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Description of Statistical Computation

Author's title

Author*Unverified author*
R Software Moduleskewkurt.wasp
Title produced by softwareSkewness and Kurtosis
Date of computationThu, 25 Nov 2010 10:33:18 +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/25/t1290681188bq3ull79vrbsofz.htm/, Retrieved Fri, 19 Apr 2024 01:04:20 +0000
Statistical Computations at FreeStatistics.org, Office for Research Development and Education, URL https://freestatistics.org/blog/index.php?pk=100721, Retrieved Fri, 19 Apr 2024 01:04:20 +0000
QR Codes:

Original text written by user:
IsPrivate?No (this computation is public)
User-defined keywords
Estimated Impact122

Tree of Dependent Computations

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

Dataseries X:
Download CSV
Histogram
Boxplots 
255
280.2
299.9
339.2
374.2
393.5
389.2
381.7
375.2
369
357.4
352.1
346.5
342.9
340.3
328.3
322.9
314.3
308.9
294
285.6
281.2
280.3
278.8
274.5
270.4
263.4
259.9
258
262.7
284.7
311.3
322.1
327
331.3
333.3
321.4
327
320
314.7
316.7
314.4
321.3
318.2
307.2
301.3
287.5
277.7
274.4
258.8
253.3
251
248.4
249.5
246.1
244.5
243.6
244
240.8
249.8
248
259.4
260.5
260.8
261.3
259.5
256.6
257.9
256.5
254.2
253.3
253.8
255.5
257.1
257.3
253.2
252.8
252
250.7
252.2
250
251
253.4
251.2
255.6
261.1
258.9
259.9
261.2
264.7
267.1
266.4
267.7
268.6
267.5
268.5
268.5
270.5
270.9
270.1
269.3
269.8
270.1
264.9
263.7
264.8
263.7
255.9
276.2
360.1
380.5
373.7
369.8
366.6
359.3
345.8
326.2
324.5
328.1
327.5
324.4
316.5
310.9
301.5
291.7
290.4
287.4
277.7
281.6
288
276
272.9
283
283.3
276.8
284.5
282.7
281.2
287.4
283.1
284
285.5
289.2
292.5
296.4
305.2
303.9
311.5
316.3
316.7
322.5
317.1
309.8
303.8
290.3
293.7
291.7
296.5
289.1
288.5
293.8
297.7
305.4
302.7
302.5
303
294.5
294.1
294.5
297.1
289.4
292.4
287.9
286.6
280.5
272.4
269.2
270.6
267.3
262.5
266.8
268.8
263.1
261.2
266
262.5
265.2
261.3
253.7
249.2
239.1
236.4
235.2
245.2
246.2
247.7
251.4
253.3
254.8
250
249.3
241.5
243.3
248
253
252.9
251.5
251.6
253.5
259.8
334.1
448
445.8
445
448.2
438.2
439.8
423.4
410.8
408.4
406.7
405.9
402.7
405.1
399.6
386.5
381.4
375.2
357.7
359
355
352.7
344.4
343.8
338
339
333.3
334.4
328.3
330.7
330
331.6
351.2
389.4
410.9
442.8
462.8
466.9
461.7
439.2
430.3
416.1
402.5
397.3
403.3
395.9
387.8
378.6
377.1
370.4
362
350.3
348.2
344.6
343.5
342.8
347.6
346.6
349.5
342.1
342
342.8
339.3
348.2
333.7
334.7
354
367.7
363.3
358.4
353.1
343.1
344.6
344.4
333.9
331.7
324.3
321.2
322.4
321.7
320.5
312.8
309.7
315.6
309.7
304.6
302.5
301.5
298.8
291.3
293.6
294.6
285.9
297.6
301.1
293.8
297.7
292.9
292.1
287.2
288.2
283.8
299.9
292.4
293.3
300.8
293.7
293.1
294.4
292.1
291.9
282.5
277.9
287.5
289.2
285.6
293.2
290.8
283.1
275
287.8
287.8
287.4
284
277.8
277.6
304.9
294
300.9
324
332.9
341.6
333.4
348.2
344.7
344.7
329.3
323.5
323.2
317.4
330.1
329.2
334.9
315.8
315.4
319.6
317.3
313.8
315.8
311.3

Tables (Output of Computation)





