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Description of Statistical Computation

Author's title

Author*The author of this computation has been verified*
R Software Moduleskewkurt.wasp
Title produced by softwareSkewness and Kurtosis
Date of computationTue, 30 Nov 2010 22:45:51 +0000
Cite this page as followsStatistical Computations at FreeStatistics.org, Office for Research Development and Education, URL https://freestatistics.org/blog/index.php?v=date/2010/Nov/30/t1291157028l6p4exqknkedav1.htm/, Retrieved Mon, 29 Apr 2024 12:37:15 +0000
Statistical Computations at FreeStatistics.org, Office for Research Development and Education, URL https://freestatistics.org/blog/index.php?pk=103862, Retrieved Mon, 29 Apr 2024 12:37:15 +0000
QR Codes:

Original text written by user:
IsPrivate?No (this computation is public)
User-defined keywords
Estimated Impact127

Tree of Dependent Computations

Family? (F = Feedback message, R = changed R code, M = changed R Module, P = changed Parameters, D = changed Data)
-     [Skewness and Kurtosis] [] [2010-11-30 14:37:56] [8441f95c4a5787a301bc621ebc7904ca]
-    D    [Skewness and Kurtosis] [] [2010-11-30 22:45:51] [13dfa60174f50d862e8699db2153bfc5] [Current]
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Dataset

Dataseries X:
Download CSV
Histogram
Boxplots 
0,003877959
0,003306227
-0,004595037
0,00088223
-0,003129819
-0,004944583
-0,005141284
0,005348436
-0,00013809
-0,001175545
-0,001595525
0,000486215
-0,000486215
6,94927E-05
-0,000556253
-0,003352563
-0,000771955
-0,000210771
-0,003032352
-0,001559662
0,000922295
-0,001846553
-0,00164006
0,003557478
0,001414872
-0,003403468
-0,004579849
-0,002959552
-0,001087822
0,001087822
-0,000144886
-0,00159694
-0,002772257
0,001607147
-0,000583729
0,001385078
-0,000291228
-0,00351006
-0,001618308
0,000809908
-0,001326091
0,001031754
-0,003028514
0,001184373
-0,003190356
-0,002239791
0,000971995
-0,00254675
-0,001429715
0,000226058
-0,001887419
-0,000227043
0,003618513
0,004704001
-0,001487821
-0,000372753
-0,003745233
-0,00158268
0,000301908
-0,001511643
0,000454046
-0,007938117
-0,009185994
0,007797238
-0,005913094
-7,8343E-05
-7,83571E-05
-0,002121005
0,002825711
-0,004640699
0,006358514
0,002951226
-0,000697164
-0,003971877
0,001015894
-0,000859448
0,005517639
0,003077933
-0,00207521
-0,002085174
0,002393238
0,000846053
-0,001925238
-0,003487083
-0,008723117
0,002927217
-0,000236608
-0,00110588
-0,000633198
-0,005018959
-0,001525109
-0,004120395
-0,012601065
0,004737352
0,001897026
-0,000411693
-0,001320045
0,001484769
-0,004802543
0,001662055
-0,005677133
-0,009687267
0,000429442
-0,004660598
0,001472627
0,000691277
0,000690178
0,001720662
0,001286037
0,008981049
0,002675162
0,003734283
-0,00082707
0,002970111
-0,003549998
0,000910905
-0,005578095
0
0,000920736

Tables (Output of Computation)





Skewness and Kurtosis - Ungrouped Data
Skewness MeasureValueKurtosis MeasureValue
FISHER 3rd Cent. Mom.-0.000000FISHER 4th Cent. Mom.0.000000
FISHER beta 10.101766FISHER beta 24.303565
FISHER gamma 1-0.319008FISHER gamma 21.303565
FISHER gamma 1 (S.E.)0.224544FISHER gamma 2 (S.E.)0.449089
FISHER Test 1-1.420690FISHER Test 22.902688
FISHER Test 1 Probability0.152800FISHER Test 2 Probability0.003600
Pearson 2-0.158557
Yule using Quartile definition:Weighted Average at Xnp-0.170978
Yule using Quartile definition:Weighted Average at X(n+1)p-0.148165
Yule using Quartile definition:Empirical Distribution Function-0.148165
Yule using Quartile definition:Empirical Distribution Function - Averaging-0.148165
Yule using Quartile definition:Empirical Distribution Function - Interpolation-0.130995
Yule using Quartile definition:Closest Observation-0.165088
Yule using Quartile definition:True Basic - Statistics Graphics Toolkit-0.148165
Yule using Quartile definition:MS Excel (old versions)-0.148165
Skewness Measure (small sample)ValueKurtosis Measure (small sample)Value
Skewness (small sample)-0.323095Kurtosis (small sample)1.412207
Skewness S.E. (small sample)0.221782Kurtosis S.E. (small sample)0.440097
TEST 1 (small sample)-1.456812TEST 1 (small sample)3.208854
TEST 1 Prob. (small sample)0.144200TEST 1 Prob. (small sample)0.001400
Observations119

