This chart shows the frequency of each lottery number based on selected specific number of draws. It helps players analyze number frequency trends and understand how often each number appears over time, detect frequency imbalances, and uncover potential patterns or biases that may influence lottery outcomes.
Number Frequency
The Number Frequency Statistics table below presents key metrics for analyzing the occurrence patterns of specific numbers. It covers 75 draws, from Jan. 14, 2026 to Mar. 29, 2026 .
It includes columns for Frequency, Expected Frequency, Last Draw Interval, and the Last Draw Date, which indicates the number of draws a ball appears regardless of their position, the number of draws since the ball last appeared, and the date the ball last appeared, respectively.
In Quebec Lotto :D, each position in the winning number can contain any digit from 1 to 6. That means there are 6 possible digits, all with equal probability. Because each digit has the same chance of appearing, the theoretical probability for each digit is 1/6 or 16.666666666667%. So if there are 600 digits from 75 draws with 8 digits, the expected frequency would roughly be ~100.
Although the actual numbers will not be perfectly equal because randomness naturally creates small fluctuations. However, over hundreds or thousands of draws, the distribution should gradually approach about 16.666666666667% per digit. If one digit consistently appears far more or far less than expected, it could suggest a statistical anomaly or possible bias.
Invalid input: array must contain exactly 10 values for digits 0–9.Number Frequency by Position
Not all positions behave the same. The Number Frequency by Position reveals how often each digit (1-6) appears in every draw position, helping uncover hidden patterns, frequency imbalances, and potential positional biases that may not be visible in overall results.
In every Number Frequency by Position, the expected frequency is 7.5 (10% of 75 draws) for each digit (0-9) in every position. Each position is independent, random, and can contain any digit from 0 to 9. That means there are 10% equally likely outcomes per position.
The current dataset may be too limited to establish a reliable conclusion. Variations in digit frequency can occur naturally in small samples, and the observed distribution may not reflect long-term behavior. Increasing the number of analyzed draws will provide a more accurate assessment.