Skewness and Kurtosis - Ungrouped Data
Skewness MeasureValueKurtosis MeasureValue
FISHER 3rd Cent. Mom.112836.271628FISHER 4th Cent. Mom.2.06870e+7
FISHER beta 10.925603FISHER beta 23.603427
FISHER gamma 10.962082FISHER gamma 20.603427
FISHER gamma 1 (S.E.)0.129099FISHER gamma 2 (S.E.)0.258199
FISHER Test 17.452258FISHER Test 22.337062
FISHER Test 1 Probability0.000000FISHER Test 2 Probability0.019200
Pearson 20.728365
Yule using Quartile definition:Weighted Average at Xnp0.157012
Yule using Quartile definition:Weighted Average at X(n+1)p0.161658
Yule using Quartile definition:Empirical Distribution Function0.157012
Yule using Quartile definition:Empirical Distribution Function - Averaging0.162471
Yule using Quartile definition:Empirical Distribution Function - Interpolation0.163289
Yule using Quartile definition:Closest Observation0.157012
Yule using Quartile definition:True Basic - Statistics Graphics Toolkit0.163289
Yule using Quartile definition:MS Excel (old versions)0.160850
Skewness Measure (small sample)ValueKurtosis Measure (small sample)Value
Skewness (small sample)0.966113Kurtosis (small sample)0.628746
Skewness S.E. (small sample)0.128566Kurtosis S.E. (small sample)0.256434
TEST 1 (small sample)7.514534TEST 1 (small sample)2.451880
TEST 1 Prob. (small sample)0.000000TEST 1 Prob. (small sample)0.013800
Observations360

\begin{tabular}{lllllllll}
\hline

Skewness and Kurtosis - Ungrouped Data \tabularnewline

Skewness Measure
ValueKurtosis MeasureValue \tabularnewline FISHER 3rd Cent. Mom.112836.271628 & FISHER 4th Cent. Mom.2.06870e+7 \tabularnewline FISHER beta 10.925603 & FISHER beta 23.603427 \tabularnewline FISHER gamma 10.962082 & FISHER gamma 20.603427 \tabularnewline FISHER gamma 1 (S.E.)0.129099 & FISHER gamma 2 (S.E.)0.258199 \tabularnewline FISHER Test 17.452258 & FISHER Test 22.337062 \tabularnewline FISHER Test 1 Probability0.000000 & FISHER Test 2 Probability0.019200 \tabularnewline Pearson 20.728365 & & \tabularnewline Yule using Quartile definition:Weighted Average at Xnp0.157012 & & \tabularnewline Yule using Quartile definition:Weighted Average at X(n+1)p0.161658 & & \tabularnewline Yule using Quartile definition:Empirical Distribution Function0.157012 & & \tabularnewline Yule using Quartile definition:Empirical Distribution Function - Averaging0.162471 & & \tabularnewline Yule using Quartile definition:Empirical Distribution Function - Interpolation0.163289 & & \tabularnewline Yule using Quartile definition:Closest Observation0.157012 & & \tabularnewline Yule using Quartile definition:True Basic - Statistics Graphics Toolkit0.163289 & & \tabularnewline Yule using Quartile definition:MS Excel (old versions)0.160850 & & \tabularnewline Skewness Measure (small sample)ValueKurtosis Measure (small sample)Value \tabularnewline Skewness (small sample)0.966113 & Kurtosis (small sample)0.628746 \tabularnewline Skewness S.E. (small sample)0.128566 & Kurtosis S.E. (small sample)0.256434 \tabularnewline TEST 1 (small sample)7.514534 & TEST 1 (small sample)2.451880 \tabularnewline TEST 1 Prob. (small sample)0.000000 & TEST 1 Prob. (small sample)0.013800 \tabularnewline Observations360 \tabularnewline & \tabularnewline & \tabularnewline \hline \end{tabular} %Source: https://freestatistics.org/blog/index.php?pk=100721&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]112836.271628[/C][C]FISHER 4th Cent. Mom.[/C]2.06870e+7[/C][/ROW] [ROW][C]FISHER beta 1[/C]0.925603[/C][C]FISHER beta 2[/C]3.603427[/C][/ROW] [ROW][C]FISHER gamma 1[/C]0.962082[/C][C]FISHER gamma 2[/C]0.603427[/C][/ROW] [ROW][C]FISHER gamma 1 (S.E.)[/C]0.129099[/C][C]FISHER gamma 2 (S.E.)[/C]0.258199[/C][/ROW] [ROW][C]FISHER Test 1[/C]7.452258[/C][C]FISHER Test 2[/C]2.337062[/C][/ROW] [ROW][C]FISHER Test 1 Probability[/C]0.000000[/C][C]FISHER Test 2 Probability[/C]0.019200[/C][/ROW] [ROW][C]Pearson 2[/C]0.728365[/C][C][/C][C][/C][/ROW] [ROW][C]Yule using Quartile definition:Weighted Average at Xnp[/C]0.157012[/C][C][/C][C][/C][/ROW] [ROW][C]Yule using Quartile definition:Weighted Average at X(n+1)p[/C]0.161658[/C][C][/C][C][/C][/ROW] [ROW][C]Yule using Quartile definition:Empirical Distribution Function[/C]0.157012[/C][C][/C][C][/C][/ROW] [ROW][C]Yule using Quartile definition:Empirical Distribution Function - Averaging[/C]0.162471[/C][C][/C][C][/C][/ROW] [ROW][C]Yule using Quartile definition:Empirical Distribution Function - Interpolation[/C]0.163289[/C][C][/C][C][/C][/ROW] [ROW][C]Yule using Quartile definition:Closest Observation[/C]0.157012[/C][C][/C][C][/C][/ROW] [ROW][C]Yule using Quartile definition:True Basic - Statistics Graphics Toolkit[/C]0.163289[/C][C][/C][C][/C][/ROW] [ROW][C]Yule using Quartile definition:MS Excel (old versions)[/C]0.160850[/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]0.966113[/C][C]Kurtosis (small sample)[/C]0.628746[/C][/ROW] [ROW][C]Skewness S.E. (small sample)[/C]0.128566[/C][C]Kurtosis S.E. (small sample)[/C]0.256434[/C][/ROW] [ROW][C]TEST 1 (small sample)[/C]7.514534[/C][C]TEST 1 (small sample)[/C]2.451880[/C][/ROW] [ROW][C]TEST 1 Prob. (small sample)[/C]0.000000[/C][C]TEST 1 Prob. (small sample)[/C]0.013800[/C][/ROW] [ROW][C]Observations[/C]360[/C][/ROW] [ROW][C] [/C][C] [/C][/ROW] [ROW][C] [/C][C] [/C][/ROW] [/TABLE] Source: https://freestatistics.org/blog/index.php?pk=100721&T=0