\begin{tabular}{lllllllll}
\hline

Skewness and Kurtosis - Ungrouped Data \tabularnewline

Skewness Measure
ValueKurtosis MeasureValue \tabularnewline FISHER 3rd Cent. Mom.-0.000000 & FISHER 4th Cent. Mom.0.000000 \tabularnewline FISHER beta 10.101766 & FISHER beta 24.303565 \tabularnewline FISHER gamma 1-0.319008 & FISHER gamma 21.303565 \tabularnewline FISHER gamma 1 (S.E.)0.224544 & FISHER gamma 2 (S.E.)0.449089 \tabularnewline FISHER Test 1-1.420690 & FISHER Test 22.902688 \tabularnewline FISHER Test 1 Probability0.152800 & FISHER Test 2 Probability0.003600 \tabularnewline Pearson 2-0.158557 & & \tabularnewline Yule using Quartile definition:Weighted Average at Xnp-0.170978 & & \tabularnewline Yule using Quartile definition:Weighted Average at X(n+1)p-0.148165 & & \tabularnewline Yule using Quartile definition:Empirical Distribution Function-0.148165 & & \tabularnewline Yule using Quartile definition:Empirical Distribution Function - Averaging-0.148165 & & \tabularnewline Yule using Quartile definition:Empirical Distribution Function - Interpolation-0.130995 & & \tabularnewline Yule using Quartile definition:Closest Observation-0.165088 & & \tabularnewline Yule using Quartile definition:True Basic - Statistics Graphics Toolkit-0.148165 & & \tabularnewline Yule using Quartile definition:MS Excel (old versions)-0.148165 & & \tabularnewline Skewness Measure (small sample)ValueKurtosis Measure (small sample)Value \tabularnewline Skewness (small sample)-0.323095 & Kurtosis (small sample)1.412207 \tabularnewline Skewness S.E. (small sample)0.221782 & Kurtosis S.E. (small sample)0.440097 \tabularnewline TEST 1 (small sample)-1.456812 & TEST 1 (small sample)3.208854 \tabularnewline TEST 1 Prob. (small sample)0.144200 & TEST 1 Prob. (small sample)0.001400 \tabularnewline Observations119 \tabularnewline & \tabularnewline & \tabularnewline \hline \end{tabular} %Source: https://freestatistics.org/blog/index.php?pk=103862&T=0

[TABLE]

[ROW][C]Skewness and Kurtosis - Ungrouped Data[/C][/ROW]

[ROW][C]Skewness Measure[/C]
Value[/C]Kurtosis Measure[/C]Value[/C][/ROW] [ROW][C]FISHER 3rd Cent. Mom.[/C]-0.000000[/C][C]FISHER 4th Cent. Mom.[/C]0.000000[/C][/ROW] [ROW][C]FISHER beta 1[/C]0.101766[/C][C]FISHER beta 2[/C]4.303565[/C][/ROW] [ROW][C]FISHER gamma 1[/C]-0.319008[/C][C]FISHER gamma 2[/C]1.303565[/C][/ROW] [ROW][C]FISHER gamma 1 (S.E.)[/C]0.224544[/C][C]FISHER gamma 2 (S.E.)[/C]0.449089[/C][/ROW] [ROW][C]FISHER Test 1[/C]-1.420690[/C][C]FISHER Test 2[/C]2.902688[/C][/ROW] [ROW][C]FISHER Test 1 Probability[/C]0.152800[/C][C]FISHER Test 2 Probability[/C]0.003600[/C][/ROW] [ROW][C]Pearson 2[/C]-0.158557[/C][C][/C][C][/C][/ROW] [ROW][C]Yule using Quartile definition:Weighted Average at Xnp[/C]-0.170978[/C][C][/C][C][/C][/ROW] [ROW][C]Yule using Quartile definition:Weighted Average at X(n+1)p[/C]-0.148165[/C][C][/C][C][/C][/ROW] [ROW][C]Yule using Quartile definition:Empirical Distribution Function[/C]-0.148165[/C][C][/C][C][/C][/ROW] [ROW][C]Yule using Quartile definition:Empirical Distribution Function - Averaging[/C]-0.148165[/C][C][/C][C][/C][/ROW] [ROW][C]Yule using Quartile definition:Empirical Distribution Function - Interpolation[/C]-0.130995[/C][C][/C][C][/C][/ROW] [ROW][C]Yule using Quartile definition:Closest Observation[/C]-0.165088[/C][C][/C][C][/C][/ROW] [ROW][C]Yule using Quartile definition:True Basic - Statistics Graphics Toolkit[/C]-0.148165[/C][C][/C][C][/C][/ROW] [ROW][C]Yule using Quartile definition:MS Excel (old versions)[/C]-0.148165[/C][C][/C][C][/C][/ROW] [ROW][C]Skewness Measure (small sample)[/C]Value[/C]Kurtosis Measure (small sample)[/C]Value[/C][/ROW] [ROW][C]Skewness (small sample)[/C]-0.323095[/C][C]Kurtosis (small sample)[/C]1.412207[/C][/ROW] [ROW][C]Skewness S.E. (small sample)[/C]0.221782[/C][C]Kurtosis S.E. (small sample)[/C]0.440097[/C][/ROW] [ROW][C]TEST 1 (small sample)[/C]-1.456812[/C][C]TEST 1 (small sample)[/C]3.208854[/C][/ROW] [ROW][C]TEST 1 Prob. (small sample)[/C]0.144200[/C][C]TEST 1 Prob. (small sample)[/C]0.001400[/C][/ROW] [ROW][C]Observations[/C]119[/C][/ROW] [ROW][C] [/C][C] [/C][/ROW] [ROW][C] [/C][C] [/C][/ROW] [/TABLE] Source: https://freestatistics.org/blog/index.php?pk=103862&T=0

