Multiple Linear Regression - Estimated Regression Equation |
MDVP:Fo(Hz)[t] = + 96.9556 + 0.125008`MDVP:Fhi(Hz)`[t] + 0.370473`MDVP:Flo(Hz)`[t] -1078020`MDVP:Jitter(Abs)`[t] + 10714.7`MDVP:PPQ`[t] + e[t] |
Multiple Linear Regression - Ordinary Least Squares | |||||
Variable | Parameter | S.D. | T-STAT H0: parameter = 0 | 2-tail p-value | 1-tail p-value |
(Intercept) | 96.9556 | 8.07188 | 12.01 | 4.29531e-25 | 2.14765e-25 |
`MDVP:Fhi(Hz)` | 0.125008 | 0.0212902 | 5.872 | 1.89498e-08 | 9.47491e-09 |
`MDVP:Flo(Hz)` | 0.370473 | 0.0481721 | 7.691 | 7.68845e-13 | 3.84423e-13 |
`MDVP:Jitter(Abs)` | -1078020 | 140015 | -7.699 | 7.29964e-13 | 3.64982e-13 |
`MDVP:PPQ` | 10714.7 | 1714.03 | 6.251 | 2.62384e-09 | 1.31192e-09 |
Multiple Linear Regression - Regression Statistics | |
Multiple R | 0.78074 |
R-squared | 0.609554 |
Adjusted R-squared | 0.601334 |
F-TEST (value) | 74.1558 |
F-TEST (DF numerator) | 4 |
F-TEST (DF denominator) | 190 |
p-value | 0 |
Multiple Linear Regression - Residual Statistics | |
Residual Standard Deviation | 26.1337 |
Sum Squared Residuals | 129764 |
Multiple Linear Regression - Actuals, Interpolation, and Residuals | |||
Time or Index | Actuals | Interpolation Forecast | Residuals Prediction Error |
1 | 119.992 | 128.302 | -8.31031 |
2 | 122.4 | 146.038 | -23.638 |
3 | 116.682 | 141.334 | -24.6521 |
4 | 116.676 | 133.216 | -16.5399 |
5 | 116.014 | 134.382 | -18.3678 |
6 | 120.552 | 149.626 | -29.0739 |
7 | 120.267 | 145.953 | -25.6861 |
8 | 107.332 | 136.993 | -29.6607 |
9 | 95.73 | 118.349 | -22.6193 |
10 | 95.056 | 116.658 | -21.602 |
11 | 88.333 | 112.81 | -24.4774 |
12 | 91.904 | 114.73 | -22.8257 |
13 | 136.926 | 160.407 | -23.4815 |
14 | 139.173 | 137.657 | 1.51558 |
15 | 152.845 | 139.87 | 12.9752 |
16 | 142.167 | 144.358 | -2.19072 |
17 | 144.188 | 159.444 | -15.2558 |
18 | 168.778 | 152.334 | 16.4438 |
19 | 153.046 | 136.745 | 16.3007 |
20 | 156.405 | 162.394 | -5.9894 |
21 | 153.848 | 136.36 | 17.488 |
22 | 153.88 | 143.777 | 10.1034 |
23 | 167.93 | 144.527 | 23.4028 |
24 | 173.917 | 148.28 | 25.6372 |
25 | 163.656 | 138.393 | 25.2626 |
26 | 104.4 | 127.092 | -22.6917 |
27 | 171.041 | 143.699 | 27.3416 |
28 | 146.845 | 150.451 | -3.60619 |
29 | 155.358 | 152.336 | 3.02195 |
30 | 162.568 | 145.278 | 17.29 |
31 | 197.076 | 201.191 | -4.11496 |
32 | 199.228 | 198.317 | 0.911097 |
33 | 198.383 | 199.082 | -0.699169 |
34 | 202.266 | 198.183 | 4.08321 |
35 | 203.184 | 197.725 | 5.45857 |
36 | 201.464 | 197.324 | 4.13985 |
37 | 177.876 | 187.579 | -9.70265 |
38 | 176.17 | 182.551 | -6.38134 |
39 | 180.198 | 183.341 | -3.14309 |
40 | 187.733 | 184.286 | 3.44749 |
41 | 186.163 | 184.653 | 1.50987 |
