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Author

*The author of this computation has been verified*

R Software Module

rwasp_variability.wasp

Title produced by software

Variability

Date of computation

Mon, 04 Oct 2010 11:13:15 +0000

Cite this page as follows

Statistical Computations at FreeStatistics.org, Office for Research Development and Education, URL https://freestatistics.org/blog/index.php?v=date/2010/Oct/04/t1286191127cnpgxzf82w2575s.htm/, Retrieved Sat, 27 Apr 2024 21:47:31 +0000

Statistical Computations at FreeStatistics.org, Office for Research Development and Education, URL https://freestatistics.org/blog/index.php?pk=80504, Retrieved Sat, 27 Apr 2024 21:47:31 +0000

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Original text written by user:

IsPrivate?

No (this computation is public)

User-defined keywords

Estimated Impact

139

Family? (F = Feedback message, R = changed R code, M = changed R Module, P = changed Parameters, D = changed Data)

F     [Variability] [Variability of th...] [2010-09-25 09:46:38] [b98453cac15ba1066b407e146608df68]
F    D    [Variability] [vijfde opdracht] [2010-10-04 11:13:15] [8f110cf3e3846d42560df9b5835185a6] [Current]

Feedback Forum

2010-10-08 16:41:00 [347d11d64cf4ded9ba0714e7297d928b] [reply] 
Fout (0/2). 
Als je de berekening correct maakt 
68% [333-435, 333+435] 
95% [333-2*435, 333+2*435] 
99% [333-3*435, 333+3*435] 
dan zie je dat je negatieve waarde uitkomt, wat niet mogelijk is bij tijd. Hier kunnen we zeggen dat er geen logische oplossing is door de extreme waarden.
2010-10-09 16:38:45 [1047e32db976ffec0cf8e54ab6985f99] [reply] 
Je hebt 135 observaties in het geblogde resultaat in plaats van 139.  
Om het betrouwbaarheidsinterval te definiëren, verminderen en vermeerderen we het rekenkundig gemiddelde met de standaarddeviatie. Wanneer we dit hier doen komen we tot het betrouwbaarheidsinterval -100 tot 766 (33-433=-100 & 333+433=766). We merken dat we een negatieve tijdsuitkomst (-100) bekomen voor het invullen van een enquête en dat kan natuurlijk niet!  
2010-10-10 11:25:15 [73b763ab03a59f488b4c9e04fda397bb] [reply] 
Geen antwoord op de vraag. 
 
Het heeft geen nut, want: 
 
Door intervals te creëren op basis van Chebyshev's rule'' of the Emperical rule' kom je soms minwaarden uit. Hierdoor is het gebruik niet realistisch (door de aanwezigheid van uitschieters). 
 

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Summary of computational transaction
Raw Input	view raw input (R code)
Raw Output	view raw output of R engine
Computing time	1 seconds
R Server	'Gwilym Jenkins' @ 72.249.127.135

\begin{tabular}{lllllllll}
\hline
Summary of computational transaction \tabularnewline
Raw Input & view raw input (R code)  \tabularnewline
Raw Output & view raw output of R engine  \tabularnewline
Computing time & 1 seconds \tabularnewline
R Server & 'Gwilym Jenkins' @ 72.249.127.135 \tabularnewline
\hline
\end{tabular}
%Source: https://freestatistics.org/blog/index.php?pk=80504&T=0

[TABLE]
[ROW][C]Summary of computational transaction[/C][/ROW]
[ROW][C]Raw Input[/C][C]view raw input (R code) [/C][/ROW]
[ROW][C]Raw Output[/C][C]view raw output of R engine [/C][/ROW]
[ROW][C]Computing time[/C][C]1 seconds[/C][/ROW]
[ROW][C]R Server[/C][C]'Gwilym Jenkins' @ 72.249.127.135[/C][/ROW]
[/TABLE]
Source: https://freestatistics.org/blog/index.php?pk=80504&T=0

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=80504&T=0

As an alternative you can also use a QR Code:

The GUIDs for individual cells are displayed in the table below:

Summary of computational transaction
Raw Input	view raw input (R code)
Raw Output	view raw output of R engine
Computing time	1 seconds
R Server	'Gwilym Jenkins' @ 72.249.127.135