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=103862&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:

Skewness and Kurtosis - Ungrouped Data
Skewness MeasureValueKurtosis MeasureValue
FISHER 3rd Cent. Mom.-0.000000FISHER 4th Cent. Mom.0.000000
FISHER beta 10.101766FISHER beta 24.303565
FISHER gamma 1-0.319008FISHER gamma 21.303565
FISHER gamma 1 (S.E.)0.224544FISHER gamma 2 (S.E.)0.449089
FISHER Test 1-1.420690FISHER Test 22.902688
FISHER Test 1 Probability0.152800FISHER Test 2 Probability0.003600
Pearson 2-0.158557
Yule using Quartile definition:Weighted Average at Xnp-0.170978
Yule using Quartile definition:Weighted Average at X(n+1)p-0.148165
Yule using Quartile definition:Empirical Distribution Function-0.148165
Yule using Quartile definition:Empirical Distribution Function - Averaging-0.148165
Yule using Quartile definition:Empirical Distribution Function - Interpolation-0.130995
Yule using Quartile definition:Closest Observation-0.165088
Yule using Quartile definition:True Basic - Statistics Graphics Toolkit-0.148165
Yule using Quartile definition:MS Excel (old versions)-0.148165
Skewness Measure (small sample)ValueKurtosis Measure (small sample)Value
Skewness (small sample)-0.323095Kurtosis (small sample)1.412207
Skewness S.E. (small sample)0.221782Kurtosis S.E. (small sample)0.440097
TEST 1 (small sample)-1.456812TEST 1 (small sample)3.208854
TEST 1 Prob. (small sample)0.144200TEST 1 Prob. (small sample)0.001400
Observations119