42 | 184.055 | 188.355 | -4.3002 |
43 | 237.226 | 220.034 | 17.1916 |
44 | 241.404 | 221.947 | 19.4572 |
45 | 243.439 | 219.409 | 24.0295 |
46 | 242.852 | 218.463 | 24.389 |
47 | 245.51 | 220.69 | 24.8201 |
48 | 252.455 | 201.922 | 50.5327 |
49 | 122.188 | 134.551 | -12.363 |
50 | 122.964 | 139.964 | -17.0004 |
51 | 124.445 | 142.922 | -18.4771 |
52 | 126.344 | 130.502 | -4.15806 |
53 | 128.001 | 144.886 | -16.8854 |
54 | 129.336 | 134.867 | -5.53089 |
55 | 108.807 | 128.513 | -19.706 |
56 | 109.86 | 122.953 | -13.0934 |
57 | 110.417 | 131.248 | -20.8313 |
58 | 117.274 | 139.668 | -22.3941 |
59 | 116.879 | 130.874 | -13.9949 |
60 | 114.847 | 139.128 | -24.2813 |
61 | 209.144 | 172.672 | 36.4716 |
62 | 223.365 | 168.782 | 54.5827 |
63 | 222.236 | 206.655 | 15.5811 |
64 | 228.832 | 214.963 | 13.8692 |
65 | 229.401 | 212.823 | 16.578 |
66 | 228.969 | 173.058 | 55.9105 |
67 | 140.341 | 124.222 | 16.1192 |
68 | 136.969 | 116.383 | 20.5856 |
69 | 143.533 | 105.411 | 38.1224 |
70 | 148.09 | 126.288 | 21.8021 |
71 | 142.729 | 121.729 | 21.0004 |
72 | 136.358 | 119.145 | 17.2129 |
73 | 120.08 | 146.852 | -26.7719 |
74 | 112.014 | 191.525 | -79.511 |
75 | 110.793 | 139.929 | -29.1359 |
76 | 110.707 | 128.25 | -17.5429 |
77 | 112.876 | 143.038 | -30.1624 |
78 | 110.568 | 139.086 | -28.5177 |
79 | 95.385 | 114.057 | -18.6717 |
80 | 100.77 | 97.0258 | 3.74419 |
81 | 96.106 | 110.853 | -14.747 |
82 | 95.605 | 107.146 | -11.5408 |
83 | 100.96 | 118.743 | -17.7826 |
84 | 98.804 | 126.797 | -27.9928 |
85 | 176.858 | 152.446 | 24.4117 |
86 | 180.978 | 184.163 | -3.18507 |
87 | 178.222 | 173.744 | 4.47824 |
88 | 176.281 | 173.005 | 3.27646 |
89 | 173.898 | 145.917 | 27.9813 |
90 | 179.711 | 180.646 | -0.935008 |
91 | 166.605 | 157.034 | 9.57101 |
92 | 151.955 | 163.899 | -11.9439 |
93 | 148.272 | 165.388 | -17.1156 |
94 | 152.125 | 137.392 | 14.733 |
95 | 157.821 | 143.36 | 14.4609 |
96 | 157.447 | 172.338 | -14.8905 |
97 | 159.116 | 169.874 | -10.7584 |
98 | 125.036 | 116.945 | 8.0909 |
99 | 125.791 | 101.768 | 24.0234 |
100 | 126.512 | 96.0114 | 30.5006 |
101 | 125.641 | 40.4868 | 85.1542 |
102 | 128.451 | 111.817 | 16.6337 |
103 | 139.224 | 132.062 | 7.16167 |
104 | 150.258 | 137.209 | 13.0486 |
105 | 154.003 | 164.575 | -10.5724 |
106 | 149.689 | 159.298 | -9.60939 |
107 | 155.078 | 169.904 | -14.8262 |
108 | 151.884 | 157.74 | -5.8562 |
109 | 151.989 | 165.35 | -13.3611 |
110 | 193.03 | 151.377 | 41.6528 |
111 | 200.714 | 161.949 | 38.7645 |
112 | 208.519 | 202.211 | 6.30838 |
113 | 204.664 | 203.715 | 0.948993 |
114 | 210.141 | 192.339 | 17.8015 |
115 | 206.327 | 164.141 | 42.1864 |
116 | 151.872 | 160.736 | -8.86374 |