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=100721&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.112836.271628FISHER 4th Cent. Mom.2.06870e+7
FISHER beta 10.925603FISHER beta 23.603427
FISHER gamma 10.962082FISHER gamma 20.603427
FISHER gamma 1 (S.E.)0.129099FISHER gamma 2 (S.E.)0.258199
FISHER Test 17.452258FISHER Test 22.337062
FISHER Test 1 Probability0.000000FISHER Test 2 Probability0.019200
Pearson 20.728365
Yule using Quartile definition:Weighted Average at Xnp0.157012
Yule using Quartile definition:Weighted Average at X(n+1)p0.161658
Yule using Quartile definition:Empirical Distribution Function0.157012
Yule using Quartile definition:Empirical Distribution Function - Averaging0.162471
Yule using Quartile definition:Empirical Distribution Function - Interpolation0.163289
Yule using Quartile definition:Closest Observation0.157012
Yule using Quartile definition:True Basic - Statistics Graphics Toolkit0.163289
Yule using Quartile definition:MS Excel (old versions)0.160850
Skewness Measure (small sample)ValueKurtosis Measure (small sample)Value
Skewness (small sample)0.966113Kurtosis (small sample)0.628746
Skewness S.E. (small sample)0.128566Kurtosis S.E. (small sample)0.256434
TEST 1 (small sample)7.514534TEST 1 (small sample)2.451880
TEST 1 Prob. (small sample)0.000000TEST 1 Prob. (small sample)0.013800
Observations360






