| Central Tendency - Ungrouped Data | |||
| Measure | Value | S.E. | Value/S.E. |
| Arithmetic Mean | -1.61887283010518e-05 | 0.000613567105488939 | -0.0263846092077432 |
| Geometric Mean | NaN | ||
| Harmonic Mean | 1.59314095872071e-13 | ||
| Quadratic Mean | 0.00865544430226438 | ||
| Winsorized Mean ( 1 / 66 ) | -1.61887283010518e-05 | 0.000613567105488939 | -0.0263846092077432 |
| Winsorized Mean ( 2 / 66 ) | -1.44558618814118e-05 | 0.000613328064547284 | -0.0235695424961225 |
| Winsorized Mean ( 3 / 66 ) | -1.70551615106768e-05 | 0.000612968666109104 | -0.0278238716816255 |
| Winsorized Mean ( 4 / 66 ) | -1.70551615106768e-05 | 0.000612968666109104 | -0.0278238716816255 |
| Winsorized Mean ( 5 / 66 ) | -1.70551615106768e-05 | 0.000612968666109104 | -0.0278238716816253 |
| Winsorized Mean ( 6 / 66 ) | -1.70551615106768e-05 | 0.000612968666109104 | -0.0278238716816255 |
| Winsorized Mean ( 7 / 66 ) | -1.70551615106768e-05 | 0.000612968666109104 | -0.0278238716816255 |
| Winsorized Mean ( 8 / 66 ) | -1.70551615106768e-05 | 0.000612968666109104 | -0.0278238716816253 |
| Winsorized Mean ( 9 / 66 ) | 5.30826680366317e-06 | 0.000609933517749149 | 0.00870302524650946 |
| Winsorized Mean ( 10 / 66 ) | -1.95399868791868e-05 | 0.000606540643922569 | -0.0322154616924258 |
| Winsorized Mean ( 11 / 66 ) | -1.95399868791868e-05 | 0.000606540643922569 | -0.0322154616924258 |
| Winsorized Mean ( 12 / 66 ) | -1.95399868791868e-05 | 0.000606540643922569 | -0.0322154616924258 |
| Winsorized Mean ( 13 / 66 ) | -1.95399868791867e-05 | 0.000606540643922569 | -0.0322154616924256 |
| Winsorized Mean ( 14 / 66 ) | -1.95399868791868e-05 | 0.000606540643922569 | -0.0322154616924258 |
| Winsorized Mean ( 15 / 66 ) | -1.95399868791868e-05 | 0.000606540643922569 | -0.0322154616924258 |
| Winsorized Mean ( 16 / 66 ) | -1.95399868791868e-05 | 0.000606540643922569 | -0.0322154616924258 |
| Winsorized Mean ( 17 / 66 ) | -1.95399868762114e-05 | 0.000600929532683472 | -0.0325162699009897 |
| Winsorized Mean ( 18 / 66 ) | -1.95399868762114e-05 | 0.000600929532683472 | -0.0325162699009897 |
| Winsorized Mean ( 19 / 66 ) | -1.95399868762117e-05 | 0.000600929532683472 | -0.0325162699009902 |
| Winsorized Mean ( 20 / 66 ) | -1.95399868762117e-05 | 0.000600929532683472 | -0.0325162699009902 |
| Winsorized Mean ( 21 / 66 ) | -1.95399868792565e-05 | 0.000598364578633585 | -0.032655654390301 |
| Winsorized Mean ( 22 / 66 ) | -1.95399868792567e-05 | 0.000598364578633585 | -0.0326556543903015 |
| Winsorized Mean ( 23 / 66 ) | -1.95399868792567e-05 | 0.000598364578633585 | -0.0326556543903015 |
| Winsorized Mean ( 24 / 66 ) | -1.95399868792567e-05 | 0.000598364578633585 | -0.0326556543903015 |
| Winsorized Mean ( 25 / 66 ) | -1.95399868792565e-05 | 0.000598364578633585 | -0.032655654390301 |