Variability - Ungrouped Data
Absolute range	1271.924
Relative range (unbiased)	6.73898503416188
Relative range (biased)	6.76408376176038
Variance (unbiased)	35623.2337363756
Variance (biased)	35359.3579309209
Standard Deviation (unbiased)	188.741181877129
Standard Deviation (biased)	188.040841124796
Coefficient of Variation (unbiased)	0.647446319467167
Coefficient of Variation (biased)	0.645043912965517
Mean Squared Error (MSE versus 0)	120341.134849793
Mean Squared Error (MSE versus Mean)	35359.3579309209
Mean Absolute Deviation from Mean (MAD Mean)	127.879802469136
Mean Absolute Deviation from Median (MAD Median)	117.808970370370
Median Absolute Deviation from Mean	91.7703407407407
Median Absolute Deviation from Median	60.353
Mean Squared Deviation from Mean	35359.3579309209
Mean Squared Deviation from Median	37894.0112652222
Interquartile Difference (Weighted Average at Xnp)	158.5745
Interquartile Difference (Weighted Average at X(n+1)p)	163.426
Interquartile Difference (Empirical Distribution Function)	163.426
Interquartile Difference (Empirical Distribution Function - Averaging)	163.426
Interquartile Difference (Empirical Distribution Function - Interpolation)	157.983
Interquartile Difference (Closest Observation)	156.79
Interquartile Difference (True Basic - Statistics Graphics Toolkit)	163.426
Interquartile Difference (MS Excel (old versions))	163.426
Semi Interquartile Difference (Weighted Average at Xnp)	79.28725
Semi Interquartile Difference (Weighted Average at X(n+1)p)	81.713
Semi Interquartile Difference (Empirical Distribution Function)	81.713
Semi Interquartile Difference (Empirical Distribution Function - Averaging)	81.713
Semi Interquartile Difference (Empirical Distribution Function - Interpolation)	78.9915
Semi Interquartile Difference (Closest Observation)	78.395
Semi Interquartile Difference (True Basic - Statistics Graphics Toolkit)	81.713
Semi Interquartile Difference (MS Excel (old versions))	81.713
Coefficient of Quartile Variation (Weighted Average at Xnp)	0.291004300619447
Coefficient of Quartile Variation (Weighted Average at X(n+1)p)	0.297125216354195
Coefficient of Quartile Variation (Empirical Distribution Function)	0.297125216354195
Coefficient of Quartile Variation (Empirical Distribution Function - Averaging)	0.297125216354195
Coefficient of Quartile Variation (Empirical Distribution Function - Interpolation)	0.287853638005142
Coefficient of Quartile Variation (Closest Observation)	0.288541520975804
Coefficient of Quartile Variation (True Basic - Statistics Graphics Toolkit)	0.297125216354195
Coefficient of Quartile Variation (MS Excel (old versions))	0.297125216354195
Number of all Pairs of Observations	9045
Squared Differences between all Pairs of Observations	71246.467472751
Mean Absolute Differences between all Pairs of Observations	182.009245992261
Gini Mean Difference	182.009245992261
Leik Measure of Dispersion	0.465371811465077
Index of Diversity	0.98951050629886
Index of Qualitative Variation	0.996894913062285
Coefficient of Dispersion	0.530245354827636
Observations	135

