The median in your example is quite easy as you are showing an odd number of total
No. of occurrences. By observation, the median in 2. Relative to the last 2 (the sixth value in the sequence) there are five values less than or equal [1,1,2,2,2] and five values greater than or equal [3,3,4,4,4].
This can be calculated from your summary data with a formula such as
No._of_occurences is the named range containing the array of your No. of occurrences [2,4,2,3].
A data set with an even number of datapoints does not have a median so any result from adding one datapoint (say 4) is suspect. The formula would return 6.5 in that case, with the half indicating an invalid result (there are two middle values). Though if taking a fairly conventional approach of averaging these two values, then the formula result can be interpreted as the mean of the sixth  and seventh  values – ie 2.5.
Individual values for your binned No. of occurrences multiplied by 100 and divided by the total No. of occurrences  would give the percentages each bin contributes to the total. A cumulative total of these gives the percentile for the upper limit of each bin. Taking say the lower 30th percentile, this arises in the second bin, hence in this case is 2. The lower 20th and the 50th percentile (median) are in the same bin so for them the answer is also 2.
This works because you chose one bin per data point value. Had these, as is more usual, been ranges (say 1-5, 6-10 etc) then the lower 20th and the 50th percentile may still have been in the same bin but would not necessarily have had the same value. However, to determine the value only the contents of that bin would require further examination to determine the exact value, rather than your entire dataset.