File: time_scale.xml

package info (click to toggle)
engauge-digitizer 12.1%2Bds.1-1
  • links: PTS, VCS
  • area: main
  • in suites: bookworm, bullseye, sid, trixie
  • size: 25,500 kB
  • sloc: cpp: 59,550; xml: 4,372; python: 871; sh: 244; ansic: 25; makefile: 15
file content (82 lines) | stat: -rw-r--r-- 28,988 bytes parent folder | download | duplicates (3)
1
2
3
4
5
6
7
8
9
10
11
12
13
14
15
16
17
18
19
20
21
22
23
24
25
26
27
28
29
30
31
32
33
34
35
36
37
38
39
40
41
42
43
44
45
46
47
48
49
50
51
52
53
54
55
56
57
58
59
60
61
62
63
64
65
66
67
68
69
70
71
72
73
74
75
76
77
78
79
80
81
82
<ErrorReport>
 <Application VersionNumber="9.6"/>
 <Document VersionNumber="9.6" AxesPointsRequired="0">
  <Image Width="570" Height="344"><![CDATA[AAAAAYlQTkcNChoKAAAADUlIRFIAAAI6AAABWAgCAAAA1f7BWwAAAAlwSFlzAAALEwAACxMBAJqcGAAAABl0RVh0Q29tbWVudABDcmVhdGVkIHdpdGggR0lNUFeBDhcAACAASURBVHic7d13WBRX2wbwZ2EpCwgoioogCNiwIDaMDREbIqix9xZLEk2iRmNMYvImRqJGYxI19l5QNDbE3sUCFrCCIiIoKgosuJSF3Z3vj8ENHyJN2LOze/+u93qvs8POzjNm2JuZOXOOiOM4AgAA0G4GrAsAAAAoGeIKAAAEAHEFAAACgLgCAAABQFwBAIAAIK4AAEAAEFcAACAAiCsAABAAxBUAAAgAy7gKCgoyMHhvAd26dRO9NXXqVE0WBgAA2kbMasNhYWG3bt0qZgiotLS02NhYFxcXTVYFAADaidnZVXh4+IIFC4p5g1QqrVatmsbqAQAAbSZiO8StSPTeAmxsbFq3bn358uVWrVpt3ry5bt26Gq4NAAC0h/bG1ciRIydMmNC6det58+bFxcUdOHBA/aOQkJBSfggAALzL3Nzc29ubdRVlo71xpZaamurs7CyVSt/3hpCQkD59+lR0aQAAOkuIX5va25H95s2bKpWKiFQqlYmJCetyAACAJe2Nq0mTJq1cuVImkwUGBvr4+LAuBwAAWGIWV/wDVQUb6uV8Y82aNevWratVq9adO3eWLFnCpkoAANAOzJ67et8tK/VyDw+PyMhIDVYEAADaS3svBgIAAKghrgAAQAAQVwAAIACIKwAAEADEFQAACADiCgAABABxBQAAAoC4AgAAAUBcAQCAACCuAABAABBXAAAgAIgrAAAQAMQVAAAIAOIKAAAEAHEFAAACgLgCAAABQFwBAIAAIK4AAEAAEFcAACAAiCsAABAAxBUAAAgA4goAAAQAcQUAAAKAuAIAAAFAXAEAgAAgrgAAQAAQVwAAIACIKwAAEADEFQAACADiCgAABABxBQAAAoC4AgAAAUBcAQCAACCuAABAABBXAAAgAIgrAAAQAMQVAAAIAOIKAAAEAHEFAAACgLgCAAABQFwBAIAAIK4AAEAAEFcAACAAiCsAABAAxBUAAAgA4goAAAQAcQUAAAKAuAIAAAHQ3rgKCgoyMNDe8gAAQJO0NA/CwsJu3brFcRzrQgAAQCtoaVyFh4cvWLCAdRUAAKAttDSupk+fzroEAADQImLWBZRHdHS0SqUquOT58+esigEAAA0QZFwlJSUViqukpCRWxQAAgAYIMq66du1a8GVISEirVq1YFQMAIDghISGsSygzLb13BQAAUJCWnl2JRKKCDfRoBwDQc1oaV8gnAAAoCBcDAQBAABBXAAAgAFp6MRAAQEBepWftvRBtITF2qV3Vxa6qrbUZ64p0EOIKAOCDyPOU438/LFcoT1x/zC+xNDNxrm3tale14P/b17A0NBCxLVXQEFcAAB9k+qqTIVdjTYwM1UsysuSRj15GPnpZ8G3GYsN6tayda1u71qnqkh9jVZ1rWxdcEYqBuAIAKL/d5+7/c+gGEeUqlH6erioV9+h5WvyL9FyFstA7cxXKmKcpMU9TKOK/hd7ujv07NpjWt7UmaxYoxBUAQDk9eJo68Y8jfHvGAM/fJ+UPuKNUcYmvMh4lpcUmpcU9l6r/X5adW+gT0rPkX68+3b1lvUYONhotXYAQVwAA5ZEtVwz5dX9GlpyIPnKrs2C8l/pHhgYip5pWTjWtfDycCq6SLM2KTUrlo+tRkvT49bgbD18Q0Wd/HTu9eLhmyxcexBUAQHlMX3WSvztlYykJmtvPWFzyLShbazNba7P2bvb8y2ev3zSesOZNdu6ZqCe7z90f7NW4cisWODx3BQBQZjtO3119+CYRiUS0ZbZ/XVvLcnxInepVfhzVkW/PWH3q3UuFUBDiCgCgbKITUyb/eZRvzxrUrndbl3J/1Bf92rg5VieiZ6/fzN8RVjH16SjEFQBAGWTJ8wb9so8/E+rY1P7XcV4lrlIMI7HB8qk9+PbSveHRiSkVUKKOQlwBAJTBFytO3Il/RUQ1rMyC5vYTG37ot6i3u+PQLm5ElKdQTVtxvAJK1FGIKwCA0tpy4vb6o1H09pZVnepVKuRjf5/U1UJiTEQnb8QHn4+ukM/UPYgrAIBSuffk9ad/HePb3w5t36uNc0V9cp3qVX4Y0YFvf70GfS6KhrgCAChZljxv0Px9WfI8IvJqXvfnMZ0r9vOnf9yWf1I4ITnj152XKvbDdQPiCgCgZJ/+dezek9dEZGtttnNu3wofrLZgn4s/9obHPEWfi8IQVwAAJVh/NGrLidtEZGgg2jYnoHY1i8rYio+H06DOjYhInqf8YsWJytiEoCGuAACKc/vxK3V4fDe8Q/eW9SpvW0undOP7XBy//njvhZjK25AQIa4AAN5Llp07+O0tKx8Pp3kjO1bq5uyrV/luWHu+PWP1SX67wENcAQC81+Q/j/KP7taqZr7tmwANzK84Y+B/fS7mb8c4F/9BXAEAFG314Zs7Tt8lIkMD0Y5v+9aqZq6BjRqLDf/8rDvfXro3/OGzVA1sVBAQVwAARYh89HL6qpN8+6fRnbzdHTW26R6t6v3X52Il+lzkQ1wBABSWkSUf8uv+bLmCiLq3rDf37f0kjfl9ko+ZiRERHY2I23/pgYa3rp0QVwAAhU3848iDp6lEZGdjsW1OgIGo0m9ZFVLX1lI9zsVX/6DPBRHiCgCgkJWHbuw+d5+IDA1EQd/1s7U2Y1LG9AFt69epRkRPXqb/FnSZSQ1aBXEFAPCfqLjkGW9vWc0f69WpqQOrSkyMDNXjXCzafQV9LhBXAAD/WbDzUqdmDiZGhr3aOH8z5CO2xfRoVa9/hwZEJM9TTl91im0xzCGuAADyPXyWGnz+/skb8SZG4vUz/DR+x6oIyz7tzve5OHw1Vs/7XCCuAADyLT9wneOIiIZ3dbOzqZSBAcuqrq2lul/ijFWn+M6K+glxBQBARCTLzt1y8g7fntq3NdtiCvp6kCff5+LxC2lgkP7OLYK4AgAgItp26q5UlkNEXdzrNnGszrqc/5gYGS77tBvfXhx8Ne65lG09rCCuAACIiP4+cI1vfB7Qim0l7+rd1qVf+wZElJOr0NtxLhBXAAB0NiqBn33RoYYlHwzaZukUH3Wfi5CrsazLYQBxBQBAyw/mn1pN8mshNtTGL8Z6taznDM3vWP/FihM5uXrX50Ib/6sAAGhSQnLGgUsPichYbDiptwfrct5r1iBPV7uqRPQqPWvT8Vusy9E0xBUA6Lu1oZEKpYqIhnRpzGrIpdIwNRYvmujtVre6pZnx4uCrfJ97/YG4AgC9lqtQrj58k29/5t+SbTEl6t+hoVyhTEqRxT2XRjxIYl2ORiGuAECvBZ259yo9i4haN6jdrnEd1uWUbGiXxnxjx+l7bCvRMMQVAOi1f0LyT62m9dW6/utFGtrFjW8En7+v0qcLgogrANBf1x48v3L/GRFVt5IM6tyYdTml0tSpRrN6NYgoKUV2NiqBdTmag7gCAP3194HrfOMT3xYSEzHbYkpvmHcTvrHrrB5dD0RcAYCeep2eHXz+PhGJDQ0+7aPtnSwKGuLVmB8tfs+FmFyFknU5GoK4AgA9te5IJD/AuZ+nS11bS9bllIFzbeu2De2IKPVN9onrj1mXoyGIKwDQRwql6p+QG3x7mjaNv15Kw7zzO1zsOKMv1wMRVwCgjw5ffZSQnEFEbo7Vu7ZwYl1OmQ32amwgEhHRocsPs+R5rMvRBMQVAOgj9fjrU/w8tGHW4LKqXc2ii3tdInqTnRtyRS9GvEVcAYDeuffk9enIeCKykBiP69mcdTnlpH4AK0g/+gcirgBA7/wTcoN/vnZcz+YWEmPW5ZTTgE4NjcWGRBQa/ig9U866nErHLK6kUqmvr6+VlZWvr296evq7b+jWrZvoralTp2q+QhAKWXbupuO3JiwJHf/74QOXHurTY/5QHm+yczcdv01EIhFN8dPe8ddLVK2KpHurekQkz1PuC4thXU6lYxZXgYGBnTt3TkxM9PLyWrhw4btvSEtLi42N5TiO47jly5drvkLQfpfvPZu87Ijd0L/H/X541/n7oRGP+v20p+VnG/aFPUBowftsOnZLlp1LRD4eTm7aNMl9OQx/2z9wpx70D2QWVyEhIQMHDrS0tOzfv//hw4fffYNUKq1WrZrmCwPtlyzN+uPf8GaT1rX/asua0Mg32blElJmd+zItk4giH738+H97W3y6fu+FGL0aUQ1Kg+NI3X99aoDw+q8XEvBRfX6K4dORT5KlWazLqVzM4io+Pt7e3p6IHBwc4uLi3n2DVCodOnSopaWlt7d3QoIejYsF76NUcaHhjwbP3+cwfPmMVafuxL/il4tE5OPhtGGm36JPutauZsEvvBWXPPCXf90nr991Tr+GAYXinbz5+H5CChHVtbXs086VdTkfykJi7N/OlYgUShU/QocOE3GMfpMNDQ0VCoVIJFKpVEZGRkpl4XFERo4cOWHChNatW8+bNy8uLu7AgQPqH50+fVqlUqlf5uTk1K5dW0N1AwtPU7JCbiQdup70Mj2n4HJbK9OAVnZ9WtrZ2+RPqSfPU+2LeLrl3OPkjP/uPDvbWkzo6ty9eU0DIXZYhgo1c2vkuXvJRDStV/0xXvVYl1MBztxNnrUtkohaOFmvm9y2lGs9f/68T58+lVlXxWMWVxYWFq9evZJIJJmZmbVr187IyHjfO1NTU52dnaVSqXpJdHR0wbiKi4tr1UoYI/9DmeTkKkOvP9l1ITbs3vOCZ0hGhgY9W9Yd0sm1S7M6hgZFJJA8T7nj3IPlh+88T81UL3StbfVVX/e+nvWKXAX0wbOUTM+Ze1QcZ2pseG3poGpVTFlXVAFyFcrm03ZlZOWKRBS+ZFAdG/PSrHX9+nXBxRWzEYidnZ0TExMbNGiQkJDg6lrEKfnNmzfd3d0NDAxUKpWJiUnBHzVq1Kjgy7i4OJxd6ZjrD19sOn5rx+l7qW+yCy53c6z+ia/7iK5NS5yhfO4o+5lDvdYfjfot6HLiqwwiin2ePnXV+b9D7n43vP0wbzexIZ7i0Dt/hp7h/+4Z4uXWpIEunFrxPu7YaNPxWxxHZ+6/njVI8Fc434fZb2xAQEBwcHBGRkZwcLC/v/+7b5g0adLKlStlMllgYKCPj4/mKwQm0jPln/51tPXnG5cfuK7OKguJ8aTeLS4tG3137cTpH7ctMat4JkaGn/m3jN08ZdWXvZxqWvELY56mjF50qPGENZuO31IoVcV/AuiSbLli/dEovj2tn+A7WRQ0vOvb54XP6PLtK2ZxNXv27IsXLzo4OERERMyaNUu9XPT27sKaNWvWrVtXq1atO3fuLFmyhFGZoFFZ8ryAecFbTtxp5GDDL+nQxH7j137Pg6at/sr3I7fyTExuLDac7OcRs3Hy2um969Wy5hfGJqWN+/1ww/GrNxyLylMgtPTC7vP3X6dnE1G7xnVa1a/FupyK5O3uyP8NdyP2RczTFNblVBZmFwMtLS2PHDny7nL1vTQPD4/IyEjNFgUs5SqUg+fvP387kYjiX6Z/0a/1p/4t1bn1gYzFhp/4uo/p3mzrqdu/7rgU91xKRHHPpROWhJ6JSlg2pZuNpaRCNgRa6+/9+YMEfh4gpKmtSkNsaDCoc+MVB68TUdCZ+z+O6si6okqBy/egFZQqbuzikMNXY4nI0EC09Rv/Pz/rXlFZpWYkNhjf0z1mw+SNX/u52lUlovp1qu67GDPu98Po667brtx/dv3hCyKqWdV8sJcwJrkvE/X4gTr8vDDiCtjjOJq24jj/ayYS0eqvfAd2alTiWuUmNjQY26P5/fWTlk72iX+RnpmTd+jKwz/+Da+8LQJzKw7mPxo80bcFP86ejunQxN6xphURxTxNuRn7knU5lQJxBezN3Xj2n0P53yaLJ3ad0MtdAxsVGxpMH9B28aSu/Mtv15+99uC5BrYLmvcyLXP3ufxJ7if5tWBdTqUQiWhw5/yzRl09wUJcAWMLd135Legy3/5uePuZAz01ufUv+rXxb1efiHIVyqELDmRk6f6w1npo7ZHIXIWSiPq1b+BQQ0iT3JeJen7hXefu6eTFbcQVsLT68M1vN5zh25/5t5w/1kvDBYhEtGmWX11bSyJ6lJQ2edlRDRcAlU2hVK0Oucm3Pw/Q5fEEPFxrNrS3IaKE5Iywu09Zl1PxEFfATNDZe5//fYz/M3BE1ybLp/ZkUka1KpLtc/ryQ10Enb23JhT9UXXKvrAHT1+/IaImjtX56Xd1mPoESycnbERcARuh4Y/GLApRqjgiCvio/sav+zAcz69jU/v/je7Mt6f/c/Luk9fMSoGKtvLQdb6hY48GF2mod/7tq+Dz93XvKXjEFTBw8c7TQb/s428ndG3huHNuXyMx40NxztCPurV0IqIsed6Q+fuy5Hls64EKcSf+1dmoBCKytjAd0bUJ63IqXUN7m5autYgoWZp1JuoJ63IqGOIKNC3y0cs+P+zm86BtQ7t/fxzAT9jDlqGBaOvsgJpVzYno7pPXX6w4wboiqADqR4PHdG8m3Enuy0R9grXjtK5dD0RcgUY9fJbaY05QeqaciJo4Vg+ZP8jK3KTEtTSjVjXzLbP9+WuS649G6WpvYP0hleXsePsw39S+utzJoqChXdz4Y3j/pQfyvMITMwka4go05+nrN11n7XiVnkVE9WpZHw0cWsOqVIPVakyPVvVmD27Ht6f8efRRUhrbeuBD7L0Y07pBbUszkx6tnPlBTPSBQw3LDk3siUgqywkNf8S6nIqEuAINeZWe1XXWDr6PVs2q5sd/G2pfvQrrooowf6xXezd7IsrIkg+ev5+/wQZCtDY08mzUE3me4jN/XRsksHjDvPPv0ulM/0CRSCQSiRBXoAnpmfIec4IePkslIitzkxO/DdPav3bFhgY7vg2oamFKRDdiX8xee4Z1RVAeD5+lXo1OIiILiXGvNs6sy9GogZ0a8dO5hVyJfZOdy7qcCoO4gkqXJc/r88PuyEcvicjMxOhY4NBm9WqwLqo4jjWt1s/049t/7Y84dOUh23qgHLaevMM3hng11slBAotha23WtYUjEWXJ8w5d1p2jF3EFlStXoRz0y76Ld54SkbHY8MD/Bno2smNdVMn6d2jA35znOBr3+2F+PmIQCo6j7afv8u2RPk3ZFsOE+nnhHTrUYwhxBZVIqeLGLArh7/caGoh2zu3LP9skCL9P8vFwrUlEKRnZwwMP8E80gyBcuveUn9LM1a5qu8blmdVT6Pp3aGhiZEhEJ64/Vs/KLXSIK6hE87eH8Td7RSJaO733xx0bsq6oDEyMDHfO7cs/rHPxztMft5xnXRGU1rZT+VcCR/g0YThaCkNW5ia927oQUa5CufdCDOtyKgbiCirL7nP3f9t1me9T+/skn3E9m7OuqMwa2tv880X+SIa/BV0+HalrwwTopFyFcve5aL6tn1cCeeoJG3WmfyDiCipF4quMKX8ezclVhN19OnOg54wBbVlXVE4jfZqO7dGciJQqbsRvB16mZbKuCEoQGv6Iv/z1kVsdre2AqgF92rlWkRgT0dmohOepMtblVADEFVQ8pYobtfBQmiyHiNo0rB04vgvjgj7M8qk9GjnYENGL1MzRiw7p5ExCukTdJ1CfT62IyMzEKOCj+kSk4jh+dkqhQ1xBxVu8+8q5WwlEZCEx3j4ngPnwtR/I3NQo6Lt+EhMxER2//njR7iusK4L3SpPlHL4aS0TGYkP17Lp667/+gToxfqCwv0dAC0XEPP9xywW+vezTbvXrVGNbT4Vwd7ZdOrkb3/5h87lL93Rw7jvdEHw+mh8or1cb5+pWEtblMNajlXO1KhIiiniQxHeVFDTEFVSkzJy8kQsP8gMXDejUcEIvd9YVVZgpfTwGdmpERHkK1fDAg/ylTtA223AlsAAjscHATg2JiON0ocMF4goq0lf/nHjwNJWI6lSvsuYrX9blVLC1032daloR0ZOX6d+ux+BMWif+ZfrFu4lEZGVu4t/OlXU5WmGIDvUPRFxBhdkX9mDdkSgiMhCJtsz2569C6BJrC9Og7/qZGBl2aGIffD6Gvz8H2mP7qbt8R5hBnRuZGotZl6MVurjXtbOxIKLbj1/diX/FupwPgriCivHs9ZtPloby7ZkDPfkhy3SPZyO7zwNahd19mvom+4dNeHBYu6BP4LsMRKJBb7ucCP0EC3EFFYDjaMziEP5hl1b1a80f15l1RZXohxEd+PHaL9xJPHYtjnU5kC8i5nnM0xQicqxp1amZA+tytMjwrurrgcLuzo64ggrw+54rp27GE5GZidG2OQG6PQC2tYXpzIGefHve5gt4DEtLqAdeGu7tZqCfIy+9R5sGds61rYnoUVJaeEwS63LKD3EFHyry0cvvN+ZfFls6xYd/ola3fdG/NT8PcnhMEqYX0QYKpUp9pQtXAgsRiWi4dxPPRnbt3eocvirg+YURV/BBsuR5wxYc4HuuB3xUf7KfB+uKNKGKxPibIe349rzN53GCxdyxa3HJ0iwiaulay82xOutytE7/jg2uRidduvdsX5ggh7vlOI7jOMQVfJCv15yOTkwhotrVLNbP8GNdjuZ85t+K73AVFZccfF7YtwR0wLZT+bNbjeqGU6sieLjUUvcPTEgW6uRtiCsov4OXH/5z6AYRiUS0aVYfvRpEQGIinjusPd/+aesFzIbF0Jvs3IOXHxKR2NBAPQw5FCQSUfeW9fg2P0iVECGuoJxepGaqe65P/7htj1b12NajeRN7t3CsaUVE9xNSdryduxY0b++F6Cx5HhF1a+lUq5o563K0lJ9n/nPTh8OFevsKcQXlwXE0ZvGhV+lZRNTc2XbB+C6MC2LBWGz4/fAOfPunrRfyFCq29egt9ZVAdLIoRo9W9fjBpk9HxmfLFazLKQ/EFZTHX/sjjl9/TEQSE/HOb/vy02zrobE9mvEzKsU9l248fot1Ofro6es3ZyKfEFEViXG/9g1Yl6O9rMxNOjZxIKJsueJ0ZDzrcsoDcQVldisu+Zt1+SPmLfqkqz53xBIbGvw4qiPfnr89jB8LHDRp55m7Ko4jon4dGpibGrEuR6v5ebrwDYFeD0RcQdnk5CpG/HaQ/17u4+n6eUAr1hUxNrxrEz6wE19lrDl8k3U5ekc98BL6BJbov9tXwuxtgbiCspm19jQ/UGbNqubrZvTG6AEGItFPozrx7QVBl/h7/qAZUXHJtx+/IiI7G4uuLZxYl6PtGjnYuNhVJaKE5Iz4FOHNgIO4gjIIDX+04uB1IhKJaOPXfjWrohcWEdHATo1auNQkohepmfy/D2jG9redLIZ5NzE00Ps/nUrBr23+9cBrj9+wraQcEFdQWi/TMscvOcyP4PB5QCvfNi6sK9IWIhH9PCb/BGvR7itvsnPZ1qMnVBy3/bR6CPYmbIsRCvX1wIh4xBXoKI6jT5aGvkzLJKKmTjUWT+zKuiLt4t+uvmcjOyJ6nZ79574I1uXohVM345NSZETUrF4N/uwWSuTVvK6FxJiIop9n8VMoCAjiCkplTejNkKuxRGRiZLh9TgDmvnvX/LFefGPJnvA0mfBuDAgOHrcqBxMjw24eTkSk4rijEQKb/gZxBSWLfPRyxqpTXs3rGokNFn7i3dzZlnVF2qhbSyev5nWJSCrLWbLnKutydFyWPG/fxRgiMhCJhnlj4KUyEO7wFogrKIEsO3forwey5HnnbiWM6tb0i35tWFekvX4Zmz8v5V/7rvFDfkAl2R/2gL9H2MW9rkMNS9blCEnvti4SE3FLxyrdWzqxrqVsEFdQgs/+PsZP0lq7mkXgeG/0XC9Gp6YOPVs7E9Gb7NyFu66wLkeX4UpgudnZWKTunf6/vk5jezRnXUvZIK6gOJtP3OYfwzQ0EG3/NsDW2ox1Rdru5zGd+ERfeeg63xEAKtzLtMwTNx4TkZmJ0YBODVmXIzwCvfeMuIL3ik5M+fzvY3z7u+EdvN0d2dYjCG0b2vm3q09E2XLFgp2XWJejm4LO3lMoVUTk387V0syEdTmgIYgrKFq2XDH01/2ZOXlE1LmZw7yRHVlXJBg/j+nMn2CtDY188jKddTk6CAMv6SfEFRRtxuqTUXHJRFTdSrJzbj8MGVB67s62gzo3JqJchXL+jjDW5eia+wkp1x++ICJba7MerZxZlwOao6VxJZVKfX19raysfH1909Px96mm7bkQvSrkJvHTBH/dh582G0rvp1Gd+IDfdPx2bFIa63J0inoki8FejfkJnEBPaOl/7MDAwM6dOycmJnp5eS1cuJB1Ofrl8QupeprgmQM91U9pQOk1rmszvGsTIlIoVf/bepF1ObqD4/7rE4grgfpGS+MqJCRk4MCBlpaW/fv3P3z4MOty9EiuQjn01wPpmXIiatvQ7tdxXqwrEqofR3YUGxoQ0Y7Td+89ec26HB1x/nYCfzuwob1N24Z2rMsBjdLSuIqPj7e3tyciBweHuLgSRgpRKLl5m8/LMK5oRfhu47nwmCQisjI3Cfqur7FYT6cJ/nAudlXH92xORCqO+2nrBdbl6Ijtp98+btUNY9rqHRHHj7CtZQwNDRUKhUgkUqlURkZGSuX/m6Q1JCSk4Mt1F54fuPnaztrk614O9W0lmq1Up0TEv/nlYDx/QMzpXbeDqxXjggTu9Zu8SVti8pSciGjZsPrONUxZVyRseUpu1Lr7mXKliGjNmIa1rIxZVyRsffr0YV1C2Wjpw2ISiSQnJ0cikWRnZ5ubF55UqeC/8sNnqSHL1xBRklQ+Z8/jX8d5zRzoiZEXyiEpRTZu8zo+q6b08Qj8ohfjgnTCjbQTf++/xhGdfEwHxwns20Hb7LkQnSm/Q0Qdmtp/MuJj1uUIW6E/+gVBSy8GOjs7JyYmElFCQoKra3G3+uvXqfZLv3r21asQUa5COWvt6V5zg16kZmqoUF2hVHHDFux/nZ5NRO7Otn9M6ca6Ih0xd2h7MxMjIjp05eHV6CTW5QjbtlPq2a3QyUIfaWlcBQQEBAcHZ2RkBAcH+/v7F//mZvbmkasm9GvfgH95/Ppj9ynrBDc2Pls/b7t4/nYiMOWgoAAAHcxJREFUEZmbGgV910+gY7RooVrVzD8PaMW3f9h0nm0xgpaSkX0kPI6ITIwMB3VuxLocYEBL42r27NkXL150cHCIiIiYNWtWie+3sZTs+2nAymk9+e/ZZGlW7+93zVx9Sp6nLHFdOBP15Ne3T7OunNazkYMN23p0zOzB7apIjInoxI3H524lsC5HqHafu5+rUBJR77Yu1argFrU+0tK4srS0PHLkSHp6+qFDhywsSvuM6qf+LSOWj23qVIOIOI6W7g1v/+UWfjRxeJ9kadaIwINKFUdEo7o1Hd29GeuKdE11K8mX/dsQkYXEWP3MEJTV1lPqgZdwiOopLY2rcmvqVCP877Gf+rfkX96IfdH6800bjkWxrUprcRyNWXzoeaqMiBra26yc1pN1Rbpp5sC2Ph5OpsbidUciL9xJZF2O8Dx4lirPVRoaiKpVkfRu68K6HGBD1+KKiCQm4pXTeu77aYCNpYSIZNm5E5aEDluQ/+grFLRo9xX+Jp+psXjX9/0sJOgZXCmsLUw7NLF/nZ5FRL/uwDDtZbYuNOpG7Isa1uZf9GttYoRnAfWUDsYVr1/7BpGrJvCTkRNR0Nl7Hp9uuHz/GduqtMqV+89+2HyOby+Z7OOOKe0r0xf9WvN/DRy7FseP0AqlJM9TbjweRUQvUmV929dnXQ4wo7NxRUT21aucWjT8l7Gd+bFw4l9KZ68989f+a6zr0gppspyhCw7kKVRENKBTw8/eXj6FSmJjKZnSx4NvYx6sMtlzIZp/xMKzkV0Ll5qsywFmdDmuiMjQQPT98A7nloxwqmnVoYn9xTuJX648MXrRoWy5gnVpjE1Ycpgfe82pptW66b1Zl6MXZgxoKzERE9H+sAd3MYpgqa0Ouck3Jvt5sK0E2NLxuOK1d7O/sXI8fyuLiLaevNNh+pbHL6Rsq2JoxcHr+8IeEJGx2HDn3L7WFhgcSBNqV7MY2yN/FMFAnGCVzt0nr/nOKdYWpkO7uLEuB1jSi7gioqpVTPf9OPDnMZ0NRCIiuhn7ss3UTcevP2ZdFwOnI5/MXH2Kb88f17ld4zps69Erswe34y9N7zp3/xHmwSqFVSE3+MaY7s34c1PQW/oSV0QkEtEPIzoc+mUQfzKRkpHd+7tdvwVd1soxfivL1eikAT//27hudXNTI982Ll8PbMe6Iv3iVNOKH0BIoVQt3H2FdTnaLkuep35SDVcCQY/iite7rcu15WObO9sSkVLFfbvh7KD5/77Rj8lHLt552mNOkFSWE/noZTcPp82z+2AsYM2bM7Qdf4q/+fjtp6/fsC5HqwWdvSeV5RBR52YOjetisBV9p3dxRUQudlUvLRutvg6+90KM57RNOj/4xamb8b3mBmVkyYmogX21v6f2qGFlxroofdTQ3mZg50ZElKtQ/h58lXU5Wm3V204WU/qg5yroZVwRkbmp0c65fX+f1JW/kXA/IaXt1M0HLz9kXVdlORoR5z8vODMnj4ga17U5+/sIhxqWrIvSX3OHtefPa9eGRr5Kz2Jdjpa6/vBFRMxzIqphZTagU0PW5QB7ehpXvJkDPU/8Now/ycjIkvf7ac8Pm86rdO5e1v5LD/r+uIfvu9/Cpea5JSNrVyvtMIxQGdydbf3auhJRljzvj73hrMvRUmsO559ajevZHLNaA+l5XBFRF/e611eOa9OwNhFxHM3fEdbn++A0WQ7ruirM7nP3B8/fxw9l3ap+rVOLhuEaoDb4bnh7vrHy0A2pDh1vFSUjS77jzD0iMhCJJvVuwboc0Ar6HldE5FDD8vySkeN7uvMvj0Q8ajN10624ZLZVVYitJ+8MD8wfuqJDE/tTi4Zj5gUt0a5xna4tHIkoPVO+/OB11uVonW2n7sqyc4moW0snF7uqrMsBrYC4IiIyNRavn9n7ny968aNnPkpKa//VlqCz91jX9UHWhkaOXRzCzwzi1bzu0QVDrMxNWBcF/5k7LP8E6899ETL96JtaeurHrdDJAtQQV/+Z0sfjzOIRdapXIaLMnLxhCw7MWHVKoVSxrqs8Vhy8PvnPI/x9uB6t6oX+OhijrWsbHw8n/hnt1+nZa0IjWZejRS7de3r78SsisrOx8G/nyroc0BaIq//nI7c615aP69jUnn/5x7/h3efsTJYKrO/W4uArU5cf57uM9PF0PfjzIDMTI9ZFQRHUd7B+D76ak6vv41iqqfuvf+Lbgu+7C0CIq3fVqmZ+etGIL/q15l9eiU7q8NWWTcdvCaXD4K87Ls1ee4Zvf9yx4d4fP8b8QFrLr60rP2/L81TZxmO3WJejFVIysvdciCYisaHBJ77urMsBLYK4KoKR2ODPz7pvme0vMRG3a2QXm5Q27vfDnWZsjXz0knVpJZi74ez3m/KnsBretcnu7/ujB7A2E4n+u4O1OPiqQK88V6wtJ2/zD134tnHB04FQEOLqvUZ1axr+11j+0VoiCrv7tM3UTV+uPKGd3Y45jr5eczow6DL/cmyP5ltm+xsaYJAlbTewc6OG9jZE9PiFdMfpu6zLYYzjaHVI/m089fRgADzEVXGa1qtx5a8xy6f24EfFVShVf+2/5vbJ2m2n7mjVtUGOo6nLjy3Zkz+iz6f+LTfM9ENWCYKBSDRnaP5Aw4FBl3XvKfUyORP1hB8OzammVa82zqzLAe2CuCqBgUj0eUCrBxsnj+3RnB8453mqbNTCQ96ztt+Jf8W6OiIipYqb+EfoykP5HX+/+rjNiqk9MXatgIzo2tSxphURRSem/HsxhnU5LKn7r0/y8zDAQQz/H+KqVGpYmW382u/C0lH8jXEiOncrwePTDTNXn2L7xIxSxY1dHLL+aBT/cs7Qj/6Y0g2/5sJiJDaYPTj/BOvXHZf09vzqZVrmgUsPichYbDi+Z3PW5YDWQVyVQYcm9tdWjFv2aTf