# What is the formula to predict a high probability of range 0~9, given by past results?

I'm very new and i'm below average for my math.

But there's this thing about a lucky draw game that bugs me to think of a probability.

Say the host of a party has already drawn several luck draw numbers for each 2 hours, such as below:
$$\begin{array}{c|c|c} \text{Time} & \text{1st Draw} & \text{2nd Draw} & \text{3rd Draw}\\ \hline \\08 AM & 1516 & 4865 & 9876 \\10 AM & 0513 & 7805 & 9843 \\12 PM & 1124 & 0350 & 8790 \\02 PM & 9802 & 7967 & 3210 \\04 PM & 8794 & 6350 & 7842 \\06 PM & ???? & ???? & ???? \end{array}$$

Now, at $06:00 PM$ I would like to find out the [????].

I wish to know from the range of [0~9], what will be the 4 digits highly probable number to appear.

It does not need to be sorted in any order.
e.g, if you think the result is $0531$, then it doesn't matter if its $0351$ or $5130$ or $3150$ or etc...

It does not need to be in any specific draws, meaning dont care if its [1st draw] or [3rd draw]...

All I need to know is the 4 high probability digits.