Find the values of the 30th and 90th percentiles of the data. 129, 113, 200, 100, 105, 132, 100, 176, 146, 152
A. 30th percentile = 105; 90th percentile = 200
B. 30th percentile = 113; 90th percentile = 200
C. 30th percentile = 105; 90th percentile = 176
D. 30th percentile = 113; 90th percentile = 176

Note: I answered C and got it wrong.

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tasharasta tasharasta · Answer 1 · 2016-09-24T01:35:21+02:00

The answer to that question is letter B.

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YashBhattar YashBhattar · Answer 2 · 2022-05-26T20:38:58+02:00

The values of the 30th and 90th percentiles of the data is option (A) 30th percentile = 105; 90th percentile = 200

Each of the 100 equal groups into which a population can be divided according to the distribution of values of a particular variable

Given set of data = 129, 113, 200, 100, 105, 132, 100, 176, 146 and 152

Arrange them from low to high

100, 100, 105, 113, 129, 132, 146, 152, 176 and 200

Total number of values = 10

The 90th percentile is the value that beats the lower 90% of the data

There are 10 values therefore 90% of 10 is 9, Therefore 200 is the value that beats other 90% of the data

Therefore 90th percentile is 200

Similarly 30% of 10 is 3, so 105 is the 30th percentile of the data

Hence, The values of the 30th and 90th percentiles of the data is option (A) 30th percentile = 105; 90th percentile = 200

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