- Author:
- Leyla <noroozbabaee@gmail.com>
- Date:
- 2022-05-10 14:01:08+12:00
- Desc:
- Adding Tong_2011 to PMR
- Permanent Source URI:
- https://models.cellml.org/workspace/85c/rawfile/a03f680a69226c515cd789723c8036028406852b/Experiments/Figure_5/Fig5C_art.dig
<?xml version="1.0" encoding="UTF-8"?>
<!DOCTYPE engauge>
<Document VersionNumber="12.1" AxesPointsRequired="0">
<Image Width="340" Height="213"><![CDATA[AAAAAYlQTkcNChoKAAAADUlIRFIAAAFUAAAA1QgCAAAAh2ufKwAAAAlwSFlzAAAOwwAADsMBx2+oZAAAIABJREFUeJztnXd4XMX19+f2u7039W7LXbZkufeKbbrpGDCEnhASEkj5JSRvEpJQQhJ6BwOhGXBvcu9FkiXLtiSrd62299vfP9aWhTHGGGmllebz8ODVfXb3nt2d75QzZ85BJEkCEAhk6IH3twGQ76HixImtW7a43W5Jksxm850rVuj0+v42CvLD4Dhu/br1FSdOMAwDgDR7ztzJUybL5fL+tQrt39tDLk1LS8u6tescXY7S4hJBEAiCBAjS30ZBfjAbN2yoOn26uqqqo70dRVEcx/rbIgDgyD/AcTqdd99zt91u5zj2npUrExIS5Yp+Hi4gPxRJkhISEidOnPjxhx+lZaRPmTJFr9eTFNXfdkHxD2xyc3MJgujo6NBotFqtVqlSXvCEysrKkmPFKpVq1uxZKrX6om+yd/+B1vZ2QRBJglgwbw6B4zv37PV6fRIASQm2gvwJXV2OkuPHQ+EIAGD8uDFZGRkEQfT5ZxsyIAgydtxYgiAYhtHr9VqdjqLpbz9t146dY8aN1X/Hms7vD5ysrA6Ewpd/34zU5ORE2yV+Sij+AQ1JkgCAcCQik8tRFBVFEUXPr9S2btmydfPmMWPHHTxwoKzs+IMPP2w0Gr/9JgaDQRQlURRomiYJAsNxk9Eol8kBkMwmE45hcrncYjYzDAMQRKvR9LwFpFeI/o6RSERGyxAEkSQJ6bF883q9Rw4f/u+///3MP/6h0+mQi63sCJLQatUUTYPLdtArFYpL/5RQ/HGAJEkNDQ2ddvuZM2cys7IOHjjIMowg8BvWb1hx14qCwsKFixfdv/LeW2+//aLiz87KzExPAwAgCBIdB8aNGR3d5cEwDMMwg16nGZ8XvYLjOIYNiBXp4EOSpNq62q4u+/SZM+tq64LBwNEjR+fMnVNXV3e8tLS9rZ3n+e96LUWSWelpP2hvDsOwPhF/zZkz4XB42PDh0S4NAGC3248dPYYAacrUaWqNOtp78Tx/6OBBh8MxYsTIjMwMHD97u9qamlOnTqlUqsJJk2Qy2ZXZMHQYNmxYa0vLTx9++P/99W+CIHz4wQfDhw9fdvWyn//i8ZycHKVKVXHiBEVR3yVaAscB/o0fuvtXi4IgyAVXIH3BmLFj337rrYzMjLwJE6qqKtevXTdn7lyT2ZyZlTV7zpzjpaWXeC2CIDjey0P1lbxdIBB44/XXLRZLampqtNGUl5f/9c//z2g0+v2+/338v6f//Ke09HSO4/70xz/W19VbrJY3Xn3t/gcfWLh4sUwm27Bu/VtvvJGWnt7U1LRh/fqnfvtbg8HQu59qkKHX6//53LPBUCgrKysUCuE4dtMtNw8bPhxFUYHnv1y9es2XX929cqXFYulvSyGXYsmypRmZGWaLxWq18hyXX1CwYOECq9Ua7bUxDAcgpls5P1j8L/37Pzt27Kg5c+a6G67vnoR89MEHo0aNuvPuu2Q0/dsnnyratu22O+44cvhI5anT//f0H1NSU9evW/fF519MmjwZQZD333v32uuvn79wQSgUeuzRR0tLSmbMmDEQnJ8DFhRFMzIzJUnCMCwcDtO0TKPRkCTZ1dX1j789YzQZn3jyyeycbPpibiTIwEEul48dNw7DsOi8WKvVyhWKflxk/WDXzoSC/JX3rswdMaJ7EtLU2Hjs6LGFixclJSVZrNZFS67auX1HIBDYsG7dxMKJ6enpBoNh2dVXOx2O8rLyHdu3syw3feYMm82WkZExefKUnTt2BILB3v5cgw0URbtbSbdD6M3X35g4qfDulStHjhopk8ku6iiCDChwHO/+mZD+/sF+8Mg/IT9fEsUd23d0t8WmpiaAIFabLdodpKdntLS0MBGmpubM+PHjo0O6TqfT6fXNTU3+gN9oMioVCgRBEARJy0jfsmkzx7IXvRfP86IgfsNcAoe+aILAEQQJhUJHjxzeu2f3Z598Gm1Fz//rhZTU1P62DnJZoCgmSaBnyBZBEAg6sKf90UU+2mOuEolECILo7gtomhZEkeO5cDhMUVS0XSIIQlEUw0TCoTBNUcg5AdM0zTCMeDEfZigY/OkjjzY1NnYvLkRRJEji3Q8+SEhI+KFmDxp0Ot3f/vEPjUaDYdhrb74pimJ3ezGaTP1pGeSHcO1110lA6hnh+/Krr2q0mljOBnrBf0gSJMey4JxEOY4FkkQQBEVRLMd2S5dhGZwgCJJkWa77IsuwBEFc9APLZLJn/vF3jucBAOXHj3u9vvKysqKioktshwwFMAzr9o9CD1/8olAqLrhiMse67+4F8ecMGyZKUmNDo9liIQji9OnTmVmZNE2PGDmytraOZVi5XO5wOOydncOGD+d5fkdRUTAQkEwmBEFOnz6dlZ1NXczbh6Co2WIBAHAsV1FxsrOzo7m5mWWYyw9ygEAgl6AX1s9mi3nS5MlfffWly+nsstvXrV07c/ZspUKxdNmyQwcPnjlTzTDMZ598YktIyMrOnjxlikqt3rB+vd/vP33q1MH9++fMnaNUXNgL9gRBkZycnOG5uYmJiQRBxHY3BAIZtFzhyK9UKGQyOYKgAAAURVfee+/zz/5z5d13h8ORsePGLVi4UCaXF0ycuHDRwj/8/v8AkCiKfuSnPzUajRRF/fSxn7307/9s3rgpFA4vvmrx6DFjiO+LMOns7Oiyd3ndHkEQ4MgPgfQKyJUl8/B4PCiKKpXKqO9dEASX09nW1o6iiC0hQafTRf1/Ab+/ta0tEAiYjEazxRL1/7Es22W3d9rtcpnMlpCgUqku7cCXJOlE+Qmf13vw4MEvv/ji09VfpKSkXNmnhUAg3VzhyK/Vanv+iWGYyWzWGwzRx93XlSpVdna2KIrdgQ0AAJIkExITrTYbgiCXs2/HcdzqLz5vb2vv6OgIhoIAph6CQHqD3owWvmisEoqi31Y4giCXH9hEEMRjjz8u8MK2rVtffeVlmM0CAukV4uBUH8dxr7/yamtbW1trq8/rgyM/BNIrxIH4CYKYt2C+3+c7cuRIW1srHPkhkF4hDsSPIMi4vDxRFH0+P0lt7G9zIJBBQhyIn2XZv/z5z60trZ2dnR6XG077IZBeIQ7ETxDE8ptu8vv9Bw8eXP3Z53DaD4H0CnEgfgRBckeMkCSpy95FkDCxJATSO8SB+AEAHR0dwUCgs7OD54b0qR4IpBeJA/GzLPvayy+3tbXbOzv9fj9c80MgvUIciJ8giMefeILn+aKt21579RW45odAeoU4ED+CINET7BqtFqbxgUB6C6glCGSIEgcjP8/zO7fvcLmcZWVl4R9SrggCgVyCOBA/AKClpcXh6HI4HIIg9LctEMggIQ7Ej+P4jTctFwRh6+Ytp0+d7m9zIJBBQhyIHwCgUqkAABRNoxi2Z/8BQ1WVyWAcPXKEzx84cfIkwzIAgGHZ2SlJSbX1DU3NzbzAowg6qSBfqVQeLS71+LySJKpV6gnjxjIsW3q8PMxEAJDSU9My09NaWttq6+s5nkMAMmHcOINBX1JW7nQ6RUmU0bKJ+ROABI6VlgZDIQCkRJtteE5Ol8NZeaaaZVkEIKNGjLBZLScrKzs6OgVRwDF8SuFEgiCOFpf6A34JSOdM9VecOh1hIudNratvam3heR5F0ML8fKVSWXL8eCAYwnFcq1EPy87iBeF0VRXDMDiGJSUmWSzmcDjscXtwklDKFQqFHLo/IT+G+BD/WRAEIAjDspEIw/G8BIAoCtE/AQDRDP8cxzEMw/E8juGCKKIoyjCRSCQiSZKM5iRJEkWJYVkmwkhAEngeAMDxPMOyLMuiCBpNIs4yTIRhRFHEMBxIkgQAwzAMw0iSxPOCBADP8wzDMgyDnEuFxLEcwzC8IFCkJIgiAUCEiUTOvoSXJEkQBIZhzpoqigAAlucZhuU4DsdxURRRFAmGQk6Xi+e4UCiYmZ4eCoeaW1qDwZAgCCiGGQ36k6dPlxwv83h9LMPeuvyGzMyML7782u31alSq5OSk/LxxsPAh5PK5wjRe/cL6teue/ec/33j77aTkJAzDKJIURZFhz2YHJwkCx3GO43mel4CEAEDTNIqikUhEEEUAAIaiFEVJktRdKYAgCALHeZ7neF6SJASAaLnLCMOIgiABgCJItAZWJBIRzxWxJQlCEASWO5uAnCJJHMcZlhV4XgIAQRCaohAEiUQYURIBADiGkReaSuI49m1Tw5GIKAiSJKEoRstoSRTPvokECJKgSJI51ytJoqRSKQmCaGlts3d1eXw+IEmTJhY4HM5tO3bqdbrhw3Iy09MumhYZAokSbyM/kGQyWnGu1AGGYfJvjnUkSZDfjP+/oIIdgiAXDI8EQUQLV59/ybc0c8FLcBy/oGQqRZLgm2lIZbJv3PdyTJVdUGwPwxQKec8LNE1f8HESE2xWi1kQBAkAmqJsVsvkwoK6+oat23cU5uePHzcmWoS7vwtDQQYicTDysyz71K+fbG5sdLlcnZ2dG7dshkWpLgHP8yzHsSxLURRNUW++94EoiLNnTMvISCe+VeOZYZjjpaV+v3/EyJEWi6Ufi0ZCYg/29NNP97cN3wOKolnZWVOmTVUqldVVVTfedJNGo+lvowYuKIoSBEHTNIHjCIKkpaYIgrilaAfP8zarpeccp7Ky8ve/+e2JE+XNjU0frfqQ5/mMjAy4Uhg6xMG0H0GQjIwMSZIa6utxIg4MHlDodbrJhQU52ZkoghAEEWEYkiRRBGEY5oVnn5sxc8as2bPlCkVzU9Pzzz6XkZlZUFBAfl8ZBcjgID60FN3TQlE4Kf3BRB2QCVarJEksy73x7nvDc7KnTZl8oqyMpulpM2Ykp6QgCKLVaqdMnVJaXJybm6vX6/vbakgsiA/xQ34k0YLoFEUuW7xo7cZNTpebwhC5QiGTyaK+QBzHdTp9c3MTjKEcOsAokSEEgiApKcm33HgDhmHZ2dl1NTWNjY0cxwEAwqHQvj17MjMzexaNhgxuenPklyTJ6/Gq1WoUO9+nsCwbiUQUCkVPT7IoioFAgKIokiThLlQswVDUbDIuWTifJMkFixe9+MK/Jk2aZDKZ9u7Zo1QqJxYWQvEPHXpz5K+rq3v8scfsXfbon5IkrV+79tabbrru6msefuCBU6dORaeU9XV1P//ZY8uvv+H6a6798ovV4TA8qBdTEARRKBQEQSi1+uGjx0SYSHNz04KFCx//5S8TEhNhXzx06J2Rv6mx8djRYx9/9GFLc0v3orHy9Om33njzzrvuGjl61Kr333/nzbd+8/vf6fX6F1/4l1qlev5fL9TX17/y35eyh+WMHDkS7jDHnsUL5/sDAYaJXLVwgdVi6V7/Q4YIvTPyt7a0Vp4+TVFUz6MmGzdsyMrJnjptak5Ozh0rVpQdP97Y0FheVl5VVXX9jTcMz82dv2BBRmbmrh07g8Fgr5gB+UFo1Oobrr3abDbTMhlN01D5Q43eEX/e+PEPPfLwzbfeqlAqui8eOnho5KhRKrUaRdHs7GytTldx4sSB/futNltCQiKO4zRNj58wvux4aQTO/PsJnVa7ZOECs8nEnTuqABk69M60n5bRtIxWqVQocr438fl9CoUiOhfAcVypUASDAY/bo5DLMfzsJF+t1gQCwejBmwsIhUJvv/lml72ru1E2Njb6vD4Am2jvEV3/C4L41nurJhdOHDUylyRgZYShQh/u8+MYJopSd6ZtQRQxDMNwTBTF7ouiKGAYhoCLTDhpmh45apTX6+u+gqJoVWXlxZ4L+VFgGDp18sQtRTuUCnlmRjr0vwwR+lD8FovF5XTyggAAYFnW5XIZjEaFQll87BjHn6290Wm3G41GHL9Ia0NRdMrUqZIoMiz7s0cera+vD4VC4VAI5u3vC0bm5rrcnj0HDhiNBr1O19/mQGJBHwb5zF+wcP/+fX6/HwCwb+9eDEPH5eXNXzDf5/WdrKhgGSYUCu3ZtXvqtKlyheKi70DTtEwu12g0//f0H//78kv3rFyp1Wlh3v6+gCCIKZMKr1u2VK1S97ctkBjRhyP//IULNm3c8PQf/pCRnrF79+4lS5eYzWaFQrHsmqtf+s9/jx09WldbSxDE5ClTLp1/huO4f//rxabGBo/H6/P64MjfR9AURZFkc0trfWPjhLxxyu/okSGDht480iuXyXKGD8vOzo6eG5XJZIWFhZIoSQAsXrJk0eJFarUaRdHhubkJiQmhUDgjM+Pe++5LTkm5dC46FEXzC/IXX3WVTqc7ebLihuXL4ZHePgJBEAzDtmwrikQiNquVgM6/QU1vJvMQRZHjuJ4Ru5IkhUIhgRco+huRvNGUeCiKyuXfn4WSZdnf/eY3zU1NToezvaN942aYzKMPkSSpoan50y++nDd71phRI0lYFnnwEgeZfCRJOlNdHQqF9u3d+/FHH33y+ecpKSn9bdRgRhDEM7W1FEkmJSbAwX8QEwdHekVRbG1pdbldnZ2dPA8PnPY5GIZmZWYASWrr6KApyqDXw82/QUkcHOmVJOlMzZmq05VtrW08x/W3OUMCHMNwHPd6fR9+8lldfQM85D8oiYORH8Owm2+5RRCEbVu2VFdX97c5Q4ic7Kwuh/OrdRuuv2ZpemoqHP8HGXEgfgDA6dOnvW5PTU0tx7L9bcsQgiLJKZMm0jQlSpIoit3i51gOJ3B4ECjeiQPx8zxffORop93e0FDPMAyM7Y8lNEVNyBuHIoi9q4vluIaa2i8+/6y+vkGlUl573fVLr14WraQGiUfiQPw4jt++4k6B57du3VpfVwdj+2MMRZIAAJ7nP/l8dWVFxbIli38+blxnR8f777yLoMjSZcuUSmV/2wi5EuJA/NHcsgAAlUoNS1P2F4kJCS31tXKl0hMImczmtLQ0SZI++mDVlKlTv1f8kUgEQZC+SNkmSdLmjZu++vLLlpaWjIyM2+64fUJ+/veWHvB5vXV1dRRND/E6BXEgfpZlX3ju+fa2ttaWFo/bA8N7+wUcx9uaW3711JNJyckKudzpcg8fntvR0cFEmEu8qr29/d233z5y6DDDsmPHjv3Jgw+kpaX1ouPwi88/37lj55JlS3Nyck5WnHzlpZcffvSR/EuWHli/bt2nH/9PqVL6fH61Wv3YLx7Pzs4emr7MOBA/QRBz5s7x+/1HDx9uaW2BB3v6C5vV6rB3jRkzhiCI8oqKQ0ePUSo1LwqiKF50RhYMBv/+178lp6T86a9/kdH05k2b/vX880/95rdJyUm9Yk8wGNywbt0dK+6aNHmSXC5PTUvzeDx79+zNysoyWywXfUnxsWPr16yNppYDAHy1+sv33n7nZz9/LCExsVdMii/iYBaNIMi4vLxp06cPy80lh/Akrd+54abln3/22bYtWzs7OikMO11ampiUdPDoMZ/fH62MfkG06IF9+2iavvraa0aNGpWdk3PXPfeIglhx4kRvpWzt6uoiCCItLVWpVEZDxfPG53V0dEQike96SdG2ovyJEyfkT0hISEhMTLztjttbWlpaWlv5c2fMhxRxMPIDAKKzOIIg4aDfj0ydNk0QxM0bN360apVKrV60eNGcuXPUao1SpSwrP7G1aIdKpUpJTpo8MV+v10uS1NjYlJKaajAYopNqjUaTnpHucDhYlr30Oc7LRKvV+v0Bn98vCEL0Fk1NTSqVCv/ukGSn05E7Ipc+l6pUp9PRNBUKhkRBjBMp9Cbx8Yl9Ph/DMF6vVxThgr/foGl6xswZ4/LGsQyDYZhKre4+lzVi+DCrxdzS2tbldHI8L0nSO6s+KjtdxbGsbMOmG665GkWRsoqT1bX1crW2y+FQKBThcMTpdiEIgiKoyWikKMrr8wYDQVGSEAAMBj1N08FQKDomRysOi6IYDIVEUQQAKBUKtVo9ZerU999979rrrxs+PLe6quqzTz+7cflyFEU9Xi9JkDRNIwjwBwLRl8hlsuHDc0tKSobnjjBbzAiCtDa3hMNhlVoVDIdCkTCB4zKZDEXRQCAQTUIjo2mSJAVBCIXD3ffFcTwSiTAsK0kSjuFyuQxF0UAweNZUkqRp+gJTcRxnGDbCRCRJQlFUoVBgKBoMhaIVUyiSvCD5bWyIg4M9LMs+9etftzQ1O51Ou92+YfMmeKpvACJJEsdxPM+TJInjuNvjcbs8zz33rFwuv+P22wECvvjq67a29vETJhRMGD929KhTlVXFpaX+QBBIYMnihZnpaWs2bKytrbfbO71er72ledTo0ZRSLSEAADBqRO6CObNr6xt27N7jDwQQgFy1cMHoUSM+X/3lgUNHJElEEERiItNnTG/psIcZBgCQmZ62dPEie1fXxq3bosngZk+flpKU9PKrr7KCIJcrAZBqT52aN29ukOMDoaAoSjaL5YZrrwmHw1+vW+90uwEAhfkTpk2ZXHai4uDhI8FQCEXQG65dlpOV9dlXX0ejnjVq9e03L8dQ9NPVX9kdDgDA6JEj5s2aVddQv2PPXr8/gABkyaIFo0aO2Ly16FRVJctyNEXdccstWq36408/b+/slCQpMyN9ycIFOq02xj9ZHIhfkqTOzk6e43Zs3/7G669//Omn8FRfXCCKYmNj47o1a44dPcay7KjRo6+74YbExESapiiKYhgmEmFEUZQAUCkVBEG0trb97qnfjB4z+qqlSxAEWff1muoz1T/9+c8TEhIoilIqFCzLnh9OlUqaogKBYCQSEURBkgACJJVKxbBs9CQCSZBKpVIQ+EAgKIgCAEAhl1MU1d7RsXvnrrLjx0mKmjp16sTCiQiKCoIIgITjuFqlEkXJH/BH30Qmk8llsgjDhM+O/IhapSRJMurmkCQJRTGNRo0A4PP5eeHsJOW7TGVYRpIkBEG0Gg2Kol6fLzpZIElS+c2SVrEhDsTfzfp165/9x99XffwxFH+8IIqi3+8PBoKSJMnkMo1Gc4kmvm7t2kMHD9298p6MjAwEQTwez5NPPHHrbbdPnT6tF3fjJUkKBYPhSCSauZiiqCEbpxwfa35InIKiqEajuczMS00NjenpaUajMdpB6PX6lJRUh9PBsmwvih9BEIVSqYBRiXGx1QcZIlgTbI0Njd0VXDiWa2ho0Gl1MKFIHwHFDxkozJw5097VteqDDyorK2trap5/9lm5XJ4zLGcoR+D2KXGw5uc47uuvvnY6uk6fOr1/374v166Ba/5BiSiKNTU169asKSkuFgRx1KhRN960PCs7G8fh4rRPiIOvFcMwBAEoiqEoOmR9M0MBFEUzMzPvve8nt9x2G5CkaMmGoRl1HxviQPwoii5avFgQhK2btxQXH+tvcyB9CIZhWp1Wq4v1jvfQJA7EDwCIHhqVyeVw5IdAegvo8INAhihQ/BDIEAWKHwIZosRizf/RqlU5w4aNHTcuejI3unV3vKREpVbfetutyckpKAb7IAgk1vSt6jiW27J58/vvvd/YcL7ww0v/+e+G9euzc7KDwcCTv/p1a2vrwI81gEAGH3048ju6un75+C8a6us7Ozu5c5lS7Hb71s2bf/b445OnTOZY9uEHHzpwYP+yq6+Wy+V9ZwkEAvk2fTjy63S6v/79mQ8++jAlJaV7i27vnj06nW706NEajcZkNk+bPm3/vv2hYLDvzIBAIBelD0d+DMeTkpIAACR5Pv1WZ2enRqulqLNZnM0Wy5HDh/mLlYKTJKmkpMTv83UvCk5VVFw6VywEArl8Yh3kIwgCiqLdGXgxDBcE4aLZuBmG2b1zp6PL0S3+5qYmWLEHAuktYi1+hVxxLikKAACEgkGZTIZcLHsZRVF33XOPIAgcy324apXdbo8mhwNQ/RBIbxBr8U+aMvl/H33U2dFhNBpRFD148GDe+PEXzeWKIIjBYAAASJI0ZuwYj9tDkkR9XR3M2w+B9AqxFn92dnbOsGHvvv3O8ptvOlNdfaa66qFHHlYoFJd4CcdxdbV1HR0dLS2tHMfBgR8C6RViEV0zfebM5JSU6NlMgiB+/dSTRqPxjdffOHDgwK+feionJ+fSxzYJgsjIzBgxYkRSUiJBELBQJwTSK8Ri5H/gwQdomaw7GVNySspDjz4SDocxFNXqdN+bp4XneafDabfbPW63cLF9AQgEcgXEQvxana7nnyiK6vX6y385hmE0TSmUCoqiL+oahEAgV0AcnOc/m8xDFLds2lxSUtzf5kAgg4Q4ED/Lsr9+4lf1dXVen8/rgSW6IZDeIQ7ETxDEb3//u0gksmvnrnffeQdu9UEgvUIciB9BEIvVKoqiwWiA6RwhkN4iDsTPsuzjP3usoaHe6/W6Xe6+mPZLkhQKh/2BUCAQDIXDDMMwDMuwHMNGH7A8z4vSeYAEJEnCMIwkCZIgSJIgCIIkCJIgCJIgCZKiCZVCqdWoFXI5isKpCmQgEgd5+yVJamtr41h2546db7/15o8s1ClJUjAUdns8LrfX5/f7A0F/IBgMhXAMk8tkcrmMpiiKJM/rmSRIgsBwDEEQBCBRAAIQAARB5Hie53mO47novxzP8TzH8SzHBoNhfzAo8LxSodBoVBq1WqtWazQqrVpNkgTMRArpd+Jg5EcQJDExEQBgMp+8gmk/z/Mer8/p9rjcHqfL4/Z4AZBUSqVGrVIo5HqdTiGXyWU0QRAoimIoikTLA6DIN/6HnLXkgjeXJKnnjOA8oiSIoiAILMsGgiF/MBQIBOsamvzBYCAYInBMrVJq1GqdTmM2Ggx6HQHrUkBiThy0OUEQ9u/d5/a4S4tLIuHI5bwkEmHsDmdHp73D7nC7PTRNazQqjUqVnpo8bvQIuYzGcRzHMBRDMfQsVzYUIwhy6cADSZIMBlEUBEEQBVEQBFEQhHAkEgiE/MFAV5ezsro2HA5rtRqLyWg1Gc1mo4ym4bwAEgPiQPySJFVVVznsXS3NzRzHfdfT/IFAp93RYe/q6OwKhsJqtcqo12VnpOq0Y2mawnEMwzAcwzAMQ2MYKYQgCI5h4JsTFlEUBZMoCgIvCDwvRCKM2+NxuDzlpyrdB3wymjabDBaz0WIyajXqWFoLGVLEx5rf6/HdNuFHAAAgAElEQVTwgrBty9ZXXn7po08+6V7zsyzXYe9qaetobWuPMKxepzHodQa9TqtRUyRJ4FGwAT6QSpLE8wLP8zzPsxzn9ftdLo/T5Xa6PYIoGvU6m8WcaLPqdVoMZjqF9B5xMPIjCBINEFap1SiKiqJo73K2dnS2tnU43W6VUmkxGfLGjNRpNeQ5wWNYPFX1QxCEIHCCOPtbaDXqRKuF4wWe54OhsMvtdjjcp6trJEmymI3JCbZEm1Uul8XRB4QMTOJA/N0IgkCQ9Ncbt9qsCUajPi0lsSBvtExGEwRB4ASOD5IQAAzDMAyLHndSq5Qmoz4zjWc5zuf32x2umrrGQ8dKFQp5gtWSlGCzmo2wfD3kyoiDaT/Lsi++8K+Otrbm5ub6hobX3347MzOTOKf4oTMAiqLIcTzHcQzLOt0ee5ez0+4IhkJGgy7RZk1OtEEHAeQHEQcjP0EQM2fN9Pl8R48caW5tMRr0Wo26v43qB1AUpSiSokglUGjUquQEG8dzoVCky+nstDsqTlejKGKzmBMTrIk2C9wygHwvcSB+BEHyxo8XRTHgD2zetBm2aQBA1JMpA7RKqdTrtRlpKRzHe7w+u8NZVV178HCxSqVKtFmSEqxmkwH/7iCC8rKyjevXO12ugokTF191lUqliuWngPQvcSB+AEC0zhdBklD4F4AgSDSsGACgUiqtFhOXw0cYxuly27uc+48URyKMyahPtFmTEqwatarnuqD42LG//eUvtTW1giDs2bW7taX1npUrtTpt/30aSEyJD/FDLgcMQzGMoilKqZBrNeqUpESO4wLBUJfD1d5pL6s4heO41WxKSrAm2Cwymv5y9eoz1WdCoRAAIBwOf/7pp0uWLdVoNXBuNUSA4h+EIAhC4DiB40BGq5QKo0GXlZHKcpzX6+tyOCuraw8cKVGpFP4wq9EbWJbleR4A0NXVFQ6HJUmC4h8ixIf4W1tbg4FAe2sLz/H9bUucgaIoRZIUSQIANCqlzWLmeC7CsC6Xp762BsFJFMU8Lmdne6uCpnRaLdwvGDrEgfhZln3jtdfb29s62jv8fj/M5HPFRCMIaEApFZJWo77t5uWvvvzyvr37SJk8JS0jJS1t98HipKa2RJs10WaBcUSDnjjY55ckqbOzk+f5HUXb33j9tR95pBfSjSRJToejqbmZZdik5GSZXO4PhhwOZ2eX0+l2K+Qym9WSZLNazcaowxUyyIiDkR9BEKvVCgDQG2Amn94EQRCjyaTT60VRxHEcQRCtRmM1G4dxPMOybrfX7nAUHz/hDwR0Wq3Nak60WUwG/SU2DiHxBfwhhzrRtcC5x2f3C1RAoVWrkhKtHMeFI4zT6bY7nHsPHmUYNrpxmGA1a7UaDDoI4hkofsjFORtHRNMqpVKv1aSlJHE873C69h84eLKiQq5QqdSqBIslIcGSaLUolQroIIg7oPgh3wOCIARBEATBcdyH772zo2hHIBhEUCRn2PDb77q7vqH5aEkZTVNWs8lmNVvNZgX0FMYJ/SZ+r9fb0dGRnp4OnUnxQmlxyd49e9vaWqNO4rKS4vnz5i1euoQgCY/H3+V0Vp6pO3i4hCBJs9FgtRitZpNapdyxfXvRtm0sw8yeM3fu/HlKpbK/PwfkLP0jfkmS1q5ZU3nq9C9+9US0Djdk4NPc0hIMBLq3hxiG6ehopwhcp9Np1epEm4XjeS6ajMTtaWntKKs4HQwGz1RV1je1dXW2HztWHAgGrrn2Wqj/AUI/iH97UdH2bUV7du/OzMoSRTH2BkCujOzsLIqmv3ElJzt6pTuCAACgUasSLGaOF8KR8K+f+JXd7lBrdcPH5MkViur6lqMl5elpKWaTobfOHYZCoQP79zc1NQ0bNmz8hAkymezHv+cQoR/ET1FUdk5OS0sLzEIRXwwfPvzmW25+9+13XC4XgiDLrrl60qRJ3xZbdzISHEO7OjrqamtxHMdxgqCo1NS0cePGlJ8Merw+mUxmNhmsJqPVYlIplVcWWejz+p75618PHDgQCgZpmr7uhhvuXnnPDyoDO5TpB/FPyM8fM3as2+0+U10d+7tDrhiSom67447CSZPqautMZlPOsGFms/kSozdFUSNGjmhsbAiHQgAABEGmTJ40fswonV7PsqzX53e6PfWNLceOVyAIMBn0FrPJYjYadNrLDyXYtm3r/n372tvbo4uRjz/8cNr06eMnjL/0O4TD4bq6OoVcnpiUNJRHoH4Qv0wmk8lkNE1detYXDoX+7/e/b21p7V5kOp1Ol9MFw3v7EY1GM2bs2NzcXJwg8O9Lo4QgyIMPPRQIBPfs3s1EIoWTJt19z90JCbao3rRaTaLNGq164g8EnW5Pl9NZeaaWYVidVmMxG61mo8looEjyEnc5U1Xt7+GG8Hg8Lc3No0aPunQKg5f+898zZ84gAEybMePhRx+JhpANQQbuVh9F0/f95CehUFiSJLu9MxQKHy8t3bJ5MyzU2b9E9/8v88mpaWl//NPT7W1tkiSZzWazxdI90uIYhvdwE1jMRp7jOZ5vb28vLS1zdHbUKpQMy6mUCqNBbzLojUa9TqO5IFNjUnIyRZL+c38SBGG12S6xfxQOh1/+70sH9u+PRCIAgDVffZWWnnbj8uVq9VDMDTVwxY+iaHZODpAAy7Ffrv6iva29s7MzEg7DkT+OwDDMYrEYjcbo4+96WvfRw/Ly8uf++c+aMzWCIOoN+sd/+URyaqo/GGpuay8/VRlhGLVSaTToTQZdNJvbgkULDxzYv2fX7kgkgiDILbfempWddYm+qba2tq6uLqp8AEAwGDxy6PCiRYuh+Acc0eZCY/S8+QvcLmdpaamjqwuO/HHHZZ7IEEXx3bfeLi0uCYfDAACP27V108bHn3giPTWFF3ieFxiG9fr8Hp+vqaW97GQlE2GUSsWcRUvGTZgYCvpH5OaOHTf20jvHCsWFkYgymQwdqtUQBrT4o3Acd+zIkY7OjpbmFoZhABz4Byler/fMmeruYVkQhPLyMpZlaJoCgALR2md6Lc8L0b4gwjBen9/j9dG0zO5wNnU4g0ePm4x6o0FvNOi06gvXCACApKSkKVOn2js7A4EAAEClVi9YtFCrHaKZy/pN/MtvvnnZ1VfrdLrvfSZBEDcsvzEQDO7bs6eluRnAgX+QIpfLlUoViqKCIESvmExmAj/vjUcQ5JzHobsv0EV7Al4QIhHG6/d7vL7G5tayE6cZllGrVUaDzqQ3GA06jUaNYxhBEA8/+khaWtqhQwdltGzhokVTpk6lojUShh79Jv7oOvBywjw4jnv15Veam5udDofP54Nr/sEKSZK33n5bS0tzR3sHAECpUi2/abne8J2b9uezlUX7ArVkMJzvC8KRiM8f8Hi89U3NpSdOsiynUauMBp1Rr5s9b96CRQsJHFep1RT1PbtOg5j4SObR1tbGsezOHTvffutNmMxjEBMKhcrLyvfv2yeKwqQpU8aNHatUqa5MnJIk8UK0AqIgROcFPr/H63V7fR6Pl+V4tUqh02r0Oq1Oq9FrtTLZkKt0EB9r/m1bt3XZ7TVnzoRCIbjmH8TI5fIJ+RNyc4dLACgUiu8NJbgEPeYFAJybF0T7Ap7nGYb1+QPeaAW0+ka/P4ihqEaj1mk1ep1Gr9VqtWqSIAZ3dxAH4icIwmw2kwThdDowDIdr/sENQRCaPvDAXdgXSJLBoBMEITov4AUhHAr7AgGfP9Dc2n6y8kwwGKQoSqfV6DQanU6j12k1ahU+uBJJxYH4EQSZOWumKAgESRzYv7+/zYEMBs73BeecfaJGbRGMvCAIvBBdLwSCIb8/4A0EamobfP5AhGEUcrlOp9ZrtdEJglKhiOtkx3EgfpZlV33wgb2js76uLuAPwGk/pC9AURRF0Z6h/jqtRhBEXuCjEwSW4wKBoM8f8PkDLW0dvoBfFESVUqXXqXVajU6r1es08VUiMQ7ETxBETnaO2WTmeO7UqVNw2g+JDdHjiSQ42x2c31kUBEE46zjwBwI+f6DL4aqtb/L5AziGqdVKjVqt1ag1GpVWrVYq5AN2dhAH4kcQZPLUKaIgSJK0e9eu/jYHMkRBECR6HqE7KkCSJKNR37M7CIUjgUDQHwx2OZ11jU2BQJAXBKVcrtWotWq1RqPSaNQalYogBkRp+TgQPwAASBIvCIIowDk/ZOBwgRMRAKATRUEQBEGMOhEFQWBZLhAMBoLBQCBkdzr9gWAoFKYoUq1W6dRnZwcajUouk8V+ghAH4mdZ9ne/+W1zc7PL5XK54JFeyMDlnOPg/BVJkoyCXoj2CYIgCCLP86Fw2B8IBoKhjs6uM3UNgUBIFMWkBNvECWOVCnnMrI0D8RME8Ysnfsmy3K6dO99+6y14sAcSRyAIguMYDr6xRyiKIn+uL4j+wzAsjmE0FdNktnEgfgRBkpKTAQCnTp369lENCCTuQFGURFHQY4YgSZIkARSN6cAWB+KHQAY9CNIPHsA4EL8gCAf27Xd73KXFJZFwpL/NgUAGCXEgfkmSqqoqu7q6mpuaOI7rb3MgkEFCHIgfw7Drb7yR5/mirduqqqv62xwIZJAQB+JHECSaiV2t0QzYYCkIJO6AWoJAhihQ/BDIEAWKHwIZosTBmp9l2f+8+GJ7e3tLc4vX44XhvRBIrxAH4icIYtr06V6f79jRo42NjTC8FwLpFeJA/AiC5I0fL4piKBDcsmlzf5sDgQwS4kD8AIBoZnWCJOGoD4H0FtDhB4EMUaD4IZAhChQ/BDJE6f01f1tb21tvvFFxosJoNNx7//1jxozpmRG1mwMHDuzfu/e++++/nHJ9EAik1+nlkV8UxX8880woFHrokYezc3L++bdn2tvbL6gI1traunnTpn899/ypk6d4ju9dAyAQyGXSy+IvLys7U1W9/Kabp0yduuKuuwRROHTwYCQc7vmcXTt2bNyw0dHVJYpi794dAoFcPr0s/gP796dlpCenJFMUZTAax0+YcOzo0dA3xb/4qqt+/dSTCxcvkslkvXt3CARy+fTymt/ldGnUGvxcMmO93tDQ0NBdbv3sRYNBD4Dm+87nMgyzbu1al9PVvWo4WVHhcXv+9Ic/yuSxy3B6aXieE3iBHEhlnlmGQRCEIIiBEwoZDodIksSwARRUEgoGaZpGB07tPUmSyeWPPf7zpKSkmN2zt38PBFywwr9iVWAYJklSz5drtFq5XM4wzMBp1g673e/3J6WkXNSp2S80NzVhGGa2WHB8oIituqrKYDDq9PqBk46hvLw8MzNTqVL1tyFnYRnmZEVFwO+P5U17uX1odbq2tjbx3FDv9rg1ag12Rf0rhmELFy3qOWuoPF3Z1Njw+C+fMJlNvWPuj2b71m0nT526c8WdOr2+v205y7tvv6NUKhctXqxSD5SW/Zc//3n69BmFkyfRNN3ftpzlwfvv/8kD9w/PzR0gUzZ7Z+fzzz4bY2N6WfyzZs1e+/WatrZ2nV4fiUQOHzx054oV8iuapSMIolare15Rq9UURVltVqvV2kv2/lh0er1SqbDabEajsb9tOYtarVapVLYEm0aj6W9bziKXyfQGQ0JCwsDx8pAkaTKZEhISBshkBEEQioz14rGXxT9s2LBRo0f958UXZ82eXV5eThDEhPx8mqbvveeejrb2t95712az9e4dIRDIldHL4idI4ldPPrlh/fq6ujqzxXznXSsSkxIRBKmvq2tqbOLY87l3JxYWpqalKWJYnAgCgfSk931CNptt+U03RcIRnMC1Wm10wf/WO++wHNdz2B81enTuiBE/aB6IIAgywAp0I/1SbOHSIAPHH3qWAfklAQAGWHOK+XeEPf30073+pjRNK5VKufx8ZXKdXm80Gnt6/nAcJwjiBzUKhUJhNBnTMzIGjmtdqVQlJiUmJCYOHNe6SqXKyMy84NvuXzQ6Xc6wYWq1eoAssAEAJpNpWO5wmXyg+CBomjYYDZmZmbH0iSJS/GTFkiSJYRhqIG2qR6ss/tBerE/hOA5BEAzDBo5JLMtiGDZwOiMAQCQSIUly4HRGAACGYQiCiKVJ8SR+CATSiwygng8CgcQSKH4IZIgCxQ+BDFGg+CGQIQoUPwQyRBkou9OXgGXZXTt2lpeVkTS1ZMnStPS06KaRw+FY+/Uah8ORNz5v2vTpMY4bLyku3rdvn8DzCxYtysnJiYYe1NbWbt28JRgIzJw9e+zYsSRFxsyejvaO7UVFzc3NZrNp7vz5SUlJ0W+ppLh4/759oiAuWnJVZmZmv8QjCIJQtK2o4sQJtUa9dNkyi8XSL3tswWBwz67dJ0+eJCly2rRpI0eNiqaEb21t3bJxk9PlLJw0qaCgIJYHxiVJOnzo0JHDRyQgLVy4KDMrM9qQTp86vWvXzlAwNHfe3BEjRpAU1Rd375Mgn15EkqSX//vS5k2bUlNT/P7Aqg8+yM0dYTQaXS7Xb598KhQKGYyGNV99zTJsVnYWScZIbGu+XvPm669bLBaO41a9/0FmZqbFYqmqqvrb//sLTdMkRX76ySd6gz4pKSk2YvP5fH/4/e9dbpfNZqs4UbFx48bxE8Zrtdqd23e89uqrBr0hFAp99smn2Tk5JpMp9sJ78/U3tm7ZkpCYeKb6zPZtRePy8mJ/6EiSpFdeeunA/n02W4Lf5//0f58kJiTYEhLaWlv/8qc/syyrUqm++uorHMNT01Jj1pA+/d8nn/zvY6PJFAj4v/jss4ysLLPZXFJc/O8X/yWjKAmALz7/zGyxJiQk9EVDGugjf2tLy7atWx948MHCyZOABF54/rldO3empadtLyrief6OFSsSEmxGo2nN11/PmTdXqVTGwCS32/3xhx9etWTJvAXzSYIEAKmqrBoxcuT6tWttNtvNt96iNxgEQSzati1v/PjYBGxtLyoKBAL3PXB/Wmqq2+1+7Kc/O1Febjabv1y9elxe3vU33iCXyf7217/u3rUzLT0txhlT7Z2dWzZvvnPFnVOmTQuFQr/6xS9LikuMRmOMZ2o1NTX79uy99/6f5BcUiKLo6Oo6cvjIqNGji7Zuo2X0TbfcnJiYqFQqd+7YUTipMDYNqa219euvvrru+utnzJyJosgbr79eX1ubnZ29bu26tLS05TffrNPpX3nppX179uTmDrf2wYm4gb7mb2pqkkRx9JjRJpPJbDGPHDly3969oWBwy6bN+QUFqWmpeoNh0eLFXq+3orycYZgYmHTyxAlRFPInFng8HnuX/c4VK5YsW8rz/N49e6dOn5aSmmo0Gq9auuREeXl7W9sFWYz6iJSU1DtXrMjJztbp9Rqtlud5AsfPVFfX1tbOmDkjOTnZbLHMnTfv4IEDPq83Bvb0ZP++fWq1eszYsWazOS0tLb+g4Mjhw7E3QyGX33L77QUFBSajSa/XoyiKoCjH8Tt37swbPyEtPd1gNC5esqSlpaWmtpZl2RiYdLz0uFKlGjZ8uNvt9ng896xcOW/BAq/XW1ZaOnXatLT0dJPZNG/B/OOlpV1dXX0RjDfQR369Xh+OhL0+nyiKKIo2NjS2t7fzPN/S0nLVkiXRuZBGq1EqFJ12O8/zVN+sjnpSU1OD48QLzz6HYZjb7UpNS3/k0UcAAAG/32ZLiK7ZEhMTOY53OV2CIMQgrHXkqJGSJNk77as+WLVv797s7OyRo0fX1tTgGKbT66MGJCYmdtm7YtOse9La2qbVaWUyWTTc2Gaz1dfFSF09MVssixcvJkji/ffeLT5W3NracstttxIk4XK5LGYzRVIAAKvVKkmSo6uL57gYzPzr6mp5jnvxhRcIknC7XMOH5973wP1ulzvCMCaTKdqQbDZbKBzy+wOiKPZ6QxqI4r//3vva2tqij1969ZX8/IJnn/n75KlTXS7nwf0HOJaVJCDwPIbj0faEIAhOEDzH912o8oM/ub+lpSX6ePTo0Y0NDbevuHPO3LmSKD3/3HOrv1g9e85sSZII4qxJBE4gCMJxXN+Z9PADDzY1NUUfv/r6a8kpKbSMtlgtFqultLS0vq4uHAphGNa9wsdxXBTF2GdM5jiu50EDgiB4Xoh9TDmO47gSFwTBbLEkJiWeOnWytLTUYDRKoojjeNQ6FEUxDOU4ToyJfcFgsK6u9o4VK6ZPn8Fy7IvPv7Bpw4bs7BwAAHruG8MJAgBE4PukbQ9E8dfW1DQ2NkYfIwD5+S9/sW/v3paWlqTk5IWLF1WcqKAoiqZpholIoggAkCQpHA7RfXngp662tq6uLvp4XF6e0WSaN29edk4OgiAzZszYs3v3rDmzERQNhyPRGUo4HJZEkZbL+s67VldXV3PmTPRxQ0OjUqXS6XTz5s+fPGXKP5/5+46i7XnjxzMs251SLRyJEAQR+9M1tEzGspwonm27kUiYJEkUjfWhI7fbzTCMwWCYPmPGxIkTTSbzti1bCidNQlA0EglH+0SO4wRBpGk6Nj5RuUyempo2bfr0YcOHAQDyCwpqa2oyMjIkUeQ5LprAMhKOiKJI0VRfmDQQxf/GO29z56aFJEluL9o2e+5ciiRxgnjun8+OnzBBJpdNyM8/ferUgoULZXJ5dVV1MBgaMWpU33nXXnvzje6ZamNDY3lZGUGQ0cP8As+TJGkxm9PT0ypOnBg5aqRKpSopLtYbDEl9edT3lddfY8/5OL5a/eXpU6duuuVmrVarUqkMRoPf5x+WO5wkiKqq6sSkJJqmS4uLh+XmyhWKPrLnuxg/Pm/Lxo0ul9OWYEMQpLSkdNjw4YqYm3Hk8OE9u3Y99OijSUlJSqUyISmR5TiaokeMGFFVVTV56lRaJis7XkYQRFZWVmzctKlpaceOHSNwPCpsXuBxgkjPzDSZzSdPnszMylKpVGXHjyenJOv7JvfpQNzq0+v1RpMp+p8kSa+89HIkEs7Kzi4tKVn79de33HZrSmqqUqX85OP/6XR6BEHeffttnU67ZNlSVZ8lY9X1MMloMm4vKmppaTEajTVnat5688258+bl5xcIgrBxw0aLxeIPBN5648288XlTpk3rO5+2TqfrNsnr8X7x+WdarY4kyL1796z+/IuFixflFxR0tHccPnjQarM1NTW/9967S5cuGTN2bMz2saIYDIbdu3a1NDebTOZ9+/Zu27rtzrtWpKWnx3jHkSSIVR+sYhlGo9E01NW//eZb6RkZs2bNVChV69auiXpJ33/33aSkpNlz5/ZdQ+qJVqfbvHmzo6tLq9NVVFT876OP582fNyE/P+AP7Nm922AwOp3O9999r3DypImFhX3RkAb6kV5RFPft3ff1l1922jsVCsXiq66aN3++SqViIpH169dv3rjR7w8kJyevuPuu3BEjYrOpLklSaUnJV19+WVtTg+PE+PHjb7r1FqvV6vf7P//0s/379obD4dFjxtx2xx0pKSmxmWb7/f7PPvnk0IGDPr9fpVIVTpp09bXXmEymzs7Oj1atKi8rFwR+ytSpNy5fbjabkZjv81ecOPHxRx831tcTJLlk2dKFixZdkJo1BgiCsG3Llk2bNts7OwmCyMrOvvmWWzKzMhmGWbdm7faiIr/fn5mVefsdd+QMGxabhiSK4tHDR9auWVNXX0+SRGFh4XXXX2+xWt0u12effnb48GEmEs6bMOGmm29OTk7ui4Y00MUPAGAYxuFwhMNhAsdNJpNMLo+u7YPBoMPh4DhOoVAYjcZYpvfhOM7ldAYCAQRFdVqdRnu2AInX63W7XIIgaDSabjd7bPB6vR63m+M4giC0Op1KpUJRVJIkl9Pp9fmAJOkNhv7KpcPzvMPhCAaCGI6ZTCb5uV8wxoTDYZfTGY5EUBRVqVQ6nS4q8oDf73S6OJ5TKZUGgwGPYUNiWdbldAWDARTDdDpd9AeSJMnj8Xg8HlEQtTptdy68XicOxA+BQPqCgR7kA4FA+ggofghkiALFD4EMUaD4IZAhChQ/BDJEgeKHQIYoUPwQyBAFih9yHp/Xx7Lsjwn9cLvdPM/3okmQvgOKfzAjCMLT//eH99991+fzdV8sPnrs0YcerjxdecHxXpfT+fJ//9Nlt1/6PSVJ+sczz7z2yqtut7v74qlTp3768MMlJSWffPzxsaNHmUikdz8IpC+A4h/MoCiqVCqLiop83vPi37Vzp8/nlcllF8TYfvbJp2azRa5QXDr2FkEQrVa3vajI00P8+/bu7ey0q1WqgomFn3/6mb2rq9c/C6TXgeIfzCAIMmv27Pa29saGBo7jAADhcPjw4UMTJuRrNJqeIvf7fLt37RozbqxKpWpra6upqamtrf1y9epNGzb6/f6mxsbVX3yxbevWQCAAAJg1e5bX662uro7mTeN5fv++fWPGjtXp9aPHjA4EApWnT0fg4D/gGYjn+SG9yKgxo20227FjR0eOHqXVasvLyj1uz+SpUy/IUXno4CGtTmexWHEcP3zw0PaibeFwJC0trby8fHtRUTAUtNlsFSdOVFdV337nHRmZmVlZmcXHjuXnF1AUVVVZ2dbads/KlSqViiTJ/IL8gwcOjB07NpbVpiFXABz5Bzk0TU+fMaOkuCTg9wMA9u/dm52Tk5h0YZaRvXv3pqenK5QKAEAgGKiqqr7xppvu/cl9s+fMOVFeftWSJSvvu2/R4quOHD7s8/oIgpgxc1bZ8eM+nxcAcGD//uTk5LT09OjBynF5ecXHjnl7eBkgAxMo/sHPnLlzOzs6Ghoa/X7/oUOHCicVfjttfkd7u1Klws8dHU1PTx85cmRCYmJSUpLZYhk5clRiYmJWVlYkEonmI54xa2YwEKyqrg4Gg/v37c8vKNBptdF1hMFgCAaDoUAg9vkCIT8IOO0f/KSlpWVlZ5eWFIdCQYZhxk+YIP9WURqOY3H8fJpNpVJJEDgAAEVRmqYJkkAQBMdxgCAASAAAi8UyeszostJSuUzucDomFk5Unst+gyAIkADXNzknIb0IFP/gByfwmbNnbdqwsb6+ftToUSaz+dspPWQyGcfz3VlrvzfZBoZhs2bPef+9d2w11CwAAAF0SURBVH1eX052ji0hoTvhBMMwoiTFLA0m5IqBP8+QYMbMmQ6HY9fOnYWTJl00hVbuiBFddvsPSqdfOHkSy3Jbt27JL8jvuY5obGpKS0tTqdT9kq4HcvlA8Q8JTCbT0mXLFixclJd38Qpi8+cvqKqs9Hq8kiQlJSWPPJcK2WK1jMvLi2aP1Bn0+fn53fl/NRrNNddeO2vW7EmTJ/dcRxw9fLigcKJaE+ssfZAfCkzjNVTweDwsw+gNhotmp+Q47sknfjVv/vzZc2aLksSyrFqtxjAsHA6HQyGNVothGMMwfr9fq9V2v4PP6wuHQz3z3gWDwfvvve/nv3g8b/z4fqkIDLl8oPghZzly6PCGDRseevihH1MTct3adXW1NbfefrvZbO5F2yB9AeybIWcZmzfOH/ATJBmtFXNlb6JWq6674QaDwdC7tkH6AjjyQ84TCoUoivoxiaKDwSBN07EvCga5AqD4IZAhCvT2QyBDFCh+CGSI8v8ByijG4yrJPXsAAAAASUVORK5CYII=]]></Image>
