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Description of Statistical Computation

Author's title

Author*Unverified author*
R Software Modulerwasp_centraltendency.wasp
Title produced by softwareCentral Tendency
Date of computationMon, 22 Oct 2007 12:20:42 -0700
Cite this page as followsStatistical Computations at FreeStatistics.org, Office for Research Development and Education, URL https://freestatistics.org/blog/index.php?v=date/2007/Oct/22/ws77qfemhby89ts1193080567.htm/, Retrieved Mon, 06 May 2024 08:11:23 +0000
Statistical Computations at FreeStatistics.org, Office for Research Development and Education, URL https://freestatistics.org/blog/index.php?pk=1627, Retrieved Mon, 06 May 2024 08:11:23 +0000
QR Codes:

Original text written by user:
IsPrivate?No (this computation is public)
User-defined keywordsQ6
Estimated Impact439

Tree of Dependent Computations

Family? (F = Feedback message, R = changed R code, M = changed R Module, P = changed Parameters, D = changed Data)
F       [Central Tendency] [Q6 Distributions] [2007-10-22 19:20:42] [1a83104d28786df2e24859e2e02dc234] [Current]
-    D    [Central Tendency] [Q6] [2008-10-23 10:46:45] [adb6b6905cde49db36d59ca44433140d]
F    D    [Central Tendency] [Q6] [2008-10-23 11:01:53] [cb714085b233acee8e8acd879ea442b6]
F    D    [Central Tendency] [Q6] [2008-10-23 11:15:50] [28075c6928548bea087cb2be962cfe7e]
F   P       [Central Tendency] [q6 central tendency] [2008-10-23 12:36:56] [7173087adebe3e3a714c80ea2417b3eb]
-   P         [Central Tendency] [Q6 Central Tendency] [2008-10-24 14:09:17] [7d3039e6253bb5fb3b26df1537d500b4]
F   P         [Central Tendency] [q6] [2008-10-27 10:35:54] [e43247bc0ab243a5af99ac7f55ba0b41]
-   P         [Central Tendency] [Q6 central tendency] [2008-10-27 19:48:51] [c993f605b206b366f754f7f8c1fcc291]
-               [Central Tendency] [Q6 central tendency] [2008-11-02 13:16:52] [c993f605b206b366f754f7f8c1fcc291]
F           [Central Tendency] [] [2008-10-27 17:28:56] [29747f79f5beb5b2516e1271770ecb47]
F           [Central Tendency] [] [2008-10-27 17:30:01] [af90f76a5211a482a7c35f2c76d2fd61]
F           [Central Tendency] [Investigation Dis...] [2008-10-27 19:51:22] [79c17183721a40a589db5f9f561947d8]
F RMPD      [Maximum-likelihood Fitting - Weibull Distribution] [Investigation Dis...] [2008-10-27 20:09:55] [79c17183721a40a589db5f9f561947d8]
F RM D      [Box-Cox Normality Plot] [Investigation Dis...] [2008-10-27 20:20:18] [79c17183721a40a589db5f9f561947d8]
-           [Central Tendency] [investigating dis...] [2008-10-27 20:38:53] [4ad596f10399a71ad29b7d76e6ab90ac]
F RMPD      [Univariate Explorative Data Analysis] [Investigation Dis...] [2008-10-27 20:38:46] [79c17183721a40a589db5f9f561947d8]
-   PD        [Univariate Explorative Data Analysis] [Q7] [2008-10-31 16:10:18] [57850c80fd59ccfb28f882be994e814e]
-   PD        [Univariate Explorative Data Analysis] [verbetering] [2008-11-02 20:06:37] [79c17183721a40a589db5f9f561947d8]
-           [Central Tendency] [Q6 reproductie] [2008-10-29 19:29:49] [ed2ba3b6182103c15c0ab511ae4e6284]
-    D    [Central Tendency] [Q6:Mean] [2008-10-23 11:37:05] [1ce0d16c8f4225c977b42c8fa93bc163]
- RM D      [Box-Cox Normality Plot] [Task 2] [2008-10-27 17:40:42] [1ce0d16c8f4225c977b42c8fa93bc163]
- RM D      [Maximum-likelihood Fitting - Cauchy Distribution] [Maximum likelihood] [2008-10-27 18:14:53] [1ce0d16c8f4225c977b42c8fa93bc163]
F RMPD        [Maximum-likelihood Fitting - Normal Distribution] [Maximum likelihoo...] [2008-11-11 15:34:06] [1ce0d16c8f4225c977b42c8fa93bc163]
-    D    [Central Tendency] [vraag 1: Q6 Distr...] [2008-10-23 11:56:25] [82d201ca7b4e7cd2c6f885d29b5b6937]
F    D    [Central Tendency] [Q6: The mean of t...] [2008-10-23 13:34:51] [1e1d8320a8a1170c475bf6e4ce119de6]
-           [Central Tendency] [Q6: The mean of t...] [2008-10-27 19:14:59] [988ab43f527fc78aae41c84649095267]
F    D    [Central Tendency] [The mean of the e...] [2008-10-24 14:02:30] [1376d48f59a7212e8dd85a587491a69b]
F    D    [Central Tendency] [Investigating Dis...] [2008-10-24 14:50:37] [fa7d70f0863e7dbd5409d4f96a84a75c]
F           [Central Tendency] [Q6] [2008-10-26 08:39:24] [87cabf13a90315c7085b765dcebb7412]
F             [Central Tendency] [Q6] [2008-10-27 21:32:07] [d2d412c7f4d35ffbf5ee5ee89db327d4]
- R         [Central Tendency] [verbetering centr...] [2008-11-03 18:56:52] [85134b6edb9973b9193450dd2306c65b]
F    D    [Central Tendency] [Central tendency ...] [2008-10-24 15:18:42] [495cd80c1a9baafb03c09cd9ab8d8fb5]
-           [Central Tendency] [central tendency ...] [2008-10-27 21:49:43] [74be16979710d4c4e7c6647856088456]
F    D    [Central Tendency] [q6 INV DISTR] [2008-10-24 16:19:37] [8545382734d98368249ce527c6558129]
F    D    [Central Tendency] [Investigating Dis...] [2008-10-24 17:17:00] [a57f5cc542637534b8bb5bcb4d37eab1]
F    D    [Central Tendency] [Investigating dis...] [2008-10-25 12:01:16] [2d4aec5ed1856c4828162be37be304d9]
- R         [Central Tendency] [Feedback Q6] [2008-11-03 21:18:31] [d32f94eec6fe2d8c421bd223368a5ced]
F    D    [Central Tendency] [Investigating Dis...] [2008-10-25 12:53:46] [6743688719638b0cb1c0a6e0bf433315]
-    D    [Central Tendency] [Q6 Error Component] [2008-10-25 12:52:51] [f9b9e85820b2a54b20380c3265aca831]
F    D    [Central Tendency] [Q6] [2008-10-25 13:05:52] [b187fac1a1b0cb3920f54366df47fea3]
F    D    [Central Tendency] [Investigating Dis...] [2008-10-25 20:23:13] [b82ef11dce0545f3fd4676ec3ebed828]
-    D    [Central Tendency] [Investigating dis...] [2008-10-25 22:50:12] [d32f94eec6fe2d8c421bd223368a5ced]
-    D      [Central Tendency] [] [2008-11-03 14:06:53] [888addc516c3b812dd7be4bd54caa358]
-           [Central Tendency] [] [2008-11-03 15:03:51] [888addc516c3b812dd7be4bd54caa358]
F    D    [Central Tendency] [Q6: the mean of t...] [2008-10-26 12:12:43] [4396f984ebeab43316cd6baa88a4fd40]
F    D    [Central Tendency] [Investigating Dis...] [2008-10-26 12:52:49] [33f4701c7363e8b81858dafbf0350eed]
-    D    [Central Tendency] [Investigating dis...] [2008-10-26 14:22:39] [b943bd7078334192ff8343563ee31113]
F    D    [Central Tendency] [q6 ct] [2008-10-26 14:57:53] [44a98561a4b3e6ab8cd5a857b48b0914]
-    D    [Central Tendency] [Investigating dis...] [2008-10-26 15:10:29] [b943bd7078334192ff8343563ee31113]

