | 3 | Normal | |
Add | -1.03 | 3 | Normal | |
Add | -1.03 | 3 | Normal | |
Add | -1.03 | 3 | Normal | |
Add | -1.03 | 3 | Normal | |
Add | -1.55 | 2 | Notable | |
Add | -1.55 | 2 | Notable | |
Add | -1.55 | 2 | Notable | |
Add | -1.55 | 2 | Notable | |
Add | -1.55 | 2 | Notable | |
Add | -2.07 | 1 | Deviation | |
Add | -2.07 | 1 | Deviation | |
Add | -2.58 | 0 | Deviation |
Z-Score Interpretation Scale
|Z| < 1.5 — Normal
|Z| 1.5–2 — Notable
|Z| 2–3 — Deviation
|Z| > 3 — Anomaly
Z-Score Combination Generator
Generate combinations from numbers with the greatest deviation
Selected numbers for generator
0
G on keyboard — generate combination
What is Z-Score?
Mathematical foundations of the method
Z-Score (standardized deviation) is a statistical measure showing how many standard deviations an observed value differs from the expected value.
Formula
Z = (f - E) / σ
- f — observed frequency of the number
- E = n × p — expected frequency (n — number of draws, p = take/totalBalls)
- σ = √(n × p × (1-p)) — standard deviation
Interpretation
In a fair lottery, the Z-Score of all numbers should approach 0 with a large number of draws. Values |Z| > 2 occur for ~5% of numbers, |Z| > 3 — for ~0.3%.