\begin{tabular}{lllllllll}
\hline
Variability - Ungrouped Data \tabularnewline
Absolute range & 1271.924 \tabularnewline
Relative range (unbiased) & 6.73898503416188 \tabularnewline
Relative range (biased) & 6.76408376176038 \tabularnewline
Variance (unbiased) & 35623.2337363756 \tabularnewline
Variance (biased) & 35359.3579309209 \tabularnewline
Standard Deviation (unbiased) & 188.741181877129 \tabularnewline
Standard Deviation (biased) & 188.040841124796 \tabularnewline
Coefficient of Variation (unbiased) & 0.647446319467167 \tabularnewline
Coefficient of Variation (biased) & 0.645043912965517 \tabularnewline
Mean Squared Error (MSE versus 0) & 120341.134849793 \tabularnewline
Mean Squared Error (MSE versus Mean) & 35359.3579309209 \tabularnewline
Mean Absolute Deviation from Mean (MAD Mean) & 127.879802469136 \tabularnewline
Mean Absolute Deviation from Median (MAD Median) & 117.808970370370 \tabularnewline
Median Absolute Deviation from Mean & 91.7703407407407 \tabularnewline
Median Absolute Deviation from Median & 60.353 \tabularnewline
Mean Squared Deviation from Mean & 35359.3579309209 \tabularnewline
Mean Squared Deviation from Median & 37894.0112652222 \tabularnewline
Interquartile Difference (Weighted Average at Xnp) & 158.5745 \tabularnewline
Interquartile Difference (Weighted Average at X(n+1)p) & 163.426 \tabularnewline
Interquartile Difference (Empirical Distribution Function) & 163.426 \tabularnewline
Interquartile Difference (Empirical Distribution Function - Averaging) & 163.426 \tabularnewline
Interquartile Difference (Empirical Distribution Function - Interpolation) & 157.983 \tabularnewline
Interquartile Difference (Closest Observation) & 156.79 \tabularnewline
Interquartile Difference (True Basic - Statistics Graphics Toolkit) & 163.426 \tabularnewline
Interquartile Difference (MS Excel (old versions)) & 163.426 \tabularnewline
Semi Interquartile Difference (Weighted Average at Xnp) & 79.28725 \tabularnewline
Semi Interquartile Difference (Weighted Average at X(n+1)p) & 81.713 \tabularnewline
Semi Interquartile Difference (Empirical Distribution Function) & 81.713 \tabularnewline
Semi Interquartile Difference (Empirical Distribution Function - Averaging) & 81.713 \tabularnewline
Semi Interquartile Difference (Empirical Distribution Function - Interpolation) & 78.9915 \tabularnewline
Semi Interquartile Difference (Closest Observation) & 78.395 \tabularnewline
Semi Interquartile Difference (True Basic - Statistics Graphics Toolkit) & 81.713 \tabularnewline
Semi Interquartile Difference (MS Excel (old versions)) & 81.713 \tabularnewline
Coefficient of Quartile Variation (Weighted Average at Xnp) & 0.291004300619447 \tabularnewline
Coefficient of Quartile Variation (Weighted Average at X(n+1)p) & 0.297125216354195 \tabularnewline
Coefficient of Quartile Variation (Empirical Distribution Function) & 0.297125216354195 \tabularnewline
Coefficient of Quartile Variation (Empirical Distribution Function - Averaging) & 0.297125216354195 \tabularnewline
Coefficient of Quartile Variation (Empirical Distribution Function - Interpolation) & 0.287853638005142 \tabularnewline
Coefficient of Quartile Variation (Closest Observation) & 0.288541520975804 \tabularnewline
Coefficient of Quartile Variation (True Basic - Statistics Graphics Toolkit) & 0.297125216354195 \tabularnewline
Coefficient of Quartile Variation (MS Excel (old versions)) & 0.297125216354195 \tabularnewline
Number of all Pairs of Observations & 9045 \tabularnewline
Squared Differences between all Pairs of Observations & 71246.467472751 \tabularnewline
Mean Absolute Differences between all Pairs of Observations & 182.009245992261 \tabularnewline
Gini Mean Difference & 182.009245992261 \tabularnewline
Leik Measure of Dispersion & 0.465371811465077 \tabularnewline
Index of Diversity & 0.98951050629886 \tabularnewline
Index of Qualitative Variation & 0.996894913062285 \tabularnewline
Coefficient of Dispersion & 0.530245354827636 \tabularnewline
Observations & 135 \tabularnewline
\hline
\end{tabular}
%Source: https://freestatistics.org/blog/index.php?pk=80504&T=1