Trimmed Skewness and Kurtosis (small sample) - Ungrouped Data
Skewness Measure (small sample)ValueProbabilityKurtosis Measure (small sample)ValueProbability
Trim. Skewness (0/119)-0.3231000.144200Trim. Kurtosis (0/119)1.4122000.001400
Trim. Skewness (1/119)-0.2270000.307800Trim. Kurtosis (1/119)0.6355000.149800
Trim. Skewness (2/119)-0.2470000.271400Trim. Kurtosis (2/119)0.3375000.447200
Trim. Skewness (3/119)-0.2036000.368200Trim. Kurtosis (3/119)0.0775000.857200
Trim. Skewness (4/119)-0.1217000.589200Trim. Kurtosis (4/119)-0.2164000.631200
Trim. Skewness (5/119)-0.0597000.794800Trim. Kurtosis (5/119)-0.5151000.258400
Trim. Skewness (6/119)-0.0758000.741400Trim. Kurtosis (6/119)-0.5561000.226200
Trim. Skewness (7/119)-0.1058000.652800Trim. Kurtosis (7/119)-0.6194000.183600
Trim. Skewness (8/119)-0.1030000.660000Trim. Kurtosis (8/119)-0.6392000.173800
Trim. Skewness (9/119)-0.1126000.638400Trim. Kurtosis (9/119)-0.6379000.180200
Trim. Skewness (10/119)-0.1239000.603000Trim. Kurtosis (10/119)-0.6387000.183600
Trim. Skewness (11/119)-0.1377000.568600Trim. Kurtosis (11/119)-0.6516000.177000
Trim. Skewness (12/119)-0.1473000.548400Trim. Kurtosis (12/119)-0.6565000.180200
Trim. Skewness (13/119)-0.1529000.535200Trim. Kurtosis (13/119)-0.6533000.186800
Trim. Skewness (14/119)-0.1534000.541800Trim. Kurtosis (14/119)-0.6631000.183600
Trim. Skewness (15/119)-0.1543000.541800Trim. Kurtosis (15/119)-0.6990000.164600
Trim. Skewness (16/119)-0.1528000.548400Trim. Kurtosis (16/119)-0.7824000.123600
Trim. Skewness (17/119)-0.1779000.490200Trim. Kurtosis (17/119)-0.8391000.103200
Trim. Skewness (18/119)-0.2072000.429600Trim. Kurtosis (18/119)-0.9041000.083600
Trim. Skewness (19/119)-0.2345000.378800Trim. Kurtosis (19/119)-0.9428000.073400
Trim. Skewness (20/119)-0.2412000.368200Trim. Kurtosis (20/119)-0.9336000.080200
Trim. Skewness (21/119)-0.2387000.378800Trim. Kurtosis (21/119)-0.9225000.087200
Trim. Skewness (22/119)-0.2307000.400800Trim. Kurtosis (22/119)-0.9211000.091000
Trim. Skewness (23/119)-0.2210000.429600Trim. Kurtosis (23/119)-0.9229000.095000
Trim. Skewness (24/119)-0.2010000.477600Trim. Kurtosis (24/119)-0.9324000.097000
Trim. Skewness (25/119)-0.1879000.509200Trim. Kurtosis (25/119)-0.9338000.101000
Trim. Skewness (26/119)-0.1691000.562000Trim. Kurtosis (26/119)-0.9452000.101000
Trim. Skewness (27/119)-0.1498000.610000Trim. Kurtosis (27/119)-0.9641000.099000
Trim. Skewness (28/119)-0.1098000.711400Trim. Kurtosis (28/119)-1.0183000.085400
Trim. Skewness (29/119)-0.0509000.865000Trim. Kurtosis (29/119)-1.1039000.067200
Trim. Skewness (30/119)0.0089000.976000Trim. Kurtosis (30/119)-1.1772000.054800
Trim. Skewness (31/119)0.0568000.857200Trim. Kurtosis (31/119)-1.2196000.050000
Trim. Skewness (32/119)0.0741000.810400Trim. Kurtosis (32/119)-1.2123000.054800
Trim. Skewness (33/119)0.0854000.787200Trim. Kurtosis (33/119)-1.1926000.062800
Trim. Skewness (34/119)0.1009000.756600Trim. Kurtosis (34/119)-1.1710000.073400
Trim. Skewness (35/119)0.1201000.718800Trim. Kurtosis (35/119)-1.1641000.080200
Trim. Skewness (36/119)0.1200000.726400Trim. Kurtosis (36/119)-1.1475000.091000
Trim. Skewness (37/119)0.1157000.741400Trim. Kurtosis (37/119)-1.1406000.099000
Trim. Skewness (38/119)0.1056000.764200Trim. Kurtosis (38/119)-1.1494000.103200
Trim. Skewness (39/119)0.0560000.872800Trim. Kurtosis (39/119)-1.1551000.109600
Trim. Skewness (40/119)0.0108000.976000Trim. Kurtosis (40/119)-1.1378000.123600

