Physics-
General
Easy
Question
A ball is projected upwards. Its acceleration at the highest point is
- infinite
- zero
- directed upwards
- directed downwards.
The correct answer is: directed downwards.
Related Questions to study
physics-
An object is thrown along a direction inclined at an angle of 45° with the horizontal direction. The horizontal range of the particle is
An object is thrown along a direction inclined at an angle of 45° with the horizontal direction. The horizontal range of the particle is
physics-General
physics-
A body is dropped from a height of 20 m above the ground. If gravity disappears 1 second after it starts falling, the total time it takes to hit the ground is (g = 10 ms-2).
A body is dropped from a height of 20 m above the ground. If gravity disappears 1 second after it starts falling, the total time it takes to hit the ground is (g = 10 ms-2).
physics-General
physics-
A player kicks up a ball at an angle q with the horizontal. The horizontal range is maximum when q is equal to
A player kicks up a ball at an angle q with the horizontal. The horizontal range is maximum when q is equal to
physics-General
physics-
An object projected with 20m/s and 30° with horizontal direction. The time of flight is ![left parenthesis g equals 10 m divided by s to the power of 2 end exponent right parenthesis](data:image/png;base64,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)
An object projected with 20m/s and 30° with horizontal direction. The time of flight is ![left parenthesis g equals 10 m divided by s to the power of 2 end exponent right parenthesis](data:image/png;base64,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)
physics-General
physics-
The displacement – time graph is shown below
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQMAAACmCAYAAADed+oiAAAgAElEQVR4nOy9eXxU9b3//zyzTzKTyWTfQ0IWAkmAhB3CIqCobArYVq5XrUqr316vXm9tH3a7td7+btvbe9tqb33Y1qW2KlWLWBUQWWUPEHYIYclO9m0ymX3O7494jpOQnUkmlLweDx7AmXM+53M+y/vz/rw/7/frLYiiKDKGMYzhloci0BUYwxjGMDowJgzGMIYxAGPCYAxjGMMXGBMGYxjDGIAxYTCGMYzhC4wJgzGMYQzAmDAYwxjG8AXGhMEYxjAGYEwYjGEMY/gCqu4XxhwSxzCGf3wIgnDdtVGjGYwJoTGMIbAYNcJgDGMYQ2AxaoRBT2rLGMYwhpHDqBAGLpcLi8US6GqMYQy3NAIuDFpbWyksLGTnzp1j2sEYxhBAXHeaMJLweDxcuHCB//u//6OxsZH8/Hzi4+NvSaEgGVBvxW8fw+hAwDQDQRBoa2vj6NGjfPjhhxw+fJg//OEPtLe3B6pKAcXYacoYAo2ACQOv18vFixfZv38/LpeLjo4O3njjDU6fPo3D4QhUtQIGhUIxphWMIaAIiDAQBIHm5mYOHTpEU1MTDz/8MGlpacTHx/O9732PmpqasYkxhjGMMG5YGIiiOCQV9+rVqzidTpYsWcKcOXMYP348f/zjH4mPj6eiooKOjo4brdoYxnBTYqhz6kZxwwbEoRi+RFEkMzOT2NhYOjo6OHHiBB6Ph7S0NP7jP/6DqKgotFrtjVZtDGO4KREorfiGhUF/Ffd6vYiiiFKp7HLdYDBgNBppaWlBFEU8Hg8qlYr09PQvBEwzJ9//Ix9uP8Jpw3RmL1vL00tSbrS6fsXYCcAY/pHQrzAQRbHPwd7Tb77P9PWsKIooFArUavX1P7ae58inhRzZf4xzQQ4sZHDPkhTGDbBeA4WkkikUQ9sxDbUOkgBUKpX/kMLkRtvVX/07hoFjQD01mP2LdK/vqtmfQPB4PHg8ni7X20sKOdkcQvSMhSxOV+A6f4TC6qHVaTAYTLljg7V3SMKgp/aUtMUxjC70Kwx6msy+Hdm9U3vSCPqaNF6vF6fT2U0YWLlSWMglZQix85dw+7QwTLZTfF5Y3191Bw1BEOTVq7cBLAksfw5gQRBQqVQDFij+fv9g0Nd7vV5vj9eldh2qwPR9zuv19vqeG8WYUPoSg9bhBtJ4gxkAKpUKvV7fdRLaL1NYWEL1tQpqrjXR0OTEaq3jyP6jNA/hHYNBb9set9s9LO8bKAZrYR6JQS6KYq+rfG+LiKT+D9bgPBzfMyYIumLQBsTunXijk1KlUhEUFNTFwOgqPcCR804cVcf5/O0LHHa209qsI0h5kAPWO7k7uH9bxFDq1tf9w7G3H8y+WKUaeFdJk1SadEOp90DsPoIgdGmX/tpd+n2wdoTuxmd/oTeN91bd/gU8UMnj8eBwOPB4PF90gpfKg7s5Y8nlnv/vLbaeOsWp7a/yv98YR3vLDvYc7HuFHo5VRKFQDGoyjgaM1Fn1YBYHhUIxZIPiSOBW1xT82jO+K1Fvf7pDq9USGhr6hV+BCJRxcNcJmiZnkpUaRzJAQjLJ2ZPJa2nlg70H+q3DzeLaO5xbHUl4DXWAD6VuN0Ob9wSp3kMdN32N795+629eBAJ+W+4EQcBut3P58mWam5uJj48nMTGR9vZ2zp49i8PhICQkhIyMDIxGo/ycy+WitbWVlpYW6usbiIiIZ+UvP2M+BkJDjAgAQiLZdz/LK7O+hcsYPqg6weBPCHozivqW1ZdRtaf7+3qmNzvFQN8t/db9uq963dO7+1LnB1qnGylrMNeHgsGU1d99A/1