[TABLE]
[ROW][C]Variability - Ungrouped Data[/C][/ROW]
[ROW][C]Absolute range[/C][C]1271.924[/C][/ROW]
[ROW][C]Relative range (unbiased)[/C][C]6.73898503416188[/C][/ROW]
[ROW][C]Relative range (biased)[/C][C]6.76408376176038[/C][/ROW]
[ROW][C]Variance (unbiased)[/C][C]35623.2337363756[/C][/ROW]
[ROW][C]Variance (biased)[/C][C]35359.3579309209[/C][/ROW]
[ROW][C]Standard Deviation (unbiased)[/C][C]188.741181877129[/C][/ROW]
[ROW][C]Standard Deviation (biased)[/C][C]188.040841124796[/C][/ROW]
[ROW][C]Coefficient of Variation (unbiased)[/C][C]0.647446319467167[/C][/ROW]
[ROW][C]Coefficient of Variation (biased)[/C][C]0.645043912965517[/C][/ROW]
[ROW][C]Mean Squared Error (MSE versus 0)[/C][C]120341.134849793[/C][/ROW]
[ROW][C]Mean Squared Error (MSE versus Mean)[/C][C]35359.3579309209[/C][/ROW]
[ROW][C]Mean Absolute Deviation from Mean (MAD Mean)[/C][C]127.879802469136[/C][/ROW]
[ROW][C]Mean Absolute Deviation from Median (MAD Median)[/C][C]117.808970370370[/C][/ROW]
[ROW][C]Median Absolute Deviation from Mean[/C][C]91.7703407407407[/C][/ROW]
[ROW][C]Median Absolute Deviation from Median[/C][C]60.353[/C][/ROW]
[ROW][C]Mean Squared Deviation from Mean[/C][C]35359.3579309209[/C][/ROW]
[ROW][C]Mean Squared Deviation from Median[/C][C]37894.0112652222[/C][/ROW]
[ROW][C]Interquartile Difference (Weighted Average at Xnp)[/C][C]158.5745[/C][/ROW]
[ROW][C]Interquartile Difference (Weighted Average at X(n+1)p)[/C][C]163.426[/C][/ROW]
[ROW][C]Interquartile Difference (Empirical Distribution Function)[/C][C]163.426[/C][/ROW]
[ROW][C]Interquartile Difference (Empirical Distribution Function - Averaging)[/C][C]163.426[/C][/ROW]
[ROW][C]Interquartile Difference (Empirical Distribution Function - Interpolation)[/C][C]157.983[/C][/ROW]
[ROW][C]Interquartile Difference (Closest Observation)[/C][C]156.79[/C][/ROW]
[ROW][C]Interquartile Difference (True Basic - Statistics Graphics Toolkit)[/C][C]163.426[/C][/ROW]
[ROW][C]Interquartile Difference (MS Excel (old versions))[/C][C]163.426[/C][/ROW]
[ROW][C]Semi Interquartile Difference (Weighted Average at Xnp)[/C][C]79.28725[/C][/ROW]
[ROW][C]Semi Interquartile Difference (Weighted Average at X(n+1)p)[/C][C]81.713[/C][/ROW]
[ROW][C]Semi Interquartile Difference (Empirical Distribution Function)[/C][C]81.713[/C][/ROW]
[ROW][C]Semi Interquartile Difference (Empirical Distribution Function - Averaging)[/C][C]81.713[/C][/ROW]
[ROW][C]Semi Interquartile Difference (Empirical Distribution Function - Interpolation)[/C][C]78.9915[/C][/ROW]
[ROW][C]Semi Interquartile Difference (Closest Observation)[/C][C]78.395[/C][/ROW]
[ROW][C]Semi Interquartile Difference (True Basic - Statistics Graphics Toolkit)[/C][C]81.713[/C][/ROW]
[ROW][C]Semi Interquartile Difference (MS Excel (old versions))[/C][C]81.713[/C][/ROW]
[ROW][C]Coefficient of Quartile Variation (Weighted Average at Xnp)[/C][C]0.291004300619447[/C][/ROW]
[ROW][C]Coefficient of Quartile Variation (Weighted Average at X(n+1)p)[/C][C]0.297125216354195[/C][/ROW]
[ROW][C]Coefficient of Quartile Variation (Empirical Distribution Function)[/C][C]0.297125216354195[/C][/ROW]
[ROW][C]Coefficient of Quartile Variation (Empirical Distribution Function - Averaging)[/C][C]0.297125216354195[/C][/ROW]
[ROW][C]Coefficient of Quartile Variation (Empirical Distribution Function - Interpolation)[/C][C]0.287853638005142[/C][/ROW]
[ROW][C]Coefficient of Quartile Variation (Closest Observation)[/C][C]0.288541520975804[/C][/ROW]
[ROW][C]Coefficient of Quartile Variation (True Basic - Statistics Graphics Toolkit)[/C][C]0.297125216354195[/C][/ROW]
[ROW][C]Coefficient of Quartile Variation (MS Excel (old versions))[/C][C]0.297125216354195[/C][/ROW]
[ROW][C]Number of all Pairs of Observations[/C][C]9045[/C][/ROW]
[ROW][C]Squared Differences between all Pairs of Observations[/C][C]71246.467472751[/C][/ROW]
[ROW][C]Mean Absolute Differences between all Pairs of Observations[/C][C]182.009245992261[/C][/ROW]
[ROW][C]Gini Mean Difference[/C][C]182.009245992261[/C][/ROW]
[ROW][C]Leik Measure of Dispersion[/C][C]0.465371811465077[/C][/ROW]
[ROW][C]Index of Diversity[/C][C]0.98951050629886[/C][/ROW]
[ROW][C]Index of Qualitative Variation[/C][C]0.996894913062285[/C][/ROW]
[ROW][C]Coefficient of Dispersion[/C][C]0.530245354827636[/C][/ROW]
[ROW][C]Observations[/C][C]135[/C][/ROW]
[/TABLE]
Source: https://freestatistics.org/blog/index.php?pk=80504&T=1