<CoordSystem>
<General CursorSize="3" ExtraPrecision="1"/>
<Coords Type="0" TypeString="Cartesian" Coords="0" ScaleXTheta="0" ScaleXThetaString="Linear" ScaleYRadius="1" ScaleYRadiusString="Log" 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="0" PointsSelectionFunctionsString="InterpolateAllCurves" PointsIntervalFunctions="10" PointsIntervalUnitsFunctions="1" PointsSelectionRelations="0" PointsSelectionRelationsString="Interpolate" PointsIntervalUnitsRelations="1" PointsIntervalRelations="10" LayoutFunctions="0" LayoutFunctionsString="AllPerLine" Delimiter="0" OverrideCsvTsv="False" DelimiterString="Commas" ExtrapolateOutsideEndpoints="True" Header="1" HeaderString="Simple" XLabel="x">
<CurveNamesNotExported/>
</Export>
<AxesChecker Mode="1" Seconds="3" LineColor="6"/>
<GridDisplay Stable="True" DisableX="0" CountX="5" StartX="-100" StepX="50" StopX="100" DisableY="0" CountY="5" StartY="0.1" StepY="10" StopY="1000" Color="0" ColorString="Black"/>
<GridRemoval Stable="False" DefinedGridLines="False" CloseDistance="10" CoordDisableX="0" CoordDisableXString="Count" CountX="15" StartX="-109.801" StepX="9.86087" StopX="28.2509" CoordDisableY="0" CoordDisableYString="Count" CountY="2" StartY="32.1333" StepY="501.21" StopY="533.344"/>
<PointMatch PointSize="48" ColorAccepted="4" ColorAcceptedString="Green" ColorCandidate="7" ColorCandidateString="Yellow" ColorRejected="6" ColorRejectedString="Red"/>
<Segments PointSeparation="25" MinLength="2" FillCorners="False" LineWidth="4" LineColor="4" LineColorString="Green"/>
<Curve CurveName="Axes">
<ColorFilter CurveName="Axes" Mode="2" ModeString="Intensity" IntensityLow="0" IntensityHigh="50" ForegroundLow="0" ForegroundHigh="10" HueLow="180" HueHigh="360" SaturationLow="50" SaturationHigh="100" ValueLow="0" ValueHigh="50"/>
<CurveStyle CurveName="Axes">
<LineStyle Width="0" Color="8" ColorString="Transparent" ConnectAs="4" ConnectAsString="ConnectSkipForAxisCurve"/>
<PointStyle Radius="10" LineWidth="1" Color="6" ColorString="Red" Shape="1" ShapeString="Cross"/>
</CurveStyle>
<CurvePoints>
<Point Identifier="Axes	point	681" Ordinal="1" IsAxisPoint="True" IsXOnly="False" Index="710">
<PositionScreen X="57.9564" Y="12.5992"/>
<PositionGraph X="-90" Y="1000"/>
</Point>
<Point Identifier="Axes	point	683" Ordinal="2" IsAxisPoint="True" IsXOnly="False" Index="710">
<PositionScreen X="58.2713" Y="162.53"/>
<PositionGraph X="-90" Y="0.1"/>
</Point>
<Point Identifier="Axes	point	685" Ordinal="3" IsAxisPoint="True" IsXOnly="False" Index="710">
<PositionScreen X="302.696" Y="162.215"/>
<PositionGraph X="60" Y="0.1"/>
</Point>
</CurvePoints>
</Curve>
<CurvesGraphs>
<Curve CurveName="Curve1">
<ColorFilter CurveName="Curve1" Mode="2" ModeString="Intensity" IntensityLow="0" IntensityHigh="50" ForegroundLow="0" ForegroundHigh="10" HueLow="180" HueHigh="360" SaturationLow="50" SaturationHigh="100" ValueLow="0" ValueHigh="50"/>
<CurveStyle CurveName="Curve1">
<LineStyle Width="1" Color="1" ColorString="Blue" ConnectAs="0" ConnectAsString="FunctionSmooth"/>
<PointStyle Radius="10" LineWidth="1" Color="1" ColorString="Blue" Shape="1" ShapeString="Cross"/>
</CurveStyle>
<CurvePoints>
<Point Identifier="Curve1	point	686" Ordinal="0" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="59.8462" Y="34.9628"/>
