| Central Tendency - Ungrouped Data | |||
| Measure | Value | S.E. | Value/S.E. |
| Arithmetic Mean | -3.0713737046503e-05 | 0.000845800934981046 | -0.0363131982671446 |
| Geometric Mean | NaN | ||
| Harmonic Mean | -3.27027139976659e-14 | ||
| Quadratic Mean | 0.0119315300123241 | ||
| Winsorized Mean ( 1 / 66 ) | -3.0713737046503e-05 | 0.000845800934981046 | -0.0363131982671446 |
| Winsorized Mean ( 2 / 66 ) | -3.0713737046503e-05 | 0.000845800934981046 | -0.0363131982671446 |
| Winsorized Mean ( 3 / 66 ) | -3.0713737046503e-05 | 0.000845800934981046 | -0.0363131982671446 |
| Winsorized Mean ( 4 / 66 ) | -3.0713737046503e-05 | 0.000845800934981046 | -0.0363131982671446 |
| Winsorized Mean ( 5 / 66 ) | -3.0713737046503e-05 | 0.000845800934981046 | -0.0363131982671446 |
| Winsorized Mean ( 6 / 66 ) | -3.0713737046503e-05 | 0.000845800934981046 | -0.0363131982671446 |
| Winsorized Mean ( 7 / 66 ) | -3.07137370487079e-05 | 0.00083965158079259 | -0.0365791451493673 |
| Winsorized Mean ( 8 / 66 ) | -3.07137370487079e-05 | 0.00083965158079259 | -0.0365791451493673 |
| Winsorized Mean ( 9 / 66 ) | -3.07137370487080e-05 | 0.00083965158079259 | -0.0365791451493675 |
| Winsorized Mean ( 10 / 66 ) | -3.07137370487079e-05 | 0.00083965158079259 | -0.0365791451493673 |
| Winsorized Mean ( 11 / 66 ) | -3.07137370487079e-05 | 0.00083965158079259 | -0.0365791451493673 |
| Winsorized Mean ( 12 / 66 ) | -3.07137370487079e-05 | 0.00083965158079259 | -0.0365791451493673 |
| Winsorized Mean ( 13 / 66 ) | -3.07137370487082e-05 | 0.00083965158079259 | -0.0365791451493677 |
| Winsorized Mean ( 14 / 66 ) | -3.07137370487079e-05 | 0.00083965158079259 | -0.0365791451493673 |
| Winsorized Mean ( 15 / 66 ) | -3.07137370487079e-05 | 0.00083965158079259 | -0.0365791451493673 |
| Winsorized Mean ( 16 / 66 ) | -3.07137370487079e-05 | 0.00083965158079259 | -0.0365791451493673 |
| Winsorized Mean ( 17 / 66 ) | -3.07137370487079e-05 | 0.00083965158079259 | -0.0365791451493673 |
| Winsorized Mean ( 18 / 66 ) | -3.07137370487082e-05 | 0.00083965158079259 | -0.0365791451493677 |
| Winsorized Mean ( 19 / 66 ) | -3.07137370487076e-05 | 0.00083965158079259 | -0.036579145149367 |
| Winsorized Mean ( 20 / 66 ) | -0.000644988477982336 | 0.000133488018499891 | -4.83180801715821 |
| Winsorized Mean ( 21 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 22 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 23 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 24 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 25 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437772 |
| Winsorized Mean ( 26 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 27 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 28 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 29 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437772 |
| Winsorized Mean ( 30 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437772 |
| Winsorized Mean ( 31 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 32 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 33 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437772 |
| Winsorized Mean ( 34 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 35 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 36 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 37 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437772 |
| Winsorized Mean ( 38 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437772 |
| Winsorized Mean ( 39 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 40 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 41 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 42 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437772 |
| Winsorized Mean ( 43 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 44 / 66 ) | 2.40474307133802e-15 | 1.91385850846780e-15 | 1.25648947437771 |
