| Central Tendency - Ungrouped Data | |||
| Measure | Value | S.E. | Value/S.E. |
| Arithmetic Mean | -0.000166711983576282 | 0.000441915484534445 | -0.377248567680112 |
| Geometric Mean | NaN | ||
| Harmonic Mean | -1.97281723523094e-13 | ||
| Quadratic Mean | 0.00623621381001801 | ||
| Winsorized Mean ( 1 / 66 ) | -0.000245714178302282 | 0.000416067402428724 | -0.590563396382333 |
| Winsorized Mean ( 2 / 66 ) | -8.77097888504521e-05 | 0.000359652412913997 | -0.243873767284931 |
| Winsorized Mean ( 3 / 66 ) | -0.000114387124779762 | 0.000334938522988833 | -0.341516776747642 |
| Winsorized Mean ( 4 / 66 ) | -0.000106596241143282 | 0.000283307688281284 | -0.37625608323572 |
| Winsorized Mean ( 5 / 66 ) | -0.000189221361781440 | 0.000268172310918283 | -0.705596193482849 |
| Winsorized Mean ( 6 / 66 ) | -5.52605845621496e-05 | 0.000242467328649391 | -0.227909404825656 |
| Winsorized Mean ( 7 / 66 ) | -5.7774151453324e-05 | 0.000242127746100323 | -0.238610206322186 |
| Winsorized Mean ( 8 / 66 ) | -4.863053285118e-05 | 0.000240880684302308 | -0.201886394469671 |
| Winsorized Mean ( 9 / 66 ) | -4.6426102482069e-05 | 0.000240309449932244 | -0.193192995511242 |
| Winsorized Mean ( 10 / 66 ) | -4.64261024820690e-05 | 0.000240309449932244 | -0.193192995511242 |
| Winsorized Mean ( 11 / 66 ) | -4.51705154352725e-05 | 0.000240142287649143 | -0.188098963649702 |
| Winsorized Mean ( 12 / 66 ) | -4.51705154352725e-05 | 0.000240142287649143 | -0.188098963649702 |
| Winsorized Mean ( 13 / 66 ) | -4.51705154352726e-05 | 0.000240142287649143 | -0.188098963649703 |
| Winsorized Mean ( 14 / 66 ) | -4.51705154352725e-05 | 0.000240142287649143 | -0.188098963649702 |
| Winsorized Mean ( 15 / 66 ) | -4.51705154352725e-05 | 0.000240142287649143 | -0.188098963649702 |
| Winsorized Mean ( 16 / 66 ) | -4.51705154352725e-05 | 0.000240142287649143 | -0.188098963649702 |
| Winsorized Mean ( 17 / 66 ) | -4.53638021726241e-05 | 0.000240116226533337 | -0.188924350626199 |
| Winsorized Mean ( 18 / 66 ) | -9.22287093661162e-05 | 0.000233951277417707 | -0.394221866980648 |
| Winsorized Mean ( 19 / 66 ) | -9.20126830169565e-05 | 0.000233922016790106 | -0.393347681759762 |
| Winsorized Mean ( 20 / 66 ) | -3.99405639185466e-05 | 0.000227030187625529 | -0.175926225213829 |
| Winsorized Mean ( 21 / 66 ) | -3.99405639185466e-05 | 0.000227030187625529 | -0.175926225213828 |
| Winsorized Mean ( 22 / 66 ) | -3.99405639185466e-05 | 0.000227030187625529 | -0.175926225213828 |
| Winsorized Mean ( 23 / 66 ) | -3.99405639185466e-05 | 0.000227030187625529 | -0.175926225213828 |
| Winsorized Mean ( 24 / 66 ) | -3.99405639185466e-05 | 0.000227030187625529 | -0.175926225213828 |
| Winsorized Mean ( 25 / 66 ) | -3.99405639185466e-05 | 0.000227030187625529 | -0.175926225213828 |