G3zHXl9bU2trK8ePHOX78OCtWrCAlJSXg2qdf3i4IAk6nk40bN3Ls2DFaW1uJjIxk6dKlVFdXs3nzZtLS0oiNjSUiIgKj0YggCLjdbo4fP87LL7/MxYsXeeaZZ/jxj39MYmIiRpXKZ/Cp0RnCiDGE9VmP3gZrf/aFwdzf1/65pzJ7mjhutxtRFNFoNIiiiMvlkoWQ5KClUChwu91YrVZUKhUdHR2EhoaiVqux2Wx0dHTgcrmATu3KZDLR3t4uO3F5vV6MRiMhISGIokhLSwsWiwWFQoFWqyU6OhqA+vp6eZumUCgwm80EBwfT3NxMXV2dLFDCwsIIDQ3FZrNRW1uLxWJBEASio6OJj4/H6/Vy8uRJOjo6cLvdmEwmkpKSUCgUXLhwgebmZllrmzFjBiaTidLSUqqqqrBarYiiSEJCAllZWTQ3N3P06FE5gjUxMZH09HScTifnzp2jqakJh8OBTqdj4cKFBAUFcfbsWaqrq3G5XISEhDB+/Hji4uIoLy9n//796HQ6HA4HOTk5ZGRkcPHiRQ4fPozT6USlUpGVlcXChQux2+18+OGHtLW14fF4yMzMZMaMGdjtdg4cOMCFCxcwGAw4nU7uu+8+dDodu3btori4GJVKRUhICNnZ2cyaNYuSkhI+/fRTHA4HKpWKgoICpkyZQnl5Oe+88w5vv/02FouF48eP89Of/pSEhISAbqP8Joqampq4dOkSycnJjB8/nqtXr3Lq1ClaW1vJyMhg/vz5JCUlERERIU+Q4uJi3nvvPfbt20d7ezsff/wxgiCwYMECMjIyyMrKwmq1cvLkSSorK1EqlSQlJXH77bejUCh46623aG1txeVyER0dTX5+Pkajkf3793Pu3Dncbjder5dHH32UhIQEDh8+zNGjR2lpaUGn05GTk8OSJUu4du0a7777Lm1tbbhcLubOncvMmTO5du0a27dvp7q6GrVaTVBQEA8//DAGg4HNmzdz4cIFnE4ncXFxFBQUMGnSJIqKiti4cSNKpRKz2cy9995LZmYme/fu5dNPP5VjLpKTk3nqqadobW3l5z//OS0tLXg8HiZOnMhdd91FXFwchw4d4o9//CN6vR6bzcZ//ud/Eh8fz6ZNm9i5cydtbW0EBwczbdo0Hn30UQ4fPsybb75Je3s7Ho+H22+/nRUrVmCz2di8eTOHDh1CFEUmTJjAv/3bvyEIAm+99RZnz57FYrEQERHB8uXLmTdvHgcPHuTNN98kODgYl8vFPffcw6JFi7hw4QKbN2+moqICo9FIZmYmzzzzDDabjddff53KykrcbjfZ2dmsWbOGiIgIPv/8c/bv309kZCQOh4OUlBRMJhNnzpxh586dNDY2otFomDNnDpmZmdTW1vLxxx9TW1uLy+ViwYIFREREYLPZ+Pzzzzl37hxqtZrQ0FDy8vJQq9WcPn1aHkfjx4+XBV5dXR2FhYV4vV4cDgcmk4lx48ZRU1PDiRMncLlc8gRcsGABCoWCK1euUF5ejsfjQaPRkJ2djdfrpbGxkUuXLqHX6+no6KCjowOtVovNZpOFnRSBC19uO6TTsuLiYo4dO8b+/fvZt28fpaWlCILAjh07uHbtGjExMWg0Gn9NyUHDL8JAFEWCgoK48847MZlMtLS0UFJSgtfrpaamhoaGBjo6OsjLyyMyMpLg4GBZm2htbcVqteL1emltbaWtrY3q6mpCQ0MZP348DoeDpqYmamtr5RVQemdbWxutra2IoojT6cTr9coGSWmVtdvt8vGXKIqoVCo0Gg1qtVpWy7xer3wdvjw5UKvVGAwGzGYzZrOZoKAg1Go1SqUSnU4nx1DExMQQGhoqC4D09HRaWlpQKpVyWUFBQYSFhcnvjY6ORhAEtFot4eHh6HQ6lEoliYmJhISEyGVNmTJF9uQLDg5GpVIRGRnJxIkTEUURg8FAWloaSqWShIQE5s6dK6+0mZmZBAcHo1aryc3NlbWE+Ph4dDodgiAwdepUoqOjcTgcGAwGkpOT0Wg0jB8/nrvvvhuNRoPD4SAtLQ2dTkdsbCzz5s2jra0NnU6H2WzuHEgqFYsXL6a1tRWv10tMTAzR0dEYDAbmzJlDbGwsRqMRl8tFWFinhpeeno5CocBms6FSqUhMTEShUBAREcGyZcuwWq243W7GjRtHaGgoBoOBBQsWMHHiRFQqFTqdjtDQUDQaDVOmTMFsNuN0OgkPDycpKQmVSkVycjKrV6+WF4b09HT0ej0TJkxArVbLpy7h4eFyny9ZskTWsOLi4ggKCkIQBGbNmkVSUhJKpRKXy0VERAQ6nY6ZM2eSlpYGgEajISIiAo/Hg16vJy4ujt27d1NWVobD4cDhcNDR0SGPDa/Xi1qtHhV2LkHstkG+EYNTa2srR48e5dChQ+h0OqZPn86FCxdkdXP//v089thjLFq0iJCQEOrr69m2bRu/+93vOHDgADqdjl//+tdkZWURGRlJfHw8breb6upq2traUKvVhISEkJ6eDsC5c+dwOp0oFAqMRiMREREolUpqa2ux2WyIoojD4ZAnRWNjIxaLRT65MJlMhIWF0dHRQW1tLR6PB6/XS1hYGGazGZfLRVNTEx6PB4PBgFKpxGAwIAgCdXV1AOj1erRarSwkJNW+paUFh8NBfHw8wcHBtLe309zcjNPpRKlUYjQaCQ/vtH9UVlbKAsloNGIwGGQBZ7fbcblcsgqqUqlkDcZXqKm+2Fb5nsxIv/meLPg6WQ0U0hbC154iDVxpMvleGyr8ebQ30mV5PB6sViv19fVUVFRQUlLClStXaGxspKysDEEQiI+PJzU1lZiYGNrb29m9ezeXLl1i6dKl/Nu//RuxsbEjtk3o6Vv8tk1wu93s27ePAwcOYDQamTdvHmlpaVitVlavXk1kZCTz58+noqICm81GSEgIkZGR3HHHHTIPonT0lJubi8lkkjtBWn0kSHvySZMmXXcdIDU19br6iaJIeHg4ERER191vMBgwGAzX3a9SqUhISOjxW6WVvbuRUlJfQ0NDu5QlBWb1VN/ExMQev0+v16PX67tcF0VRtrl0vy4IAjqdrseyug+ywRg8lUrldQLF9x7fOITejLY9GWZ7Q/c63MiRnz+PC3v6JpvNRl1dHVeuXKG4uJiLFy9y9epVGhoaZI3qjjvuIDMzk4yMDBISEtDr9VgsFnJycvjb3/7GsmXLCA8PD/ix6w0JA19vsra2NrZs2YLVauX2229HEARKSko4dOgQ9fX1xMfHEx4eTmpqqrzyAURGRjJ9+nSio6OJiorirbfeoqCgAIPB0MVNuKd391Wvgfwm1X+wZUmu0z113lDqNdjrvf3mjzYZynVBELpsxaRrA31/XxhtZ/+iKNLR0UFLSwvV1dWUl5dz+vRpioqKKC8vR6lUEh0dzfz588nLyyM/P5+4uLjrbAFGo5Hs7Gz27dtHU1PTsLlbDwYDEgZSZ0sqoe9KIXV6e3s7MTExnDhxgj//+c9ER0dz5513MmfOHP7nf/4Hq9XK1772NfLy8ggKCupSvlqtJj09nccff5wnnniCY8eOERUV1WV1HSh8V6mBfNdQMNJGHn8etw0XpEnbk5Yw0nUYyHu7C67efAQ8Hg9OpxOHwyEbCi9dusSpU6fYsWMH