| Winsorized Mean ( 45 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 46 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 47 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 48 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 49 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 50 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 51 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 52 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 53 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 54 / 66 ) | -7.08766378920713e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 55 / 66 ) | -7.08766378920713e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 56 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 57 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 58 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 59 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 60 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 61 / 66 ) | -7.08766378920713e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 62 / 66 ) | -7.08766378920713e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 63 / 66 ) | -7.08766378920713e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 64 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 65 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Winsorized Mean ( 66 / 66 ) | -7.08766378920712e-15 | 9.5846992528132e-16 | -7.39476910256399 |
| Trimmed Mean ( 1 / 66 ) | -3.10239768148667e-05 | 0.00083217208232862 | -0.037280722910163 |
| Trimmed Mean ( 2 / 66 ) | -3.13405480070745e-05 | 0.000817649793519687 | -0.0383300384290012 |
| Trimmed Mean ( 3 / 66 ) | -3.16636464403588e-05 | 0.000802152319055892 | -0.0394733589720539 |
| Trimmed Mean ( 4 / 66 ) | -3.19934760910031e-05 | 0.000785586080221846 | -0.040725614794458 |
| Trimmed Mean ( 5 / 66 ) | -3.23302495237663e-05 | 0.000767843089226429 | -0.0421052816355197 |
| Trimmed Mean ( 6 / 66 ) | -3.26741883487159e-05 | 0.000748797578276337 | -0.0436355422301564 |
| Trimmed Mean ( 7 / 66 ) | -3.30255237075355e-05 | 0.00072830151424199 | -0.0453459495301313 |
| Trimmed Mean ( 8 / 66 ) | -3.33844967912044e-05 | 0.000707416552262843 | -0.047192134089054 |
| Trimmed Mean ( 9 / 66 ) | -3.37513593931956e-05 | 0.000684832464732508 | -0.0492841112700151 |
| Trimmed Mean ( 10 / 66 ) | -3.41263744974534e-05 | 0.000660317659606473 | -0.0516817534727021 |
| Trimmed Mean ( 11 / 66 ) | -3.45098169074248e-05 | 0.000633584720431139 | -0.054467564943709 |
| Trimmed Mean ( 12 / 66 ) | -3.49019739176228e-05 | 0.00060426880607869 | -0.0577590197715381 |
| Trimmed Mean ( 13 / 66 ) | -3.53031460315035e-05 | 0.000571893676966547 | -0.0617302611540651 |
| Trimmed Mean ( 14 / 66 ) | -3.5713647729428e-05 | 0.000535815286503167 | -0.0666529093682677 |
| Trimmed Mean ( 15 / 66 ) | -3.61338082908330e-05 | 0.000495121422156445 | -0.0729796907866687 |
| Trimmed Mean ( 16 / 66 ) | -3.65639726751287e-05 | 0.000448436017110739 | -0.0815366546842275 |
| Trimmed Mean ( 17 / 66 ) | -3.70045024662748e-05 | 0.000393485308943417 | -0.0940429073848754 |
| Trimmed Mean ( 18 / 66 ) | -3.74557768864733e-05 | 0.000325927560747908 | -0.114920557195358 |
| Trimmed Mean ( 19 / 66 ) | -3.79181938849483e-05 | 0.000234855088671104 | -0.161453575902925 |
| Trimmed Mean ( 20 / 66 ) | -3.83921713083852e-05 | 3.83921713087762e-05 | -0.999999999989815 |
| Trimmed Mean ( 21 / 66 ) | 9.27528096521589e-17 | 1.86266294913295e-15 | 0.0497958096473302 |
| Trimmed Mean ( 22 / 66 ) | -4.83943369709096e-17 | 1.85458846299792e-15 | -0.0260943804711697 |
| Trimmed Mean ( 23 / 66 ) | -1.93207643246525e-16 | 1.84565985707984e-15 | -0.10468215067115 |
| Trimmed Mean ( 24 / 66 ) | -3.41831826003078e-16 | 1.83580458129308e-15 | -0.18620273066445 |
| Trimmed Mean ( 25 / 66 ) | -4.94419320299806e-16 | 1.82494227927006e-15 | -0.270923264760770 |
| Trimmed Mean ( 26 / 66 ) | -6.51130800928878e-16 | 1.81298368506931e-15 | -0.359148737129416 |
| Trimmed Mean ( 27 / 66 ) | -8.12135746780664e-16 | 1.79982931637080e-15 | -0.45122931346527 |
| Trimmed Mean ( 28 / 66 ) | -9.77613052239444e-16 | 1.78536791608268e-15 | -0.547569519667658 |
| Trimmed Mean ( 29 / 66 ) | -9.77613052239444e-16 | 1.76947458006780e-15 | -0.552487762893993 |
| Trimmed Mean ( 30 / 66 ) | -1.32275143219633e-15 | 1.75200848933609e-15 | -0.754991451381365 |
