================================================== x761y14 d:\lidarqa\consist_rithaiti\x761y14.txt 06 Aug 10 00:28:17 Friday elapsed time 00:04:32 Rectangular area = 0.488 km2 Data area = 0.196 km2 *percent double coverage = 2.595 **low-curvature dc area = 0.005 km2 1st-return RMSE, low-curvature areas = 0.342 95p = 0.673, 98p = 0.769, 99.5p = 0.899 BE RMSE = 0.186 95p = 0.374, 98p = 0.471, 99.5p = 0.583 168540 unique returns and 0 duplicate returns 312967.4446 762683.33 2015499.09 1.34 1 1 312973.386 762699.65 2015099.04 1.16 1 2 137.6158 313111.0018 762698.44 2014994.22 1.0 1 2 313117.4392 762686.48 2015499.97 0.99 1 1 290.752 313408.1912 762077.54 2015499.95 1.21 1 2 313411.473 762281.07 2015287.54 1.01 1 2 162.527 313574.0 761881.24 2015399.23 1.19 1 2 313575.7344 762233.29 2015499.16 1.11 1 1 168529 1st returns 11 2nd returns 0 3rd returns 0 4th returns 117263 ground returns 0 blunders curvature versus slope n = 36179 X=0, Y = 8.00 +/- 3.36 Weighted least-squares fit: Y = 7.4 + 0.329 X + 0.00068 X**2 slope versus dZ, curvature < 5 n = 8068 Weighted least-squares fit: Y = 27.9 + 1.432 X + -0.07435 X**2 at X = 100, Y = -572.4 effective RMSE xy = 898.1 slope versus dZ, curvature < 15 n = 18643 Weighted least-squares fit: Y = 32.8 + 0.137 X + -0.00597 X**2 curvature versus dZ, slope < 10 n = 28248 X=0, Y = 33.66 +/- 19.32 Weighted least-squares fit: Y = 35.6 + -0.465 X + 0.00821 X**2 Number of samples 36242 Max dz = 110 Mean dz = 27 RMS dz = 34.1320963318 100cm = 99.7902985486 percentile value of dz Mean dz (curv<=5) = 27 RMS dz (curv<=5) = 33.5857112475 Number of survey units in 1 meter = 1 Nominal spot spacing (in survey units) = 0.75 Nominal pulse density (per m2) = 3.5 Difference cell size = 0.375 IsData cell size = 0.1875 IsData expand cells = 8 IsData shrink cells = 7 BE IsData cell size = 0.375 BE IsData expand cells = 24 BE IsData shrink cells = 24 MaxCurve = 106.6666666667 Curvature expand cells = 4 Curvature shrink cells = 3 Point density cell size = 3 Color critical value = 0.1 Hue jump at critical value = 90