117 | 158.219 | 168.772 | -10.5534 |
118 | 170.756 | 178.144 | -7.38814 |
119 | 178.285 | 171.16 | 7.12476 |
120 | 217.116 | 153.113 | 64.0026 |
121 | 128.94 | 169.359 | -40.4195 |
122 | 176.824 | 146.313 | 30.5108 |
123 | 138.19 | 142.016 | -3.82641 |
124 | 182.018 | 145.149 | 36.8693 |
125 | 156.239 | 150.119 | 6.11986 |
126 | 145.174 | 142.91 | 2.26411 |
127 | 138.145 | 143.579 | -5.4339 |
128 | 166.888 | 145.773 | 21.115 |
129 | 119.031 | 130.811 | -11.7804 |
130 | 120.078 | 144.837 | -24.7589 |
131 | 120.289 | 132.48 | -12.1906 |
132 | 120.256 | 141.06 | -20.8041 |
133 | 119.056 | 130.638 | -11.5819 |
134 | 118.747 | 139.095 | -20.3479 |
135 | 106.516 | 115.045 | -8.52942 |
136 | 110.453 | 142.644 | -32.1906 |
137 | 113.4 | 140.77 | -27.3695 |
138 | 113.166 | 140.846 | -27.6802 |
139 | 112.239 | 139.299 | -27.0601 |
140 | 116.15 | 146.624 | -30.4741 |
141 | 170.368 | 156.508 | 13.8602 |
142 | 208.083 | 165.43 | 42.6529 |
143 | 198.458 | 180.931 | 17.5271 |
144 | 202.805 | 158.89 | 43.9147 |
145 | 202.544 | 191.416 | 11.1275 |
146 | 223.361 | 160.993 | 62.3685 |
147 | 169.774 | 181.375 | -11.6012 |
148 | 183.52 | 185.343 | -1.82337 |
149 | 188.62 | 198.506 | -9.88556 |
150 | 202.632 | 250.288 | -47.6562 |
151 | 186.695 | 194.663 | -7.96781 |
152 | 192.818 | 224.856 | -32.0378 |
153 | 198.116 | 221.855 | -23.739 |
154 | 121.345 | 121.703 | -0.358 |
155 | 119.1 | 113.385 | 5.71479 |
156 | 117.87 | 126.556 | -8.68575 |
157 | 122.336 | 121.513 | 0.822676 |
158 | 117.963 | 66.2896 | 51.6734 |
159 | 126.144 | 114.783 | 11.3612 |
160 | 127.93 | 136.03 | -8.0997 |
161 | 114.238 | 120.998 | -6.75993 |
162 | 115.322 | 135.212 | -19.8902 |
163 | 114.554 | 118.311 | -3.75673 |
164 | 112.15 | 126.075 | -13.9253 |
165 | 102.273 | 99.0081 | 3.26486 |
166 | 236.2 | 170.993 | 65.2072 |
167 | 237.323 | 218.611 | 18.7125 |
168 | 260.105 | 227.136 | 32.9689 |
169 | 197.569 | 162.679 | 34.8903 |
170 | 240.301 | 217.785 | 22.5156 |
171 | 244.99 | 223.424 | 21.5665 |
172 | 112.547 | 140.81 | -28.2634 |
173 | 110.739 | 137.344 | -26.6048 |
174 | 113.715 | 136.826 | -23.1109 |
175 | 117.004 | 143.051 | -26.0473 |
176 | 115.38 | 141.573 | -26.1929 |
177 | 116.388 | 143.939 | -27.5506 |
178 | 151.737 | 164.639 | -12.9023 |
179 | 148.79 | 166.613 | -17.8228 |
180 | 148.143 | 158.894 | -10.7511 |
181 | 150.44 | 163.633 | -13.1926 |
182 | 148.462 | 162.537 | -14.0751 |
183 | 149.818 | 170.678 | -20.8601 |
184 | 117.226 | 137.769 | -20.5434 |
185 | 116.848 | 144.187 | -27.3386 |
186 | 116.286 | 143.28 | -26.9937 |
187 | 116.556 | 187.968 | -71.4122 |
188 | 116.342 | 198.834 | -82.4923 |
189 | 114.563 | 131.327 | -16.7644 |