1tcGle8Mbjl/N6oHiJy/Te80N2nbqDv/yf6M7BY7vwqQS+EDjejTnB3KMfPQyNDyWdTlsbDh2ix8trG/7+jWrmrMuB7QO4qpsxIYGX/Zvc2/dxJE+TfmTmKQU2bAFB3xm77ifoKEpSJQq7uDlh37f73Ye/c/tx6/4e1S/TfCeN7KjZgqACicxEc8Y0JZvL9h5mW0xTKg4Tj2mLUaygCIhrsqjdjWLrd/4n1k8ooljdX7J6cgnLaasn7P+TKVeG0x8lfHT1guOI1f0/XFPaPgjFce9TMvs1cblr8+6fzME8wIL25Q+HjaWEiK6dO/p6cgnrMvRtKMRcfEv04moob2Nt7sj63JAGyGuys+red3IVROWTPbhxzfKVSgX7rri9sla/iHHCqRUcSFXYwPm7ak3auX/tl589nYKWomJeFzP5j+N6jTt7UPNIFwWEmP1w+mBQZfYFqN5q9+eWk3ya4Gbr1AkMesChE1saDBjQNuhXdxmrDq569x9Ikp8lTHol30fNa7ziW8Ldxdbt7rVJSbl/0dOSpGtOxK5/mhUQnJGweVNnWpM6t1idPdmGLVWl3zRr/WSPeEZWfKTN+LDY5LaNrRjXZGGJL7KCA1/REQSE/GY7s1YlwNaCnFVAexsLIK+6zfJz2Pq8mP8Haz0LPmEpYeJyNBA5Fy7anPnGk0cazR1qtGsXg1Xu6olDoOm4rhj1+LWHI48dOUhP6Q6T2IiHtS58aTeLTo0sa/UPQImrC1MPwto+VvQZSKav/3SwZ8Hsq5IQ9YdieJH9BjYqRF/RRTgXYirCtO1hWPkqgl/7I1Y9m+4pVn+8OdKFffwWerDZ6l7L+Q/T2NiZOjmWF2dXk0cq/PP3PCep8o2HL217kgkfx1frXFdm0m9PUZ3b4oJq3TbV/3b/LkvIluuCLn68FZccvO3D07oMIVSpX4SY7IfRrKA90JcVSRjseE3Q9qN6Op2/Prjlq617j55ffvxq9Q32QXfI89T3ox9eTP2v+EHrcxN3ByrO9eyTkqRXbybyM+myDMxMhzQqdFkP4/OzRw0txvATs2q5p/4tvh7/zWOo8Cgyzvn9mVdUaU7dCWWvx3brF4NXDaAYiCuKp59DcvxvdzH98ofTDopRXYn/hX/v9uPX9178jpLnlfw/emZ8sv3nl2+98zc1EidVQ3tbSb2dh/bozmujeibWYM8V4fczFUod5+7/7/RnRrYV2NdUeXCTIxQSoirSmdnY2FnY9GjVT3+pYrjHj+X3n6bXnfiXz18lsqnlGcju7C7T/t3aDjJr0WX5o7oH6WfHGpYjurWdP3RKBXH/bbr8oaZfqwrqkSPktJO3ognIguJ8UifJqzLAa2GuNI0A5HIxa6qi13Vfu0b8EtyFcrohJQ78a/ylKqdc/vZWpuxrRCYmzP0o80nbiuUqm2n7vw0qlNdW52dR2PtkUh+VN9h3m6WZujmCsXBc1fsGYsNmzvbDu/aZEz3ZsgqICJXu6qDvRoTUZ5CtWj3FdblVJZchXLD0fxJKdHJAkqEuALQRt8O/Yi/GrzhWNSL1EzW5VSKvRdiXqVnEVGbhrVb1a/FuhzQdogrAG3U1KkGf7nY3NT4r/0RrMupFAU6WeDUCkqGuALQUt8Oa9+9Zb3M7NzFwVe1ZHK1CnQ/IeXCnUQisrYwHeLlxrocEADEFYCWatOgtq21WXauQqFUTVtxXMfmwVp9+Ca/RyN9mpibGrEuBwQAcQWgvX6f5MP3lzsblbDzzF3W5VSYbLli84nbfBuPW0EpIa4AtFetaub/G92Jb89aezojS862nooSdPaeVJZDRB2b2qtn4QEoHuIKQKtN7duqqVMNIkpKkf28LYx1ORVjNWZihLJDXAFoNbGhwcovevKd2v/cF6EDfS4iH728Gp1ERNWtJAM7NWJdDggG4gpA23Vq6jDcuwkR6Uafi1Uh+adW43q4mxgZsi0GBARxBSAAOtPnIvFVxpX7z2pWNReJaGJvd9blgJAgrgAEQGf6XExdfjwqLjkzJ++r/m3q19HxweahYiGuAIRBB/pc7At7cPDyQyJSKFXoZAFlhbgCEAah97l4k507bcVxvv3d8PY6P48XVDhmcSWVSn19fa2srHx9fdPT0wv9tFu3bqK3pk6dyqRCAG0j6D4X3208x88a3LiuzezB7ViXA8LDLK4CAwM7d+6cmJjo5eW1cOHCQj9NS0uLjY3lOI7juOXLlzOpEEALCbTPRXhM0sqD14lIJKLVX/kai9EhEMqMWVyFhIQMHDjQ0tKyf//+hw8fLvRTqVRarRquFQAUJsQ+FwqlasqfR5Uqjogm9HLv1NSBdUUgSMziKj4+3t7enogcHBzi4uIK/VQqlQ4dOtTS0tLb2zshIYFFgQBaSnB9Lpb9G3Ez9iUR2VqbLfzEm3U5IFRiVhvOyckxNTUlIlNT06ysrEI/9fX1nTBhQuvWrefNmzdt2rQDBw4U/Gl0dLRKpSq45Pnz55VdMID2+GV4648Dj3Ac/bkvws+jViP7qqwreq+nr2U/bb3At38c2loukz6XSdmWBAKl0bgSiURExHEcEUkkkpycHIlEkp2dbW5uXuid27Zt4xs//PCDs7NzoZ8mJSUViqukpKTKKhpA+zhUoV7utY9EPlcoVbPWX1j1SWu+x6AWmrH5ZmZOHhF51rfxdDTFryqUm0bjiivQk8nZ2TkxMbFBgwYJCQmurq6F3nnz5k13d3cDAwOVSmViYlLop127di34MiQkpFWrVpVUM4B22lCvUcPxqzOy5NfjUh9kmA7v2oR1RUXYcyH6YvQrIpKYiLd/N8jFTnvPAvVNSEgI6xLKjNm9q4CAgODg4IyMjODgYH9//0I/nTRp0sqVK2UyWWBgoI+PD5MKAbSZ9ve5SM+Uf7nyBN/+fngHZBV8IGZxNXv27IsXLzo4OERERMyaNUu9nL9guGbNmnXr1tWqVevOnTtLlixhVSSANtPyPhdzN5xNSpERUVOnGrMG4UEr+FDMulpYWloeOXLk3eX8BUMPD4/IyEiNFwUgJPw4F14zt/F9Lsb2aManlza4cv8ZP/K6SESrv+plJMYAOvChcAwBCJh2jnOhUKom/3lUxXFENKm3R3s3e9YVgS5AXAEImxaOc7F0b/ituGQiqlXN/LcJXViXAzoCcQUgbNrW5yLuufR/Wy/y7T+mdLO2MGVbD+gMxBWA4GlVn4upy49nyfOIyLeNy9AubmyLAV2CuAIQPO2ZWyTo7L0jEY+IyMzEaMW0HqzKAJ2EuALQBdrQ50Iqy5m+6iTf/nFUx3q1rBkUAboLcQWgI5j3uZiz/uyL1Ewiau5sO2NAW80XALoNcQWgIwr2uZi55tTT1xma3HrY3adrQm8SkYFItPrLXmJDfLdABcMhBaA7+D4XEhOxxNjI++sdfG9yDchTqKb8eZS/Avmpf8t2jetoZrugVxBXALpDbGiw+ivfzs3qPn4hjU1K++jLLVtP3tHAdhcHX+H7d9jZWPw6zksDWwQ9hLgC0Cnt3ep8P7xDnepViChLnjd60aFP/zoqz1NW3hYfJaXN35Hfe/7Pz7pbmReeQgGgQiCuAHRNx6b215aP6+Jel3+5KuRmpxlbE5Ir61bWp38dy5YriMjP03Vgp0aVtBUAxBWADqpVzfzEb8NmDWrHP4wVEfO85Wcbjl9/XOEb2n767okbj4nIQmK8YioetIJKhLgC0E1iQ4NFE73//XEA37s9JSPbd+6uX7aHqSrumayUjOwZbx+0+mlUR8eaVhX1yQDvQlwB6LJ+7RtcWzG2Wb0aRKTiuHmbz/v/EJySkf2BH5smy1n2b0Tzyev5j/Jwrfll/zYVUC7A+yGuAHRc/TrVrvw1ZqRPU/5laPijNlM3XX/4onyfFh6TNGFJaJ1hf09fdTIp5U1zZ9umTjVWf+mLB62gsuEIA9B9ZiZGW7/xXzGtp4mRIRE9fiHtOH3ruiNRpf+EzJy8dUeiWn++0XPa5g3Hovi+FUQklclnD27XpmHtSqkboABmswkDgIZ95t+ydYNag37Zl5CckZOrmPhHaNjdp/980dPUuLjvgXtPXq8+fHPzidvpmf9NTWIgEvVu6zK5j0fvti4GfHcOgEqGuALQI20b2l1fMX7Ebwf4XoKbjt+KfPRy77yPnWsXHo42V6HcF/ZgVciNs1EJBZfXrGo+oZf7xN4tnNCxAjQLcQWgX6pbSUJ/HfK/rRfm7wjjOIp89LLV5xu3fuPfx9OVf8OTl+lrQiPXH416mZZZcMUu7nUn+3l83LGhsdiQReGg7xBXAHrH0ED085jOno3sRi8KSX2TLZXlBMwL/nZo+3aN66w5fDM0/FHBzu5W5iajuzeb4ufh5lidYc0AiCsAPeXn6XptxdiBP++7EfuC42jBzkuF3tDStdan/i2HebuZmxoxqRCgIMQVgP6qV8s6bNmoqcuPrz8a5VTLKv5FOhFJTMRDu7hN6ePRtqEd6wIB/oO4AtBrpsbidTN6t29iv3TP1R6t6vVq4zy2R/OqFqas6wIoDHEFADS+Z/PxPZuzrgKgOHhMGAAABABxBQAAAoC4AgAAAUBcAQCAACCuAABAABBXAAAgAIgrAAAQAMQVAAAIAOIKAAAEAHEFAAACgLgCAAABQFwBAIAAIK4AAEAAEFcAACAAiCsAABAAxBUAAAgA4goAAAQAcQUAAAKAuAIAAAFAXAEAgAAgrgAAQAAQVwAAIACIKwAAEADEFQAACID2xlVQUJCBgfaWBwAAmqSleRAWFnbr1i2O41gXAgAAWkFL4yo8PHzBggWsqwAAAG2hpXE1ffp01iUAAIAWEbMuoDzOnz+vUqkKLjl27BirYgDeh7+aLRKJWBcCUJgQD0stiiv+n68096usrKwKvk0mk1lYWFRiZQDl8ubNG5FIhIMTtFBaWhrrEspMi+Kq9B0r3N3dC758+vRphw4dKqEigA8SFhYmFos9PT1ZFwJQWEhICOsSykxL710BAAAUpEVnVwWpr6uW/gohAADoMC2NK+QTAAAUpKVxVSbW1tasSwAogq2trVisC79ioHuE+LUpwnkMAABoP3S1AAAAAUBcAQCAACCuAABAABBXAAAgAIgrAAAQgOLiSiqV+vr6WllZ+fr6pqen8wtF/x+/UCaTtWvX7n2rqFSqzz//3MLCwsXF5cyZM+rPV6/1+PFjb29vCwsLd3f3q1evvu9zilz45MkTb29vc3PzXr16ZWRklGYXilxY0IMHDzp27Ghubt6yZcuIiIji9+JDNgTlpqsHJ5VuYtJt27YVHKI0KirK09PTwsLC09MzMjKyNBvCwVlJdPXILPJbscS1ij/MyrpKcb8VgYGBnTt3TkxM9PLyWrhwIb+Qe+uff/4ZPHgwv3DXrl1+fn7vW2XNmjXm5uaJiYmBgYFz585Vf756rQkTJnTv3j05OXnq1KmTJ09+3+cUuXDq1KmdO3dOSkpq3779/PnzS7MLRS4saOLEif3793/16tXkyZMnTJhQ/F58yIag3HT14CzNxKQcx23YsKHgknHjxk2ZMiU5OXnixInqI7b4DeHgrCS6emQW+a1Y4lrFH2ZlXoV7Pzc3twcPHnAcFx0d3bx584I/SklJcXJyevbsGf+yQ4cO0dHR71ulU6dO/G9gIeq11q9fn5OTw3FcRkaGubn5+z6nyIVWVlZSqZTjuBs3bri5uZVmF963X+p/ja1bt+bm5nIcJ5PJJBJJMXuhXqVMG4IPp6sH59KlS7kCx5VawSUHDhyYPXt2wSUSiYQvUi6Xq49YHJxM6OqRWeS3Ileuw6zcR2ZxcWVmZpaVlcVxXGZmpoWFRcEfff/99z/++CPfjo6ObtGiRTGrVK1aNSgoyNbWtkWLFvfv3393LbV///3Xx8fnfZ9T5EIrK6v09HSO4+7du2dmZlaaXShmvwrKy8tbvny5n59fMXtRIRuCctDVg5NX/N+R7du3j4uLK/ienj17rlq1SiaTbdy4sXfv3qXZEA7OSqLbR2ahb8US1yr+MCvrKsX9VhgYGKhUKo7jlEqlgYGBerlMJqtXr15aWhr/8ptvvlmwYEExqxgaGs6dOzcjI2PevHndu3d/dy3e/fv3HR0dIyMj3/c5RS709fX96aefMjIyvvzyS5FIVJpdeN9+FUJEderUefjwYTF7USEbgnLQ1YOTV0xcnTlzhv+yKPiemJiY6tWrE1H16tX5P71L3BAOzkqi80dmwW/FEtcq/jAr6yrFxZW5uTmfcjKZrEqVKurlQUFBo0eP5tsKhcLOzi42NraYVaytrWNiYjiOk0qllpaW767FcdytW7ccHR1DQ0OL+ZwiF8bExLi7u1etWjUwMNDExKQ0u/C+/SokLy9vxYoVnTp1et9eVNSGoBx09eDkFRNXPXv2PHLkSKH3+Pj4rF69WiaTrVu3zsvLqzQbwsFZSXT7yCz0rVjiWsUfZmVdpbiuFs7OzomJiUSUkJDg6uqqXn7w4MGAgAC+feTIkdq1a7u4uBSziqOj45s3b/jfLn7Ez0JrJSUl9enTZ8WKFb6+vsV8TpELGzRoEBkZmZqa2q1bN1tb29Lswvv2S23x4sVyuVwsFo8ZM+batWvv24sP3xCUm64enCU6duyYr68v37tMJBJ16dKFiMLCwkaPHm1ubj5ixIjw8PDSbAgHZyXR1SOzyG/FEtcq/jAr6yrFxVVAQEBwcHBGRkZwcLC/v796+c2bN5s1a8a3N2zYMGTIkOJXGTBgwPbt29PT05ctW+bt7f3uWrNmzRo9ejTf3aWYzylyYcuWLf/991+pVLp169YBAwaUZhfet19qhw4dWrZsWVZW1tatW93c3N63Fx++ISg3XT04S6T+S5Nvnz17logaNGiwbdu27OzsHTt2NGrUqDQbwsFZSXT1yCzyW7HEtYo/zMq8yrvndGrp6em9evWytLTs06fPmzdv1MurVKnCv0xOTjY2No6Pjy9+FZlM5u/vL5FIOnbs+OTJk3fXKvgECRE9fPiwyM8pcuGxY8fq1q1rZmY2ceJEuVxeml14336p/zWio6M/+ugjMzMzd3f38PDwIvei0Cpl2hB8OF09OAv9Pqvf/O6vasEl165d8/DwkEgkHh4e165dK/QGHJyapKtHZpHfily5DrNyH5mYQAQAAAQAgzABAIAAIK4AAEAAEFcAACAAiCsAABAAxBUAAAgA4goAAAQAcQUAAAKAuAIAAAHQi7jiR6DSN9hr/YG91h/6vNd6EVf85ED6BnutP7DX+kOf91ov4goAAIQOcQUAAAKAuAIAAAFAXAEAgAD8H4C+wyZPsv8dAAAAAElFTkSuQmCC]]></Image>
  <CoordSystem>
   <General ExtraPrecision="1" CursorSize="3"/>