| Winsorized Mean ( 26 / 66 ) | -1.95399868792565e-05 | 0.000598364578633585 | -0.032655654390301 |
| Winsorized Mean ( 27 / 66 ) | -0.000465320998277782 | 0.000541257673095319 | -0.859703282572839 |
| Winsorized Mean ( 28 / 66 ) | 0.00043006187353345 | 0.000283824800814646 | 1.51523711916319 |
| Winsorized Mean ( 29 / 66 ) | -0.000554913927661358 | 9.36403267233084e-05 | -5.92601443287396 |
| Winsorized Mean ( 30 / 66 ) | -5.09814412907876e-15 | 2.29665515247865e-15 | -2.21981263646683 |
| Winsorized Mean ( 31 / 66 ) | -5.09814412907876e-15 | 2.29665515247865e-15 | -2.21981263646683 |
| Winsorized Mean ( 32 / 66 ) | -5.09814412907876e-15 | 2.29665515247865e-15 | -2.21981263646683 |
| Winsorized Mean ( 33 / 66 ) | -5.09814412907876e-15 | 2.29665515247865e-15 | -2.21981263646683 |
| Winsorized Mean ( 34 / 66 ) | -5.09814412907876e-15 | 2.29665515247865e-15 | -2.21981263646683 |
| Winsorized Mean ( 35 / 66 ) | -5.09814412907876e-15 | 2.29665515247865e-15 | -2.21981263646683 |
| Winsorized Mean ( 36 / 66 ) | -5.09814412907876e-15 | 2.29665515247865e-15 | -2.21981263646683 |
| Winsorized Mean ( 37 / 66 ) | -7.06990022081295e-15 | 2.12613128069834e-15 | -3.32524161842481 |
| Winsorized Mean ( 38 / 66 ) | -7.06990022081295e-15 | 2.12613128069834e-15 | -3.32524161842481 |
| Winsorized Mean ( 39 / 66 ) | -7.06990022081295e-15 | 2.12613128069834e-15 | -3.32524161842481 |
| Winsorized Mean ( 40 / 66 ) | -7.06990022081295e-15 | 2.12613128069834e-15 | -3.32524161842481 |
| Winsorized Mean ( 41 / 66 ) | -7.06990022081295e-15 | 2.12613128069834e-15 | -3.32524161842481 |
| Winsorized Mean ( 42 / 66 ) | -7.06990022081295e-15 | 2.12613128069834e-15 | -3.32524161842481 |
| Winsorized Mean ( 43 / 66 ) | -7.06990022081294e-15 | 2.12613128069834e-15 | -3.32524161842481 |
| Winsorized Mean ( 44 / 66 ) | -7.06990022081295e-15 | 2.12613128069834e-15 | -3.32524161842481 |
| Winsorized Mean ( 45 / 66 ) | -7.06990022081295e-15 | 2.12613128069834e-15 | -3.32524161842481 |
| Winsorized Mean ( 46 / 66 ) | -7.06990022081295e-15 | 2.12613128069834e-15 | -3.32524161842481 |
| Winsorized Mean ( 47 / 66 ) | -5.50448575609146e-15 | 2.00025504146554e-15 | -2.75189195476715 |
| Winsorized Mean ( 48 / 66 ) | -5.50448575609146e-15 | 2.00025504146554e-15 | -2.75189195476715 |
| Winsorized Mean ( 49 / 66 ) | -5.50448575609146e-15 | 2.00025504146554e-15 | -2.75189195476715 |
| Winsorized Mean ( 50 / 66 ) | -5.50448575609146e-15 | 2.00025504146554e-15 | -2.75189195476715 |
| Winsorized Mean ( 51 / 66 ) | -5.50448575609146e-15 | 2.00025504146554e-15 | -2.75189195476715 |
| Winsorized Mean ( 52 / 66 ) | -5.50448575609146e-15 | 2.00025504146554e-15 | -2.75189195476715 |
| Winsorized Mean ( 53 / 66 ) | -5.50448575609146e-15 | 2.00025504146554e-15 | -2.75189195476715 |