Trimmed Skewness and Kurtosis (small sample) - Ungrouped Data
Skewness Measure (small sample)ValueProbabilityKurtosis Measure (small sample)ValueProbability
Trim. Skewness (0/360)0.9661000.000000Trim. Kurtosis (0/360)0.6287000.013800
Trim. Skewness (1/360)0.9419000.000000Trim. Kurtosis (1/360)0.5523000.031600
Trim. Skewness (2/360)0.9178000.000000Trim. Kurtosis (2/360)0.4775000.062800
Trim. Skewness (3/360)0.8896000.000000Trim. Kurtosis (3/360)0.3880000.131000
Trim. Skewness (4/360)0.8723000.000000Trim. Kurtosis (4/360)0.3474000.180200
Trim. Skewness (5/360)0.8520000.000000Trim. Kurtosis (5/360)0.2953000.254200
Trim. Skewness (6/360)0.8302000.000000Trim. Kurtosis (6/360)0.2395000.357600
Trim. Skewness (7/360)0.8060000.000000Trim. Kurtosis (7/360)0.1730000.502800
Trim. Skewness (8/360)0.7805000.000000Trim. Kurtosis (8/360)0.1019000.696600
Trim. Skewness (9/360)0.7550000.000000Trim. Kurtosis (9/360)0.0302000.904400
Trim. Skewness (10/360)0.7261000.000000Trim. Kurtosis (10/360)-0.0552000.833600
Trim. Skewness (11/360)0.6938000.000000Trim. Kurtosis (11/360)-0.1540000.555200
Trim. Skewness (12/360)0.6682000.000000Trim. Kurtosis (12/360)-0.2264000.389800
Trim. Skewness (13/360)0.6472000.000000Trim. Kurtosis (13/360)-0.2787000.293800
Trim. Skewness (14/360)0.6319000.000000Trim. Kurtosis (14/360)-0.3102000.242000
Trim. Skewness (15/360)0.6201000.000000Trim. Kurtosis (15/360)-0.3299000.215000
Trim. Skewness (16/360)0.6066000.000000Trim. Kurtosis (16/360)-0.3550000.183600
Trim. Skewness (17/360)0.5935000.000000Trim. Kurtosis (17/360)-0.3777000.158600
Trim. Skewness (18/360)0.5805000.000000Trim. Kurtosis (18/360)-0.4003000.136200
Trim. Skewness (19/360)0.5665000.000000Trim. Kurtosis (19/360)-0.4259000.114200
Trim. Skewness (20/360)0.5515000.000000Trim. Kurtosis (20/360)-0.4548000.093000
Trim. Skewness (21/360)0.5365000.000000Trim. Kurtosis (21/360)-0.4834000.075000
Trim. Skewness (22/360)0.5204000.000200Trim. Kurtosis (22/360)-0.5164000.058800
Trim. Skewness (23/360)0.5020000.000200Trim. Kurtosis (23/360)-0.5560000.042400
Trim. Skewness (24/360)0.4849000.000400Trim. Kurtosis (24/360)-0.5913000.031600
Trim. Skewness (25/360)0.4687000.000600Trim. Kurtosis (25/360)-0.6244000.023200
Trim. Skewness (26/360)0.4521000.001200Trim. Kurtosis (26/360)-0.6588000.017400
Trim. Skewness (27/360)0.4364000.001600Trim. Kurtosis (27/360)-0.6903000.012800
Trim. Skewness (28/360)0.4239000.002400Trim. Kurtosis (28/360)-0.7125000.010400
Trim. Skewness (29/360)0.4101000.003400Trim. Kurtosis (29/360)-0.7392000.008000
Trim. Skewness (30/360)0.3961000.004800Trim. Kurtosis (30/360)-0.7661000.006200
Trim. Skewness (31/360)0.3819000.006800Trim. Kurtosis (31/360)-0.7937000.004800
Trim. Skewness (32/360)0.3716000.008600Trim. Kurtosis (32/360)-0.8095000.004200
Trim. Skewness (33/360)0.3604000.011000Trim. Kurtosis (33/360)-0.8282000.003400
Trim. Skewness (34/360)0.3489000.014200Trim. Kurtosis (34/360)-0.8481000.002800
Trim. Skewness (35/360)0.3383000.017800Trim. Kurtosis (35/360)-0.8659000.002400
Trim. Skewness (36/360)0.3281000.022000Trim. Kurtosis (36/360)-0.8826000.002000
Trim. Skewness (37/360)0.3191000.026400Trim. Kurtosis (37/360)-0.8971000.001800
Trim. Skewness (38/360)0.3090000.032400Trim. Kurtosis (38/360)-0.9152000.001400
Trim. Skewness (39/360)0.2988000.039400Trim. Kurtosis (39/360)-0.9340000.001200
Trim. Skewness (40/360)0.2880000.047800Trim. Kurtosis (40/360)-0.9552000.001000