   <Coords Coords="0" UnitsX="0" UnitsYString="Number" ScaleYRadius="0" UnitsDate="3" UnitsRadiusString="Number" Type="0" ScaleXThetaString="Linear" UnitsTheta="0" UnitsRadius="0" UnitsDateString="YYYY/MM/DD" TypeString="Cartesian" ScaleXTheta="0" UnitsThetaString="Degrees (DDD.DDDDD)" UnitsY="0" UnitsTimeString="HH:MM:SS" UnitsXString="Number" UnitsTime="2" ScaleYRadiusString="Linear"/>
   <DigitizeCurve CursorInnerRadius="5" CursorSize="1" CursorStandardCross="True" CursorLineWidth="2"/>
   <Export XLabel="x" PointsIntervalFunctions="10" PointsIntervalRelations="10" PointsIntervalUnitsFunctions="1" PointsSelectionRelations="0" PointsSelectionFunctions="0" PointsSelectionFunctionsString="InterpolateAllCurves" DelimiterString="Commas" PointsIntervalUnitsRelations="1" HeaderString="Simple" Delimiter="0" LayoutFunctionsString="AllPerLine" LayoutFunctions="0" Header="1" OverrideCsvTsv="False" PointsSelectionRelationsString="Interpolate">
    <CurveNamesNotExported/>
   </Export>
   <AxesChecker Seconds="3" Mode="1" LineColor="6"/>
   <GridDisplay CountY="2" StartY="0" StepX="1" Stable="False" ColorString="Black" Color="0" DisableY="0" StopX="1" StepY="1" DisableX="0" CountX="2" StopY="1" StartX="0"/>
   <GridRemoval CountY="2" DefinedGridLines="False" CloseDistance="10" StartY="0" StepX="0" Stable="False" CoordDisableYString="Count" StopX="0" CoordDisableY="0" CoordDisableX="0" StepY="0" CountX="2" StopY="0" CoordDisableXString="Count" StartX="0"/>
   <PointMatch ColorRejectedString="Red" ColorAcceptedString="Green" ColorAccepted="4" ColorRejected="6" ColorCandidateString="Yellow" PointSize="48" ColorCandidate="7"/>
   <Segments MinLength="2" FillCorners="False" PointSeparation="25" LineColorString="Green" LineWidth="4" LineColor="4"/>
   <Curve CurveName="Axes">
    <ColorFilter CurveName="Axes" Mode="2" IntensityLow="0" HueLow="180" ForegroundHigh="10" SaturationLow="50" ValueHigh="50" HueHigh="360" IntensityHigh="50" SaturationHigh="100" ModeString="Intensity" ForegroundLow="0" ValueLow="0"/>
    <CurveStyle CurveName="Axes">
     <LineStyle Width="0" ConnectAsString="ConnectSkipForAxisCurve" ColorString="Transparent" ConnectAs="4" Color="8"/>
     <PointStyle Shape="1" ShapeString="Cross" ColorString="Red" Color="6" Radius="10" LineWidth="1"/>
    </CurveStyle>
    <CurvePoints/>
   </Curve>
   <CurvesGraphs>
    <Curve CurveName="Curve1">
     <ColorFilter CurveName="Curve1" Mode="2" IntensityLow="0" HueLow="180" ForegroundHigh="10" SaturationLow="50" ValueHigh="50" HueHigh="360" IntensityHigh="50" SaturationHigh="100" ModeString="Intensity" ForegroundLow="0" ValueLow="0"/>
     <CurveStyle CurveName="Curve1">
      <LineStyle Width="1" ConnectAsString="FunctionSmooth" ColorString="Blue" ConnectAs="0" Color="1"/>
      <PointStyle Shape="1" ShapeString="Cross" ColorString="Blue" Color="1" Radius="10" LineWidth="1"/>
     </CurveStyle>
     <CurvePoints/>
    </Curve>
   </CurvesGraphs>
  </CoordSystem>
  <OperatingSystem Endian="LittleEndian" WordSize="64"/>
  <File Imported="True"/>
  <CmdMediator>
   <Cmd Type="CmdSettingsCoords" Description="Coordinate settings">
    <Coords Coords="0" UnitsX="0" UnitsYString="Number" ScaleYRadius="0" UnitsDate="3" UnitsRadiusString="Number" Type="0" ScaleXThetaString="Linear" UnitsTheta="0" UnitsRadius="0" UnitsDateString="YYYY/MM/DD" TypeString="Cartesian" ScaleXTheta="0" UnitsThetaString="Degrees (DDD.DDDDD)" UnitsY="0" UnitsTimeString="HH:MM:SS" UnitsXString="Number" UnitsTime="2" ScaleYRadiusString="Linear"/>