| Winsorized Mean ( 26 / 66 ) | -3.99405639185466e-05 | 0.000227030187625529 | -0.175926225213828 |
| Winsorized Mean ( 27 / 66 ) | -3.99405639185466e-05 | 0.000227030187625529 | -0.175926225213828 |
| Winsorized Mean ( 28 / 66 ) | -8.69397861304466e-05 | 0.000220944624004965 | -0.393491294581093 |
| Winsorized Mean ( 29 / 66 ) | -0.000633128082807472 | 0.000163606089741262 | -3.86983200814067 |
| Winsorized Mean ( 30 / 66 ) | -0.000550231319738137 | 0.000102219161079201 | -5.38285888799076 |
| Winsorized Mean ( 31 / 66 ) | -3.74589248508516e-15 | 2.20324421892674e-15 | -1.70017125333019 |
| Winsorized Mean ( 32 / 66 ) | -3.74589248508516e-15 | 2.20324421892674e-15 | -1.70017125333019 |
| Winsorized Mean ( 33 / 66 ) | -3.74589248508516e-15 | 2.20324421892674e-15 | -1.70017125333019 |
| Winsorized Mean ( 34 / 66 ) | -3.74589248508516e-15 | 2.20324421892674e-15 | -1.70017125333018 |
| Winsorized Mean ( 35 / 66 ) | -3.74589248508516e-15 | 2.20324421892674e-15 | -1.70017125333018 |
| Winsorized Mean ( 36 / 66 ) | -3.74589248508516e-15 | 2.20324421892674e-15 | -1.70017125333018 |
| Winsorized Mean ( 37 / 66 ) | -3.74589248508516e-15 | 2.20324421892674e-15 | -1.70017125333019 |
| Winsorized Mean ( 38 / 66 ) | -3.74589248508516e-15 | 2.20324421892674e-15 | -1.70017125333019 |
| Winsorized Mean ( 39 / 66 ) | -3.74589248508516e-15 | 2.20324421892674e-15 | -1.70017125333019 |
| Winsorized Mean ( 40 / 66 ) | -3.74589248508516e-15 | 2.20324421892674e-15 | -1.70017125333019 |
| Winsorized Mean ( 41 / 66 ) | -3.74589248508516e-15 | 2.20324421892674e-15 | -1.70017125333019 |
| Winsorized Mean ( 42 / 66 ) | -4.58522109170166e-15 | 2.12898336511452e-15 | -2.15371391192388 |
| Winsorized Mean ( 43 / 66 ) | -4.58522109170166e-15 | 2.12898336511452e-15 | -2.15371391192388 |
| Winsorized Mean ( 44 / 66 ) | -4.58522109170166e-15 | 2.12898336511452e-15 | -2.15371391192388 |
| Winsorized Mean ( 45 / 66 ) | -4.58522109170166e-15 | 2.12898336511452e-15 | -2.15371391192388 |
| Winsorized Mean ( 46 / 66 ) | -4.58522109170166e-15 | 2.12898336511452e-15 | -2.15371391192388 |
| Winsorized Mean ( 47 / 66 ) | -4.58522109170166e-15 | 2.12898336511452e-15 | -2.15371391192388 |
| Winsorized Mean ( 48 / 66 ) | -9.61453139325177e-16 | 1.81415631926426e-15 | -0.529972598896604 |
| Winsorized Mean ( 49 / 66 ) | -9.61453139325178e-16 | 1.81415631926426e-15 | -0.529972598896605 |
| Winsorized Mean ( 50 / 66 ) | -9.61453139325178e-16 | 1.81415631926426e-15 | -0.529972598896605 |
| Winsorized Mean ( 51 / 66 ) | -9.61453139325178e-16 | 1.81415631926426e-15 | -0.529972598896605 |
| Winsorized Mean ( 52 / 66 ) | -9.61453139325177e-16 | 1.81415631926426e-15 | -0.529972598896604 |
| Winsorized Mean ( 53 / 66 ) | -9.61453139325177e-16 | 1.81415631926426e-15 | -0.529972598896604 |