| Trimmed Mean ( 31 / 66 ) | -1.50282363043470e-15 | 1.73281013829649e-15 | -0.867275414207879 |
| Trimmed Mean ( 32 / 66 ) | -1.68819206979773e-15 | 1.71169791311892e-15 | -0.98626752820049 |
| Trimmed Mean ( 33 / 66 ) | -1.87909389541041e-15 | 1.68846382066027e-15 | -1.11290148620158 |
| Trimmed Mean ( 34 / 66 ) | -2.07578062482953e-15 | 1.66286809042950e-15 | -1.24831346321245 |
| Trimmed Mean ( 35 / 66 ) | -2.27851925361539e-15 | 1.63463225620294e-15 | -1.39390327394378 |
| Trimmed Mean ( 36 / 66 ) | -2.48759346455081e-15 | 1.60343014765037e-15 | -1.55141991573258 |
| Trimmed Mean ( 37 / 66 ) | -2.70330495202386e-15 | 1.56887594703828e-15 | -1.72308394244118 |
| Trimmed Mean ( 38 / 66 ) | -2.92597487457669e-15 | 1.53050802299143e-15 | -1.91176709342417 |
| Trimmed Mean ( 39 / 66 ) | -3.15594545032797e-15 | 1.48776651525890e-15 | -2.12126393352708 |
| Trimmed Mean ( 40 / 66 ) | -3.39358171193763e-15 | 1.43996136535542e-15 | -2.35671719643673 |
| Trimmed Mean ( 41 / 66 ) | -3.63927344004253e-15 | 1.38622516579781e-15 | -2.62531191168213 |
| Trimmed Mean ( 42 / 66 ) | -3.89343729670278e-15 | 1.32544074543348e-15 | -2.93746612975101 |
| Trimmed Mean ( 43 / 66 ) | -4.15651918342127e-15 | 1.25612426926675e-15 | -3.30900316562437 |
| Trimmed Mean ( 44 / 66 ) | -4.42899685180829e-15 | 1.17622426171372e-15 | -3.76543572171805 |
| Trimmed Mean ( 45 / 66 ) | -4.71138279904574e-15 | 1.08274647267576e-15 | -4.35132592711445 |
| Trimmed Mean ( 46 / 66 ) | -4.61359345788683e-15 | 1.08204780654547e-15 | -4.26376120350552 |
| Trimmed Mean ( 47 / 66 ) | -4.51211395291061e-15 | 1.08081634335356e-15 | -4.17472772377813 |
| Trimmed Mean ( 48 / 66 ) | -4.40673139005069e-15 | 1.07898404138305e-15 | -4.08414881132265 |
| Trimmed Mean ( 49 / 66 ) | -4.29721617766684e-15 | 1.07647294870018e-15 | -3.99194070120912 |
| Trimmed Mean ( 50 / 66 ) | -4.18332035678765e-15 | 1.07319340898344e-15 | -3.89801159955895 |
| Trimmed Mean ( 51 / 66 ) | -4.06477572689298e-15 | 1.06904185870959e-15 | -3.80226058856053 |
| Trimmed Mean ( 52 / 66 ) | -3.94129173741936e-15 | 1.06389809887498e-15 | -3.70457635142601 |
| Trimmed Mean ( 53 / 66 ) | -3.8125531100958e-15 | 1.05762188283426e-15 | -3.60483569031187 |
| Trimmed Mean ( 54 / 66 ) | -3.67821715114948e-15 | 1.05004860198928e-15 | -3.50290181252681 |
| Trimmed Mean ( 55 / 66 ) | -3.53791070513888e-15 | 1.04098376319580e-15 | -3.39862237070591 |
| Trimmed Mean ( 56 / 66 ) | -3.39122669340052e-15 | 1.03019581981719e-15 | -3.29182727027790 |
| Trimmed Mean ( 57 / 66 ) | -3.39122669340052e-15 | 1.01740671512290e-15 | -3.33320651711136 |
| Trimmed Mean ( 58 / 66 ) | -3.23772016948828e-15 | 1.00227917449719e-15 | -3.2303576207822 |
| Trimmed Mean ( 59 / 66 ) | -2.90824275231081e-15 | 9.84399254798228e-16 | -2.95433254153256 |
| Trimmed Mean ( 60 / 66 ) | -2.73114864057791e-15 | 9.63251759847354e-16 | -2.83534248721302 |
| Trimmed Mean ( 61 / 66 ) | -2.54497277952538e-15 | 9.38184529348652e-16 | -2.71265694531572 |
| Trimmed Mean ( 62 / 66 ) | -2.34899818894377e-15 | 9.08354600622093e-16 | -2.58599250483791 |
| Trimmed Mean ( 63 / 66 ) | -2.14243037724964e-15 | 8.72643220404622e-16 | -2.45510459160646 |
| Trimmed Mean ( 64 / 66 ) | -1.92438657601695e-15 | 8.29513637548432e-16 | -2.31989745425323 |
| Trimmed Mean ( 65 / 66 ) | -1.69388312899953e-15 | 7.76754368509327e-16 | -2.18071915353404 |
| Trimmed Mean ( 66 / 66 ) | -1.44982065568697e-15 | 7.1096525804368e-16 | -2.03922855481905 |
| Median | -3.5527136788005e-15 | ||
| Midrange | 2.15001627612565e-14 | ||
| Midmean - Weighted Average at Xnp | -8.40123990276066e-15 | ||
| Midmean - Weighted Average at X(n+1)p | -8.40123990276066e-15 | ||
| Midmean - Empirical Distribution Function | -8.40123990276066e-15 | ||
| Midmean - Empirical Distribution Function - Averaging | -8.40123990276066e-15 | ||
| Midmean - Empirical Distribution Function - Interpolation | -8.40123990276066e-15 | ||
| Midmean - Closest Observation | -8.40123990276066e-15 | ||
| Midmean - True Basic - Statistics Graphics Toolkit | -8.40123990276066e-15 | ||
| Midmean - MS Excel (old versions) | -8.40123990276066e-15 | ||
| Number of observations | 200 | ||