| Winsorized Mean ( 54 / 66 ) | -5.50448575609146e-15 | 2.00025504146554e-15 | -2.75189195476715 |
| Winsorized Mean ( 55 / 66 ) | -5.62661028880021e-15 | 1.99041645823697e-15 | -2.82685076558503 |
| Winsorized Mean ( 56 / 66 ) | -5.62661028880021e-15 | 1.99041645823697e-15 | -2.82685076558503 |
| Winsorized Mean ( 57 / 66 ) | -5.62661028880021e-15 | 1.99041645823697e-15 | -2.82685076558503 |
| Winsorized Mean ( 58 / 66 ) | -5.62661028880021e-15 | 1.99041645823697e-15 | -2.82685076558503 |
| Winsorized Mean ( 59 / 66 ) | -5.62661028880021e-15 | 1.99041645823697e-15 | -2.82685076558503 |
| Winsorized Mean ( 60 / 66 ) | -5.62661028880021e-15 | 1.99041645823697e-15 | -2.82685076558503 |
| Winsorized Mean ( 61 / 66 ) | -5.62661028880021e-15 | 1.99041645823697e-15 | -2.82685076558503 |
| Winsorized Mean ( 62 / 66 ) | -5.62661028880021e-15 | 1.99041645823697e-15 | -2.82685076558503 |
| Winsorized Mean ( 63 / 66 ) | -5.62661028880021e-15 | 1.99041645823697e-15 | -2.82685076558503 |
| Winsorized Mean ( 64 / 66 ) | -5.62661028880021e-15 | 1.99041645823697e-15 | -2.82685076558503 |
| Winsorized Mean ( 65 / 66 ) | -5.62661028880021e-15 | 1.99041645823697e-15 | -2.82685076558503 |
| Winsorized Mean ( 66 / 66 ) | -5.62661028880021e-15 | 1.99041645823697e-15 | -2.82685076558503 |
| Trimmed Mean ( 1 / 66 ) | -1.63522508090220e-05 | 0.000607791817057613 | -0.0269043615759506 |
| Trimmed Mean ( 2 / 66 ) | -1.65191105110324e-05 | 0.00060165461209918 | -0.0274561354285926 |
| Trimmed Mean ( 3 / 66 ) | -1.75826407324864e-05 | 0.00059525970171727 | -0.0295377642426693 |
| Trimmed Mean ( 4 / 66 ) | -1.77657932400591e-05 | 0.000588590697050157 | -0.0301836120229152 |
| Trimmed Mean ( 5 / 66 ) | -1.79528015898966e-05 | 0.000581489382940065 | -0.0308738252435936 |
| Trimmed Mean ( 6 / 66 ) | -1.81437888407944e-05 | 0.000573921201943927 | -0.0316137281204104 |
| Trimmed Mean ( 7 / 66 ) | -1.83388833443997e-05 | 0.000565847529261499 | -0.0324095845542248 |
| Trimmed Mean ( 8 / 66 ) | -1.85382190328660e-05 | 0.000557224979010552 | -0.0332688227038634 |
| Trimmed Mean ( 9 / 66 ) | -1.87419357254744e-05 | 0.000548004547323641 | -0.0342003288421726 |
| Trimmed Mean ( 10 / 66 ) | -2.17110965315408e-05 | 0.000538603255280199 | -0.0403099987211291 |
| Trimmed Mean ( 11 / 66 ) | -2.19550414362997e-05 | 0.000529018408045093 | -0.0415014697077011 |
| Trimmed Mean ( 12 / 66 ) | -2.22045305434395e-05 | 0.000518732120687976 | -0.0428053896373148 |
| Trimmed Mean ( 13 / 66 ) | -2.24597550323526e-05 | 0.000507672493615008 | -0.0442406380389497 |
| Trimmed Mean ( 14 / 66 ) | -2.27209149744962e-05 | 0.000495755889997604 | -0.045830852306376 |
| Trimmed Mean ( 15 / 66 ) | -2.29882198564549e-05 | 0.000482884021805075 | -0.0476060892852126 |
