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kGAACdS9EMKx+EDAMAgDNI1QwrzhY3dh1plLYSAABIWSmaYQOzzRaDhogO1TmCYU7qcgAAIBWlaIYxDJ09JIeIuCi/B5cTAQCgMymaYUR0dkmuuPHfww3SVgIAAKkpdTNsTEmOuIEMAwCATqVuho0tyRM3vj2EDAMAgE6kboaNGpTNqpREtOtIIxZ0BgCAU6VuhqlVilGDsonIGwgfOI4J7AEA4GSpm2FEdM6wtmEd2yvrpa0EAAAkxJxGSmfY+aUF4sY3yDAAADhFKq4fFjNueNuwji+/q5G2EgAAkMTpVg4TpXQ/bNSgbL1GTUTfHWvCbB0AAHCSlM4wlVIxoSyfiMJcdMdBu9TlAABAaknpDCOiCWVtt8Q+r6iWthIAAEg1qZ5hk0cVihtb99ZKWwkAAKSaLmWY0Lr29iFs/l2fhnu7nFNMHjVQqWCIaPPu41EeTzoDAMAJXcgwoWXtL3+5SZEtSZfNpGPPHTaAiNz+0I6DGGEPAAAnnDGYhJY1v3zkyM3P3Jgv1WXHi8YWixsbvq2SqAQAAEhFZwgmofnDhx6tvn3pojK2b+rpxEVjB4kb72+tlKwIAABIPXEzTGhe/dDi2gVL7hquZvqqoFNNKi806lgi2nHQ3uoJSFcIAACkljgZJjR98OATjQtfXjBM2sk8tKxq5rmDiYiL8qu3HZK0FgAASCHM6afxcP3jyrz5q4Mdd6lGPfbNt78doyIicrlcmzdvPuln1Gp1b1S5YW/rcx8dI6ILhlkfv3JIb3wFAAD0GUEQysrKiouLEzxOnAzrKLr3qQmX1DxzaOnFsftiPM8HgycSrqmpac+ePTNmzEiwoE45faGCeUsiHK9SKhr/dY9R1ytJCQAAfWPv3r1WqzXxDOv5ZUKFQqHX62MvNRoN9Vo/LNuqnj5m0Mfbj3BR/qPtR+dNL++NbwEAgL6hUCRnqHsXj6Ic+eg31R06YX1v7oVl4say9bulqwIAAFJIqs81FXPN5BFaVkVEG3dVNTh8UpcDAADSk02GmfWaqy4YTkRclH/lo11SlwMAANKTTYYR0U8vOVvcWPLBDr5LQ1EAACCdySnDLho7aEShjYjqW71vf7Ff6nIAAEBicsowhqH7rzlP3P79v7ZJWwwAAEhOThlGRDfPOCsv00BEOw/Z1359WOpyAABASjLLMJ1Gdd9VbV2xX//j5FlCAACgX5FZhhHRwh+dm23RE9E3B+pXfYmZ7AEA+i/5ZZhJxz48d6K4/bO/fhqKRKWtBwAApCK/DCOiu684Z3CelYiONbj++PZXUpcDAADSkGWGaVnV83dMF7effmtrdaNb2noAAEASsswwIrpm8ohLzhtCRL5g5Od/2yB1OQAAIAG5ZhgRvXj3DI1aSURvb96/fsdRqcsBAIC+JuMMG1aQ+eCcCeL2PUvWY3AHAEB/I+MMI6JHbphYlGMmosqa1mdX/EfqcgAAoE/JO8P0GvVf7m5bOfr3K/9zuM4hbT0AANCX5J1hRHTVBcMvP38oEQVC3H1LP5W6HAAA6DuyzzAienHhDL1GTURrvjq0ettBqcsBAIA+kg4ZNjjP+sgNbTN33L8UM3cAAPQX6ZBhRPTgnAni4I4j9U7M3AEA0E+kSYZp1MoX754pbj/xxuYj9U5p6wEAgD6QJhlGRD+6YNhl5w8lIi7KL/yfj6UuBwAAel36ZBgRLVk0U6dREdG6b478+4v9UpcDAAC9K60yrDjX8viNk8Xte19e7w2Epa0HAAB6VVplGBH9fPb5ZUU2IrK3+h5/HQs9AwCks3TLMLVKsfTeSxiGiOhP736985Bd6ooAAKC3pFuGEdHU0UW3zBwtbt/07AcRjpe2HgAA6CVpmGFE9Nzt03OseiLaV93y1FtfSl0OAAD0ivTMMJtZ9/I9l4jbT775ZcWRRmnrAQCA3pCeGUZE104Zcd3UMiKK8sKP/7A6zGECKgCAdJO2GUZELy2cmWXREVHFkcbHln0hdTkAAJBk6ZxhOVb90nvbrij+YeW2T3YelbYeAABIrnTOMCKaPaX0Jz88W9y+6dkPaps90tYDAABJlOYZRkQvLZpRXpxFRI1O/+zfrcKNMQCAtJH+GabXqN9+/BqjjiWibftqb//TR1JXBAAAyZH+GUZEpQNtr/3iMnHyjjc+2f3U8q1SVwQAAEnQLzKMiGZPKX34+ra1nh97/fNX1+2Sth4AAEhcf8kwInrq1gvnTS8nIkGg215Y+87mA1JXBAAACelHGcYw9NovLrtiwjDx5ezfvYs1xgAAZK0fZRgRsSrlikd/NHlUofjy+qdWLVtfIW1JAADQY/EzjG/c9Oz14wpMLGsqOGf20xsb5T8FvF6jXvPkdWKMCQLd+vya372JSYEBAGQpXoYJ9jcXzFkSvmXVQYejcuXs1j/Of3xDoM8q6z1mvebjZ+Zeel6J+PLx17+49fk1WKIFAEB24mYYDZ3z/Bt/uXt8nsEwYOJNV5/lPHTYKfRZab1Jr1G/95trb5xeLr5ctr5i6i/+WdfilbYqAADolngZpsibOO/maUUKIqJo9bq1+8umT85h+qiwXseqlP/45ZWPzrtAfG7sP3trR972v5/9t0rqugAAoKu6NKYjUrVq0dXPCo+88sAoZW8X1JcYhp68ZeqKX12lUiqIyOULzXz4rcXLPueiuK4IACADjCDEvzootHz5zLz5y/OeePuv80t1Hd7gOK6q6kSvxePx1NXVjR8/vpcK7VX7axw/+fOnB+uc4stzh+b87z3Ti7JN0lYFAJCujh49mpOTU1xcnOBx4meY4Phi8axbt1667O3HpthOuoro8Xi2bj0xaZMgCNFo1GazJViQVALh6LMfHFhf0SC+VCqYR35UetnYPGmrAgBIS36/v6SkpHczTGh575bznsha9sXzP7Cc8TaY3W7fuXPnrFmzEixIWm9+tueW5z6MXUu8YsKwJffMHJhtlrYqAIA0s3v3brPZnHiGxbsfFvxs+b+PVbww1apgRKqiezZFEvzC1Hbj9PLK1xZcMLLtIejV2w6eveBVTK4IAJCa4mWYbs5KPy90wFW/dKG6z0qTyOA86xcv3PT726aJAz0c3uBtL6yd/uDyyppWqUsDAIDv6V9zTXWRUsE8dN2Eir/dNqYkV9yzcVfViJ/87bFlXwRCnLS1AQBADDLstMqKbNuX3PqnOy9Wq9r+Kz25/MvB819e+fm+M4zlBACAPoEMi0epYO6/5ryjb9x9zeQR4p4Gh+/6p947b9FrX+2vk7Y2AABAhp1ZQZbpncevWfvUdUPzM8Q9Ow7aJ9z7+iW/+tfuo03S1gYA0J8hw7rq0vNK9rxy+wt3XmQ1asU9H28/MnrBK1c+/vbOQ3ZpawMA6J+QYd3AqpQPXDP+0LI777lqnDhqkYhWbzt47t2vTX9w+da9NdKWBwDQ3yDDus1m1r1494yj/7j7rivOie3cuKtq0v3/GHPnqys27Q1zUQnLAwDoP5BhPVSYZXr5nh9Wv7lw4ZXnxnbuOtJ4w9PvD5z3P4++9nlts0fC8gAA+oMzzvnbVekx11TPNDr9L773zdLV37Z6TqwRqlQwl08YuuCysT8cN0TBpM2SNQAASZCsuaaQYUkTCHGvra944Z2vD9c5Ou7PNOlumXnW7bPGlA6U64TIAADJhQxLXRt3Vf31w2/f31oZinzvxtj4EfmzfzBi7oUjMYkwAPRzyLBU1+oJvPZxxavrdu2rbum4n2HogpGF100tm/OD0gGZRqnKAwCQEDJMNnYctL+6btfbX+xvcvlPeuuCkYU/HDf4+gvLRhTiMiMA9CPIMJnhovxn/616a+Pe97ZWOr3Bk94dmp9xxYRhl44fMu3s4tiTZwAA6QoZJlfBMPfJzqMrNu1bsXEv39l//FnjS2acM/jS8UPQOQOAdIUMk70Ix2/49th7Wys/3n7kWIPr1A9kGLWXnT908qjCGecMHjLA2vcVAgD0EmRYWvnuWNO7Ww58vP3o6SasGphtHl86YNb4kollhaUDbXjeDABkDRmWnryB8IZvq9ZtP/zBfw7WtXg7/YzVqJ1YVjBxZMGEsvzxI/ItBk0fFwkAkCBkWPo7andu3n18zdeHv95f1+nFRlFxrmVSeeG5w/LOL80fOzRXr1H3ZZEAAD2QrAxTJaUa6A2D86yD86zzZ5xFREftzi/31Hy5p2bLdzXfHfveomVVDa6qBtfyz/YQEcPQsILMMSW540cMGFOSO6Yk12bWSVM9AEDvQ4bJg5hnN100iohcvtCXe2q+2l+3effxiqONLe4TkzQKAlXWtFbWtK78fJ+4pyDLVFZkG1mUdX5pfvmg7OEFmToNGh0A0gR+ncmPxaCZNb5k1vgS8eXhOsfXB+q/2l+3bV/tnqpmbyDc8cO1zZ7aZs+nO4+JLxmGCrPMY0pyRxbbhhVkjhqUXVZkM+txRw0AZAkZJnsl+Rkl+Rk3TBspvtx/vKXiSOOOg/a9Vc27jjQeb3J3/LAg0PEm9/Em9+ptB2M79Rp16UDbmJLcIQOswwszy4uzBudZ0V0DgNSH31PppnSgrXSg7bqpZeJLtz/07aGGXUcadx9t3H+8ZefBBn8octKP+EORnYfsOw/ZO+60mXVlRbaB2eYRhbZBeZaSARlD8zPyMg19dBoAAF2ADEtzZr1m6uiiqaOLYnuaXYHdxxr3HGv+7+GG6kb33urmTpfrbHEHtnx38sNqWlZVmGUakGkcNTi7MMs0MNtclGMuyjEXZJlYlbJ3zwQA4BTIsH4ny6KbdnbxtLNPDGn1hyIHjrcernfsOGivb/HuOtJYWdN6aneNiIJh7lCd41CdY/N3xzvuZxjKyzAOzDYXZBmLcixFOeaB2ea8TIMYeFoWf8wAoFfglwuQXqMeOzR37NDc2VNKYzu9gfDheudRu/PA8dbjTe7dRxsbHP6qRlcwzJ16BEGg+lZvfauXDnRy/GyL3mrUDhlgzTRpB+dZ8zIM+TZTXqZhQKYxL9OAB9oAoMeQYdA5o449e0jO2UNyTtrf5PIfqnVUNbpqmjzVTe7qRldts7em2W1v9Z3uUE0uf5PLf7C2tdN3dRpVpklXnGMxG1ibSVeQZSrIMuVlGLIs+iyzLi/TmGPVJ/PEACCNIMOge7It+myLfuLIgpP2hyLRmiZ3TbOnutFd3eg+3uSubfYctTtbPcEGh6/TGfpFgRBXG/J0ek9OpGAYLavKzTAU5Zj1GnVhtsms1+RY9QVZJh2rKsoxm/Uam1mHp7kB+iFkGCSHRq0UR/mf+laE45tc/roWT22zt67F0+D0Ha5zunyhw/UObyBc3eg+9Uc64gXBH4octTuP2p3xP6nTqIqyLUad2qzXFGSZTHo206TNtRrMBo2Yc1lmncWgMRs0Jh3b81MFgJSBDINep1Yp8m3GfJtx3PDOP+D0BmtbvE1Of12Lx+0PH7U73f7QsQZXIMQdqXc2u/2BUCc34U4VCHEHalq6WFWmSadRKwuzTRaDxmLQZBi1Jp1G3DbpWbNek2HUxrYtBo1Bi/t2ACkHGQbSsxq1VqOWTj/5Jy8IjQ6/wxtsdPoanX6nN1jd6PYEwnUtHn+Iq2ly+0NcdaMrFIl2/UtbPQEiqm/tfHGAUykVjFmvsRq1Jj1rNWiivJBvMxq0rLk95MwGjUGr1qiVVoPWYtCYDaxSobCZdWa9RqnAYjkAvQIZBjKgYJi8TENepqGs6AxrWzu8QYcnKP6zvtXr8oXc/pDTG6ppdgdCnNMX9PjDDm/Q7Q81uwLxD3WSKC84vEGHN9izU7AatSYdazVqwhE+32ZUKhmx52c2sDwvZFn0WlZpMWgVDGMxaMx61qRnNWqV1aBhGCbDpLUatFg0DuBUyDBIKxlGbYZR28UPO7xBpzfo8Ydd/pDbF3