\begin{tabular}{lllllllll}
\hline

Trimmed Skewness and Kurtosis (small sample) - Ungrouped Data \tabularnewline

Skewness Measure (small sample)
ValueProbabilityKurtosis Measure (small sample)ValueProbability \tabularnewline Trim. Skewness (0/119)-0.3231000.144200 & Trim. Kurtosis (0/119)1.4122000.001400 \tabularnewline Trim. Skewness (1/119)-0.2270000.307800 & Trim. Kurtosis (1/119)0.6355000.149800 \tabularnewline Trim. Skewness (2/119)-0.2470000.271400 & Trim. Kurtosis (2/119)0.3375000.447200 \tabularnewline Trim. Skewness (3/119)-0.2036000.368200 & Trim. Kurtosis (3/119)0.0775000.857200 \tabularnewline Trim. Skewness (4/119)-0.1217000.589200 & Trim. Kurtosis (4/119)-0.2164000.631200 \tabularnewline Trim. Skewness (5/119)-0.0597000.794800 & Trim. Kurtosis (5/119)-0.5151000.258400 \tabularnewline Trim. Skewness (6/119)-0.0758000.741400 & Trim. Kurtosis (6/119)-0.5561000.226200 \tabularnewline Trim. Skewness (7/119)-0.1058000.652800 & Trim. Kurtosis (7/119)-0.6194000.183600 \tabularnewline Trim. Skewness (8/119)-0.1030000.660000 & Trim. Kurtosis (8/119)-0.6392000.173800 \tabularnewline Trim. Skewness (9/119)-0.1126000.638400 & Trim. Kurtosis (9/119)-0.6379000.180200 \tabularnewline Trim. Skewness (10/119)-0.1239000.603000 & Trim. Kurtosis (10/119)-0.6387000.183600 \tabularnewline Trim. Skewness (11/119)-0.1377000.568600 & Trim. Kurtosis (11/119)-0.6516000.177000 \tabularnewline Trim. Skewness (12/119)-0.1473000.548400 & Trim. Kurtosis (12/119)-0.6565000.180200 \tabularnewline Trim. Skewness (13/119)-0.1529000.535200 & Trim. Kurtosis (13/119)-0.6533000.186800 \tabularnewline Trim. Skewness (14/119)-0.1534000.541800 & Trim. Kurtosis (14/119)-0.6631000.183600 \tabularnewline Trim. Skewness (15/119)-0.1543000.541800 & Trim. Kurtosis (15/119)-0.6990000.164600 \tabularnewline Trim. Skewness (16/119)-0.1528000.548400 & Trim. Kurtosis (16/119)-0.7824000.123600 \tabularnewline Trim. Skewness (17/119)-0.1779000.490200 & Trim. Kurtosis (17/119)-0.8391000.103200 \tabularnewline Trim. Skewness (18/119)-0.2072000.429600 & Trim. Kurtosis (18/119)-0.9041000.083600 \tabularnewline Trim. Skewness (19/119)-0.2345000.378800 & Trim. Kurtosis (19/119)-0.9428000.073400 \tabularnewline Trim. Skewness (20/119)-0.2412000.368200 & Trim. Kurtosis (20/119)-0.9336000.080200 \tabularnewline Trim. Skewness (21/119)-0.2387000.378800 & Trim. Kurtosis (21/119)-0.9225000.087200 \tabularnewline Trim. Skewness (22/119)-0.2307000.400800 & Trim. Kurtosis (22/119)-0.9211000.091000 \tabularnewline Trim. Skewness (23/119)-0.2210000.429600 & Trim. Kurtosis (23/119)-0.9229000.095000 \tabularnewline Trim. Skewness (24/119)-0.2010000.477600 & Trim. Kurtosis (24/119)-0.9324000.097000 \tabularnewline Trim. Skewness (25/119)-0.1879000.509200 & Trim. Kurtosis (25/119)-0.9338000.101000 \tabularnewline Trim. Skewness (26/119)-0.1691000.562000 & Trim. Kurtosis (26/119)-0.9452000.101000 \tabularnewline Trim. Skewness (27/119)-0.1498000.610000 & Trim. Kurtosis (27/119)-0.9641000.099000 \tabularnewline Trim. Skewness (28/119)-0.1098000.711400 & Trim. Kurtosis (28/119)-1.0183000.085400 \tabularnewline Trim. Skewness (29/119)-0.0509000.865000 & Trim. Kurtosis (29/119)-1.1039000.067200 \tabularnewline Trim. Skewness (30/119)0.0089000.976000 & Trim. Kurtosis (30/119)-1.1772000.054800 \tabularnewline Trim. Skewness (31/119)0.0568000.857200 & Trim. Kurtosis (31/119)-1.2196000.050000 \tabularnewline Trim. Skewness (32/119)0.0741000.810400 & Trim. Kurtosis (32/119)-1.2123000.054800 \tabularnewline Trim. Skewness (33/119)0.0854000.787200 & Trim. Kurtosis (33/119)-1.1926000.062800 \tabularnewline Trim. Skewness (34/119)0.1009000.756600 & Trim. Kurtosis (34/119)-1.1710000.073400 \tabularnewline Trim. Skewness (35/119)0.1201000.718800 & Trim. Kurtosis (35/119)-1.1641000.080200 \tabularnewline Trim. Skewness (36/119)0.1200000.726400 & Trim. Kurtosis (36/119)-1.1475000.091000 \tabularnewline Trim. Skewness (37/119)0.1157000.741400 & Trim. Kurtosis (37/119)-1.1406000.099000 \tabularnewline Trim. Skewness (38/119)0.1056000.764200 & Trim. Kurtosis (38/119)-1.1494000.103200 \tabularnewline Trim. Skewness (39/119)0.0560000.872800 & Trim. Kurtosis (39/119)-1.1551000.109600 \tabularnewline Trim. Skewness (40/119)0.0108000.976000 & Trim. Kurtosis (40/119)-1.1378000.123600 \tabularnewline \hline \end{tabular} %Source: https://freestatistics.org/blog/index.php?pk=103862&T=1

