統(tǒng)計(jì)數(shù)據(jù) - 統(tǒng)計(jì)十分位數(shù)

2018-12-28 10:08 更新

將一系列數(shù)據(jù)或值的給定隨機(jī)分布劃分為十組相似頻率的系統(tǒng)被稱為十進(jìn)制。

$ {D_i = l + \\ frac {h} {f}(\\ frac {iN} {10} - c); i = 1,2,3 ...,9}

其中 -

  • $ {l} $ =十進(jìn)制組的下邊界。

  • $ {h} $ =十進(jìn)制組寬度。

  • $ {f} $ =十進(jìn)制組的頻率。

  • $ {N} $ =觀察總數(shù)。

  • $ {c} $ =累計(jì)頻率前十進(jìn)制組。

例子

問題陳述:

計(jì)算下表的分布的十分位數(shù):

fi Fi
[50-60] 8 8
[60-60] 10 18
[70-60] 16 34
[80-60] 14 48
[90-60] 10 58
[100-60] 5 63
[110-60] 2 65
? 65 ?

解決方案:

Calculation of First Decile

$ {\frac{65 \times 1}{10} = 6.5 \\[7pt] \, D_1= 50 + \frac{6.5 - 0}{8} \times 10 , \\[7pt] \, = 58.12}$

Calculation of Second Decile

$ {\frac{65 \times 2}{10} = 13 \\[7pt] \, D_2= 60 + \frac{13 - 8}{10} \times 10 , \\[7pt] \, = 65}$

Calculation of Third Decile

$ {\frac{65 \times 3}{10} = 19.5 \\[7pt] \, D_3= 70 + \frac{19.5 - 18}{16} \times 10 , \\[7pt] \, = 70.94}$

Calculation of Fourth Decile

$ {\frac{65 \times 4}{10} = 26 \\[7pt] \, D_4= 70 + \frac{26 - 18}{16} \times 10 , \\[7pt] \, = 75}$

Calculation of Fifth Decile

$ {\frac{65 \times 5}{10} = 32.5 \\[7pt] \, D_5= 70 + \frac{32.5 - 18}{16} \times 10 , \\[7pt] \, = 79.06}$

Calculation of Sixth Decile

$ {\frac{65 \times 6}{10} = 39 \\[7pt] \, D_6= 70 + \frac{39 - 34}{14} \times 10 , \\[7pt] \, = 83.57}$

Calculation of Seventh Decile

$ {\frac{65 \times 7}{10} = 45.5 \\[7pt] \, D_7= 80 + \frac{45.5 - 34}{14} \times 10 , \\[7pt] \, = 88.21}$

Calculation of Eighth Decile

$ {\frac{65 \times 8}{10} = 52 \\[7pt] \, D_8= 90 + \frac{52 - 48}{10} \times 10 , \\[7pt] \, = 94}$

Calculation of Nineth Decile

$ {\frac{65 \times 9}{10} = 58.5 \\[7pt] \, D_9= 100 + \frac{58.5 - 58}{5} \times 10 , \\[7pt] \, = 101}$
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