L7w05v0O0PO31Bly/k8Yfd/pDbH3L72va4fCEuyvesMKc36PQGjzcREXX9gmdHYmfOZtYJAmVb9YIgFGSZPP5wQZYpHInm24yRKJ9j1QsCmfWabKs+HIlmmLQMUaZJR0QZJq1GrTRo1Rq1yqRnBUGwGLToIILyoBH7AAAMH0lEQVTcIcOg/+pW4IkCIc7tD7l8IU8g7PGHg2HO5Q85PEFPIOT0hnzBSCjCuf1hty/k8oWcvmCUF9y+UE2zR8uqOn20ruuivEBEjU4/ETW5/ES0r7onWXgStUqhViotBo1SweRmGHzBiEnPCgLlWPVRXsjNMCgYRqVkDFrWoFUrFYxKqTDpWYOWjUZ5i0HDqpVGLatSKnQaVexQvCBYDVqFgrSsCs//Qa9ChgF0g06j0mlUuRk9mTcyzEVdvpDDE+QFweMPt7gDvCDErmr6ghGnLxgKR5vdfiIKhjl7q48XhAaHT6lQNLn8DEOJdARPJ8LxEY4Xp2WpOf0TDolgGFIwjNWoVSoYo451+0OZJp0gULZFH4pwJj2bbdEHQpxeq7YaNIEwZzFolAoFEZl0rFHHhrmoUadWK5VmPavTqCNcVKdRm3QsF+X1WrVBq47yvF6j1rIqBcOY9KxKqeB5wWLQqJSK3jgdSCnIMIA+wqqU4tN1CR4nygsuX9DpDUWiUTHV3L5wJBp1eIJRXnD6glyU9we5Zrdfy6oaHD4FwzS7AwxRqycopqbHH+YFQRCEuhavRq3s1liYHhAEigqCuNCd2I8UY/t0j70nlzgYx+ENZhi1DMNYjZoIx+dY9d5AxGxgVUqFQat2+8I2s04gwaRjPYFwjtXAEGnUSoOW5QVByyq1rErHqoNhTqdR6TVqVq0MhTkNqyKiDKPWH4roNWqdRqVVqxQKxmLQRHlejGG9Rq1RK8WXVqOGYRieFxQKRseqMAdbUuA/IoDMKBVMpkkn3uVKFkEgpy8Y4Xi3P6RgGJcvFIlGvYFIKMI5PEEi8oe4QCgS5qJuf1ivUbd6AsEw5wmE1UqF2x/2BMIqJROKRF2+kCCQxx/SsqrqRjcvCC3uQIZR2+OxMIkTB+MQkfhPcTzqSWsSSUitUhi1rNsfMus1vCCIj+q3eoLihtWgcflCFoOGiNQqpVGn5vm2z/hDnF6j4qJ8tkXvDUaMWjURiSFNRG5/2Kxn1UqlUccSUSjCadQqnUalYBhWrRSHDhFRhIuqVUqGIauh7aI6F+VVSoVapRB/UExfVqXUaVRZZp21m9fe+wAyDACIYUi8NdjbM3uFuag3EGYYRuxBtnoCSoUiHIn6QxHxkmaUFyJcNBLlPf6wIAgOb1CjVvmCYbc/rGWVgRDn8AZ1rMoXjESivDcQNmjV9lYfx/Nif9SoU7v9YU8gpNeofcG2Y+pYlYQhGl+E4ztGrMsXEvc7U6/gZ35y4cNzJ0pdxcniZ5jg+uble+/5/XsVTsPg82cvXvLcDcOx4i8A9BirUraNk2z7G30nE7v0njAX9QUjPC9EecEbCIt9jmCYC4Q5scPh9AYFgQLhSDAcjXBRLsqHItFQJMqqlcEwFwhxYoeGiBzeABEFw1Etq2x0+tVKRbM7oFQwYrepxR1QKBhfMGLQqr2BSISLBsOcllV5AmHxjqbHH+aivNMXtBq0Tl+QVfX6Fd10FTfDfBsfnft0633vH9o0Mrz1qTlz5/9p9JcPl2OZKACQJValZI1tv8FSdi5pXhBcvpAgCAzDUHvacVE+EuU9/pBapSQiLsp7/GFqv/QnRqN4YZCIXL6QeL8zwvGsWukLhsMRnoj8oUgowoUiUY1aSUShSNQfjIifFy8txiLWG4gYdWpfMBLmokQUCHGhSDQ1l8CNl2GhLW+tYm96965x2Wqi6Y88OOP/fvv2nl+Uj8b1RwCAXqJgmI6PfHT38Y/+Js7YU76h8qBnaPmItqc7dMNHDjy692AnCyMCAABIIU6GCQGfn9Hr2/8OwOj0Ot7ffsMRAABAanEyjNEbDYLfF2hb+Enwe/1KI7q1AACQKuLc21LklpZaXqzYF6ELWCLBvXtXVcnY0ti8MX6//+uvv459muM4nuc//vjjXi23D8RupcoaziJ14CxSR9qcBRHJ/UQikUhZWVnix4k3PoOdfON1ijm/fWnuPxeW+zf+7rlN5T9+ekRsVKJSqbRarbEP+/3+UChkNBoTr0lCHMd5PJ6MjD4d75t00WjU7XbL/SyIyOFwmM1mpVLeQ2EdDofJZFKp5D0Wyul06vV6lpX32qFOp1On02k08n5EyOVyqdVqvT5Fx1V2kdvtbm1tLSkpSfA4cf+/0k7+zYrf3LtoXtnjtXzBpFv/741Fw0/8NtFoNGPGjIm9tNvtO3funDRpUoIFScvhcGzdulXuZxEMBj/99FO5nwURffjhh+PHj9dq5X0Be82aNaNHj5b7XynWrl1bVlaWl5cndSEJWbdu3ZAhQwYNGiR1IQn57LPPcnJyRo0aJXUhCfn888+T8tfTM/zd0Djmjr9vuSPxrwEAAEg6zOsMAAByhQwDAAC5Stp9ZoPBkJOTk6yjSUWr1WZlZUldRaJUKpXNZpO6iiSw2WxyHwpBRFlZWXK/pUdEOTk5BkMqTjXULbm5uWazWeoqEpWbmyv326tElJubm5RhKYw4TBMAAEB2cC0RAADkChkGAABylXiGCa5vltw8ociiN+eXz7j3rUq5TqgYXvuTLCUTw57z5HdyWs4ntH/prFzd9CU1fNsOWbbLyWchv0bhGzc9e/24AhPLmgrOmf30xkaeZNgWnZ2F/NqCiCLH3n/48tEFVp3WWjzhx3/Z5hBIhs3R2VnIsjmIiITWtbcPYfPv+jRMlJy2EBLk3bBwSP7lf/mmMeCr2fCridnnP/Mdl+gxJeFZfrX5wv85HpW6jp6I1n/48E8fuOU8w7TYCciwXTo5C7k1Cl//xlVZhVe99FW911u35alpmYUL1vtl1xadn4Xc2kIQBK7yhcnW8tv/tac14KvduPgCS8kDm0Oya47Oz0KGzSEIgsA3f3jbqKEl+QV3fhISkvNrKtEMC667Lb/0oW1h8ZXn3XnZY369K5LgQaXA1758kflH/3RLXUcP8I5Nr7y2w1X/t5mm2G9/+bVLZ2chu0aJ1m99c9lnVWL10aoXpxovWloXkFtbdHoWUbm1hSAI0eObl7/zTZO4HCRX+YcJxlmvtcivOTo7Czk2hyDwzat/etb05/79+LiBd34SStKvqQSvJabPGmO8y+ni9//t6rJsvcaYP3ZO21UgOWCsU396yzmmjhOAyrBdOjkL+TWKIm/ivJunFSmIiKLV69buL5s+OatRbm3R2VnkCHJrCyJSFE6+4ZpxWQwJ4ZZ97y9ZWTvlRz8wy685OjkLqxybQ2j+8KFHq29fuqisbdLN5PyaSjDD0miNMXbQD66eec0vVx9ytO5fMdfz4nV3LrfL9rGDdGkX2TZKpGrVoqufFR555YFRCvm2RYezUMq3LTxvXqXXZI++/Ytznn3x5iGMTJvj+2ehkF9zCM2rH1pcu2DJXcPV7X9RTc6vqQQzLH3WGFOW3PDHN168f8ZQi8ZQ+IOfLb7BtPGjban/J/s00qRd5NkoQsuXT18+/TH/A2tX3TdaJ9e2OOksZNoWRESmG9/zhxwHP1jg/fW0+SvsOlk2x0lnUa+QWXMITR88+ETjwpcXDOswZ0Fy/tdIMMMUuaWllgMV+8Tun7jG2KgTa4zJSKT18Lf7Gtq7sUIkElVrNLJ98iBN2kWGjSI4vlh8+fxPJi37fNn8Uh2RPNvi1LOQZVu4tv/zuX9s9xIxrGXQpJ/cdZl6w0ffZsisOTo9ix0+mTWHe92rK/67ZkGJimEYVfni7cf/OsNw1q/tw5LRFonepQts/tmIvB8+/3VTwFe19oGxtikvHEjpQT6n4/v07kGZUx77tMob9lZv+M2FWYU3v9/KS11VN/D2jqMh5Nou3z8L2TUK37xq/uDRP/vc+b0i5dYWnZ6F7NpCEITglp8Ns5z38w8PuSPh1u/+efMw46Q/VnJya45Oz8Itw+Zox+15sm1MR1L+10g4wwTB8+3fbp00NEuvyxx28c/fPRpO/IiS4B1fvTR/QrGFVWmsgyfduuRrh0z+RAjet6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<General CursorSize="3" ExtraPrecision="1"/>