190 | 201.774 | 168.867 | 32.9068 |
191 | 174.188 | 156.161 | 18.0266 |
192 | 209.516 | 160.684 | 48.8319 |
193 | 174.688 | 128.669 | 46.0189 |
194 | 198.764 | 172.995 | 25.7685 |
195 | 214.289 | 160.004 | 54.2847 |
Goldfeld-Quandt test for Heteroskedasticity | |||
p-values | Alternative Hypothesis | ||
breakpoint index | greater | 2-sided | less |
8 | 0.000349371 | 0.000698742 | 0.999651 |
9 | 0.000741637 | 0.00148327 | 0.999258 |
10 | 8.89193e-05 | 0.000177839 | 0.999911 |
11 | 1.07193e-05 | 2.14387e-05 | 0.999989 |
12 | 1.12186e-06 | 2.24372e-06 | 0.999999 |
13 | 1.10638e-07 | 2.21275e-07 | 1 |
14 | 3.87671e-08 | 7.75343e-08 | 1 |
15 | 4.9426e-06 | 9.8852e-06 | 0.999995 |
16 | 6.51252e-06 | 1.3025e-05 | 0.999993 |
17 | 2.62318e-05 | 5.24637e-05 | 0.999974 |
18 | 1.58509e-05 | 3.17018e-05 | 0.999984 |
19 | 6.53672e-06 | 1.30734e-05 | 0.999993 |
20 | 0.000144142 | 0.000288284 | 0.999856 |
21 | 7.55673e-05 | 0.000151135 | 0.999924 |
22 | 3.08362e-05 | 6.16725e-05 | 0.999969 |
23 | 4.18552e-05 | 8.37105e-05 | 0.999958 |
24 | 7.08105e-05 | 0.000141621 | 0.999929 |
25 | 0.000121097 | 0.000242193 | 0.999879 |
26 | 7.96365e-05 | 0.000159273 | 0.99992 |
27 | 7.70864e-05 | 0.000154173 | 0.999923 |
28 | 6.43626e-05 | 0.000128725 | 0.999936 |
29 | 3.6394e-05 | 7.2788e-05 | 0.999964 |
30 | 1.89696e-05 | 3.79392e-05 | 0.999981 |
31 | 2.34279e-05 | 4.68558e-05 | 0.999977 |
32 | 2.097e-05 | 4.194e-05 | 0.999979 |
33 | 1.24587e-05 | 2.49175e-05 | 0.999988 |
34 | 9.49788e-06 | 1.89958e-05 | 0.999991 |
35 | 6.38025e-06 | 1.27605e-05 | 0.999994 |
36 | 3.62238e-06 | 7.24476e-06 | 0.999996 |
37 | 2.21113e-06 | 4.42226e-06 | 0.999998 |
38 | 1.06619e-06 | 2.13238e-06 | 0.999999 |
39 | 5.13213e-07 | 1.02643e-06 | 0.999999 |
40 | 2.79112e-07 | 5.58223e-07 | 1 |
41 | 1.46356e-07 | 2.92712e-07 | 1 |
42 | 7.55157e-08 | 1.51031e-07 | 1 |
43 | 7.06623e-08 | 1.41325e-07 | 1 |
44 | 7.39072e-08 | 1.47814e-07 | 1 |
45 | 1.10494e-07 | 2.20988e-07 | 1 |
46 | 1.16099e-07 | 2.32197e-07 | 1 |
47 | 1.07105e-07 | 2.14209e-07 | 1 |
48 | 8.21962e-07 | 1.64392e-06 | 0.999999 |
49 | 4.56736e-07 | 9.13471e-07 | 1 |
50 | 2.36026e-07 | 4.72051e-07 | 1 |
51 | 1.27323e-07 | 2.54645e-07 | 1 |
52 | 1.03871e-07 | 2.07742e-07 | 1 |
53 | 5.44227e-08 | 1.08845e-07 | 1 |
54 | 3.51823e-08 | 7.03646e-08 | 1 |
55 | 1.80734e-08 | 3.61467e-08 | 1 |
56 | 1.25244e-08 | 2.50488e-08 | 1 |
57 | 6.50433e-09 | 1.30087e-08 | 1 |
58 | 3.75894e-09 | 7.51789e-09 | 1 |
59 | 1.99305e-09 | 3.98611e-09 | 1 |
60 | 1.76141e-09 | 3.52281e-09 | 1 |
61 | 1.80993e-09 | 3.61986e-09 | 1 |
62 | 9.98912e-09 | 1.99782e-08 | 1 |
63 | 5.54991e-09 | 1.10998e-08 | 1 |
64 | 3.03924e-09 | 6.07849e-09 | 1 |