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=80504&T=1

As an alternative you can also use a QR Code:

The GUIDs for individual cells are displayed in the table below:

Variability - Ungrouped Data
Absolute range	1271.924
Relative range (unbiased)	6.73898503416188
Relative range (biased)	6.76408376176038
Variance (unbiased)	35623.2337363756
Variance (biased)	35359.3579309209
Standard Deviation (unbiased)	188.741181877129
Standard Deviation (biased)	188.040841124796
Coefficient of Variation (unbiased)	0.647446319467167
Coefficient of Variation (biased)	0.645043912965517
Mean Squared Error (MSE versus 0)	120341.134849793
Mean Squared Error (MSE versus Mean)	35359.3579309209
Mean Absolute Deviation from Mean (MAD Mean)	127.879802469136
Mean Absolute Deviation from Median (MAD Median)	117.808970370370
Median Absolute Deviation from Mean	91.7703407407407
Median Absolute Deviation from Median	60.353
Mean Squared Deviation from Mean	35359.3579309209
Mean Squared Deviation from Median	37894.0112652222
Interquartile Difference (Weighted Average at Xnp)	158.5745
Interquartile Difference (Weighted Average at X(n+1)p)	163.426
Interquartile Difference (Empirical Distribution Function)	163.426
Interquartile Difference (Empirical Distribution Function - Averaging)	163.426
Interquartile Difference (Empirical Distribution Function - Interpolation)	157.983
Interquartile Difference (Closest Observation)	156.79
Interquartile Difference (True Basic - Statistics Graphics Toolkit)	163.426
Interquartile Difference (MS Excel (old versions))	163.426
Semi Interquartile Difference (Weighted Average at Xnp)	79.28725
Semi Interquartile Difference (Weighted Average at X(n+1)p)	81.713
Semi Interquartile Difference (Empirical Distribution Function)	81.713
Semi Interquartile Difference (Empirical Distribution Function - Averaging)	81.713
Semi Interquartile Difference (Empirical Distribution Function - Interpolation)	78.9915
Semi Interquartile Difference (Closest Observation)	78.395
Semi Interquartile Difference (True Basic - Statistics Graphics Toolkit)	81.713
Semi Interquartile Difference (MS Excel (old versions))	81.713
Coefficient of Quartile Variation (Weighted Average at Xnp)	0.291004300619447
Coefficient of Quartile Variation (Weighted Average at X(n+1)p)	0.297125216354195
Coefficient of Quartile Variation (Empirical Distribution Function)	0.297125216354195
Coefficient of Quartile Variation (Empirical Distribution Function - Averaging)	0.297125216354195
Coefficient of Quartile Variation (Empirical Distribution Function - Interpolation)	0.287853638005142
Coefficient of Quartile Variation (Closest Observation)	0.288541520975804
Coefficient of Quartile Variation (True Basic - Statistics Graphics Toolkit)	0.297125216354195
Coefficient of Quartile Variation (MS Excel (old versions))	0.297125216354195
Number of all Pairs of Observations	9045
Squared Differences between all Pairs of Observations	71246.467472751
Mean Absolute Differences between all Pairs of Observations	182.009245992261
Gini Mean Difference	182.009245992261
Leik Measure of Dispersion	0.465371811465077
Index of Diversity	0.98951050629886
Index of Qualitative Variation	0.996894913062285
Coefficient of Dispersion	0.530245354827636
Observations	135

Parameters (Session):

Parameters (R input):