\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 (0/360)0.9661000.000000 & Trim. Kurtosis (0/360)0.6287000.013800 \tabularnewline Trim. Skewness (1/360)0.9419000.000000 & Trim. Kurtosis (1/360)0.5523000.031600 \tabularnewline Trim. Skewness (2/360)0.9178000.000000 & Trim. Kurtosis (2/360)0.4775000.062800 \tabularnewline Trim. Skewness (3/360)0.8896000.000000 & Trim. Kurtosis (3/360)0.3880000.131000 \tabularnewline Trim. Skewness (4/360)0.8723000.000000 & Trim. Kurtosis (4/360)0.3474000.180200 \tabularnewline Trim. Skewness (5/360)0.8520000.000000 & Trim. Kurtosis (5/360)0.2953000.254200 \tabularnewline Trim. Skewness (6/360)0.8302000.000000 & Trim. Kurtosis (6/360)0.2395000.357600 \tabularnewline Trim. Skewness (7/360)0.8060000.000000 & Trim. Kurtosis (7/360)0.1730000.502800 \tabularnewline Trim. Skewness (8/360)0.7805000.000000 & Trim. Kurtosis (8/360)0.1019000.696600 \tabularnewline Trim. Skewness (9/360)0.7550000.000000 & Trim. Kurtosis (9/360)0.0302000.904400 \tabularnewline Trim. Skewness (10/360)0.7261000.000000 & Trim. Kurtosis (10/360)-0.0552000.833600 \tabularnewline Trim. Skewness (11/360)0.6938000.000000 & Trim. Kurtosis (11/360)-0.1540000.555200 \tabularnewline Trim. Skewness (12/360)0.6682000.000000 & Trim. Kurtosis (12/360)-0.2264000.389800 \tabularnewline Trim. Skewness (13/360)0.6472000.000000 & Trim. Kurtosis (13/360)-0.2787000.293800 \tabularnewline Trim. Skewness (14/360)0.6319000.000000 & Trim. Kurtosis (14/360)-0.3102000.242000 \tabularnewline Trim. Skewness (15/360)0.6201000.000000 & Trim. Kurtosis (15/360)-0.3299000.215000 \tabularnewline Trim. Skewness (16/360)0.6066000.000000 & Trim. Kurtosis (16/360)-0.3550000.183600 \tabularnewline Trim. Skewness (17/360)0.5935000.000000 & Trim. Kurtosis (17/360)-0.3777000.158600 \tabularnewline Trim. Skewness (18/360)0.5805000.000000 & Trim. Kurtosis (18/360)-0.4003000.136200 \tabularnewline Trim. Skewness (19/360)0.5665000.000000 & Trim. Kurtosis (19/360)-0.4259000.114200 \tabularnewline Trim. Skewness (20/360)0.5515000.000000 & Trim. Kurtosis (20/360)-0.4548000.093000 \tabularnewline Trim. Skewness (21/360)0.5365000.000000 & Trim. Kurtosis (21/360)-0.4834000.075000 \tabularnewline Trim. Skewness (22/360)0.5204000.000200 & Trim. Kurtosis (22/360)-0.5164000.058800 \tabularnewline Trim. Skewness (23/360)0.5020000.000200 & Trim. Kurtosis (23/360)-0.5560000.042400 \tabularnewline Trim. Skewness (24/360)0.4849000.000400 & Trim. Kurtosis (24/360)-0.5913000.031600 \tabularnewline Trim. Skewness (25/360)0.4687000.000600 & Trim. Kurtosis (25/360)-0.6244000.023200 \tabularnewline Trim. Skewness (26/360)0.4521000.001200 & Trim. Kurtosis (26/360)-0.6588000.017400 \tabularnewline Trim. Skewness (27/360)0.4364000.001600 & Trim. Kurtosis (27/360)-0.6903000.012800 \tabularnewline Trim. Skewness (28/360)0.4239000.002400 & Trim. Kurtosis (28/360)-0.7125000.010400 \tabularnewline Trim. Skewness (29/360)0.4101000.003400 & Trim. Kurtosis (29/360)-0.7392000.008000 \tabularnewline Trim. Skewness (30/360)0.3961000.004800 & Trim. Kurtosis (30/360)-0.7661000.006200 \tabularnewline Trim. Skewness (31/360)0.3819000.006800 & Trim. Kurtosis (31/360)-0.7937000.004800 \tabularnewline Trim. Skewness (32/360)0.3716000.008600 & Trim. Kurtosis (32/360)-0.8095000.004200 \tabularnewline Trim. Skewness (33/360)0.3604000.011000 & Trim. Kurtosis (33/360)-0.8282000.003400 \tabularnewline Trim. Skewness (34/360)0.3489000.014200 & Trim. Kurtosis (34/360)-0.8481000.002800 \tabularnewline Trim. Skewness (35/360)0.3383000.017800 & Trim. Kurtosis (35/360)-0.8659000.002400 \tabularnewline Trim. Skewness (36/360)0.3281000.022000 & Trim. Kurtosis (36/360)-0.8826000.002000 \tabularnewline Trim. Skewness (37/360)0.3191000.026400 & Trim. Kurtosis (37/360)-0.8971000.001800 \tabularnewline Trim. Skewness (38/360)0.3090000.032400 & Trim. Kurtosis (38/360)-0.9152000.001400 \tabularnewline Trim. Skewness (39/360)0.2988000.039400 & Trim. Kurtosis (39/360)-0.9340000.001200 \tabularnewline Trim. Skewness (40/360)0.2880000.047800 & Trim. Kurtosis (40/360)-0.9552000.001000 \tabularnewline \hline \end{tabular} %Source: https://freestatistics.org/blog/index.php?pk=100721&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 (0/360)[/C]0.966100[/C]0.000000[/C][C]Trim. Kurtosis (0/360)[/C]0.628700[/C]0.013800[/C][/ROW] [ROW][C]Trim. Skewness (1/360)[/C]0.941900[/C]0.000000[/C][C]Trim. Kurtosis (1/360)[/C]0.552300[/C]0.031600[/C][/ROW] [ROW][C]Trim. Skewness (2/360)[/C]0.917800[/C]0.000000[/C][C]Trim. Kurtosis (2/360)[/C]0.477500[/C]0.062800[/C][/ROW] [ROW][C]Trim. Skewness (3/360)[/C]0.889600[/C]0.000000[/C][C]Trim. Kurtosis (3/360)[/C]0.388000[/C]0.131000[/C][/ROW] [ROW][C]Trim. Skewness (4/360)[/C]0.872300[/C]0.000000[/C][C]Trim. Kurtosis (4/360)[/C]0.347400[/C]0.180200[/C][/ROW] [ROW][C]Trim. Skewness (5/360)[/C]0.852000[/C]0.000000[/C][C]Trim. Kurtosis (5/360)[/C]0.295300[/C]0.254200[/C][/ROW] [ROW][C]Trim. Skewness (6/360)[/C]0.830200[/C]0.000000[/C][C]Trim. Kurtosis (6/360)[/C]0.239500[/C]0.357600[/C][/ROW] [ROW][C]Trim. Skewness (7/360)[/C]0.806000[/C]0.000000[/C][C]Trim. Kurtosis (7/360)[/C]0.173000[/C]0.502800[/C][/ROW] [ROW][C]Trim. Skewness (8/360)[/C]0.780500[/C]0.000000[/C][C]Trim. Kurtosis (8/360)[/C]0.101900[/C]0.696600[/C][/ROW] [ROW][C]Trim. Skewness (9/360)[/C]0.755000[/C]0.000000[/C][C]Trim. Kurtosis (9/360)[/C]0.030200[/C]0.904400[/C][/ROW] [ROW][C]Trim. Skewness (10/360)[/C]0.726100[/C]0.000000[/C][C]Trim. Kurtosis (10/360)[/C]-0.055200[/C]0.833600[/C][/ROW] [ROW][C]Trim. Skewness (11/360)[/C]0.693800[/C]0.000000[/C][C]Trim. Kurtosis (11/360)[/C]-0.154000[/C]0.555200[/C][/ROW] [ROW][C]Trim. Skewness (12/360)[/C]0.668200[/C]0.000000[/C][C]Trim. Kurtosis (12/360)[/C]-0.226400[/C]0.389800[/C][/ROW] [ROW][C]Trim. Skewness (13/360)[/C]0.647200[/C]0.000000[/C][C]Trim. Kurtosis (13/360)[/C]-0.278700[/C]0.293800[/C][/ROW] [ROW][C]Trim. Skewness (14/360)[/C]0.631900[/C]0.000000[/C][C]Trim. Kurtosis (14/360)[/C]-0.310200[/C]0.242000[/C][/ROW] [ROW][C]Trim. Skewness (15/360)[/C]0.620100[/C]0.000000[/C][C]Trim. Kurtosis (15/360)[/C]-0.329900[/C]0.215000[/C][/ROW] [ROW][C]Trim. Skewness (16/360)[/C]0.606600[/C]0.000000[/C][C]Trim. Kurtosis (16/360)[/C]-0.355000[/C]0.183600[/C][/ROW] [ROW][C]Trim. Skewness (17/360)[/C]0.593500[/C]0.000000[/C][C]Trim. Kurtosis (17/360)[/C]-0.377700[/C]0.158600[/C][/ROW] [ROW][C]Trim. Skewness (18/360)[/C]0.580500[/C]0.000000[/C][C]Trim. Kurtosis (18/360)[/C]-0.400300[/C]0.136200[/C][/ROW] [ROW][C]Trim. Skewness (19/360)[/C]0.566500[/C]0.000000[/C][C]Trim. Kurtosis (19/360)[/C]-0.425900[/C]0.114200[/C][/ROW] [ROW][C]Trim. Skewness (20/360)[/C]0.551500[/C]0.000000[/C][C]Trim. Kurtosis (20/360)[/C]-0.454800[/C]0.093000[/C][/ROW] [ROW][C]Trim. Skewness (21/360)[/C]0.536500[/C]0.000000[/C][C]Trim. Kurtosis (21/360)[/C]-0.483400[/C]0.075000[/C][/ROW] [ROW][C]Trim. Skewness (22/360)[/C]0.520400[/C]0.000200[/C][C]Trim. Kurtosis (22/360)[/C]-0.516400[/C]0.058800[/C][/ROW] [ROW][C]Trim. Skewness (23/360)[/C]0.502000[/C]0.000200[/C][C]Trim. Kurtosis (23/360)[/C]-0.556000[/C]0.042400[/C][/ROW] [ROW][C]Trim. Skewness (24/360)[/C]0.484900[/C]0.000400[/C][C]Trim. Kurtosis (24/360)[/C]-0.591300[/C]0.031600[/C][/ROW] [ROW][C]Trim. Skewness (25/360)[/C]0.468700[/C]0.000600[/C][C]Trim. Kurtosis (25/360)[/C]-0.624400[/C]0.023200[/C][/ROW] [ROW][C]Trim. Skewness (26/360)[/C]0.452100[/C]0.001200[/C][C]Trim. Kurtosis (26/360)[/C]-0.658800[/C]0.017400[/C][/ROW] [ROW][C]Trim. Skewness (27/360)[/C]0.436400[/C]0.001600[/C][C]Trim. Kurtosis (27/360)[/C]-0.690300[/C]0.012800[/C][/ROW] [ROW][C]Trim. Skewness (28/360)[/C]0.423900[/C]0.002400[/C][C]Trim. Kurtosis (28/360)[/C]-0.712500[/C]0.010400[/C][/ROW] [ROW][C]Trim. Skewness (29/360)[/C]0.410100[/C]0.003400[/C][C]Trim. Kurtosis (29/360)[/C]-0.739200[/C]0.008000[/C][/ROW] [ROW][C]Trim. Skewness (30/360)[/C]0.396100[/C]0.004800[/C][C]Trim. Kurtosis (30/360)[/C]-0.766100[/C]0.006200[/C][/ROW] [ROW][C]Trim. Skewness (31/360)[/C]0.381900[/C]0.006800[/C][C]Trim. Kurtosis (31/360)[/C]-0.793700[/C]0.004800[/C][/ROW] [ROW][C]Trim. Skewness (32/360)[/C]0.371600[/C]0.008600[/C][C]Trim. Kurtosis (32/360)[/C]-0.809500[/C]0.004200[/C][/ROW] [ROW][C]Trim. Skewness (33/360)[/C]0.360400[/C]0.011000[/C][C]Trim. Kurtosis (33/360)[/C]-0.828200[/C]0.003400[/C][/ROW] [ROW][C]Trim. Skewness (34/360)[/C]0.348900[/C]0.014200[/C][C]Trim. Kurtosis (34/360)[/C]-0.848100[/C]0.002800[/C][/ROW] [ROW][C]Trim. Skewness (35/360)[/C]0.338300[/C]0.017800[/C][C]Trim. Kurtosis (35/360)[/C]-0.865900[/C]0.002400[/C][/ROW] [ROW][C]Trim. Skewness (36/360)[/C]0.328100[/C]0.022000[/C][C]Trim. Kurtosis (36/360)[/C]-0.882600[/C]0.002000[/C][/ROW] [ROW][C]Trim. Skewness (37/360)[/C]0.319100[/C]0.026400[/C][C]Trim. Kurtosis (37/360)[/C]-0.897100[/C]0.001800[/C][/ROW] [ROW][C]Trim. Skewness (38/360)[/C]0.309000[/C]0.032400[/C][C]Trim. Kurtosis (38/360)[/C]-0.915200[/C]0.001400[/C][/ROW] [ROW][C]Trim. Skewness (39/360)[/C]0.298800[/C]0.039400[/C][C]Trim. Kurtosis (39/360)[/C]-0.934000[/C]0.001200[/C][/ROW] [ROW][C]Trim. Skewness (40/360)[/C]0.288000[/C]0.047800[/C][C]Trim. Kurtosis (40/360)[/C]-0.955200[/C]0.001000[/C][/ROW] [/TABLE] Source: https://freestatistics.org/blog/index.php?pk=100721&T=1