[TABLE]

[ROW][C]Trimmed Skewness and Kurtosis (small sample) - Ungrouped Data[/C][/ROW]

[ROW][C]Skewness Measure (small sample)[/C]
Value[/C]Probability[/C]Kurtosis Measure (small sample)[/C]Value[/C]Probability[/C][/ROW] [ROW][C]Trim. Skewness (0/119)[/C]-0.323100[/C]0.144200[/C][C]Trim. Kurtosis (0/119)[/C]1.412200[/C]0.001400[/C][/ROW] [ROW][C]Trim. Skewness (1/119)[/C]-0.227000[/C]0.307800[/C][C]Trim. Kurtosis (1/119)[/C]0.635500[/C]0.149800[/C][/ROW] [ROW][C]Trim. Skewness (2/119)[/C]-0.247000[/C]0.271400[/C][C]Trim. Kurtosis (2/119)[/C]0.337500[/C]0.447200[/C][/ROW] [ROW][C]Trim. Skewness (3/119)[/C]-0.203600[/C]0.368200[/C][C]Trim. Kurtosis (3/119)[/C]0.077500[/C]0.857200[/C][/ROW] [ROW][C]Trim. Skewness (4/119)[/C]-0.121700[/C]0.589200[/C][C]Trim. Kurtosis (4/119)[/C]-0.216400[/C]0.631200[/C][/ROW] [ROW][C]Trim. Skewness (5/119)[/C]-0.059700[/C]0.794800[/C][C]Trim. Kurtosis (5/119)[/C]-0.515100[/C]0.258400[/C][/ROW] [ROW][C]Trim. Skewness (6/119)[/C]-0.075800[/C]0.741400[/C][C]Trim. Kurtosis (6/119)[/C]-0.556100[/C]0.226200[/C][/ROW] [ROW][C]Trim. Skewness (7/119)[/C]-0.105800[/C]0.652800[/C][C]Trim. Kurtosis (7/119)[/C]-0.619400[/C]0.183600[/C][/ROW] [ROW][C]Trim. Skewness (8/119)[/C]-0.103000[/C]0.660000[/C][C]Trim. Kurtosis (8/119)[/C]-0.639200[/C]0.173800[/C][/ROW] [ROW][C]Trim. Skewness (9/119)[/C]-0.112600[/C]0.638400[/C][C]Trim. Kurtosis (9/119)[/C]-0.637900[/C]0.180200[/C][/ROW] [ROW][C]Trim. Skewness (10/119)[/C]-0.123900[/C]0.603000[/C][C]Trim. Kurtosis (10/119)[/C]-0.638700[/C]0.183600[/C][/ROW] [ROW][C]Trim. Skewness (11/119)[/C]-0.137700[/C]0.568600[/C][C]Trim. Kurtosis (11/119)[/C]-0.651600[/C]0.177000[/C][/ROW] [ROW][C]Trim. Skewness (12/119)[/C]-0.147300[/C]0.548400[/C][C]Trim. Kurtosis (12/119)[/C]-0.656500[/C]0.180200[/C][/ROW] [ROW][C]Trim. Skewness (13/119)[/C]-0.152900[/C]0.535200[/C][C]Trim. Kurtosis (13/119)[/C]-0.653300[/C]0.186800[/C][/ROW] [ROW][C]Trim. Skewness (14/119)[/C]-0.153400[/C]0.541800[/C][C]Trim. Kurtosis (14/119)[/C]-0.663100[/C]0.183600[/C][/ROW] [ROW][C]Trim. Skewness (15/119)[/C]-0.154300[/C]0.541800[/C][C]Trim. Kurtosis (15/119)[/C]-0.699000[/C]0.164600[/C][/ROW] [ROW][C]Trim. Skewness (16/119)[/C]-0.152800[/C]0.548400[/C][C]Trim. Kurtosis (16/119)[/C]-0.782400[/C]0.123600[/C][/ROW] [ROW][C]Trim. Skewness (17/119)[/C]-0.177900[/C]0.490200[/C][C]Trim. Kurtosis (17/119)[/C]-0.839100[/C]0.103200[/C][/ROW] [ROW][C]Trim. Skewness (18/119)[/C]-0.207200[/C]0.429600[/C][C]Trim. Kurtosis (18/119)[/C]-0.904100[/C]0.083600[/C][/ROW] [ROW][C]Trim. Skewness (19/119)[/C]-0.234500[/C]0.378800[/C][C]Trim. Kurtosis (19/119)[/C]-0.942800[/C]0.073400[/C][/ROW] [ROW][C]Trim. Skewness (20/119)[/C]-0.241200[/C]0.368200[/C][C]Trim. Kurtosis (20/119)[/C]-0.933600[/C]0.080200[/C][/ROW] [ROW][C]Trim. Skewness (21/119)[/C]-0.238700[/C]0.378800[/C][C]Trim. Kurtosis (21/119)[/C]-0.922500[/C]0.087200[/C][/ROW] [ROW][C]Trim. Skewness (22/119)[/C]-0.230700[/C]0.400800[/C][C]Trim. Kurtosis (22/119)[/C]-0.921100[/C]0.091000[/C][/ROW] [ROW][C]Trim. Skewness (23/119)[/C]-0.221000[/C]0.429600[/C][C]Trim. Kurtosis (23/119)[/C]-0.922900[/C]0.095000[/C][/ROW] [ROW][C]Trim. Skewness (24/119)[/C]-0.201000[/C]0.477600[/C][C]Trim. Kurtosis (24/119)[/C]-0.932400[/C]0.097000[/C][/ROW] [ROW][C]Trim. Skewness (25/119)[/C]-0.187900[/C]0.509200[/C][C]Trim. Kurtosis (25/119)[/C]-0.933800[/C]0.101000[/C][/ROW] [ROW][C]Trim. Skewness (26/119)[/C]-0.169100[/C]0.562000[/C][C]Trim. Kurtosis (26/119)[/C]-0.945200[/C]0.101000[/C][/ROW] [ROW][C]Trim. Skewness (27/119)[/C]-0.149800[/C]0.610000[/C][C]Trim. Kurtosis (27/119)[/C]-0.964100[/C]0.099000[/C][/ROW] [ROW][C]Trim. Skewness (28/119)[/C]-0.109800[/C]0.711400[/C][C]Trim. Kurtosis (28/119)[/C]-1.018300[/C]0.085400[/C][/ROW] [ROW][C]Trim. Skewness (29/119)[/C]-0.050900[/C]0.865000[/C][C]Trim. Kurtosis (29/119)[/C]-1.103900[/C]0.067200[/C][/ROW] [ROW][C]Trim. Skewness (30/119)[/C]0.008900[/C]0.976000[/C][C]Trim. Kurtosis (30/119)[/C]-1.177200[/C]0.054800[/C][/ROW] [ROW][C]Trim. Skewness (31/119)[/C]0.056800[/C]0.857200[/C][C]Trim. Kurtosis (31/119)[/C]-1.219600[/C]0.050000[/C][/ROW] [ROW][C]Trim. Skewness (32/119)[/C]0.074100[/C]0.810400[/C][C]Trim. Kurtosis (32/119)[/C]-1.212300[/C]0.054800[/C][/ROW] [ROW][C]Trim. Skewness (33/119)[/C]0.085400[/C]0.787200[/C][C]Trim. Kurtosis (33/119)[/C]-1.192600[/C]0.062800[/C][/ROW] [ROW][C]Trim. Skewness (34/119)[/C]0.100900[/C]0.756600[/C][C]Trim. Kurtosis (34/119)[/C]-1.171000[/C]0.073400[/C][/ROW] [ROW][C]Trim. Skewness (35/119)[/C]0.120100[/C]0.718800[/C][C]Trim. Kurtosis (35/119)[/C]-1.164100[/C]0.080200[/C][/ROW] [ROW][C]Trim. Skewness (36/119)[/C]0.120000[/C]0.726400[/C][C]Trim. Kurtosis (36/119)[/C]-1.147500[/C]0.091000[/C][/ROW] [ROW][C]Trim. Skewness (37/119)[/C]0.115700[/C]0.741400[/C][C]Trim. Kurtosis (37/119)[/C]-1.140600[/C]0.099000[/C][/ROW] [ROW][C]Trim. Skewness (38/119)[/C]0.105600[/C]0.764200[/C][C]Trim. Kurtosis (38/119)[/C]-1.149400[/C]0.103200[/C][/ROW] [ROW][C]Trim. Skewness (39/119)[/C]0.056000[/C]0.872800[/C][C]Trim. Kurtosis (39/119)[/C]-1.155100[/C]0.109600[/C][/ROW] [ROW][C]Trim. Skewness (40/119)[/C]0.010800[/C]0.976000[/C][C]Trim. Kurtosis (40/119)[/C]-1.137800[/C]0.123600[/C][/ROW] [/TABLE] Source: https://freestatistics.org/blog/index.php?pk=103862&T=1