| Winsorized Mean ( 54 / 66 ) | -9.61453139325178e-16 | 1.81415631926426e-15 | -0.529972598896605 |
| Winsorized Mean ( 55 / 66 ) | -3.50830475781426e-16 | 1.76695528977598e-15 | -0.198550850613717 |
| Winsorized Mean ( 56 / 66 ) | -3.50830475781428e-16 | 1.76695528977598e-15 | -0.198550850613718 |
| Winsorized Mean ( 57 / 66 ) | -3.50830475781428e-16 | 1.76695528977598e-15 | -0.198550850613718 |
| Winsorized Mean ( 58 / 66 ) | -3.50830475781426e-16 | 1.76695528977598e-15 | -0.198550850613717 |
| Winsorized Mean ( 59 / 66 ) | -2.05391259555647e-15 | 1.61358962144812e-15 | -1.27288411393795 |
| Winsorized Mean ( 60 / 66 ) | -2.05391259555647e-15 | 1.61358962144812e-15 | -1.27288411393795 |
| Winsorized Mean ( 61 / 66 ) | -2.05391259555647e-15 | 1.61358962144812e-15 | -1.27288411393795 |
| Winsorized Mean ( 62 / 66 ) | -2.05391259555647e-15 | 1.61358962144812e-15 | -1.27288411393795 |
| Winsorized Mean ( 63 / 66 ) | -2.05391259555647e-15 | 1.61358962144812e-15 | -1.27288411393795 |
| Winsorized Mean ( 64 / 66 ) | -4.46975789714079e-15 | 1.40711135225717e-15 | -3.17654881397324 |
| Winsorized Mean ( 65 / 66 ) | -4.46975789714079e-15 | 1.40711135225717e-15 | -3.17654881397324 |
| Winsorized Mean ( 66 / 66 ) | -7.10764780365012e-15 | 1.19915449738295e-15 | -5.92721606695546 |
| Trimmed Mean ( 1 / 66 ) | -0.000168395943006234 | 0.000366316743051846 | -0.459700371878445 |
| Trimmed Mean ( 2 / 66 ) | -8.94997845408796e-05 | 0.000305881397963237 | -0.292596362959072 |
| Trimmed Mean ( 3 / 66 ) | -9.04224627318217e-05 | 0.000272971330959362 | -0.331252598630158 |
| Trimmed Mean ( 4 / 66 ) | -8.21013995207313e-05 | 0.000246681076026229 | -0.332824069212353 |
| Trimmed Mean ( 5 / 66 ) | -7.56553885674285e-05 | 0.000235452721474525 | -0.321318811240048 |
| Trimmed Mean ( 6 / 66 ) | -5.14924155431708e-05 | 0.000227269248752873 | -0.226570096155694 |
| Trimmed Mean ( 7 / 66 ) | -5.08171164358269e-05 | 0.000224127281023970 | -0.226733292813168 |
| Trimmed Mean ( 8 / 66 ) | -4.97368314952218e-05 | 0.000220834954931949 | -0.225221734079862 |
| Trimmed Mean ( 9 / 66 ) | -4.98887955946781e-05 | 0.000217524708128046 | -0.229347718813216 |
| Trimmed Mean ( 10 / 66 ) | -5.03162885715434e-05 | 0.000214071241663484 | -0.235044596278091 |
| Trimmed Mean ( 11 / 66 ) | -5.07533881321585e-05 | 0.000210372101154148 | -0.241255317856856 |
| Trimmed Mean ( 12 / 66 ) | -5.13301311793574e-05 | 0.000206426471013753 | -0.248660605043903 |
| Trimmed Mean ( 13 / 66 ) | -5.19201326874116e-05 | 0.000202186356927537 | -0.256793452715604 |
| Trimmed Mean ( 14 / 66 ) | -5.25238551607692e-05 | 0.000197620525414127 | -0.265781375951218 |
| Trimmed Mean ( 15 / 66 ) | -5.31417828687942e-05 | 0.000192692417269492 | -0.275785542689374 |