<Coords Type="0" TypeString="Cartesian" Coords="0" ScaleXTheta="0" ScaleXThetaString="Linear" ScaleYRadius="0" ScaleYRadiusString="Linear" UnitsX="0" UnitsXString="Number" UnitsY="0" UnitsYString="Number" UnitsTheta="0" UnitsThetaString="Degrees (DDD.DDDDD)" UnitsRadius="0" UnitsRadiusString="Number" UnitsDate="3" UnitsDateString="YYYY/MM/DD" UnitsTime="2" UnitsTimeString="HH:MM:SS"/>
<DigitizeCurve CursorInnerRadius="5" CursorLineWidth="2" CursorSize="1" CursorStandardCross="True"/>
<Export PointsSelectionFunctions="2" PointsSelectionFunctionsString="InterpolatePeriodic" PointsIntervalFunctions="10" PointsIntervalUnitsFunctions="1" PointsSelectionRelations="0" PointsSelectionRelationsString="Interpolate" PointsIntervalUnitsRelations="1" PointsIntervalRelations="10" LayoutFunctions="0" LayoutFunctionsString="AllPerLine" Delimiter="0" OverrideCsvTsv="False" DelimiterString="Commas" Header="1" HeaderString="Simple" XLabel="x">
<CurveNamesNotExported/>
</Export>
<AxesChecker Mode="1" Seconds="3" LineColor="6"/>
<GridDisplay Stable="True" DisableX="0" CountX="5" StartX="0" StepX="10" StopX="40" DisableY="0" CountY="4" StartY="0" StepY="5" StopY="15" Color="0" ColorString="Black"/>
<GridRemoval Stable="False" DefinedGridLines="False" CloseDistance="10" CoordDisableX="0" CoordDisableXString="Count" CountX="2" StartX="-1.07536" StepX="2.57869" StopX="1.50333" CoordDisableY="0" CoordDisableYString="Count" CountY="3" StartY="-0.368905" StepY="0.739267" StopY="1.10963"/>
<PointMatch PointSize="48" ColorAccepted="4" ColorAcceptedString="Green" ColorCandidate="7" ColorCandidateString="Yellow" ColorRejected="6" ColorRejectedString="Red"/>
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