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=103862&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:

Trimmed Skewness and Kurtosis (small sample) - Ungrouped Data
Skewness Measure (small sample)ValueProbabilityKurtosis Measure (small sample)ValueProbability
Trim. Skewness (0/119)-0.3231000.144200Trim. Kurtosis (0/119)1.4122000.001400
Trim. Skewness (1/119)-0.2270000.307800Trim. Kurtosis (1/119)0.6355000.149800
Trim. Skewness (2/119)-0.2470000.271400Trim. Kurtosis (2/119)0.3375000.447200
Trim. Skewness (3/119)-0.2036000.368200Trim. Kurtosis (3/119)0.0775000.857200
Trim. Skewness (4/119)-0.1217000.589200Trim. Kurtosis (4/119)-0.2164000.631200
Trim. Skewness (5/119)-0.0597000.794800Trim. Kurtosis (5/119)-0.5151000.258400
Trim. Skewness (6/119)-0.0758000.741400Trim. Kurtosis (6/119)-0.5561000.226200
Trim. Skewness (7/119)-0.1058000.652800Trim. Kurtosis (7/119)-0.6194000.183600
Trim. Skewness (8/119)-0.1030000.660000Trim. Kurtosis (8/119)-0.6392000.173800
Trim. Skewness (9/119)-0.1126000.638400Trim. Kurtosis (9/119)-0.6379000.180200
Trim. Skewness (10/119)-0.1239000.603000Trim. Kurtosis (10/119)-0.6387000.183600
Trim. Skewness (11/119)-0.1377000.568600Trim. Kurtosis (11/119)-0.6516000.177000
Trim. Skewness (12/119)-0.1473000.548400Trim. Kurtosis (12/119)-0.6565000.180200
Trim. Skewness (13/119)-0.1529000.535200Trim. Kurtosis (13/119)-0.6533000.186800
Trim. Skewness (14/119)-0.1534000.541800Trim. Kurtosis (14/119)-0.6631000.183600
Trim. Skewness (15/119)-0.1543000.541800Trim. Kurtosis (15/119)-0.6990000.164600
Trim. Skewness (16/119)-0.1528000.548400Trim. Kurtosis (16/119)-0.7824000.123600
Trim. Skewness (17/119)-0.1779000.490200Trim. Kurtosis (17/119)-0.8391000.103200
Trim. Skewness (18/119)-0.2072000.429600Trim. Kurtosis (18/119)-0.9041000.083600
Trim. Skewness (19/119)-0.2345000.378800Trim. Kurtosis (19/119)-0.9428000.073400
Trim. Skewness (20/119)-0.2412000.368200Trim. Kurtosis (20/119)-0.9336000.080200
Trim. Skewness (21/119)-0.2387000.378800Trim. Kurtosis (21/119)-0.9225000.087200
Trim. Skewness (22/119)-0.2307000.400800Trim. Kurtosis (22/119)-0.9211000.091000
Trim. Skewness (23/119)-0.2210000.429600Trim. Kurtosis (23/119)-0.9229000.095000
Trim. Skewness (24/119)-0.2010000.477600Trim. Kurtosis (24/119)-0.9324000.097000
Trim. Skewness (25/119)-0.1879000.509200Trim. Kurtosis (25/119)-0.9338000.101000
Trim. Skewness (26/119)-0.1691000.562000Trim. Kurtosis (26/119)-0.9452000.101000
Trim. Skewness (27/119)-0.1498000.610000Trim. Kurtosis (27/119)-0.9641000.099000
Trim. Skewness (28/119)-0.1098000.711400Trim. Kurtosis (28/119)-1.0183000.085400
Trim. Skewness (29/119)-0.0509000.865000Trim. Kurtosis (29/119)-1.1039000.067200
Trim. Skewness (30/119)0.0089000.976000Trim. Kurtosis (30/119)-1.1772000.054800
Trim. Skewness (31/119)0.0568000.857200Trim. Kurtosis (31/119)-1.2196000.050000
Trim. Skewness (32/119)0.0741000.810400Trim. Kurtosis (32/119)-1.2123000.054800
Trim. Skewness (33/119)0.0854000.787200Trim. Kurtosis (33/119)-1.1926000.062800
Trim. Skewness (34/119)0.1009000.756600Trim. Kurtosis (34/119)-1.1710000.073400
Trim. Skewness (35/119)0.1201000.718800Trim. Kurtosis (35/119)-1.1641000.080200
Trim. Skewness (36/119)0.1200000.726400Trim. Kurtosis (36/119)-1.1475000.091000
Trim. Skewness (37/119)0.1157000.741400Trim. Kurtosis (37/119)-1.1406000.099000
Trim. Skewness (38/119)0.1056000.764200Trim. Kurtosis (38/119)-1.1494000.103200
Trim. Skewness (39/119)0.0560000.872800Trim. Kurtosis (39/119)-1.1551000.109600
Trim. Skewness (40/119)0.0108000.976000Trim. Kurtosis (40/119)-1.1378000.123600


Figures (Output of Computation)

Input Parameters & R Code

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