R code (references can be found in the software module):

num <- 50
res <- array(NA,dim=c(num,3))
q1 <- function(data,n,p,i,f) {
np <- n*p;
i <<- floor(np)
f <<- np - i
qvalue <- (1-f)*data[i] + f*data[i+1]
}
q2 <- function(data,n,p,i,f) {
np <- (n+1)*p
i <<- floor(np)
f <<- np - i
qvalue <- (1-f)*data[i] + f*data[i+1]
}
q3 <- function(data,n,p,i,f) {
np <- n*p
i <<- floor(np)
f <<- np - i
if (f==0) {
qvalue <- data[i]
} else {
qvalue <- data[i+1]
}
}
q4 <- function(data,n,p,i,f) {
np <- n*p
i <<- floor(np)
f <<- np - i
if (f==0) {
qvalue <- (data[i]+data[i+1])/2
} else {
qvalue <- data[i+1]
}
}
q5 <- function(data,n,p,i,f) {
np <- (n-1)*p
i <<- floor(np)
f <<- np - i
if (f==0) {
qvalue <- data[i+1]
} else {
qvalue <- data[i+1] + f*(data[i+2]-data[i+1])
}
}
q6 <- function(data,n,p,i,f) {
np <- n*p+0.5
i <<- floor(np)
f <<- np - i
qvalue <- data[i]
}
q7 <- function(data,n,p,i,f) {
np <- (n+1)*p
i <<- floor(np)
f <<- np - i
if (f==0) {
qvalue <- data[i]
} else {
qvalue <- f*data[i] + (1-f)*data[i+1]
}
}
q8 <- function(data,n,p,i,f) {
np <- (n+1)*p
i <<- floor(np)
f <<- np - i
if (f==0) {
qvalue <- data[i]
} else {
if (f == 0.5) {
qvalue <- (data[i]+data[i+1])/2
} else {
if (f < 0.5) {
qvalue <- data[i]
} else {
qvalue <- data[i+1]
}
}
}
}
iqd <- function(x,def) {
x <-sort(x[!is.na(x)])
n<-length(x)
if (def==1) {
qvalue1 <- q1(x,n,0.25,i,f)
qvalue3 <- q1(x,n,0.75,i,f)
}
if (def==2) {
qvalue1 <- q2(x,n,0.25,i,f)
qvalue3 <- q2(x,n,0.75,i,f)
}
if (def==3) {
qvalue1 <- q3(x,n,0.25,i,f)
qvalue3 <- q3(x,n,0.75,i,f)
}
if (def==4) {
qvalue1 <- q4(x,n,0.25,i,f)
qvalue3 <- q4(x,n,0.75,i,f)
}
if (def==5) {
qvalue1 <- q5(x,n,0.25,i,f)
qvalue3 <- q5(x,n,0.75,i,f)
}
if (def==6) {
qvalue1 <- q6(x,n,0.25,i,f)
qvalue3 <- q6(x,n,0.75,i,f)
}
if (def==7) {
qvalue1 <- q7(x,n,0.25,i,f)
qvalue3 <- q7(x,n,0.75,i,f)
}
if (def==8) {
qvalue1 <- q8(x,n,0.25,i,f)
qvalue3 <- q8(x,n,0.75,i,f)
}
iqdiff <- qvalue3 - qvalue1
return(c(iqdiff,iqdiff/2,iqdiff/(qvalue3 + qvalue1)))
}
range <- max(x) - min(x)
lx <- length(x)
biasf <- (lx-1)/lx
varx <- var(x)
bvarx <- varx*biasf
sdx <- sqrt(varx)
mx <- mean(x)
bsdx <- sqrt(bvarx)
x2 <- x*x
mse0 <- sum(x2)/lx
xmm <- x-mx
xmm2 <- xmm*xmm
msem <- sum(xmm2)/lx
axmm <- abs(x - mx)
medx <- median(x)
axmmed <- abs(x - medx)
xmmed <- x - medx
xmmed2 <- xmmed*xmmed
msemed <- sum(xmmed2)/lx
qarr <- array(NA,dim=c(8,3))
for (j in 1:8) {
qarr[j,] <- iqd(x,j)
}
sdpo <- 0
adpo <- 0
for (i in 1:(lx-1)) {
for (j in (i+1):lx) {
ldi <- x[i]-x[j]
aldi <- abs(ldi)
sdpo = sdpo + ldi * ldi
adpo = adpo + aldi
}
}
denom <- (lx*(lx-1)/2)
sdpo = sdpo / denom
adpo = adpo / denom
gmd <- 0
for (i in 1:lx) {
for (j in 1:lx) {
ldi <- abs(x[i]-x[j])
gmd = gmd + ldi
}
}
gmd <- gmd / (lx*(lx-1))
sumx <- sum(x)
pk <- x / sumx
ck <- cumsum(pk)
dk <- array(NA,dim=lx)
for (i in 1:lx) {
if (ck[i] <= 0.5) dk[i] <- ck[i] else dk[i] <- 1 - ck[i]
}
bigd <- sum(dk) * 2 / (lx-1)
iod <- 1 - sum(pk*pk)
res[1,] <- c('Absolute range','absolute.htm', range)