65 | 1.84347e-09 | 3.68693e-09 | 1 |
66 | 1.28526e-08 | 2.57051e-08 | 1 |
67 | 1.65221e-08 | 3.30441e-08 | 1 |
68 | 5.50803e-08 | 1.10161e-07 | 1 |
69 | 2.46683e-06 | 4.93367e-06 | 0.999998 |
70 | 2.52564e-06 | 5.05128e-06 | 0.999997 |
71 | 2.79635e-06 | 5.5927e-06 | 0.999997 |
72 | 2.5874e-06 | 5.1748e-06 | 0.999997 |
73 | 2.99248e-06 | 5.98497e-06 | 0.999997 |
74 | 0.00227159 | 0.00454318 | 0.997728 |
75 | 0.0028484 | 0.00569679 | 0.997152 |
76 | 0.00218228 | 0.00436457 | 0.997818 |
77 | 0.0027757 | 0.00555141 | 0.997224 |
78 | 0.00323302 | 0.00646604 | 0.996767 |
79 | 0.00253129 | 0.00506258 | 0.997469 |
80 | 0.0040706 | 0.0081412 | 0.995929 |
81 | 0.00318124 | 0.00636249 | 0.996819 |
82 | 0.00253318 | 0.00506636 | 0.997467 |
83 | 0.00200532 | 0.00401064 | 0.997995 |
84 | 0.0024185 | 0.00483699 | 0.997582 |
85 | 0.00196409 | 0.00392819 | 0.998036 |
86 | 0.00151499 | 0.00302998 | 0.998485 |
87 | 0.00107969 | 0.00215938 | 0.99892 |
88 | 0.000766488 | 0.00153298 | 0.999234 |
89 | 0.000707501 | 0.001415 | 0.999292 |
90 | 0.000497465 | 0.00099493 | 0.999503 |
91 | 0.000354269 | 0.000708538 | 0.999646 |
92 | 0.000261687 | 0.000523373 | 0.999738 |
93 | 0.000224431 | 0.000448862 | 0.999776 |
94 | 0.000159064 | 0.000318127 | 0.999841 |
95 | 0.000110816 | 0.000221631 | 0.999889 |
96 | 9.58508e-05 | 0.000191702 | 0.999904 |
97 | 7.33725e-05 | 0.000146745 | 0.999927 |
98 | 0.00011218 | 0.000224359 | 0.999888 |
99 | 0.000312497 | 0.000624995 | 0.999688 |
100 | 0.000910353 | 0.00182071 | 0.99909 |
101 | 0.0281385 | 0.0562769 | 0.971862 |
102 | 0.0235668 | 0.0471336 | 0.976433 |
103 | 0.0231882 | 0.0463765 | 0.976812 |
104 | 0.0194066 | 0.0388132 | 0.980593 |
105 | 0.0157076 | 0.0314153 | 0.984292 |
106 | 0.0124283 | 0.0248565 | 0.987572 |
107 | 0.0103509 | 0.0207018 | 0.989649 |
108 | 0.00790376 | 0.0158075 | 0.992096 |
109 | 0.00644764 | 0.0128953 | 0.993552 |
110 | 0.00931629 | 0.0186326 | 0.990684 |
111 | 0.011818 | 0.023636 | 0.988182 |
112 | 0.00907681 | 0.0181536 | 0.990923 |
113 | 0.00692684 | 0.0138537 | 0.993073 |
114 | 0.00593156 | 0.0118631 | 0.994068 |
115 | 0.0085406 | 0.0170812 | 0.991459 |
116 | 0.00677076 | 0.0135415 | 0.993229 |
117 | 0.00526628 | 0.0105326 | 0.994734 |
118 | 0.00399198 | 0.00798395 | 0.996008 |
119 | 0.00303095 | 0.00606191 | 0.996969 |
120 | 0.0135328 | 0.0270656 | 0.986467 |
121 | 0.0175527 | 0.0351054 | 0.982447 |
122 | 0.0192742 | 0.0385484 | 0.980726 |
123 | 0.0149112 | 0.0298225 | 0.985089 |
124 | 0.0184677 | 0.0369353 | 0.981532 |
125 | 0.0143494 | 0.0286988 | 0.985651 |
126 | 0.0109492 | 0.0218985 | 0.989051 |
127 | 0.00831152 | 0.016623 | 0.991688 |
128 | 0.00747632 | 0.0149526 | 0.992524 |