[Truncated]
Feedback Forum
2008-10-30 13:53:03 [Christy Masson] [reply
in de les hebben we gezien dat ook hier de x vervangen moet worden in x <- x-gevonden gemiddelde
2008-10-31 16:30:53 [Bob Leysen] [reply
Het antwoord is correct. De twee grafieken van central tendency blijven binnen de 2 lijnen van het betrouwbaarheidsinterval. Het is dus een zeer robuust resultaat zelfs als we rekening houden met de outliers. We kunnen ook de R-code aanpassen en de volgende lijn invoegen: x <-x-0,8621000904
2008-11-01 12:45:53 [2df1bcd103d52957f4a39bd4617794c8] [reply
We bekijken de central tendency met de random component.

Het gemiddelde ligt dicht bij nul en we blijven binnen het betrouwbaarheidsinterval, maw er is sprake van een uiterst robuust resultaat.

We konden ook de r-code aanpassen om zo tot dezelfde conclusie te komen.
2008-11-02 14:37:32 [Evelyn Ongena] [reply
De grafieken vallen duidelijk binnen het betrouwbaarheidsinterval, enkel nog de R code aanpassen.
2008-11-02 17:37:11 [Bernard Femont] [reply
Op juiste manier tot resultaten gekomen zoals reeds gezegd konden we dit resultaat ook bekomen door het veranderen van de R code bij de verkregen output en: x <-x-0,8621000904 invoeren
2008-11-02 21:56:16 [Bernard Femont] [reply
Deze waarde is inderdaad niet gelijk aan 0, maar is er wel heel dichtbij met namelijk 0,86. Dus kunnen we stellen dat het resultaat zo goed als robuust is en zodoende en daardoor niet gevoelig is aan outliers = correcte benadering van de vraagstelling.
2008-11-02 21:56:34 [Bernard Femont] [reply
Deze waarde is inderdaad niet gelijk aan 0, maar is er wel heel dichtbij met namelijk 0,86. Dus kunnen we stellen dat het resultaat zo goed als robuust is en zodoende en daardoor niet gevoelig is aan outliers = correcte benadering van de vraagstelling.
2008-11-03 07:59:20 [Thomas Baken] [reply
De studente heeft de vraag juist opgelost, we kunnen bemerken dat het resultaat robuust is en bijgevolg niet gevoelig aan outliers.
2008-11-03 10:32:18 [Jens Peeters] [reply
Het resultaat is inderdaad vrij robuust en niet gevoelig aan outliers.
2008-11-03 11:08:52 [Astrid Sniekers] [reply
De student heeft de oefening niet correct uitgevoerd. Hieronder vindt u hoe het wel moet.

4. Kopieer het gemiddelde van de oorspronkelijke datareeks
5. Central tendency
6. Voeg in de R-code volgende lijn toe: x <- x - 0.86210009042623

http://www.freestatistics.org/blog/date/2008/Nov/03/t1225707290pyy8qhbkhx639xl.htm

Het gemidddelde van de error component ligt heel dicht bij nul, namelijk 0.0114291533021248 (tweede kolom, arithmetic mean). We kunnen besluiten dat dit een heel robuust resultaat is en dus ongevoelig aan outliers.


De student zijn besluit is wel correct.
2008-11-03 17:41:00 [Mehmet Yilmaz] [reply
De conclusies van de student zijn correct. Resultaat is robuust (niet gevoelig aan outliers).
2008-11-03 20:19:39 [Chi-Kwong Man] [reply
In de les hebben we deze manier ook gezien: R-code aanpassen: x <- x-gevonden gemiddelde. Daarna kijkt men naar de grafiek. Kijk of de lijn buiten het betrouwbaarheidsinterval ligt --> We voldoen aan de voorwaarde, dus resultaat is robuust.
2008-11-03 23:07:16 [Martjin De Swert] [reply
De waarde is niet gelijk aan 0 maar benaderd deze wel. Hieruit volgt dan ook dat het resultaat robuust is en zodoende niet gevoelig is aan outliers.

Student heeft dus de correcte conclusies getrokken.