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=100721&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 (0/360)0.9661000.000000Trim. Kurtosis (0/360)0.6287000.013800
Trim. Skewness (1/360)0.9419000.000000Trim. Kurtosis (1/360)0.5523000.031600
Trim. Skewness (2/360)0.9178000.000000Trim. Kurtosis (2/360)0.4775000.062800
Trim. Skewness (3/360)0.8896000.000000Trim. Kurtosis (3/360)0.3880000.131000
Trim. Skewness (4/360)0.8723000.000000Trim. Kurtosis (4/360)0.3474000.180200
Trim. Skewness (5/360)0.8520000.000000Trim. Kurtosis (5/360)0.2953000.254200
Trim. Skewness (6/360)0.8302000.000000Trim. Kurtosis (6/360)0.2395000.357600
Trim. Skewness (7/360)0.8060000.000000Trim. Kurtosis (7/360)0.1730000.502800
Trim. Skewness (8/360)0.7805000.000000Trim. Kurtosis (8/360)0.1019000.696600
Trim. Skewness (9/360)0.7550000.000000Trim. Kurtosis (9/360)0.0302000.904400
Trim. Skewness (10/360)0.7261000.000000Trim. Kurtosis (10/360)-0.0552000.833600
Trim. Skewness (11/360)0.6938000.000000Trim. Kurtosis (11/360)-0.1540000.555200
Trim. Skewness (12/360)0.6682000.000000Trim. Kurtosis (12/360)-0.2264000.389800
Trim. Skewness (13/360)0.6472000.000000Trim. Kurtosis (13/360)-0.2787000.293800
Trim. Skewness (14/360)0.6319000.000000Trim. Kurtosis (14/360)-0.3102000.242000
Trim. Skewness (15/360)0.6201000.000000Trim. Kurtosis (15/360)-0.3299000.215000
Trim. Skewness (16/360)0.6066000.000000Trim. Kurtosis (16/360)-0.3550000.183600
Trim. Skewness (17/360)0.5935000.000000Trim. Kurtosis (17/360)-0.3777000.158600
Trim. Skewness (18/360)0.5805000.000000Trim. Kurtosis (18/360)-0.4003000.136200
Trim. Skewness (19/360)0.5665000.000000Trim. Kurtosis (19/360)-0.4259000.114200
Trim. Skewness (20/360)0.5515000.000000Trim. Kurtosis (20/360)-0.4548000.093000
Trim. Skewness (21/360)0.5365000.000000Trim. Kurtosis (21/360)-0.4834000.075000
Trim. Skewness (22/360)0.5204000.000200Trim. Kurtosis (22/360)-0.5164000.058800
Trim. Skewness (23/360)0.5020000.000200Trim. Kurtosis (23/360)-0.5560000.042400
Trim. Skewness (24/360)0.4849000.000400Trim. Kurtosis (24/360)-0.5913000.031600
Trim. Skewness (25/360)0.4687000.000600Trim. Kurtosis (25/360)-0.6244000.023200
Trim. Skewness (26/360)0.4521000.001200Trim. Kurtosis (26/360)-0.6588000.017400
Trim. Skewness (27/360)0.4364000.001600Trim. Kurtosis (27/360)-0.6903000.012800
Trim. Skewness (28/360)0.4239000.002400Trim. Kurtosis (28/360)-0.7125000.010400
Trim. Skewness (29/360)0.4101000.003400Trim. Kurtosis (29/360)-0.7392000.008000
Trim. Skewness (30/360)0.3961000.004800Trim. Kurtosis (30/360)-0.7661000.006200
Trim. Skewness (31/360)0.3819000.006800Trim. Kurtosis (31/360)-0.7937000.004800
Trim. Skewness (32/360)0.3716000.008600Trim. Kurtosis (32/360)-0.8095000.004200
Trim. Skewness (33/360)0.3604000.011000Trim. Kurtosis (33/360)-0.8282000.003400
Trim. Skewness (34/360)0.3489000.014200Trim. Kurtosis (34/360)-0.8481000.002800
Trim. Skewness (35/360)0.3383000.017800Trim. Kurtosis (35/360)-0.8659000.002400
Trim. Skewness (36/360)0.3281000.022000Trim. Kurtosis (36/360)-0.8826000.002000
Trim. Skewness (37/360)0.3191000.026400Trim. Kurtosis (37/360)-0.8971000.001800
Trim. Skewness (38/360)0.3090000.032400Trim. Kurtosis (38/360)-0.9152000.001400
Trim. Skewness (39/360)0.2988000.039400Trim. Kurtosis (39/360)-0.9340000.001200
Trim. Skewness (40/360)0.2880000.047800Trim. Kurtosis (40/360)-0.9552000.001000


Figures (Output of Computation)

Input Parameters & R Code

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