| Trimmed Mean ( 16 / 66 ) | -2.32618891403651e-05 | 0.000468940008204605 | -0.0496052559674449 |
| Trimmed Mean ( 17 / 66 ) | -2.35421528648514e-05 | 0.000453782917540264 | -0.0518797688385053 |
| Trimmed Mean ( 18 / 66 ) | -2.38292522901484e-05 | 0.000437918018787326 | -0.0544148705187695 |
| Trimmed Mean ( 19 / 66 ) | -2.41234405901441e-05 | 0.000420543899177126 | -0.0573624790119324 |
| Trimmed Mean ( 20 / 66 ) | -2.44249835976397e-05 | 0.000401408841273203 | -0.060848145546988 |
| Trimmed Mean ( 21 / 66 ) | -2.4734160605325e-05 | 0.000380184084047266 | -0.065058379987969 |
| Trimmed Mean ( 22 / 66 ) | -2.50512652284061e-05 | 0.000356762747842267 | -0.0702182763753177 |
| Trimmed Mean ( 23 / 66 ) | -2.53766063352036e-05 | 0.000330249713540151 | -0.0768406611566018 |
| Trimmed Mean ( 24 / 66 ) | -2.57105090500747e-05 | 0.000299729089307711 | -0.0857791584709333 |
| Trimmed Mean ( 25 / 66 ) | -2.60533158373423e-05 | 0.000263695578927215 | -0.0988007305368346 |
| Trimmed Mean ( 26 / 66 ) | -2.64053876729145e-05 | 0.000219297835937683 | -0.120408792727066 |
| Trimmed Mean ( 27 / 66 ) | -2.67671053122011e-05 | 0.000159481302089186 | -0.167838517503652 |
| Trimmed Mean ( 28 / 66 ) | -4.20774867816912e-06 | 7.7925866175952e-05 | -0.0539968162646826 |
| Trimmed Mean ( 29 / 66 ) | -4.20774867816912e-06 | 2.6052297073323e-05 | -0.161511618968823 |
| Trimmed Mean ( 30 / 66 ) | -6.14111935906944e-15 | 2.41585878776437e-15 | -2.54200261628389 |
| Trimmed Mean ( 31 / 66 ) | -6.19150463588059e-15 | 2.41601139354947e-15 | -2.56269678711423 |
| Trimmed Mean ( 32 / 66 ) | -6.24337183259794e-15 | 2.41563861412803e-15 | -2.58456368269788 |
| Trimmed Mean ( 33 / 66 ) | -6.29678730384417e-15 | 2.41469202280261e-15 | -2.60769789454799 |
| Trimmed Mean ( 34 / 66 ) | -6.35182142573423e-15 | 2.41311825501298e-15 | -2.63220478836420 |
| Trimmed Mean ( 35 / 66 ) | -6.4085489052209e-15 | 2.41085839647873e-15 | -2.65820212194177 |
| Trimmed Mean ( 36 / 66 ) | -6.46704911844153e-15 | 2.40784727833123e-15 | -2.68582196912569 |
| Trimmed Mean ( 37 / 66 ) | -6.52740648128821e-15 | 2.40401266197768e-15 | -2.71521302051645 |
| Trimmed Mean ( 38 / 66 ) | -6.50375810554607e-15 | 2.41046769740441e-15 | -2.69813120190299 |
| Trimmed Mean ( 39 / 66 ) | -6.47933437322222e-15 | 2.41668235899261e-15 | -2.68108646927151 |
| Trimmed Mean ( 40 / 66 ) | -6.45409651648758e-15 | 2.42262507313045e-15 | -2.66409218168776 |
| Trimmed Mean ( 41 / 66 ) | -6.42800313918565e-15 | 2.42826067598474e-15 | -2.64716354498426 |
| Trimmed Mean ( 42 / 66 ) | -6.40100999025263e-15 | 2.43354994931959e-15 | -2.63031789918359 |
| Trimmed Mean ( 43 / 66 ) | -6.37306971328687e-15 | 2.43844908561233e-15 | -2.61357505920059 |
| Trimmed Mean ( 44 / 66 ) | -6.34413156928662e-15 | 2.44290906974321e-15 | -2.59695772055629 |