Post a new message

Dataset

Dataseries X:
Download CSV
Histogram
Boxplots 
0,989130435
0,919087137
0,925417076
0,925612053
1,066666667
0,851108765
1,030693069
0,989031079
0,913000978
0,792723264
0,978170478
0,987513007
0,909433962
0,883608147
0,82745098
0,8252149
1,023255814
0,815418024
1,026192703
0,914742451
0,807276303
0,739130435
0,98973306
0,972164948
0,853889943
0,856864654
0,775739042
0,789473684
0,931350114
0,73971079
0,885245902
0,842435094
0,818458418
0,72755418
0,923238696
0,922680412
0,883762201
0,818270165
0,771047228
0,825852783
0,924485126
0,755165289
0,874671341
0,815956482
0,799807507
0,712598425
0,832980973
0,910323253
0,869149952
0,779182879
0,750254842
0,75856014
0,920889988
0,743991641
0,816254417
0,769593957
0,784007353
0,683284457
0,850505051
0,900695134
0,868398268

Tables (Output of Computation)





Summary of compuational transaction
Raw Inputview raw input (R code)
Raw Outputview raw output of R engine
Computing time1 seconds
R Server'Gwilym Jenkins' @ 72.249.127.135

\begin{tabular}{lllllllll}
\hline
Summary of compuational 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=1627&T=0

[TABLE]
[ROW][C]Summary of compuational 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=1627&T=0

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=1627&T=0

As an alternative you can also use a QR Code:  
QR Code


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

Summary of compuational transaction
Raw Inputview raw input (R code)
Raw Outputview raw output of R engine
Computing time1 seconds
R Server'Gwilym Jenkins' @ 72.249.127.135






Central Tendency - Ungrouped Data
MeasureValueS.E.Value/S.E.
Arithmetic Mean0.862100090426230.011429153302124875.4299174783102
Geometric Mean0.85758493742067
Harmonic Mean0.85310519291296
Quadratic Mean0.866633774223646
Winsorized Mean ( 1 / 20 )0.8619909161639350.011150248027888677.3068826817087
Winsorized Mean ( 2 / 20 )0.8623337158032790.011008532280137678.3332140796974
Winsorized Mean ( 3 / 20 )0.8627586026557380.010860709136414579.4385147248835
Winsorized Mean ( 4 / 20 )0.8605984453442620.010353197825005283.1239255629536
Winsorized Mean ( 5 / 20 )0.8608999392786880.010275512598969683.7817024685482
Winsorized Mean ( 6 / 20 )0.8615062191147540.010158831767616784.8036702272184
Winsorized Mean ( 7 / 20 )0.861895508049180.010020962868583486.00925074289
Winsorized Mean ( 8 / 20 )0.8611154847049180.0096907756478412788.859294239955
Winsorized Mean ( 9 / 20 )0.8618573631147540.0092340469501540293.3347391200322
Winsorized Mean ( 10 / 20 )0.8554046478688520.00798724816389706107.096290276211
Winsorized Mean ( 11 / 20 )0.855215980377050.00767868173199379111.375364968407
Winsorized Mean ( 12 / 20 )0.855855100377050.00755708675194955113.251988295127
Winsorized Mean ( 13 / 20 )0.8566846546721310.00735497059804504116.476965237609
Winsorized Mean ( 14 / 20 )0.8576531565409840.00710734829977794120.671327809808
Winsorized Mean ( 15 / 20 )0.8583149506393440.00695956233210063123.328868926198
Winsorized Mean ( 16 / 20 )0.8597034933278690.00660049543348655130.248327870405
Winsorized Mean ( 17 / 20 )0.8612825271803280.00621439653638094138.594716661243
Winsorized Mean ( 18 / 20 )0.8624029637377050.00567639224490088151.928007531968
Winsorized Mean ( 19 / 20 )0.8620282541475410.00557021747750842154.756660332970
Winsorized Mean ( 20 / 20 )0.8612479951311470.00542357106444244158.797217718339
Trimmed Mean ( 1 / 20 )0.8616636337627120.010868962632378679.277449275225
Trimmed Mean ( 2 / 20 )0.8613133841754390.010522939531300281.851024764847
Trimmed Mean ( 3 / 20 )0.860747563909090.010189501421732984.4739627861697
Trimmed Mean ( 4 / 20 )0.8599760333207550.0098451699117846787.350044847003
Trimmed Mean ( 5 / 20 )0.8597899199215690.0096167633885019589.4053316263927
Trimmed Mean ( 6 / 20 )0.8595135477551020.0093515863895873291.9109883551033
Trimmed Mean ( 7 / 20 )0.8590825089148940.0090472730907053894.9548554909283
Trimmed Mean ( 8 / 20 )0.85853776940.0086940121136610298.7504685036
Trimmed Mean ( 9 / 20 )0.8580806745348840.00833090155268804102.999737676412
Trimmed Mean ( 10 / 20 )0.8574563439024390.0079817772173857107.426744764907
Trimmed Mean ( 11 / 20 )0.8577772502051280.00785974978204419109.135439930256
Trimmed Mean ( 12 / 20 )0.8581611260270270.00776021353221818110.584731008263
Trimmed Mean ( 13 / 20 )0.85849604880.00763942698591083112.377021258702
Trimmed Mean ( 14 / 20 )0.8587536130.00750909119782298114.361856898072
Trimmed Mean ( 15 / 20 )0.8589082854516130.00737514831120705116.459798394351
Trimmed Mean ( 16 / 20 )0.8589914887241380.00720373584145335119.242502450067
Trimmed Mean ( 17 / 20 )0.8588909510370370.00704112188384609121.982116657791
Trimmed Mean ( 18 / 20 )0.858547689520.00689356397359014124.543370136140
Trimmed Mean ( 19 / 20 )0.8579796418695650.00681304458128153125.931898967287
Trimmed Mean ( 20 / 20 )0.8573606810952380.0066701101111457128.537710293957
Median0.853889943
Midrange0.874975562
Midmean - Weighted Average at Xnp0.8567825479
Midmean - Weighted Average at X(n+1)p0.858908285451613
Midmean - Empirical Distribution Function0.858908285451613
Midmean - Empirical Distribution Function - Averaging0.858908285451613
Midmean - Empirical Distribution Function - Interpolation0.858908285451613
Midmean - Closest Observation0.85673845415625
Midmean - True Basic - Statistics Graphics Toolkit0.858908285451613
Midmean - MS Excel (old versions)0.858908285451613
Number of observations61