</Point>
<Point Identifier="Curve1	point	687" Ordinal="1" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="82.8398" Y="35.2778"/>
</Point>
<Point Identifier="Curve1	point	688" Ordinal="2" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="108.353" Y="34.9628"/>
</Point>
<Point Identifier="Curve1	point	689" Ordinal="3" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="133.552" Y="34.9628"/>
</Point>
<Point Identifier="Curve1	point	690" Ordinal="4" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="163.475" Y="40.3175"/>
</Point>
<Point Identifier="Curve1	point	691" Ordinal="5" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="177.019" Y="53.8616"/>
</Point>
<Point Identifier="Curve1	point	692" Ordinal="6" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="188.988" Y="64.8859"/>
</Point>
<Point Identifier="Curve1	point	693" Ordinal="7" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="206.312" Y="68.9807"/>
</Point>
<Point Identifier="Curve1	point	694" Ordinal="8" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="228.361" Y="69.6106"/>
</Point>
<Point Identifier="Curve1	point	695" Ordinal="9" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="252.929" Y="69.6106"/>
</Point>
<Point Identifier="Curve1	point	696" Ordinal="10" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="275.608" Y="69.6106"/>
</Point>
<Point Identifier="Curve1	point	697" Ordinal="11" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="299.546" Y="69.9256"/>
</Point>
</CurvePoints>
</Curve>
<Curve CurveName="Curve2">
<ColorFilter CurveName="Curve2" Mode="2" ModeString="Intensity" IntensityLow="0" IntensityHigh="50" ForegroundLow="0" ForegroundHigh="10" HueLow="180" HueHigh="360" SaturationLow="50" SaturationHigh="100" ValueLow="0" ValueHigh="50"/>
<CurveStyle CurveName="Curve2">
<LineStyle Width="1" Color="1" ColorString="Blue" ConnectAs="0" ConnectAsString="FunctionSmooth"/>
<PointStyle Radius="10" LineWidth="1" Color="1" ColorString="Blue" Shape="5" ShapeString="X"/>
</CurveStyle>
<CurvePoints>
<Point Identifier="Curve2	point	698" Ordinal="0" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="57.9564" Y="106.148"/>
</Point>
<Point Identifier="Curve2	point	699" Ordinal="1" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="76.8552" Y="101.739"/>
</Point>
<Point Identifier="Curve2	point	700" Ordinal="2" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="99.8487" Y="98.5888"/>
</Point>
<Point Identifier="Curve2	point	701" Ordinal="3" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="129.772" Y="101.424"/>
</Point>
<Point Identifier="Curve2	point	702" Ordinal="4" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="154.97" Y="108.353"/>
</Point>
<Point Identifier="Curve2	point	703" Ordinal="5" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="182.689" Y="115.283"/>
</Point>
<Point Identifier="Curve2	point	704" Ordinal="6" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="205.997" Y="121.267"/>
</Point>
<Point Identifier="Curve2	point	705" Ordinal="7" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="224.581" Y="125.992"/>
</Point>
<Point Identifier="Curve2	point	706" Ordinal="8" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="246.315" Y="130.087"/>
</Point>
<Point Identifier="Curve2	point	707" Ordinal="9" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="268.993" Y="134.812"/>
</Point>
<Point Identifier="Curve2	point	708" Ordinal="10" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="288.207" Y="137.016"/>
</Point>
<Point Identifier="Curve2	point	709" Ordinal="11" IsAxisPoint="False" IsXOnly="False" Index="710">
<PositionScreen X="302.066" Y="139.536"/>
</Point>
</CurvePoints>
</Curve>
</CurvesGraphs>
</CoordSystem>
</Document>