    <Coords Coords="0" UnitsX="3" UnitsYString="Number" ScaleYRadius="0" UnitsDate="1" UnitsRadiusString="Number" Type="0" ScaleXThetaString="Linear" UnitsTheta="0" UnitsRadius="0" UnitsDateString="MM/DD/YYYY" TypeString="Cartesian" ScaleXTheta="0" UnitsThetaString="Degrees (DDD.DDDDD)" UnitsY="0" UnitsTimeString="HH:MM:SS" UnitsXString="Date/Time" UnitsTime="2" ScaleYRadiusString="Linear"/>
   </Cmd>
   <Cmd Type="CmdAddPointAxis" GraphX="1246865760" Ordinal="1" IsXOnly="False" Identifier="Axes&#x9;point&#x9;1" Description="Add axis point" ScreenY="309" ScreenX="66" GraphY="-1"/>
   <Cmd Type="CmdAddPointAxis" GraphX="1246874400" Ordinal="2" IsXOnly="False" Identifier="Axes&#x9;point&#x9;3" Description="Add axis point" ScreenY="308" ScreenX="511" GraphY="-1"/>
   <Cmd Type="CmdAddPointAxis" GraphX="1246865760" Ordinal="3" IsXOnly="False" Identifier="Axes&#x9;point&#x9;5" Description="Add axis point" ScreenY="15" ScreenX="65" GraphY="1.5"/>
   <Cmd CurveName="Curve1" Type="CmdAddPointsGraph" Description="Add graph points">
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;6" ScreenY="191" ScreenX="66"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;7" ScreenY="205" ScreenX="86"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;8" ScreenY="219" ScreenX="106"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;9" ScreenY="227" ScreenX="130"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;10" ScreenY="219" ScreenX="152"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;11" ScreenY="202" ScreenX="170"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;12" ScreenY="181" ScreenX="185"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;13" ScreenY="161" ScreenX="199"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;14" ScreenY="142" ScreenX="216"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;15" ScreenY="130" ScreenX="236"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;16" ScreenY="139" ScreenX="258"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;17" ScreenY="159" ScreenX="273"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;18" ScreenY="181" ScreenX="285"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;19" ScreenY="203" ScreenX="296"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;20" ScreenY="225" ScreenX="308"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;21" ScreenY="247" ScreenX="320"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;22" ScreenY="267" ScreenX="334"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;23" ScreenY="272" ScreenX="356"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;24" ScreenY="256" ScreenX="372"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;25" ScreenY="234" ScreenX="385"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;26" ScreenY="211" ScreenX="394"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;27" ScreenY="187" ScreenX="403"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;28" ScreenY="164" ScreenX="412"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;29" ScreenY="140" ScreenX="421"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;30" ScreenY="118" ScreenX="431"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;31" ScreenY="96" ScreenX="443"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;32" ScreenY="83" ScreenX="460"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;33" ScreenY="97" ScreenX="479"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;34" ScreenY="119" ScreenX="490"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;35" ScreenY="142" ScreenX="498"/>
    <Point Ordinal="1" Identifier="Curve1&#x9;point&#x9;36" ScreenY="166" ScreenX="507"/>
   </Cmd>
  </CmdMediator>
  <Error Context="Shift+Control+E" Line="1377" Comment="userTriggered" File="src/main/MainWindow.cpp"/>
 </Document>
</ErrorReport>