| Trimmed Mean ( 45 / 66 ) | -6.3141411291409e-15 | 2.44687496184112e-15 | -2.58049194487237 |
| Trimmed Mean ( 46 / 66 ) | -6.28303993195275e-15 | 2.45028506250609e-15 | -2.56420774386414 |
| Trimmed Mean ( 47 / 66 ) | -6.25076510468203e-15 | 2.45306993740798e-15 | -2.54813978572778 |
| Trimmed Mean ( 48 / 66 ) | -6.28130026624465e-15 | 2.46350884239426e-15 | -2.5497372520652 |
| Trimmed Mean ( 49 / 66 ) | -6.31303288512346e-15 | 2.47378095298204e-15 | -2.55197731937961 |
| Trimmed Mean ( 50 / 66 ) | -6.34603480875742e-15 | 2.48384815436793e-15 | -2.55492059673524 |
| Trimmed Mean ( 51 / 66 ) | -6.38038374968256e-15 | 2.49366686051896e-15 | -2.55863517725649 |
| Trimmed Mean ( 52 / 66 ) | -6.41616389647958e-15 | 2.50318715802167e-15 | -2.56319783197930 |
| Trimmed Mean ( 53 / 66 ) | -6.45346660271478e-15 | 2.5123517945279e-15 | -2.56869544176533 |
| Trimmed Mean ( 54 / 66 ) | -6.4923911657428e-15 | 2.52109497875718e-15 | -2.57522672507298 |
| Trimmed Mean ( 55 / 66 ) | -6.53304570934986e-15 | 2.52934095079718e-15 | -2.58290433612393 |
| Trimmed Mean ( 56 / 66 ) | -6.57050171846348e-15 | 2.53775657857618e-15 | -2.58909848719607 |
| Trimmed Mean ( 57 / 66 ) | -6.57050171846348e-15 | 2.54555519369909e-15 | -2.58116647194576 |
| Trimmed Mean ( 58 / 66 ) | -6.60969986753587e-15 | 2.55262771752861e-15 | -2.58937087541117 |
| Trimmed Mean ( 59 / 66 ) | -6.69383248017906e-15 | 2.55884715326454e-15 | -2.61595635817449 |
| Trimmed Mean ( 60 / 66 ) | -6.73905375947478e-15 | 2.56406515715611e-15 | -2.62826930925160 |
| Trimmed Mean ( 61 / 66 ) | -6.78659407873437e-15 | 2.5681078210206e-15 | -2.64264374851571 |
| Trimmed Mean ( 62 / 66 ) | -6.83663652006026e-15 | 2.57077044722537e-15 | -2.65937261237736 |
| Trimmed Mean ( 63 / 66 ) | -6.88938395821458e-15 | 2.57181102420605e-15 | -2.6788064493741 |
| Trimmed Mean ( 64 / 66 ) | -6.9450618095997e-15 | 2.57094200823772e-15 | -2.70136852070042 |
| Trimmed Mean ( 65 / 66 ) | -7.00392125249253e-15 | 2.56781987154629e-15 | -2.72757498689926 |
| Trimmed Mean ( 66 / 66 ) | -7.06624301555553e-15 | 2.56203166597014e-15 | -2.75806232585334 |
| Median | -1.7763568394003e-14 | ||
| Midrange | -1.20008170068076e-14 | ||
| Midmean - Weighted Average at Xnp | -3.41489288953668e-15 | ||
| Midmean - Weighted Average at X(n+1)p | -3.41489288953668e-15 | ||
| Midmean - Empirical Distribution Function | -3.41489288953668e-15 | ||
| Midmean - Empirical Distribution Function - Averaging | -3.41489288953668e-15 | ||
| Midmean - Empirical Distribution Function - Interpolation | -3.41489288953668e-15 | ||
| Midmean - Closest Observation | -3.41489288953668e-15 | ||
| Midmean - True Basic - Statistics Graphics Toolkit | -3.41489288953668e-15 | ||
| Midmean - MS Excel (old versions) | -3.41489288953668e-15 | ||
| Number of observations | 200 | ||