res[2,] <- c('Relative range (unbiased)','relative.htm', range/sd(x))
res[3,] <- c('Relative range (biased)','relative.htm', range/sqrt(varx*biasf))
res[4,] <- c('Variance (unbiased)','unbiased.htm', varx)
res[5,] <- c('Variance (biased)','biased.htm', bvarx)
res[6,] <- c('Standard Deviation (unbiased)','unbiased1.htm', sdx)
res[7,] <- c('Standard Deviation (biased)','biased1.htm', bsdx)
res[8,] <- c('Coefficient of Variation (unbiased)','variation.htm', sdx/mx)
res[9,] <- c('Coefficient of Variation (biased)','variation.htm', bsdx/mx)
res[10,] <- c('Mean Squared Error (MSE versus 0)','mse.htm', mse0)
res[11,] <- c('Mean Squared Error (MSE versus Mean)','mse.htm', msem)
res[12,] <- c('Mean Absolute Deviation from Mean (MAD Mean)', 'mean2.htm', sum(axmm)/lx)
res[13,] <- c('Mean Absolute Deviation from Median (MAD Median)', 'median1.htm', sum(axmmed)/lx)
res[14,] <- c('Median Absolute Deviation from Mean', 'mean3.htm', median(axmm))
res[15,] <- c('Median Absolute Deviation from Median', 'median2.htm', median(axmmed))
res[16,] <- c('Mean Squared Deviation from Mean', 'mean1.htm', msem)
res[17,] <- c('Mean Squared Deviation from Median', 'median.htm', msemed)
load(file='createtable')
mylink1 <- hyperlink('difference.htm','Interquartile Difference','')
mylink2 <- paste(mylink1,hyperlink('method_1.htm','(Weighted Average at Xnp)',''),sep=' ')
res[18,] <- c('', mylink2, qarr[1,1])
mylink2 <- paste(mylink1,hyperlink('method_2.htm','(Weighted Average at X(n+1)p)',''),sep=' ')
res[19,] <- c('', mylink2, qarr[2,1])
mylink2 <- paste(mylink1,hyperlink('method_3.htm','(Empirical Distribution Function)',''),sep=' ')
res[20,] <- c('', mylink2, qarr[3,1])
mylink2 <- paste(mylink1,hyperlink('method_4.htm','(Empirical Distribution Function - Averaging)',''),sep=' ')
res[21,] <- c('', mylink2, qarr[4,1])
mylink2 <- paste(mylink1,hyperlink('method_5.htm','(Empirical Distribution Function - Interpolation)',''),sep=' ')
res[22,] <- c('', mylink2, qarr[5,1])
mylink2 <- paste(mylink1,hyperlink('method_6.htm','(Closest Observation)',''),sep=' ')
res[23,] <- c('', mylink2, qarr[6,1])
mylink2 <- paste(mylink1,hyperlink('method_7.htm','(True Basic - Statistics Graphics Toolkit)',''),sep=' ')
res[24,] <- c('', mylink2, qarr[7,1])
mylink2 <- paste(mylink1,hyperlink('method_8.htm','(MS Excel (old versions))',''),sep=' ')
res[25,] <- c('', mylink2, qarr[8,1])
mylink1 <- hyperlink('deviation.htm','Semi Interquartile Difference','')
mylink2 <- paste(mylink1,hyperlink('method_1.htm','(Weighted Average at Xnp)',''),sep=' ')
res[26,] <- c('', mylink2, qarr[1,2])
mylink2 <- paste(mylink1,hyperlink('method_2.htm','(Weighted Average at X(n+1)p)',''),sep=' ')
res[27,] <- c('', mylink2, qarr[2,2])
mylink2 <- paste(mylink1,hyperlink('method_3.htm','(Empirical Distribution Function)',''),sep=' ')
res[28,] <- c('', mylink2, qarr[3,2])
mylink2 <- paste(mylink1,hyperlink('method_4.htm','(Empirical Distribution Function - Averaging)',''),sep=' ')
res[29,] <- c('', mylink2, qarr[4,2])