\begin{tabular}{lllllllll}
\hline
Central Tendency - Ungrouped Data \tabularnewline
Measure & Value & S.E. & Value/S.E. \tabularnewline
Arithmetic Mean & 0.86210009042623 & 0.0114291533021248 & 75.4299174783102 \tabularnewline
Geometric Mean & 0.85758493742067 &  &  \tabularnewline
Harmonic Mean & 0.85310519291296 &  &  \tabularnewline
Quadratic Mean & 0.866633774223646 &  &  \tabularnewline
Winsorized Mean ( 1 / 20 ) & 0.861990916163935 & 0.0111502480278886 & 77.3068826817087 \tabularnewline
Winsorized Mean ( 2 / 20 ) & 0.862333715803279 & 0.0110085322801376 & 78.3332140796974 \tabularnewline
Winsorized Mean ( 3 / 20 ) & 0.862758602655738 & 0.0108607091364145 & 79.4385147248835 \tabularnewline
Winsorized Mean ( 4 / 20 ) & 0.860598445344262 & 0.0103531978250052 & 83.1239255629536 \tabularnewline
Winsorized Mean ( 5 / 20 ) & 0.860899939278688 & 0.0102755125989696 & 83.7817024685482 \tabularnewline
Winsorized Mean ( 6 / 20 ) & 0.861506219114754 & 0.0101588317676167 & 84.8036702272184 \tabularnewline
Winsorized Mean ( 7 / 20 ) & 0.86189550804918 & 0.0100209628685834 & 86.00925074289 \tabularnewline
Winsorized Mean ( 8 / 20 ) & 0.861115484704918 & 0.00969077564784127 & 88.859294239955 \tabularnewline
Winsorized Mean ( 9 / 20 ) & 0.861857363114754 & 0.00923404695015402 & 93.3347391200322 \tabularnewline
Winsorized Mean ( 10 / 20 ) & 0.855404647868852 & 0.00798724816389706 & 107.096290276211 \tabularnewline
Winsorized Mean ( 11 / 20 ) & 0.85521598037705 & 0.00767868173199379 & 111.375364968407 \tabularnewline
Winsorized Mean ( 12 / 20 ) & 0.85585510037705 & 0.00755708675194955 & 113.251988295127 \tabularnewline
Winsorized Mean ( 13 / 20 ) & 0.856684654672131 & 0.00735497059804504 & 116.476965237609 \tabularnewline
Winsorized Mean ( 14 / 20 ) & 0.857653156540984 & 0.00710734829977794 & 120.671327809808 \tabularnewline
Winsorized Mean ( 15 / 20 ) & 0.858314950639344 & 0.00695956233210063 & 123.328868926198 \tabularnewline
Winsorized Mean ( 16 / 20 ) & 0.859703493327869 & 0.00660049543348655 & 130.248327870405 \tabularnewline
Winsorized Mean ( 17 / 20 ) & 0.861282527180328 & 0.00621439653638094 & 138.594716661243 \tabularnewline
Winsorized Mean ( 18 / 20 ) & 0.862402963737705 & 0.00567639224490088 & 151.928007531968 \tabularnewline
Winsorized Mean ( 19 / 20 ) & 0.862028254147541 & 0.00557021747750842 & 154.756660332970 \tabularnewline
Winsorized Mean ( 20 / 20 ) & 0.861247995131147 & 0.00542357106444244 & 158.797217718339 \tabularnewline
Trimmed Mean ( 1 / 20 ) & 0.861663633762712 & 0.0108689626323786 & 79.277449275225 \tabularnewline
Trimmed Mean ( 2 / 20 ) & 0.861313384175439 & 0.0105229395313002 & 81.851024764847 \tabularnewline
Trimmed Mean ( 3 / 20 ) & 0.86074756390909 & 0.0101895014217329 & 84.4739627861697 \tabularnewline
Trimmed Mean ( 4 / 20 ) & 0.859976033320755 & 0.00984516991178467 & 87.350044847003 \tabularnewline
Trimmed Mean ( 5 / 20 ) & 0.859789919921569 & 0.00961676338850195 & 89.4053316263927 \tabularnewline
Trimmed Mean ( 6 / 20 ) & 0.859513547755102 & 0.00935158638958732 & 91.9109883551033 \tabularnewline
Trimmed Mean ( 7 / 20 ) & 0.859082508914894 & 0.00904727309070538 & 94.9548554909283 \tabularnewline
Trimmed Mean ( 8 / 20 ) & 0.8585377694 & 0.00869401211366102 & 98.7504685036 \tabularnewline
Trimmed Mean ( 9 / 20 ) & 0.858080674534884 & 0.00833090155268804 & 102.999737676412 \tabularnewline
Trimmed Mean ( 10 / 20 ) & 0.857456343902439 & 0.0079817772173857 & 107.426744764907 \tabularnewline
Trimmed Mean ( 11 / 20 ) & 0.857777250205128 & 0.00785974978204419 & 109.135439930256 \tabularnewline
Trimmed Mean ( 12 / 20 ) & 0.858161126027027 & 0.00776021353221818 & 110.584731008263 \tabularnewline
Trimmed Mean ( 13 / 20 ) & 0.8584960488 & 0.00763942698591083 & 112.377021258702 \tabularnewline
Trimmed Mean ( 14 / 20 ) & 0.858753613 & 0.00750909119782298 & 114.361856898072 \tabularnewline
Trimmed Mean ( 15 / 20 ) & 0.858908285451613 & 0.00737514831120705 & 116.459798394351 \tabularnewline
Trimmed Mean ( 16 / 20 ) & 0.858991488724138 & 0.00720373584145335 & 119.242502450067 \tabularnewline
Trimmed Mean ( 17 / 20 ) & 0.858890951037037 & 0.00704112188384609 & 121.982116657791 \tabularnewline
Trimmed Mean ( 18 / 20 ) & 0.85854768952 & 0.00689356397359014 & 124.543370136140 \tabularnewline
Trimmed Mean ( 19 / 20 ) & 0.857979641869565 & 0.00681304458128153 & 125.931898967287 \tabularnewline
Trimmed Mean ( 20 / 20 ) & 0.857360681095238 & 0.0066701101111457 & 128.537710293957 \tabularnewline
Median & 0.853889943 &  &  \tabularnewline
Midrange & 0.874975562 &  &  \tabularnewline
Midmean - Weighted Average at Xnp & 0.8567825479 &  &  \tabularnewline
Midmean - Weighted Average at X(n+1)p & 0.858908285451613 &  &  \tabularnewline
Midmean - Empirical Distribution Function & 0.858908285451613 &  &  \tabularnewline
Midmean - Empirical Distribution Function - Averaging & 0.858908285451613 &  &  \tabularnewline
Midmean - Empirical Distribution Function - Interpolation & 0.858908285451613 &  &  \tabularnewline
Midmean - Closest Observation & 0.85673845415625 &  &  \tabularnewline
Midmean - True Basic - Statistics Graphics Toolkit & 0.858908285451613 &  &  \tabularnewline
Midmean - MS Excel (old versions) & 0.858908285451613 &  &  \tabularnewline
Number of observations & 61 &  &  \tabularnewline
\hline
\end{tabular}
%Source: https://freestatistics.org/blog/index.php?pk=1627&T=1