129 | 0.00570028 | 0.0114006 | 0.9943 |
130 | 0.00530538 | 0.0106108 | 0.994695 |
131 | 0.0040458 | 0.00809161 | 0.995954 |
132 | 0.00348949 | 0.00697899 | 0.996511 |
133 | 0.00262215 | 0.00524431 | 0.997378 |
134 | 0.00221119 | 0.00442237 | 0.997789 |
135 | 0.0015855 | 0.003171 | 0.998415 |
136 | 0.00187371 | 0.00374742 | 0.998126 |
137 | 0.00189577 | 0.00379154 | 0.998104 |
138 | 0.00199128 | 0.00398256 | 0.998009 |
139 | 0.00205725 | 0.0041145 | 0.997943 |
140 | 0.00241665 | 0.0048333 | 0.997583 |
141 | 0.00183655 | 0.00367311 | 0.998163 |
142 | 0.00285759 | 0.00571519 | 0.997142 |
143 | 0.00227312 | 0.00454624 | 0.997727 |
144 | 0.00398212 | 0.00796424 | 0.996018 |
145 | 0.00298421 | 0.00596843 | 0.997016 |
146 | 0.0145185 | 0.029037 | 0.985481 |
147 | 0.0124622 | 0.0249244 | 0.987538 |
148 | 0.00943743 | 0.0188749 | 0.990563 |
149 | 0.00757274 | 0.0151455 | 0.992427 |
150 | 0.0120157 | 0.0240314 | 0.987984 |
151 | 0.00892429 | 0.0178486 | 0.991076 |
152 | 0.010892 | 0.0217841 | 0.989108 |
153 | 0.688704 | 0.622592 | 0.311296 |
154 | 0.643562 | 0.712876 | 0.356438 |
155 | 0.649144 | 0.701713 | 0.350856 |
156 | 0.598945 | 0.802111 | 0.401055 |
157 | 0.550147 | 0.899707 | 0.449853 |
158 | 0.701654 | 0.596693 | 0.298346 |
159 | 0.677845 | 0.644311 | 0.322155 |
160 | 0.626373 | 0.747253 | 0.373627 |
161 | 0.571377 | 0.857247 | 0.428623 |
162 | 0.552302 | 0.895395 | 0.447698 |
163 | 0.506616 | 0.986769 | 0.493384 |
164 | 0.455577 | 0.911154 | 0.544423 |
165 | 0.586113 | 0.827773 | 0.413887 |
166 | 0.940843 | 0.118314 | 0.059157 |
167 | 0.934162 | 0.131676 | 0.065838 |
168 | 0.947701 | 0.104597 | 0.0522986 |
169 | 0.973152 | 0.0536968 | 0.0268484 |
170 | 0.96378 | 0.0724401 | 0.03622 |
171 | 0.974007 | 0.0519855 | 0.0259928 |
172 | 0.961599 | 0.0768019 | 0.038401 |
173 | 0.94761 | 0.104781 | 0.0523903 |
174 | 0.928543 | 0.142914 | 0.0714571 |
175 | 0.91809 | 0.163819 | 0.0819097 |
176 | 0.890298 | 0.219404 | 0.109702 |
177 | 0.879038 | 0.241923 | 0.120962 |
178 | 0.852025 | 0.295949 | 0.147975 |
179 | 0.792526 | 0.414947 | 0.207474 |
180 | 0.722992 | 0.554016 | 0.277008 |
181 | 0.655173 | 0.689654 | 0.344827 |
182 | 0.586977 | 0.826047 | 0.413023 |
183 | 0.531324 | 0.937353 | 0.468676 |
184 | 0.419698 | 0.839395 | 0.580302 |
185 | 0.425057 | 0.850115 | 0.574943 |
186 | 0.365049 | 0.730098 | 0.634951 |
187 | 0.256413 | 0.512826 | 0.743587 |
Meta Analysis of Goldfeld-Quandt test for Heteroskedasticity | |||
Description | # significant tests | % significant tests | OK/NOK |
1% type I error level | 110 | 0.611111 | NOK |
5% type I error level | 144 | 0.8 | NOK |
10% type I error level | 149 | 0.827778 | NOK |