mylink2 <- paste(mylink1,hyperlink('method_5.htm','(Empirical Distribution Function - Interpolation)',''),sep=' ')
res[30,] <- c('', mylink2, qarr[5,2])
mylink2 <- paste(mylink1,hyperlink('method_6.htm','(Closest Observation)',''),sep=' ')
res[31,] <- c('', mylink2, qarr[6,2])
mylink2 <- paste(mylink1,hyperlink('method_7.htm','(True Basic - Statistics Graphics Toolkit)',''),sep=' ')
res[32,] <- c('', mylink2, qarr[7,2])
mylink2 <- paste(mylink1,hyperlink('method_8.htm','(MS Excel (old versions))',''),sep=' ')
res[33,] <- c('', mylink2, qarr[8,2])
mylink1 <- hyperlink('variation1.htm','Coefficient of Quartile Variation','')
mylink2 <- paste(mylink1,hyperlink('method_1.htm','(Weighted Average at Xnp)',''),sep=' ')
res[34,] <- c('', mylink2, qarr[1,3])
mylink2 <- paste(mylink1,hyperlink('method_2.htm','(Weighted Average at X(n+1)p)',''),sep=' ')
res[35,] <- c('', mylink2, qarr[2,3])
mylink2 <- paste(mylink1,hyperlink('method_3.htm','(Empirical Distribution Function)',''),sep=' ')
res[36,] <- c('', mylink2, qarr[3,3])
mylink2 <- paste(mylink1,hyperlink('method_4.htm','(Empirical Distribution Function - Averaging)',''),sep=' ')
res[37,] <- c('', mylink2, qarr[4,3])
mylink2 <- paste(mylink1,hyperlink('method_5.htm','(Empirical Distribution Function - Interpolation)',''),sep=' ')
res[38,] <- c('', mylink2, qarr[5,3])
mylink2 <- paste(mylink1,hyperlink('method_6.htm','(Closest Observation)',''),sep=' ')
res[39,] <- c('', mylink2, qarr[6,3])
mylink2 <- paste(mylink1,hyperlink('method_7.htm','(True Basic - Statistics Graphics Toolkit)',''),sep=' ')
res[40,] <- c('', mylink2, qarr[7,3])
mylink2 <- paste(mylink1,hyperlink('method_8.htm','(MS Excel (old versions))',''),sep=' ')
res[41,] <- c('', mylink2, qarr[8,3])
res[42,] <- c('Number of all Pairs of Observations', 'pair_numbers.htm', lx*(lx-1)/2)
res[43,] <- c('Squared Differences between all Pairs of Observations', 'squared_differences.htm', sdpo)
res[44,] <- c('Mean Absolute Differences between all Pairs of Observations', 'mean_abs_differences.htm', adpo)
res[45,] <- c('Gini Mean Difference', 'gini_mean_difference.htm', gmd)
res[46,] <- c('Leik Measure of Dispersion', 'leiks_d.htm', bigd)
res[47,] <- c('Index of Diversity', 'diversity.htm', iod)
res[48,] <- c('Index of Qualitative Variation', 'qualitative_variation.htm', iod*lx/(lx-1))
res[49,] <- c('Coefficient of Dispersion', 'dispersion.htm', sum(axmm)/lx/medx)
res[50,] <- c('Observations', '', lx)
res
a<-table.start()
a<-table.row.start(a)
a<-table.element(a,'Variability - Ungrouped Data',2,TRUE)
a<-table.row.end(a)
for (i in 1:num) {
a<-table.row.start(a)
if (res[i,1] != '') {
a<-table.element(a,hyperlink(res[i,2],res[i,1],''),header=TRUE)
} else {
a<-table.element(a,res[i,2],header=TRUE)
}
a<-table.element(a,res[i,3])
a<-table.row.end(a)
}
a<-table.end(a)
table.save(a,file='mytable.tab')

Free Statistics

Description of Statistical Computation

Tree of Dependent Computations

Dataset

Tables (Output of Computation)

Figures (Output of Computation)

Input Parameters & R Code