[TABLE]
[ROW][C]Central Tendency - Ungrouped Data[/C][/ROW]
[ROW][C]Measure[/C][C]Value[/C][C]S.E.[/C][C]Value/S.E.[/C][/ROW]
[ROW][C]Arithmetic Mean[/C][C]0.86210009042623[/C][C]0.0114291533021248[/C][C]75.4299174783102[/C][/ROW]
[ROW][C]Geometric Mean[/C][C]0.85758493742067[/C][C][/C][C][/C][/ROW]
[ROW][C]Harmonic Mean[/C][C]0.85310519291296[/C][C][/C][C][/C][/ROW]
[ROW][C]Quadratic Mean[/C][C]0.866633774223646[/C][C][/C][C][/C][/ROW]
[ROW][C]Winsorized Mean ( 1 / 20 )[/C][C]0.861990916163935[/C][C]0.0111502480278886[/C][C]77.3068826817087[/C][/ROW]
[ROW][C]Winsorized Mean ( 2 / 20 )[/C][C]0.862333715803279[/C][C]0.0110085322801376[/C][C]78.3332140796974[/C][/ROW]
[ROW][C]Winsorized Mean ( 3 / 20 )[/C][C]0.862758602655738[/C][C]0.0108607091364145[/C][C]79.4385147248835[/C][/ROW]
[ROW][C]Winsorized Mean ( 4 / 20 )[/C][C]0.860598445344262[/C][C]0.0103531978250052[/C][C]83.1239255629536[/C][/ROW]
[ROW][C]Winsorized Mean ( 5 / 20 )[/C][C]0.860899939278688[/C][C]0.0102755125989696[/C][C]83.7817024685482[/C][/ROW]
[ROW][C]Winsorized Mean ( 6 / 20 )[/C][C]0.861506219114754[/C][C]0.0101588317676167[/C][C]84.8036702272184[/C][/ROW]
[ROW][C]Winsorized Mean ( 7 / 20 )[/C][C]0.86189550804918[/C][C]0.0100209628685834[/C][C]86.00925074289[/C][/ROW]
[ROW][C]Winsorized Mean ( 8 / 20 )[/C][C]0.861115484704918[/C][C]0.00969077564784127[/C][C]88.859294239955[/C][/ROW]
[ROW][C]Winsorized Mean ( 9 / 20 )[/C][C]0.861857363114754[/C][C]0.00923404695015402[/C][C]93.3347391200322[/C][/ROW]
[ROW][C]Winsorized Mean ( 10 / 20 )[/C][C]0.855404647868852[/C][C]0.00798724816389706[/C][C]107.096290276211[/C][/ROW]
[ROW][C]Winsorized Mean ( 11 / 20 )[/C][C]0.85521598037705[/C][C]0.00767868173199379[/C][C]111.375364968407[/C][/ROW]
[ROW][C]Winsorized Mean ( 12 / 20 )[/C][C]0.85585510037705[/C][C]0.00755708675194955[/C][C]113.251988295127[/C][/ROW]
[ROW][C]Winsorized Mean ( 13 / 20 )[/C][C]0.856684654672131[/C][C]0.00735497059804504[/C][C]116.476965237609[/C][/ROW]
[ROW][C]Winsorized Mean ( 14 / 20 )[/C][C]0.857653156540984[/C][C]0.00710734829977794[/C][C]120.671327809808[/C][/ROW]
[ROW][C]Winsorized Mean ( 15 / 20 )[/C][C]0.858314950639344[/C][C]0.00695956233210063[/C][C]123.328868926198[/C][/ROW]
[ROW][C]Winsorized Mean ( 16 / 20 )[/C][C]0.859703493327869[/C][C]0.00660049543348655[/C][C]130.248327870405[/C][/ROW]
[ROW][C]Winsorized Mean ( 17 / 20 )[/C][C]0.861282527180328[/C][C]0.00621439653638094[/C][C]138.594716661243[/C][/ROW]
[ROW][C]Winsorized Mean ( 18 / 20 )[/C][C]0.862402963737705[/C][C]0.00567639224490088[/C][C]151.928007531968[/C][/ROW]
[ROW][C]Winsorized Mean ( 19 / 20 )[/C][C]0.862028254147541[/C][C]0.00557021747750842[/C][C]154.756660332970[/C][/ROW]
[ROW][C]Winsorized Mean ( 20 / 20 )[/C][C]0.861247995131147[/C][C]0.00542357106444244[/C][C]158.797217718339[/C][/ROW]
[ROW][C]Trimmed Mean ( 1 / 20 )[/C][C]0.861663633762712[/C][C]0.0108689626323786[/C][C]79.277449275225[/C][/ROW]
[ROW][C]Trimmed Mean ( 2 / 20 )[/C][C]0.861313384175439[/C][C]0.0105229395313002[/C][C]81.851024764847[/C][/ROW]
[ROW][C]Trimmed Mean ( 3 / 20 )[/C][C]0.86074756390909[/C][C]0.0101895014217329[/C][C]84.4739627861697[/C][/ROW]
[ROW][C]Trimmed Mean ( 4 / 20 )[/C][C]0.859976033320755[/C][C]0.00984516991178467[/C][C]87.350044847003[/C][/ROW]
[ROW][C]Trimmed Mean ( 5 / 20 )[/C][C]0.859789919921569[/C][C]0.00961676338850195[/C][C]89.4053316263927[/C][/ROW]
[ROW][C]Trimmed Mean ( 6 / 20 )[/C][C]0.859513547755102[/C][C]0.00935158638958732[/C][C]91.9109883551033[/C][/ROW]
[ROW][C]Trimmed Mean ( 7 / 20 )[/C][C]0.859082508914894[/C][C]0.00904727309070538[/C][C]94.9548554909283[/C][/ROW]
[ROW][C]Trimmed Mean ( 8 / 20 )[/C][C]0.8585377694[/C][C]0.00869401211366102[/C][C]98.7504685036[/C][/ROW]
[ROW][C]Trimmed Mean ( 9 / 20 )[/C][C]0.858080674534884[/C][C]0.00833090155268804[/C][C]102.999737676412[/C][/ROW]
[ROW][C]Trimmed Mean ( 10 / 20 )[/C][C]0.857456343902439[/C][C]0.0079817772173857[/C][C]107.426744764907[/C][/ROW]
[ROW][C]Trimmed Mean ( 11 / 20 )[/C][C]0.857777250205128[/C][C]0.00785974978204419[/C][C]109.135439930256[/C][/ROW]
[ROW][C]Trimmed Mean ( 12 / 20 )[/C][C]0.858161126027027[/C][C]0.00776021353221818[/C][C]110.584731008263[/C][/ROW]
[ROW][C]Trimmed Mean ( 13 / 20 )[/C][C]0.8584960488[/C][C]0.00763942698591083[/C][C]112.377021258702[/C][/ROW]
[ROW][C]Trimmed Mean ( 14 / 20 )[/C][C]0.858753613[/C][C]0.00750909119782298[/C][C]114.361856898072[/C][/ROW]
[ROW][C]Trimmed Mean ( 15 / 20 )[/C][C]0.858908285451613[/C][C]0.00737514831120705[/C][C]116.459798394351[/C][/ROW]
[ROW][C]Trimmed Mean ( 16 / 20 )[/C][C]0.858991488724138[/C][C]0.00720373584145335[/C][C]119.242502450067[/C][/ROW]
[ROW][C]Trimmed Mean ( 17 / 20 )[/C][C]0.858890951037037[/C][C]0.00704112188384609[/C][C]121.982116657791[/C][/ROW]
[ROW][C]Trimmed Mean ( 18 / 20 )[/C][C]0.85854768952[/C][C]0.00689356397359014[/C][C]124.543370136140[/C][/ROW]
[ROW][C]Trimmed Mean ( 19 / 20 )[/C][C]0.857979641869565[/C][C]0.00681304458128153[/C][C]125.931898967287[/C][/ROW]
[ROW][C]Trimmed Mean ( 20 / 20 )[/C][C]0.857360681095238[/C][C]0.0066701101111457[/C][C]128.537710293957[/C][/ROW]
[ROW][C]Median[/C][C]0.853889943[/C][C][/C][C][/C][/ROW]
[ROW][C]Midrange[/C][C]0.874975562[/C][C][/C][C][/C][/ROW]
[ROW][C]Midmean - Weighted Average at Xnp[/C][C]0.8567825479[/C][C][/C][C][/C][/ROW]
[ROW][C]Midmean - Weighted Average at X(n+1)p[/C][C]0.858908285451613[/C][C][/C][C][/C][/ROW]
[ROW][C]Midmean - Empirical Distribution Function[/C][C]0.858908285451613[/C][C][/C][C][/C][/ROW]
[ROW][C]Midmean - Empirical Distribution Function - Averaging[/C][C]0.858908285451613[/C][C][/C][C][/C][/ROW]
[ROW][C]Midmean - Empirical Distribution Function - Interpolation[/C][C]0.858908285451613[/C][C][/C][C][/C][/ROW]
[ROW][C]Midmean - Closest Observation[/C][C]0.85673845415625[/C][C][/C][C][/C][/ROW]
[ROW][C]Midmean - True Basic - Statistics Graphics Toolkit[/C][C]0.858908285451613[/C][C][/C][C][/C][/ROW]
[ROW][C]Midmean - MS Excel (old versions)[/C][C]0.858908285451613[/C][C][/C][C][/C][/ROW]
[ROW][C]Number of observations[/C][C]61[/C][C][/C][C][/C][/ROW]
[/TABLE]
Source: https://freestatistics.org/blog/index.php?pk=1627&T=1