5eXlcuj9V77yFebOnUtO9kRC9F7KLtfRbrFQXFwsv1NniiQiKgazrvNYvaqqipCQkOsC9W4UXq930JpGv8JA2rNarVY6OjpkNViv13dxbElMTOTZZ5/t4qsu7aMXLlyI1+tFq9WiUCi6SHuPxyMb+RYuXMjs2bP53e9+R2xsLHPnzu05vPkWgD/3vCMBf52RD2UQ+2Iw7eV7lCu1t0KhkAWAy+Wivr6eq1evcvXqVc6fP09RURElJSWYzWYmTZrE2rVrmT17Nunp6V9uA50NtJz6Aw/P+Qmng4IQVAoUX1Qre9WTbHj6+3x1Yue7goKC5KNmf0KyGw2mPXrtQckg+Oabb7Jt2zZ5D2S328nMzOTpp59m/vz5XT5CrVb3qB5KrEW+0liC1+uVhUF4eDj//d//zfLly3n33XeJiYlhwoQJA/4Yqd7d6+Drp38z4maotzSBNBrNsMUS9IfBtJOk4fb0TFlZGR988AG7du3i7NmztLa2Eh0dzZQpU1i2bBnPPvuszNSl0Wiut5WI0Dm18njqvbf45+kxxOq+0PAUSiS5aTabefDBB+VgPX9iKLE0vQqD8vJynnnmGcLDw/n6179OTk4OarWahoYGTp8+zZ/+9CcsFgu33357l1VhsHtZpVJJUFAQKpUKj8dDSkoKq1atYsuWLeTm5hIXF0dISMigPkp6p69xayQm1GC2KP0h0AJA2sMO9Fu8Xi8WiwWTyXRDwmAkjGjdDaYWi4VTp05x6NAhtm3bxuXLlwHIysriG9/4BjNnzmTcuHEYDAY0Gg0ajQaVStXlO7uOcenfAkq1+otnrq+HRqNh4sSJCILgV+9D6fRnsOi1BsHBwTz99NOEh4ejVqtpaWmhra0Nu91OXFwc3/72t9HpdL0a0XyNi31B8sCTjvW0Wi1r1qxh9+7dfP755+Tn5zNt2rR+3UGhqyuodL/b7e6yNRnOSSaK4pA7YrRh0PtNlQqz2Szvs0fDubkvfOvicrm4fPkyx48fp6SkhLNnz3Lu3Dk0Gg2JiYmsXr2aWbNmMWHCBKKjowkJCUGr1Q7KRRvcwFle+38r2WTQoFEAxDJt9XrWP3oPM8zgdDopKSnBYDCQmJjoN42qr3nX1zzqVRiEhIQwbdo0KioqeO+99zh79qwc05+ZmcnSpUv9EuMvSUXfVTwnJ4eFCxeyc+dOioqKmD59+pDKlf4eqUHZ/Qivt+O7f0RIfg3+NoQNFT21d0VFBcXFxRw5coTDhw9z7do1tFotkZGRrFu3jvHjx5OWlkZERARRUVEEBwf3KRT71joVQCyzv/I4C9PNmDUginoiUzJI1ouAQHt7O9u2bSMhIYGoqKjrDOtDxVAXo16FgTRBz5w5Q0tLC7m5uSQlJQHILsWSQ0t3DMUJxdeeEBwczJo1azh79iyHDx9m1qxZ5Obm9rnd6H72LaGvYB1/Q9qH3sqQBmKghJ/0Xo/Hg8ViobS0lEuXLnH+/HlKSkpoa2tDo9GQlJREQUEBCQkJREdHk56eTmhoqOwdOxCDXt/jXAGEMWH+ndw5I5bYL9w/fIWHy+WisrISg8EwIkeL/X1TvxsVQRDkDEc6nU72lPP9vbfnBgJpNe1+yjB58mRuv/12Pv30U7Zv3056evp1DjUDeVcgV+R/dG2gJwTym91uN/X19ZSWllJWVsbFixe5dOkSzc3NOBwOIiIiyM7OJicnh0mTJpGcnHydIxgMPsq1Z3iBKvb9+TdYdhsxfjFljOPyyJtdwNyU4H6e9y/68gGR0K8wCA4Opq6ujtraWrlRExISKCgouGHvMKlikjFGko6iKKLX61m2bBlFRUUcP36ciooKMjIyRp0TyhgCj4aGBiorKyktLeX06dOcP3+epqYm2VszPT2dnJwcpk6dSkpKCkajUdbghmU8KXRowrO588HFXPXUUVdWR90XP5m1iaR0dG6lNBoN6enpREVFjQqNsl9h0NDQgNFoZPz48WRnZ2Oz2eQoLH9JNUlqde+YCRMmMG3aNHbu3MmRI0dITU0ddKPdDA47YxgYRLEz/Ntut9PS0kJDQwOtra2cPn2a06dPy8FAJpOJnJwc5s+fz6RJk+Sw+e7Et8MGlQH9uLv5zit393mb0Whk2bJlXYLkhgsDsZ0NSDMwGAyEhYURFRWF3W6X1fWhNGhvRrXuhidpEs+fP5+rV6+yZ88eCgoKSE5OHtR73W73oFiIB4pbyTgYSLhcLux2O1arlebmZpqbm2loaOD8+fOyxtje3k5sbCyzZ8/m9ttvZ8qUKQQHB19X1o2M1+HoY6VSSVhYGCqValScQPUqDCQJnJWVRV1dHRUVFVy7dg2XyyWHF0seVL0Z73oKOOnt/Lq3FX/ChAnk5OTwl7/8hbfffpvvfOc7g/pAu90uG4X8Cck9W6FQjAoV72ZF98kmHU263W7a29spKyujuLiYo0ePcuLECerq6tDr9WRnZzN58mS++c1vkpycTFxc3HWOO/5Y/YdT0FssFrZs2UJYWBjz58/v1SY2UuhVGNTW1vLCCy+wbNkyVq9e3SVOoLS0lJ///OfExMTw2GOPySpO94br6f+S62d3AdKT/UEUO9mAJk2aRGRkJB9++CFPPvkkQUFBA+5oKeTY3/A1fI6hE/1FP/r+Jhmm29vbUSqV8vjyeDxUVFRw8OBB3nrrLQoLC2lqamLChAncfffdzJ8/n/T0dFJSUrqovv6wX400bDYbhYWFxMXFMWvWrNErDGJjY1mxYgWbNm3ipZdewu12y048Wq2W6dOnc99993URBFeuXOH1119nz5495Ofn8+ijj6LVavnRj37EqVOn+MEPfsDSpUtlgpLukFZY344VBIGMjAwWLVrEr3/9a371q1/x3HPPDdipontZ/d3fH6T7e9IGeiqrP2epwfw21LL88e7BlNWTE5ggCF3cwktLS3nxxRf56KOPSE5OZunSpdjtdjZt2kRLSwtut5upU6fyzDPPMHnyZFJTU2UyEcng3D0C9WaDr4/NaECvwkChUFBQUEBmZqZ8Vmu1WgkPDycxMZGMjAyZG0AQBFpaWvj973+P0+nkq1/9Kk1NTWzatAmlUoler+c73/kOr7/+OiaTiYKCAtkI6XK5sNlsuN1uLBaL7M4r+bg7HA40Gg2zZs3i2LFj/PWvf2XdunWkpqbS2tqKIAhYrVa0Wi1msxm3201zc7OcyFUQBDlWXGJV8ng8csCVRqOhubmZ9vZ2ebCGhYURFBREa2srDQ0N8kAzGo3ExcXhdDqprKzEarXK16OiolCr1dTW1lJbWyu7rCYlJaFWq6mqqqKxsVHeJiUmJhIbG8vly5eprq7GZrMhCAIpKSmMGzcOi8XChQsXaGtrk98xefJk3G43xcXFVFVV4XQ6CQ0NJSsri5iYGI4ePSpTgul0OnJzc2WKr1OnTtHW1oZWq2XKlCmkpqZy+fJlzpw5I3MjxsbGkpubi16v58CBA1RVVQGdR8pz584lMTGRkydPUlhYiNPplK9PnDiR06dPs2fPHjo6OrDb7eTn57NgwQKuXbvGxx9/jMViwe12ExkZyX333ceOHTvYtWsXly9fprKykqtXr5KcnExeXh7Tpk1j/PjxJCQkEB4ejsFgkIPcJNyMk7871Go1ycnJMnFOoNGnAVEi1IyPjycnJ0fWCoKDg69TaZRKJZMnTyY8PJzIyEgOHTrE6dOnaWlpYeXKlSxZsoR3332X4uJiJk2aRExMDOfOnWPbtm0cOHCA4uJifvzjH6NUKgkJCWHlypXk5uZy+PBhduzYQX19PcXFxVRUVPD3v/+d1atX87vf/Y6Ojg7a2tooKChg1apV1NTU8Je//IXm5mZ5O/Hd736XkJAQtm7dytGjR+no6CAhIYGVK1eSmprKgQMH2LFjhyy47rrrLiZMmMDRo0fZunUrNptNpg5bv349VquVTz/9lCtXrgCddo3FixdjNps5ceIEu3btkunM1q5dS2hoKIWFhRw9ehT1F77qt912G7GxsfJkaW1tRalUsnTpUuLj42lqamLPnj1UVlbS3NzM1KlTSU9Px+v1cvbsWfk7kpKSiI6OJiIigtLSUoqKijCZTJjNZlJSUmTnm/LyclpbW9HpdKSkpCCKnUxK1dXVNDU1YTQaCQsLk20hHR0dNDY2olarcblcsrep2+3GZrPhcDhkTRHA4XDI1HO+K7dEEScJWomnory8nPr6epkeLC8vjwcffJDk5GSio6MxGo09Br79I8FoNHLnnXcCBHyLAAPkM+jOuCPBN4Zdr9ezaNEiLl68yNatW2lrayMrK4u///3vjB8/ntDQUMLCwmhvb8dutyMIAkajkbS0NOrr6zl16hS5ubnodDp0Oh0REREyV2BOTg52u50pU6YQHR3Nn//8ZyZPnkx+fr4cAp2ZmUlQUBDh4eHMmTMHm82GRqPB4/HIPICS45JkBI2IiECtVpOamorL5UKpVKLRaIiPj0ev15OSksKiRYtwOp2o1WpiY2NlYtS8vDzGjevMCR0ZGYnJZEKr1ZKeni5PhqCgIEwmEzqdjokTJ8o8iRI3nyAIjBs3TlaRFQoFqampqNVqwsLCKCgowGKx0NHRQVxcnGwhz8/PJz4+XmYClsgz8vLyiImJkdswPj4erVZLXFwc8+fPl5mA4+LiUCgUxMfHs2DBAvmEyGw2y4FGeXl5spFYpVIRFRUlay4GgwG3241arSY6OhpRFElOTuaOO+6QtwRhYWEyT+SSJUtkYaBWq9m8eTP79u1Dp9ORlJREdnY2Dz74IEuWLJEZo28FqFQqYmJiZKEZaPTLgSgIAg0NDVRVVdHR0YEodpKf5uTkdFHbBEGgqKiI7du309jYyIwZMwgPD+cnP/kJ3/ve95g/fz5f/epXmTdvHmvXriU+Pl4Oey0sLOS5557j/fffJyQkBEEQ5NBQybIMnavPnj17+Na3vsWaNWt49tlniYiIkBuzJ3ou34Cp7ufLvl6P3bn8ut8/FBfr0Yze7Cj92Ve6/zbQI1aJHHfLli288847xMTEyFuS+Ph4Fi1aRGhoaEAEQaC4Izo6Ojh27BiCIDB9+nQ51H8k0NO39qkZCEIn8efu3bu5cuWK7PQRFRXFpEmTupwMWK1WNm3aRGFhIfn5+ZhMJpmMVBIQHR0dpKSkyJZjafWUWH81Gg16vb6L0U9aSQHZcLl48WI2b97MunXrCA8Pl1cT6ZnuQqqn37pP9O7hqN0Hua8xTPq7t1OQ7vf2d/1GnrnRydPb832VO5hnBKGTBbu0tJR33nmHDz74gPz8fP75n/+Z/Px81Gq1fGoUSI0gEM5pNpuNgwcPolKpyM3N7cL7ASMvnPo9Fzt16pRsGEpKSiI+Pp6YmJjrjtQ6Ojrwer0YDAZqa2vZsWMH7e3trFu3jurqaj744APmzZvH1KlTu5CPSr4HEs25dM0XvpPTbDbzwAMPoNFo+Oyzz6ipqbkuyMPXo7Gvsvq737duvr/1VX5v7+jr+o08M5ohCJ2RecePH+e1117jnXfeYebMmTzzzDPMnj0brVmh2PQAACAASURBVFZLTU0NVVVVo/5bhgMSsY/E5C2hrz4fTvRrM2hrayMsLIz8/HymTp2K0+nskb7MbDbz5JNP0tjYKGe7iYyMJDQ0lIkTJ9Lc3ExKSgparbbLc16vF5fLhcvlkhuhLxVVp9Mxf/58HnjgAd59912ysrIICwvrQrLqT/TkxjlatgrDvYLcSPmi2JnX4ujRo7z22mucOnWKBx98kCeeeAKj0Ygodua0+OSTT2hubuaZZ56RtYSRRqD6U6FQyAZV3zoEynelT2Hg8XjIzs7mzJkzbN++nUOHDmGz2YiPj+epp56SO8/r9aJUKomKiiIqKqpLGaIoEh0dLafz6q6eSwYqpVLZayy8KHaShoiiKOcC+Pa3v83WrVt59913SUhIYObMmdcJqBtFX/7co0kgDGddJC/LwfodNDU1sW3bNt566y3UajWvvvoq06ZNk8uU+qm1tZX6+vpbUjMIDg5mwYIFw0J7NhT0yYF47do1dDodd911l5zfzm63YzQau6jmHo9HPtfvzRmn+9/SIHM6ndTV1dHe3n6dROzJqCc9r9Fo2LBhA7/4xS/Yt28f6enpXXIiBBIjtf/sbsiThLI/yx+MIJDua25u5uWXX+a1114jPz+fn/3sZ4wbN66L05FCoZADjqSMWv7EYPsgEMJdp9ORn5/f5VogbBcS+tQMXnrpJSIjIykpKeHSpUtyRVNSUigoKJANHtKA6U+98f1IibBRpVLJjDLdmZOkASKdFHTHmjVrOHfuHLt27SI5OZn77rtvYF/dByRPy8FMgkAZfEbinYMVBAcOHOBXv/oVRUVF3H333Tz55JPXJYmREBISwpIlS7BYLAHNMdgdI9WfDoeDixcv4nQ6ycnJkdtgoCc0/kafwuCb3/wmGo0Gm82G3W4HOiun1WplRxLpmvRHUgF7mky9faRkPOy+Ovi6J3eHdMS5fPlyTpw4wblz52hra5PzCQ4Vg92vjZbjx4EI4+F8N8Abb7zBG2+8QXt7O48uy0KvuMRXvvKVL06DVIjiBO78j2f4RsF4Yg0aOSOzxJno7y3ejaC3Y1R/9q3VamXnzp3U1dUxfvx4NBpNQLefvQoDURRlp5qeIGW1lT5A+oi+sg1J5Xb/YCngZyiGutzcXCZNmkRlZSUnT56koKBAfs9Q9ruDnVCjxXYAgauL0+nk7bff5uWXXyY0NJSvfe1rLEtzs/WDz7EoEvn6c3eR4bJRf2ozL/38JSKN32Ht9CRidIK8/ZT8SwJlO/AdlyMl1CVPTylZbaDR78i32+10dHTgcrkAZF45i8XSY5CFb+bh7vDVILpfk3wYBgNR7GSyWbVqFWq1Wk7J7Vv2SKAvQ+M/MtxuN1evXuWnP/0pL774IlOmTOGJJ55g1apVX+SoNGKOzmHeypWsXr2Krz6yhtm2nRwqukJ1sxOPx8OBAwfYunWrTK03WtDb+L0RiKKI1WrFYrEAnQuPTqcbNVukPrcJ5eXlfPbZZ9TX1xMbG4vJZKKiooKWlhYeeuihLslRJQzGbuD7zFB5AURRJD8/n927d3P69GmOHz/O/PnzB13OGAYHl8vFxYsX+e1vf8uhQ4fIy8vjkUceITs7G51Oh9jaTctTqglJmsKMmBZeuVRGY+sUxEgjlZWVlJeX43K5AuqfP1LCXDK2Q6cBMS8vj4SEhNEdmyAInSrcoUOHKC0tZcKECcTGxsrkEv46ClEoFHIatqGqiEFBQWRmZnL06FE++eQT8vPze2S6GYN/4HQ6uXjxIm+99RYHDhxg1apVPPDAAyQnJw/IV8DpduP1fpnkpid70UhgpC33gtCZWVv6Vr1ez4wZM7Db7aP7aBEgPj6eFStWUFxcjFarxWQyyR6I3VOYDxWSnwF0Jm8dSge53W6ysrJITk6mqKiIw4cPc9ttt/mlfmPoivr6es6ePcuuXbs4duwYjz/+OP/0T//Uv/AVvWCro7bFyKSCJMJCOnMExMXFAf+YJzE9wTd3qMfjobm5GZvNhtFo9GtWpaGgTwNiZGQkM2fOpLKykgsXLsiOQdHR0eTn5/slsEJaRYbKAyf5vsfExLBw4UIqKyv5/e9/z9SpUzGbzbekM4u/IbVxTU0Nn3zyCR999BFqtZoNGzawdu1aoDfXaDvWtkpKiooI8jqg+lOOts9i4eTxxIZpUSoFVq5cidvtJjg4+JbrK6vVyo4dOygrK+Nf/uVfeiX9GSn0K4qKioo4c+YMCxcuZNWqVfLK3Zc66Ha78Xq9cgixFO0oqUm+EtDXP7u3FFZ9QRRFdDoder2e2267jZqaGl566SU2bdrEQw89dEsa9vwNp9PJ+fPnefHFF9m7dy8LFizgmWeekZPi9jgOlFr0xjYaSz7lubvfANRALmtefIF7ZsQT/4VWfCtTx3m9Xtra2mhpaRkVpwn9CoOIiAiam5s5duwYYWFhOJ1O9Ho906dPv06aC4KA3W7n+PHjNDQ0sHDhQmpra/nNb35DS0sLRqORhx56iMmTJ8sWVIn8QqlU0tzcTFJS0qAnsGTNDw0NZd68eRw6dIhf/epXLF++XM7+NIbBQ2q3/fv386Mf/YhLly7xzW9+k29961uEhYUBfQRLpSxh/fOLuf/56wrFtzc+++wzysvL+drXviaHo99KkMhnbgphEBYWRlZWFsXFxfzlL3/BbrcTFRVFRkZGl32iIAhUV1fzyiuvsGXLFhYvXsyMGTM4cOAApaWlbNiwAZ1OR2xs7HUrgURzJllUh3LeLN0/YcIE1q9fzyeffMJrr73Gk08+KVOsjWHgkATBq6++yv/+7/8SExPDb37zG5YsWTJwx65uE7+n8quqqrh69eqQJkMgPT/9Aa1WS25uLuHh4aP7NAE6Gzs+Pp7Vq1ezZ88erFYriYmJmM3mHqW4VqslKyuLK1euoFKpcDgclJWVYbFYuHr1KhMmTJDTrwNUVlZy9OhR9u7dS2lpKZs2bUKv15OVlcWsWbO6MDJL9YG+O19iLlq6dCmvvvoqS5cuJTs7Wzbc3OwDqD/4w0Lu9Xqpq6vjV7/6FX/729+YM2cODz74INOnT/eL4di3D6So1aEIA+mIrje/lhutY3fvQ+mav96l0+mYPn06U6ZMGRWnCX1u1gRBoLm5md27d1NYWEhpaSmFhYV8/vnnNDc3X9dYISEh5Ofnk5OTI6/uRqNRTje9ceNGCgsLZccgqYE1Gg3BwcFYrVbcbrccoThUxMTEsG7dOlpbW3nttddoamrqUs8xLaF3SBre888/z3vvvcfy5ct54oknmDlzZo95CYcKqR8SEhLIyMgYkuNNb56r/oSvq/xwjBuHw9GFKDeQ6HebUFZWRkVFBWFhYZjNZpqamvB4PJw/f14OS5agVqtlJtuWlha0Wi0zZ84kLy+PqKgoWaikpaVhNBoJDw9n+vTpCILA9u3byc/PJyMjA7PZfN1RVW9cBz1dCwoKYvr06axYsYItW7awatUqQkJCrmNRGs0Y6gp/IxPD6XRy5swZ3njjDY4cOcKGDRtk0tjuPBS9YaD1lu6bPn06kyZNGhIfxXAaHn1dkqV6+Vvw2O12jh07xunTp3n00UcJCQnxW9lDQb/CQOIibG1txWKx0NzcTHJy8nUqvAS3243T2elq6nK5qKmpkdVAh8OBXq+XVfbg4GCCg4OpqalBqVSSmJhIVlZWr6neof/BLg2yqKgovv71r7N37142b95MSkoK48eP7+9zRwV8WZSGMuCHIkiampo4ePAg7733HmfOnOGhhx5i/fr1hIaGDjqIqL/3+5ZlMpkwGAwBPWPvq76+AWD+1kBcLhfV1dWcO3cOl8sV8IWq3x4YN24cWVlZVFVVyZNWr9fLx0rdodVqSUpKwmw2o1arsdvtnDhxgtDQUNLT05k3bx5RUVHX7d19YxN6apDe9mq97es0Gg35+fmsXr2arVu3MnfuXCIjI2VVN5Bx4wPBUAfFYJ/zer1UVlby2WefsWXLFurq6li5ciUbNmyQJ+hgy+yvXX1/lzImz5s3b1T5GviOz+5jTLo+UDtCb2PNNwJ4NIzFfg2I0uQeP348RqMRo9FIampqj3scURTlJCkul4vIyEiWL19OfHw8bW1tTJw4kYSEhOv2h6IoyoFQNwrfRlWr1TzyyCMcP36crVu3kpyczLRp04ZtFfKXgJFWo6FMjMHUwWKxcOrUKbZv386JEycICQlhw4YNLFu2DI1GI9PH+3ug+qrgp0+f5tKlS0yePDlgLuQ9bT17a8fuwkCKjO2pnJ6e8YVarSYpKYn8/PyAE8LCANiRa2pq+Otf/yrHXLvdbmpra2ltbSUoKOi6Z6T8AvClUXHBggXy7z198I2oxN3r2x0ZGRk88sgj/M///A+ff/4548eP76KZjFYM1Wo9kOcEQaC1tZXPPvuM3/72t1y7do2HH36YRx99tIv/wEio7lJdBxuxOtzwbcfetARBEPrk3OgPer2e2bNnM2vWrBuKzfEX+u1tq9WKTqdj+fLlrF69GviSyLG3yg/GYi+Kopw0ZLgG3/Lly9m6dSsXL17k8uXL1/E0+gujQdUbSB3a29v5+9//zgsvvEB4eDg/+9nPuOOOO/xC1T3YZ6RkNqPJC7EvXo3e/t0X+uL2cDgcWK1WzGZzwNug37dL3HWvvPIKDz74IF//+td57rnnKCsr67MxhuJW7HQ6B/XMQMs1GAzcfffdlJeXc/z4cb+/42aBIHRSl//mN7/hiSeeIC8vjxdffJG77rrrutwTkgo83Jg/fz5f+cpXRg1/5UjC4XBw7Ngx/vCHP8gcB4FEv0txVVUVarWau+66i/z8fOx2O8HBwURGRvZb+EAFglarJTY29jr+eH9ixYoV7Nmzh7KyMkpLSxk3blzA1bKRhCAIlJeX88ILL7Bx40Yef/xxHnvsMZKTk3vlkRhuTUcURTmYzN+0ZzcDPB4PLS0tXLlyRebeDGQb9KsZeDweWltbgc6cguPGjZP52vwFl8tFc3PzsBir4MtgpoULF1JTU8PHH38MjA61fiTg8Xg4deoU//Vf/8X27dt5/vnneeKJJxg3blyvW7ORYm+6cuUKRUVFtLW13TL94QtR7MwvcVM4HZnNZsxmM6dPn6apqQmFQkFUVBT/9E//RHx8vF8qIRFcDLd/9oIFC/j88885ePAgS5cuJSMjY1jfNxpgs9nYv38/r776KiUlJfz7v/8769atGxUBXIIgcPHiRUpLS2UmrVsJSqUSs9lMampqn741I4V+jxbDwsJYu3YtRUVFOBwOjEYjJpNJzorjD6jVakJDQ4dVOkr8DOnp6Vy4cIGtW7eSkpISsCw+ww1BEGhra2PTpk386U9/wm63s379eu67775RtT