| Trimmed Mean ( 16 / 66 ) | -5.37744231412959e-05 | 0.000187358758551205 | -0.28701312688619 |
| Trimmed Mean ( 17 / 66 ) | -5.44223077577133e-05 | 0.000181567654840069 | -0.299735698000012 |
| Trimmed Mean ( 18 / 66 ) | -5.50721288183367e-05 | 0.000175259040393152 | -0.314232741973226 |
| Trimmed Mean ( 19 / 66 ) | -5.25236665036741e-05 | 0.000169084330572311 | -0.310635919519531 |
| Trimmed Mean ( 20 / 66 ) | -4.99257048909582e-05 | 0.00016231872191407 | -0.307578228205791 |
| Trimmed Mean ( 21 / 66 ) | -5.05576758385792e-05 | 0.000155681956313982 | -0.324749746442121 |
| Trimmed Mean ( 22 / 66 ) | -5.12058511694725e-05 | 0.000148352199761094 | -0.345164084199184 |
| Trimmed Mean ( 23 / 66 ) | -5.18708622232462e-05 | 0.000140195374296766 | -0.369989826579055 |
| Trimmed Mean ( 24 / 66 ) | -5.25533735679086e-05 | 0.000131027965176995 | -0.401085169085230 |
| Trimmed Mean ( 25 / 66 ) | -5.32540852150954e-05 | 0.000120585765237779 | -0.441628289293395 |
| Trimmed Mean ( 26 / 66 ) | -5.39737350149089e-05 | 0.000108460753401749 | -0.497633782931464 |
| Trimmed Mean ( 27 / 66 ) | -5.47131012475939e-05 | 9.39536684112853e-05 | -0.582341298352349 |
| Trimmed Mean ( 28 / 66 ) | -5.54730054311869e-05 | 7.56400915927102e-05 | -0.733380992316687 |
| Trimmed Mean ( 29 / 66 ) | -5.54730054311869e-05 | 5.12683089426565e-05 | -1.08201355916056 |
| Trimmed Mean ( 30 / 66 ) | -2.53562820189529e-05 | 2.80196843425693e-05 | -0.904945313050157 |
| Trimmed Mean ( 31 / 66 ) | -3.53340545228515e-15 | 2.21832098446478e-15 | -1.59282875518470 |
| Trimmed Mean ( 32 / 66 ) | -3.52332542226617e-15 | 2.21162512343967e-15 | -1.59309341575323 |
| Trimmed Mean ( 33 / 66 ) | -3.51294449582872e-15 | 2.2040013607257e-15 | -1.59389397775691 |
| Trimmed Mean ( 34 / 66 ) | -3.50224899586286e-15 | 2.19536559397575e-15 | -1.59529192106923 |
| Trimmed Mean ( 35 / 66 ) | -3.49122440359036e-15 | 2.1856243702037e-15 | -1.59735792260816 |
| Trimmed Mean ( 36 / 66 ) | -3.47985529280934e-15 | 2.17467354982718e-15 | -1.60017364127406 |
| Trimmed Mean ( 37 / 66 ) | -3.46812525787654e-15 | 2.16239672578734e-15 | -1.60383393875783 |
| Trimmed Mean ( 38 / 66 ) | -3.45601683472011e-15 | 2.14866334087697e-15 | -1.60844966680985 |
| Trimmed Mean ( 39 / 66 ) | -3.44351141408314e-15 | 2.13332642997437e-15 | -1.61415119866326 |
| Trimmed Mean ( 40 / 66 ) | -3.43058914609160e-15 | 2.11621989164265e-15 | -1.62109294957468 |
| Trimmed Mean ( 41 / 66 ) | -3.41722883511729e-15 | 2.09715516304719e-15 | -1.62945922902148 |
| Trimmed Mean ( 42 / 66 ) | -3.40340782376456e-15 | 2.07591712966152e-15 | -1.63947191105817 |
| Trimmed Mean ( 43 / 66 ) | -3.35404219018323e-15 | 2.05789706043149e-15 | -1.62983963322246 |
| Trimmed Mean ( 44 / 66 ) | -3.30291349825971e-15 | 2.03770374409231e-15 | -1.62089975436100 |