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=1627&T=1

As an alternative you can also use a QR Code:  
QR Code


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

Central Tendency - Ungrouped Data
MeasureValueS.E.Value/S.E.
Arithmetic Mean0.862100090426230.011429153302124875.4299174783102
Geometric Mean0.85758493742067
Harmonic Mean0.85310519291296
Quadratic Mean0.866633774223646
Winsorized Mean ( 1 / 20 )0.8619909161639350.011150248027888677.3068826817087
Winsorized Mean ( 2 / 20 )0.8623337158032790.011008532280137678.3332140796974
Winsorized Mean ( 3 / 20 )0.8627586026557380.010860709136414579.4385147248835
Winsorized Mean ( 4 / 20 )0.8605984453442620.010353197825005283.1239255629536
Winsorized Mean ( 5 / 20 )0.8608999392786880.010275512598969683.7817024685482
Winsorized Mean ( 6 / 20 )0.8615062191147540.010158831767616784.8036702272184
Winsorized Mean ( 7 / 20 )0.861895508049180.010020962868583486.00925074289
Winsorized Mean ( 8 / 20 )0.8611154847049180.0096907756478412788.859294239955
Winsorized Mean ( 9 / 20 )0.8618573631147540.0092340469501540293.3347391200322
Winsorized Mean ( 10 / 20 )0.8554046478688520.00798724816389706107.096290276211
Winsorized Mean ( 11 / 20 )0.855215980377050.00767868173199379111.375364968407
Winsorized Mean ( 12 / 20 )0.855855100377050.00755708675194955113.251988295127
Winsorized Mean ( 13 / 20 )0.8566846546721310.00735497059804504116.476965237609
Winsorized Mean ( 14 / 20 )0.8576531565409840.00710734829977794120.671327809808
Winsorized Mean ( 15 / 20 )0.8583149506393440.00695956233210063123.328868926198
Winsorized Mean ( 16 / 20 )0.8597034933278690.00660049543348655130.248327870405
Winsorized Mean ( 17 / 20 )0.8612825271803280.00621439653638094138.594716661243
Winsorized Mean ( 18 / 20 )0.8624029637377050.00567639224490088151.928007531968
Winsorized Mean ( 19 / 20 )0.8620282541475410.00557021747750842154.756660332970
Winsorized Mean ( 20 / 20 )0.8612479951311470.00542357106444244158.797217718339
Trimmed Mean ( 1 / 20 )0.8616636337627120.010868962632378679.277449275225
Trimmed Mean ( 2 / 20 )0.8613133841754390.010522939531300281.851024764847
Trimmed Mean ( 3 / 20 )0.860747563909090.010189501421732984.4739627861697
Trimmed Mean ( 4 / 20 )0.8599760333207550.0098451699117846787.350044847003
Trimmed Mean ( 5 / 20 )0.8597899199215690.0096167633885019589.4053316263927
Trimmed Mean ( 6 / 20 )0.8595135477551020.0093515863895873291.9109883551033
Trimmed Mean ( 7 / 20 )0.8590825089148940.0090472730907053894.9548554909283
Trimmed Mean ( 8 / 20 )0.85853776940.0086940121136610298.7504685036
Trimmed Mean ( 9 / 20 )0.8580806745348840.00833090155268804102.999737676412
Trimmed Mean ( 10 / 20 )0.8574563439024390.0079817772173857107.426744764907
Trimmed Mean ( 11 / 20 )0.8577772502051280.00785974978204419109.135439930256
Trimmed Mean ( 12 / 20 )0.8581611260270270.00776021353221818110.584731008263
Trimmed Mean ( 13 / 20 )0.85849604880.00763942698591083112.377021258702
Trimmed Mean ( 14 / 20 )0.8587536130.00750909119782298114.361856898072
Trimmed Mean ( 15 / 20 )0.8589082854516130.00737514831120705116.459798394351
Trimmed Mean ( 16 / 20 )0.8589914887241380.00720373584145335119.242502450067
Trimmed Mean ( 17 / 20 )0.8588909510370370.00704112188384609121.982116657791
Trimmed Mean ( 18 / 20 )0.858547689520.00689356397359014124.543370136140
Trimmed Mean ( 19 / 20 )0.8579796418695650.00681304458128153125.931898967287
Trimmed Mean ( 20 / 20 )0.8573606810952380.0066701101111457128.537710293957
Median0.853889943
Midrange0.874975562
Midmean - Weighted Average at Xnp0.8567825479
Midmean - Weighted Average at X(n+1)p0.858908285451613
Midmean - Empirical Distribution Function0.858908285451613
Midmean - Empirical Distribution Function - Averaging0.858908285451613
Midmean - Empirical Distribution Function - Interpolation0.858908285451613
Midmean - Closest Observation0.85673845415625
Midmean - True Basic - Statistics Graphics Toolkit0.858908285451613
Midmean - MS Excel (old versions)0.858908285451613
Number of observations61


