Respuesta :

barnuts

To solve this problem, we should remember that the percentile rank of a single value is the rank of that value in the series of data set when that data set is arranged in ascending order.

Therefore arranging the data set, gives the sequence:

5581, 5700, 5700, 5896, 5972, 5993, 6075, 6274, 6283, 6381

Since we are to find the 30th percentile (30 %) and there are a total of 10 values, therefore the 30th percentile is:

10 * 30% = 3

This means we look for the 3rd number in the ordered sequence.


Answer: 5700 is the 30th percentile of the series

boffeemadrid

Answer:

5700

Step-by-step explanation:

The given data set is :

6283, 5700, 6381, 6274, 5700, 5896, 5972, 6075, 5993, 5581

Arranging the given data in ascending order, we get

5581, 5700, 5700, 5896, 5972, 5993, 6075, 6274, 6283, 6381

The total number of the counts in the given data set is 10.

Now, the 30th percentile is given as:

[tex]30{\%}{\times}10=3[/tex]

Thus, if we see the third term in the above sequence, we have the 30th percentile that is 5700.

Hence, 5700 is the 30th percentile.

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