| Trimmed Mean ( 45 / 66 ) | -3.24992558117533e-15 | 2.01508285983192e-15 | -1.61279997262565 |
| Trimmed Mean ( 46 / 66 ) | -3.19497514864338e-15 | 1.98973999146359e-15 | -1.60572495016962 |
| Trimmed Mean ( 47 / 66 ) | -3.13795111488382e-15 | 1.96133188263204e-15 | -1.59990827797731 |
| Trimmed Mean ( 48 / 66 ) | -3.07873384905657e-15 | 1.92945508781351e-15 | -1.59564939785432 |
| Trimmed Mean ( 49 / 66 ) | -3.1652240741273e-15 | 1.91958912630497e-15 | -1.64890706597201 |
| Trimmed Mean ( 50 / 66 ) | -3.25517390820085e-15 | 1.90803439929037e-15 | -1.70603523155112 |
| Trimmed Mean ( 51 / 66 ) | -3.34879516407333e-15 | 1.89457744298833e-15 | -1.76756837070289 |
| Trimmed Mean ( 52 / 66 ) | -3.44631730560716e-15 | 1.87897066340832e-15 | -1.83415173675771 |
| Trimmed Mean ( 53 / 66 ) | -3.54798932550413e-15 | 1.86092511508746e-15 | -1.9065728635391 |
| Trimmed Mean ( 54 / 66 ) | -3.65408186800532e-15 | 1.84010125762304e-15 | -1.98580477724661 |
| Trimmed Mean ( 55 / 66 ) | -3.76488963461767e-15 | 1.81609694973120e-15 | -2.07306643798665 |
| Trimmed Mean ( 56 / 66 ) | -3.90596645936297e-15 | 1.79236897186744e-15 | -2.17922008284567 |
| Trimmed Mean ( 57 / 66 ) | -3.90596645936297e-15 | 1.76486502878265e-15 | -2.21318140235188 |
| Trimmed Mean ( 58 / 66 ) | -4.05360499688712e-15 | 1.73296702061808e-15 | -2.33911260206289 |
| Trimmed Mean ( 59 / 66 ) | -4.3704877115731e-15 | 1.69591503427617e-15 | -2.57706761437991 |
| Trimmed Mean ( 60 / 66 ) | -4.46864767411618e-15 | 1.67122364784683e-15 | -2.67387771820575 |
| Trimmed Mean ( 61 / 66 ) | -4.57184148089224e-15 | 1.64227131742060e-15 | -2.78385272420936 |
| Trimmed Mean ( 62 / 66 ) | -4.68046654065651e-15 | 1.60828936848847e-15 | -2.91021418928821 |
| Trimmed Mean ( 63 / 66 ) | -4.7949632252729e-15 | 1.56831219876659e-15 | -3.05740351254292 |
| Trimmed Mean ( 64 / 66 ) | -4.91582083681242e-15 | 1.52110316405886e-15 | -3.23174716414053 |
| Trimmed Mean ( 65 / 66 ) | -4.93573436090491e-15 | 1.49400369802698e-15 | -3.30369621402086 |
| Trimmed Mean ( 66 / 66 ) | -4.95681926876754e-15 | 1.46165511961144e-15 | -3.39123723665075 |
| Median | -1.1990408665952e-14 | ||
| Midrange | -1.10016162846449e-14 | ||
| Midmean - Weighted Average at Xnp | -1.16674346951505e-15 | ||
| Midmean - Weighted Average at X(n+1)p | -1.16674346951505e-15 | ||
| Midmean - Empirical Distribution Function | -1.16674346951505e-15 | ||
| Midmean - Empirical Distribution Function - Averaging | -1.16674346951505e-15 | ||
| Midmean - Empirical Distribution Function - Interpolation | -1.16674346951505e-15 | ||
| Midmean - Closest Observation | -1.16674346951505e-15 | ||
| Midmean - True Basic - Statistics Graphics Toolkit | -1.16674346951505e-15 | ||
| Midmean - MS Excel (old versions) | -1.16674346951505e-15 | ||
| Number of observations | 200 | ||