Figures (Output of Computation)

Input Parameters & R Code

Parameters (Session):
Parameters (R input):
R code (references can be found in the software module):
geomean <- function(x) {
return(exp(mean(log(x))))
}
harmean <- function(x) {
return(1/mean(1/x))
}
quamean <- function(x) {
return(sqrt(mean(x*x)))
}
winmean <- function(x) {
x <-sort(x[!is.na(x)])
n<-length(x)
denom <- 3
nodenom <- n/denom
if (nodenom>40) denom <- n/40
sqrtn = sqrt(n)
roundnodenom = floor(nodenom)
win <- array(NA,dim=c(roundnodenom,2))
for (j in 1:roundnodenom) {
win[j,1] <- (j*x[j+1]+sum(x[(j+1):(n-j)])+j*x[n-j])/n
win[j,2] <- sd(c(rep(x[j+1],j),x[(j+1):(n-j)],rep(x[n-j],j)))/sqrtn
}
return(win)
}
trimean <- function(x) {
x <-sort(x[!is.na(x)])
n<-length(x)
denom <- 3
nodenom <- n/denom
if (nodenom>40) denom <- n/40
sqrtn = sqrt(n)
roundnodenom = floor(nodenom)
tri <- array(NA,dim=c(roundnodenom,2))
for (j in 1:roundnodenom) {
tri[j,1] <- mean(x,trim=j/n)
tri[j,2] <- sd(x[(j+1):(n-j)]) / sqrt(n-j*2)
}
return(tri)
}
midrange <- function(x) {
return((max(x)+min(x))/2)
}
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]
}
}
}
}
midmean <- 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)
}
midm <- 0
myn <- 0
roundno4 <- round(n/4)
round3no4 <- round(3*n/4)
for (i in 1:n) {
if ((x[i]>=qvalue1) & (x[i]<=qvalue3)){
midm = midm + x[i]
myn = myn + 1
}
}
midm = midm / myn
return(midm)
}
(arm <- mean(x))
sqrtn <- sqrt(length(x))
(armse <- sd(x) / sqrtn)
(armose <- arm / armse)
(geo <- geomean(x))
(har <- harmean(x))
(qua <- quamean(x))
(win <- winmean(x))
(tri <- trimean(x))
(midr <- midrange(x))
midm <- array(NA,dim=8)
for (j in 1:8) midm[j] <- midmean(x,j)
midm
bitmap(file='test1.png')
lb <- win[,1] - 2*win[,2]
ub <- win[,1] + 2*win[,2]
if ((ylimmin == '') | (ylimmax == '')) plot(win[,1],type='b',main=main, xlab='j', pch=19, ylab='Winsorized Mean(j/n)', ylim=c(min(lb),max(ub))) else plot(win[,1],type='l',main=main, xlab='j', pch=19, ylab='Winsorized Mean(j/n)', ylim=c(ylimmin,ylimmax))
lines(ub,lty=3)
lines(lb,lty=3)
grid()
dev.off()
bitmap(file='test2.png')
lb <- tri[,1] - 2*tri[,2]
ub <- tri[,1] + 2*tri[,2]
if ((ylimmin == '') | (ylimmax == '')) plot(tri[,1],type='b',main=main, xlab='j', pch=19, ylab='Trimmed Mean(j/n)', ylim=c(min(lb),max(ub))) else plot(tri[,1],type='l',main=main, xlab='j', pch=19, ylab='Trimmed Mean(j/n)', ylim=c(ylimmin,ylimmax))
lines(ub,lty=3)
lines(lb,lty=3)
grid()
dev.off()
load(file='createtable')
a<-table.start()
a<-table.row.start(a)
a<-table.element(a,'Central Tendency - Ungrouped Data',4,TRUE)
a<-table.row.end(a)
a<-table.row.start(a)
a<-table.element(a,'Measure',header=TRUE)
a<-table.element(a,'Value',header=TRUE)
a<-table.element(a,'S.E.',header=TRUE)
a<-table.element(a,'Value/S.E.',header=TRUE)
a<-table.row.end(a)
a<-table.row.start(a)
a<-table.element(a,hyperlink('arithmetic_mean.htm', 'Arithmetic Mean', 'click to view the definition of the Arithmetic Mean'),header=TRUE)
a<-table.element(a,arm)
a<-table.element(a,hyperlink('arithmetic_mean_standard_error.htm', armse, 'click to view the definition of the Standard Error of the Arithmetic Mean'))
a<-table.element(a,armose)
a<-table.row.end(a)
a<-table.row.start(a)
a<-table.element(a,hyperlink('geometric_mean.htm', 'Geometric Mean', 'click to view the definition of the Geometric Mean'),header=TRUE)
a<-table.element(a,geo)
a<-table.element(a,'')
a<-table.element(a,'')
a<-table.row.end(a)
a<-table.row.start(a)
a<-table.element(a,hyperlink('harmonic_mean.htm', 'Harmonic Mean', 'click to view the definition of the Harmonic Mean'),header=TRUE)
a<-table.element(a,har)
a<-table.element(a,'')
a<-table.element(a,'')
a<-table.row.end(a)
a<-table.row.start(a)
a<-table.element(a,hyperlink('quadratic_mean.htm', 'Quadratic Mean', 'click to view the definition of the Quadratic Mean'),header=TRUE)
a<-table.element(a,qua)
a<-table.element(a,'')
a<-table.element(a,'')
a<-table.row.end(a)
for (j in 1:length(win[,1])) {
a<-table.row.start(a)
mylabel <- paste('Winsorized Mean (',j)
mylabel <- paste(mylabel,'/')
mylabel <- paste(mylabel,length(win[,1]))
mylabel <- paste(mylabel,')')