+XCEFH22nCSECtVpOZmYnRaPQbWdCNoF/NQBAEXC4XTU1N2Gw2ORGGPy2fSqVyxLzQ5syZw/nz59m9ezfTpk1jzpw5w/7OkYbkLv7ZZ5+xfft2lEol999/P2vXrh1VggCQ09b7MgDdKlAqlZhMpl6TD400+g1UamhoYOfOnZSUlNDS0sL58+c5f/48ly5d8puaqVAounDDDRdEUSQ7O5slS5bgdrv561//6jdnp9ECu93O1q1b+cMf/sC2bdsYN24cTz/9NPfff/+wHaneCFJTU5k6dapfNc2bBW63m6qqKrZv347NZgt0dfrXDBwOBzabjejoaMLCwigvLycoKIiWlha/VUJiRrZarcM+IDQaDTNmzODChQt88MEHFBYWMmfOnJt+IIqiSGtrK7t27eLXv/41KpWKu+++m5UrV5KWljZqvy89Pd3vaeFuFrhcLsrKyvjoo49YuHDhsCUPHigG5GeQlZVFSUkJ7733HgcOHKCqquq6HHG+cLlc2O12+dzabrdTV1cnp23v6f7W1tYRcbqQOBoWLVpEdHQ0v/jFL/wq2EYSkuHV5XJRX1/Phx9+yA9+8AMAnnrqKR577LFRLQgAWlpaqK2tHXV5E0YKvlnJAo1+DYiiKLJo0SLi4uKoqqoCICUlhaCgoOsGmSiK2Gw2rly5QkdHBzk5OQCcOHGCAwcOMGXKFPLy8ggNDe3RrbO3LMz+hrRdWL9+PU8++SSbN29m5cqVmEymETtS6ylQq7egq+7XoFPFbG1tpaWlhY6ODvbv388Pf/hDFi5cyAsvvEBGRsZNcXZfWFjIlStXuPvuu0lOTh719fUnJC5Ro9E4+oWB5MP+8ssvYzKZWLNmDWfPnuWVV14hIyOD6OjoLoPaarXy/vvvs3HjRtLT0/ne975HVVUVv/3tbxk3bhw/+clP+Pa3v82iRYvkuAbJGOmbZ663KDFf9BWQM5BgHYPBwPjx41Gr1fzwhz+kra2N9evXDyujskSQIQgCDocDpVKJRqPB6/XidrvlbFRS4JbNZkOtVssnHu3t7TidTlwuF8XFxXz00Ufs378fu91OQ0MDd955J7/85S+JjIwcFYNrIGhoaKCmpuamqa8/oVarycjI4OGHH5Yzmw+HgX6gGJAHotfrJTU1leTkZBwOB3l5eRw6dIhVq1Z1uVdiRdZqtRgMBpqbm/nwww+Ji4vjqaeewmq1cvz4cdLS0pgwYQJutxu73U5zczMWi4Wamhrq6uqw2+0oFArCwsIwGAw4HA4sFgsulwu3243JZCI0NBSn00ltbS1OpxO3241OpyMqKkr2tmtoaECv16NQKEhMTCQkJISamhqsVit2u53NmzdTU1MDwPe//30OHjyISqWivr5e9oqzWq24XC5UKhV2ux2lUolCoZAntsvlkmPRJUgd6RvsI9VRgsvlQqFQoNVqu7BJS45Xbrebjo6OLsLAZrPhdrtxu904HA457Z1GoyE3N5eXXnpJzll4syA8PJzIyMhb8mhRqVQSGRkpx+X0FS05EuhXGISHh+NwONi1axeNjY1cvXqVsrIyFi9e3OU+UeykOFu2bBmiKNLQ0IDT6aStrY3s7GxMJhOZmZkUFxfLHo1VVVV88sknfPDBB5w6dYqysjI2btyI0+nE6/Wyfv16li5dyunTp3nnnXeor69HpVKxbNkyHnroIa5du8avf/1rSkpK0Gq1zJkzh3Xr1qFQKHjttdc4cuSInPxlw4YNTJo0iU2bNrFz507UajVnz56VtyZtbW0cP36chIQE2ZjlG5Cl0Whwu91yWLc0YX19+UVRlIWFFP4rseN0Z8vxjdKUJrtarZavabVaNBqNTDMvJSfVaDRotVoKCwvZv3+/LAzMZrNMOHMzqdpJSUno9fqAs/wEAh6Ph9raWs6fP8/s2bO78INKuJGgscFiQE5H69at48iRI1RWVqLValm4cCEpKSnX3a9UKgkJCcFoNNLY2Civ/BaLRR7QDodDNpqEhYWxcOFCgoODcbvdLFy4kOzsbJl3Lisri5CQENLS0rj33nux2+1oNBrGjRuHWq0mPDyc1atX09zcjEajIT4+nrCwMBQKBffeey/z5s1DEAR0Oh0TJkwgJCSE2267jaysLBQKBUeOHOHHP/6xnN7qm9/8ZpfkML4Wbt/9tzShfY0/fdkA+op68xUKvvYKSZBIfJAej0fWHBQKBbNnzyYyMpK9e/cSHh7OunXr5PfeLBDFzkzf8fHxo4rYZKTgdDq5dOkS77//PtnZ2ddRAoy0pjAg2rOoqCiCgoJoa2vDbrfjdrspKysjOzv7uvtdLhcWi4X29na0Wi2JiYkUFRVRW1vLyZMniY+Pl70NpRyJoijy2WefkZuby2233SZPPI1Gg0qlIjExUeZblNKxKRQKjEYjs2bNkgkmfDNAT506tctkla5PmDCBzMxMoDN9XGlpKR9//DHf+MY3WLNmDXFxcb2SVQxWSvt2pO9+sL/Y9Z6IM7r/bjabiY2NZcWKFQQHB4/48ai/ViyPxyNvkwINqX9GavJJW7+GhoZejecjWZ9ehYHH40GpVNLW1sbevXs5evQojY2NNDU10dDQ0GvIpSAImEwmIiIiCA0NpaCggJKSEt5++23UajVz587tkl9PMpZI6d11Ot11LsLSvrkn9JbiTSk64cp2/vv9k9icX7IthyZkMmX2HGbkpBAdHc3ixYs5f/4869evvy6nQ198DQNBX0QufT5nr+FaySF27T5Kcb0aQYgnd9GdLJ4WjSm4U5CEhobKBLJ2u52YmJgRFwZer/eGvEYFQaCkpITq6mry8/OJi4sLqHbgz0k3EGEp0fP1dpow0raDfoVBU1MThw8fpqmpCYPBQEtLCwaDQd73+0KKDszNzSUlJQWz2YzJZGL16tVcunSJe+65h1mzZl2Xyl0URXl1GAwxSp9wWXEXf8R//+wIE++czPiwYHS2Si4dK+RarR19zMNk65QEBwcTGhoqGxr9uTp03xIMyELsqOVq4Sd8um0bRS1aFO4gsFxm4/lyxKcfZ9HkGMK+oNh3Op2UlJRw4cIFHnzwQbmIkVAt/dVGFRUVXLhwYVQEjY345FOpiI2NZd68eaMib0KvwkAauBqNRua2l6jGJQt/T9BoNKSlpXVp2BUrVnS5p/tk93q9dHR0DOkD+pbACmAWX/v+D1mbHUdE3Xbe+Y9fsOVIESfueogpEzs7Iz8/v9dYcn9OrIGU46w9yd6tn7LpVCgP/Pw/WZ8ehLd2O//5nbepbLLR7kQWBjabjTNnzrBt27YuwmAk4Ev5dSOQtk+BZvkJBNRqNSkpKcTExIwKA2qvwkCtVtPS0oLH42HatGnYbDZsNhuRkZE4nU7mz5/fZ8HdJ1Z/xA1DcTrq38AiAo2UnjlBUUclpuZiTrQItIWYMQd1bklycnJIT08nKChIrmMgj+Zaykq43CDinbScBRPCAVDEreT7f1rRY70kYyswKuo/WISGhhIbGzsqVkZ/YiB9IC2CDQ0NBAcHB1wg9rnh27dvH/v27cPtdstGO7VaTXR0NA0NDZjN5gG/qC9BoNVqiY6Oxm63D7zmDERVFYHdvPL0Qf6sVqLAhc00gzsfmEX+OC+iqJBdpyWtpy/+u5GApa2