It is also very simple to think clearly about this problem. Just look at how many triple numbers there are in the whole data. If there are many triple serial numbers in the data, it is normal to open three consecutive serial numbers. If the probability is too low, it may be abnormal to open several issues in a row.
Let's look at this problem with the data of two-color ball. If we remove the blue ball, we will look at this problem with the data of the red ball. If the blue ball is added according to probability or proportion, just multiply the data by 16. We all know that the red ball of the two-color ball has a total of 1 107568 note data, which is more than one million note numbers. Let's look at the six consecutive numbers first. There are 28 serial numbers for data with a million notes or more, (0 1, 02, 03, 04, 05, 06) ... (28, 29, 30, 3 1, 32, 33) 28 notes, so the possibility of six consecutive numbers of two-color ball is/kloc-. The six-serial number may be a wonderful number in the lottery, and it is not as scary as we thought. Even if the red ball is really 0 1, 02, 03, 04, 05, 06, it is only one in a million. This is serial number 6,
If we look at quadruple numbers, there are about 10,000 quadruple numbers in the combination of more than one million, so the probability of quadruple numbers appearing is more than 1%, which can be said to be higher than all even numbers. If we look at the three consecutive numbers, we can put the three consecutive numbers in a combination of more than one million, which is about a combination of 1 1 million notes, which is about one tenth, which is higher than the probability of blue balls in our two-color ball. Because the probability of a blue ball in a two-color ball is 16, and the probability of a triple number is about one tenth, it is higher than that in a two-color ball. Many friends may sometimes win several blue balls in a row when betting, so even the serial numbers of several consecutive periods are normal, which can be said to be within the normal probability range, and there is nothing strange.
Finally, remind friends that it is best not to participate in the lucky draw … participation must be rational and not blind.