a<-table.element(a,hyperlink('winsorized_mean.htm', mylabel, 'click to view the definition of the Winsorized Mean'),header=TRUE)
a<-table.element(a,win[j,1])
a<-table.element(a,win[j,2])
a<-table.element(a,win[j,1]/win[j,2])
a<-table.row.end(a)
}
for (j in 1:length(tri[,1])) {
a<-table.row.start(a)
mylabel <- paste('Trimmed Mean (',j)
mylabel <- paste(mylabel,'/')
mylabel <- paste(mylabel,length(tri[,1]))
mylabel <- paste(mylabel,')')
a<-table.element(a,hyperlink('arithmetic_mean.htm', mylabel, 'click to view the definition of the Trimmed Mean'),header=TRUE)
a<-table.element(a,tri[j,1])
a<-table.element(a,tri[j,2])
a<-table.element(a,tri[j,1]/tri[j,2])
a<-table.row.end(a)
}
a<-table.row.start(a)
a<-table.element(a,hyperlink('median_1.htm', 'Median', 'click to view the definition of the Median'),header=TRUE)
a<-table.element(a,median(x))
a<-table.element(a,'')
a<-table.element(a,'')
a<-table.row.end(a)
a<-table.row.start(a)
a<-table.element(a,hyperlink('midrange.htm', 'Midrange', 'click to view the definition of the Midrange'),header=TRUE)
a<-table.element(a,midr)
a<-table.element(a,'')
a<-table.element(a,'')
a<-table.row.end(a)
a<-table.row.start(a)
mymid <- hyperlink('midmean.htm', 'Midmean', 'click to view the definition of the Midmean')
mylabel <- paste(mymid,hyperlink('method_1.htm','Weighted Average at Xnp',''),sep=' - ')
a<-table.element(a,mylabel,header=TRUE)
a<-table.element(a,midm[1])
a<-table.element(a,'')
a<-table.element(a,'')
a<-table.row.end(a)
a<-table.row.start(a)
mymid <- hyperlink('midmean.htm', 'Midmean', 'click to view the definition of the Midmean')
mylabel <- paste(mymid,hyperlink('method_2.htm','Weighted Average at X(n+1)p',''),sep=' - ')
a<-table.element(a,mylabel,header=TRUE)
a<-table.element(a,midm[2])
a<-table.element(a,'')
a<-table.element(a,'')
a<-table.row.end(a)
a<-table.row.start(a)
mymid <- hyperlink('midmean.htm', 'Midmean', 'click to view the definition of the Midmean')
mylabel <- paste(mymid,hyperlink('method_3.htm','Empirical Distribution Function',''),sep=' - ')
a<-table.element(a,mylabel,header=TRUE)
a<-table.element(a,midm[3])
a<-table.element(a,'')
a<-table.element(a,'')
a<-table.row.end(a)
a<-table.row.start(a)
mymid <- hyperlink('midmean.htm', 'Midmean', 'click to view the definition of the Midmean')
mylabel <- paste(mymid,hyperlink('method_4.htm','Empirical Distribution Function - Averaging',''),sep=' - ')
a<-table.element(a,mylabel,header=TRUE)
a<-table.element(a,midm[4])
a<-table.element(a,'')
a<-table.element(a,'')
a<-table.row.end(a)
a<-table.row.start(a)
mymid <- hyperlink('midmean.htm', 'Midmean', 'click to view the definition of the Midmean')
mylabel <- paste(mymid,hyperlink('method_5.htm','Empirical Distribution Function - Interpolation',''),sep=' - ')
a<-table.element(a,mylabel,header=TRUE)
a<-table.element(a,midm[5])
a<-table.element(a,'')
a<-table.element(a,'')
a<-table.row.end(a)
a<-table.row.start(a)
mymid <- hyperlink('midmean.htm', 'Midmean', 'click to view the definition of the Midmean')
mylabel <- paste(mymid,hyperlink('method_6.htm','Closest Observation',''),sep=' - ')
a<-table.element(a,mylabel,header=TRUE)
a<-table.element(a,midm[6])
a<-table.element(a,'')
a<-table.element(a,'')
a<-table.row.end(a)
a<-table.row.start(a)
mymid <- hyperlink('midmean.htm', 'Midmean', 'click to view the definition of the Midmean')
mylabel <- paste(mymid,hyperlink('method_7.htm','True Basic - Statistics Graphics Toolkit',''),sep=' - ')
a<-table.element(a,mylabel,header=TRUE)
a<-table.element(a,midm[7])
a<-table.element(a,'')
a<-table.element(a,'')
a<-table.row.end(a)
a<-table.row.start(a)
mymid <- hyperlink('midmean.htm', 'Midmean', 'click to view the definition of the Midmean')
mylabel <- paste(mymid,hyperlink('method_8.htm','MS Excel (old versions)',''),sep=' - ')
a<-table.element(a,mylabel,header=TRUE)
a<-table.element(a,midm[8])
a<-table.element(a,'')
a<-table.element(a,'')
a<-table.row.end(a)
a<-table.row.start(a)
a<-table.element(a,'Number of observations',header=TRUE)
a<-table.element(a,length(x))
a<-table.element(a,'')
a<-table.element(a,'')
a<-table.row.end(a)
a<-table.end(a)
table.save(a,file='mytable.tab')