BlpZa6Na0PdVDpVIRHh5OUlIScHOdJEiYP38+Ho9nVMTzjzTsdjuFhYVs3LiRn/zkJ8TGxgZUkPcpinwlVWRkJMnJyYSHh/uV5Qi+tBm4XC4/DwgFsJafbi/kRHk55eXb+P3/02M7t5HXdnT6QRQXF/Piiy/S2Ng4KgajOTyeyKgkEL18WR0Rr8eDVxSRLoliJ/P04sWLeeqppwJU2xuD5JchJeq51SC5I1ssFpxOZ8DHX689IIoiixcv5vvf/z6PPPIIFouF999/n4MHD8oeiX6vzDDnzesOj8dDc3MzR44cwWq1jorjrdDxmWSG2VEeepX3j10DtxXvlVd4MHcCT71+juLGL+8VBIGQkBASEhICV+EbgCAIss2joqLiptre+AOS743dbh8VY6/PbYJWq8Vms/GXv/wFj8fDv/7rv1JdXc3Ro0fZt29fl3wINwLJrdf/yS29wMf8dN1+/k+vRoWNVnUkOaseYElBOB6Pjba2NjlOYDQMRkVYHnc88CjGyD/z1o+WkletB1c0WUt+ygPzEhnnwwxmt9spKSnhypUrMo39zYaqqirOnz9/0wq0G4Hkjjxt2jSCg4MDPv76PSRua2ujrq6OnJwcCgoKKC0txWKxyBGM/mB0ldQlv0YtakJQz/wX3n53DS6Pj9TVmYgal0J6iAplh5LQ0FASEhJGj5qqDMaUPIu598YQPbmSWosAhBKXPpHMJAO6L3pMCnY6e/Ys27ZtY/Xq1QiCIMd1SH4box1SCPZIRayOJki0Z+Hh4YSFhQW8vwbkgahWq9m7dy8tLS3Y7XbOnTuHRqOhtbWVNWvWEB4efkOTSTJM+jVYRalBEZ3Dkttzer3Fo9UyceJENmzYgNlsDnhnyFAZCYnNIS+297pLsNls1NbWyv8P9L5zsDCZTISHh8sGRMlYfStAYviKiIgYFeQu/c5gk8nE3LlzSUtLk8krjUYj06ZNk/nbbhSCIKBSqUZ8dVAoFAQFBREfH3/TrKS+UKlUhIaGdvHcU6vVo2bL0x9EUSQ1NZXZs2fL4fA3mzC7Ebjdbq5evcqf/vQn6uvrA2436FcYqFQqDAYD2dnZZGZmotfrSU5O5rbbbuPee+/1S1ooKRBnpBvD7XZTXl7OW2+9RUNDQ7/vH02DVYpyzMrKYsWKFXK9pECmmwUhISEyTbq/HJl6g+RCPVr6UOJA3LJlC21tbQGvV7+jRuLVKyoq4sqVK5SUlGCxWDh06NCg8hxIE6mnD/Z4PDIlmj8bpL+yXC4XVVVVvPfeezQ2NvapmfRV/0BA4kpIS0tj2bJlvbIa9VXn4fqWgbaTxDtx4sQJGhsbh53UY7j7cChlS8Q+o0Gb61fHl+LpW1tbUSqVpKenk5aWRl1d3YBe4HQ6KS0tpaOjA0EQCA8PJyIioosgkQaBP7cJAwn/lLYnvuHI/SHQHeYLj8fDtWvXqK6uZtasWT3eI7WD7yQbTd9QVVXFmTNnMBqNxMTEDOu7emPSChQhqyAI6PX6G7a5+Qt91sDr9ZKQkMDMmTOpqKjg6tWrBAcHc/LkSZYtW9Zv4V6vl8rKSn74wx/y7LPP8oMf/ICtW7fS1NTU5T6VSoXJZBpyg/QkjQeyykjCQKfTdSEq6e3ekfaD6AsKhQKn08m+fft4/vnn8Xg8vUa++TIvdf9tOCB5cg5kJdZoNDL123Cjex9KR9pWq9XvgWkDgVqtJi0tjccee4zIyMiAC4ReNQNBEOTIxDlz5hAWFobFYkGr1SKK4oCizOx2O+Xl5djtdr797W8TExNDQkLCdUEZkieav6mf+gsj1Wg0pKen853vfIfk5OSbzootee91/z7fyEvfgQ8jqxX4cjL09l6JACcQtGdS+/THL9EXpLEq2b2AAY8jhUKB2Wxm+vTp/R7Rj0TMyXW19o1T37hxIx0dHdTX13PmzBmqqqpQKBSkpqYSEhLCwoUL+32B3W7n6NGjfP/73yckkouINQAAIABJREFUJITHH3+c2267DbPZTHV1tUzftWfPHkwmE2VlZWi1WtauXUtWVlYXHgOpwftq7ME0mkKhIDIykmXLlqFWq0fNqj8YSIFKvgOpJzU4EIJhIAbBjIwMwsLCiI2NHda69Ia+uDIGi8Gu7F6vl8bGRs6ePcu0adMGnGJtuPrvulnl24GrV6/G5XJRWVlJRkYGjY2NxMbGMn369AGRaWi1WrKzs3n++eeZMWMGH3zwAR988AEmk0kWJFIIqzSgpVTvPe3jexpcvqpo987or7EkW8jJkyfJyckhNDQ04KraYKBWq0lISGDq1Kk4nU55UPtOeqkNu5O2jITgG0j7x8TEEBkZedMHKg2F38HtdlNdXc2bb75JQkICKSkpvQpP37IlLcrfJ0d96jMhISH89a9/Zc+ePUDn4Dt16hTXrl3jmWeeAfq2SNvtdqqqqmRK6OTkZE6cOCGnkgoPD2fu3LnExsbK24977rkHtVpNWFhYjxK7v6jCwXSIdLTz8ssv893vfheDweD3IKzhgrS1ys7OJiYmRm4/X/RmNxlJKq3+YLN1uoTrdDoiIiJuOoHgj3aUEg4NFL3R8t0o+hQGJ06coKioiJSUFHJzcwkODpZ94fft28e8efP6LFyhUKBQKLhw4QK//OUvqa2tZcaMGaSlpcmchVFRUbhcLsLCwnC5XCQkJPRKZdYbhtoootiZ7ammpuamG4TQWf+Ojg5qa2tJTk7ucd85Gui0eoKknVRUVFBSUkJycvKoSwo73BAEAa1WK9vQBjoGAyIMSkpKMBgMLF26lGnTpqFSqZg0aRJ79+7l2LFj/QoDrVZLSkoKBQUFNDQ0kJaWRnZ2tjxw4csGEEVxxMM4pc64mZKOSBAEAY/HQ0lJCX/729+YOnXqTWcABWhqaqKiooLw8PBAV2XEoVQqiY6O5t577x3U8eJwjdU+R4+kwl24cEH2kHK73TQ3N2O1WvstXDLQ3XnnnV2ud5/wUjKRgZTpT0hRY8uXL/eLJ2Ug0NzczLlz5266QB9pq6JSqW5ZPgPpNGHRokWj3+koKiqKgwcPcuDAgS57Uo/HQ0FBwYBeMFBPtEA4fSgUCqKjo7n//vtvylUVOo+xurNJ30yIiYnB6XTekpqBKIpYrVbOnTtHZmYmRqMxoEKxzxkwe/ZsgoODaWtrk/0AvF4ver2eyZMn+60SkqFrpAe0RC5RUVFBXFyczIN4M0Dac0tJZvx1PDaSEEWR5ORkEhISbpp29yekjEqvvfYa3/rWt+RkuYFCr8JAOvbpy0XUn5NXoikfSXg8Hq5cucKPfvQjvvvd75KTk3PTnCZAZ5vNnDmTnJwcdDrdTakdSLkjpQQ4txq8Xi/Nzc2jgvas3/RqI4FAawbXrl0bBv7FkYGU0vtmhCAIVFVVUVZWRkREBNnZ2TdlH9wIRPHLhLqB/vZRY7UJlDCQjhdvBmHQ3c9fFEVOnTrFL3/5S9ra2gasao+m72xsbOTy5cs0Njb2f3MvGE3RpIOBlCLw9ttvHxUG7FEhDHwDW0YSSqUSo9HIhAkTRtWedSBx91J9a2pq2L9//6DLHk3wer2Djk3wjQXo7o490OcDJUB8PWajoqK4//77R0VszKgxoQ8mjNhfUCgUJCQk8NxzzxEXFzeq7AU9+Z/35G3p9XpxOBx9riq+ZQ03Z8BgERwcTGRkJCaTqf+bfeA7mQdrawi0FuHbj5LNQEoyHEgMalQMtzQd6U6SJoZOpxsV57wSBhouLQgCoaGhpKWlDartRuI7BzJWRFEkPj6e6dOnk5qaOuhvkITAYN2re+I1CAS8Xi8NDQ1s3LiR6urqgERu+mJQwmC4G2+khYHX66Wuro7f/e53XLhwAafTOaLv7wsDCfIBSE1N5atf/SoajabH9vN4PAFxSBroWAkKCsJsNg86vVpvAmCgYyjQggC+dCc/d+4c7e3tNzz+b/T5QeuLw02IMZIQRRGLxcKOHTuoqKjA5XLdcHn+wkBX1rCwMCZPntxrPEd3YTDS7t79/d7U1MTFixeprKwcFRN0pNGdbGUgGK4+HPbNo2StP3/+PGfPnsVisVx3jyQIRvp4RRA6k68ajcZRZ1QbiHAUBIHa2lr27t3baxZrKVhstE602tpazpw5Q0VFhV/K6+07extXN7oI3cjzgiAQFBREeno6er1+SLYc38S7EtxuN1arddAa4bALA4fDwbFjx3jzzTd55ZVX2L9/Py0tLdfdJwmDoWCozMqCIMjh0kN1eHG73TgcDtxu95AGhdfrxWaz9dhxfZUn/Xbp0iVef/116urqerxfclfurcyOjg45q9RQ6t7x/7d3pcFNXWf7uVqtzZssWcaW9xUMpiRshuBCCCRAGRgmzNCWtpOmTSZN+4P2R6aZoZTONJMMnTZDUwj9QxZoKENDJ4StpiyxDcE2BmNkhC1v2MiSbUnWLl0t/eHvnO9aSJbkAIHEz4zG8tXZ7lne8573vIvbjXv37k37KOL1euFyuaa9CbjdbgwNDVGz+GQQDAZhsVjQ19c37bEbHByE0WicVv/xeDykpqZi0aJFSfnS4LZ1cHAQ3d3dk27khoeHcfbsWej1+qT69r7aH6SQkDTsz3/+M0KhEGw2G95//320tLRQ7zvk5biOGhIdGIZh4Pf7MTAwgNHR0WkNqEgkwrx581BSUpL0bQLDMBgeHoZer6fefZPNT5yrEBdzySIYDFI9iWTBMAx0Oh0aGxunFevQ7/dDp9PhwIEDsNls05o3LMuCZdlpjR3DMOju7saBAwfQ1dUVN23k/w6HA+fPn8eePXumVbfX68UHH3yAY8eOwWQyJf0OxLnOp59+mrAAkSx6snmeOnUKH3zwAVVPDwaDuHPnDnbv3o09e/agqakJFoslpo9MLh4qZ+D3+zE2NgYej4cdO3Zg9+7dyMnJgdVqvY+SE3fpyeLevXt47733cPbsWQDJyTTIzmAwGCAWi6fFpl25cgVHjx5Fd3f3pOfcQYv1CYfDuH37Ng4dOkQXY6IfAhJKjQjgki3jxo0bqK+vR29vb8z8sRAIBDA8PIyGhgb4fL64PvwiP8S9nkwmg1QqpdxdtLSx8rMsC71eD6vVSp8RHQ1uusgPkaWMj4+js7OTcpfkt8h05Bn5TlSoPR4PdXceCAQm/c7NS55xP9z4omKxmOpbTPXx+/2UgBIHNwzDgGVZKgB/5pln8Pe//x12ux07d+7E/v37YTAYJm3A0RDV7dmDAmGByYsrFAqoVCoIhcKoLs2496yJtiMUCsFkMsFqtSadlygduVwu2Gw2BIPBpA1+yGLkXnMlA4VCgfT09ITr5XJu3CtIs9mM3NxcuiiJ+2/yeyzZgVgshkQioX0fqQDEsiycTieAyXYEYrEYTqcTJpMJXq8X/f39NJI1dzGS8vx+P/h8Pv0/GAxCKpWipaUFt2/fpkc2oVAIi8WCcDhM3dhznaby+XwqW+LxeOjq6sLY2Bhu3LgBu91OIxqT4D/AROwPco72+/0IBAL0iNPR0YHBwUHs27cPfr8fAoGAOv4VCoVwuVzw+Xz0TO/xeCAQCGicjS+//BI8Hg+NjY1QKBR0gVqtVqhUKrAsS6OFkXM8UYMPhUKw2+3o6emBxWJBKBSifUCID5lXEokEJpOJ6pTw+Xz4fD709vbC6/WiqamJGhN6PB6kpKTA4XDAYDDgj3/8IxobG/GrX/3qPncCXDxULQdyh08mhs/ng8fjoQPJTRcOhynLlpmZiZSUFNqJxIiD+Mnzer30jGqz2aDT6ajrKI/HM6kTye6lUCggl8tpCGxSv8vlwrVr17B3715kZ2dPMgcmC4e0j7CzZFKKRCJ0dnZieHgYBoMBx48fp2lMJhNEIhHEYjEEAgFdAESngcgYBgcHcfv2bdy5cwdpaWk0HXcXI5Of7AZE2Yg41Ozu7sbQ0BCysrJoP5A+Jm0nk5DsUmRsBgcH4fF4cPr0aWRmZtJyyftzFZW440Cej42NQa/XY+fOndTLMJdgkfayLEuJAekDwpl5PB5cu3YNcrl80pGRfA+FQrRukUhE5xTJr9PpEA6HkZ2dTecUabPD4aB9IBaLwbIsHROn04n+/n5YLBY0NzfD4/HQMSc7Lul74jCXtI343xgfH4dKpYJUKoVAIKB9TmQAhIjweDzI5XLKRQiFQvh8PthsNty7dw8qlQpKpZLOWzJ+ZM4rFAqUlpZCKpVSoiWXy9HU1ITR0VFs27YN4+PjVCgpFArx+eefo7e3F7m5uVixYkVcS+OHSgyIcC4tLQ2HDx+G2+2G3++HWq2eFERFIpFg7ty5WLduHViWhclkohSSO5G5ikFkUpKFz3V3zRUGCoVCzJo1iy5eqVRKhT1kQPh8PlJTU5Gamgq5XE7jKPh8PgiFQqSmplI2j0wMMiFsNhscDgeysrJQXl5OF3lhYSF9B0LUGIahV4BkoDs6OmCxWPD0008jPz+fCiMJsROJRHC73ZDL5XC73RAIBBCLxbRPurq64Ha7sXbtWsyZMwcOh4P2B5fb4go4g8EgZDIZMjIycPbsWXR3d2Px4sVYtGgRfD7fJLaW1Mfj8eD1eumCACa4iCtXrmB0dBQvv/wysrOzJ3EehBDweDwEAgG645HyQqEQrl+/DoPBgLKyMsybN+++cSZ/uY5duUTniy++gNPpxIsvvojFixfTuskxLBAIUMJPiAIp3+Px4NKlSzhy5Ah+/etfT+JWI6/7uPIs0gdutxt/+ctfoFar8b3vfQ85OTmT8nGPWdzv5B2CwSCsVitGR0exefNmFBUV3SfsJe9B5jr5S8bW6/Xi7t27eP755+lmYbfb8cknn2B8fBzr1q3DmjVrsGzZMqjV6imPcg+dM8jOzsaPfvQjahmYn5+PioqKSYtXKBSipKQEP/3pT+H3++nOFWm8FNmxRAik1+tRXl6OdevW0UXHHURSDsnD3fn6+vrQ2tqK1atX0ysecozhcgDcHY8sMLLDBwIBVFZWYu3atZPay2XNuQuD/MYwDNLS0mCxWLB8+XJUVFRQroCUQ7gKciblLgYAaG1tRU9PD5YtW4YlS5aAZVlaNvfDdZdO2FGyw2q1WixYsABLliyhRIZwCKQ+sktyJzVhn10uF5599llkZmZGnQfk/SPHAQBUKhXKy8uRm5uLyspK+nuiEAqF8Hq9WL58OaqrqwEg6pyJhkAgAKlUCplMhnnz5t33e2RbIssNBALYtm0bpFIpampqkJGRkbQQVaPRYPv27aipqaHRmJMpo66uDuPj48jMzKTz0+l0QqFQ4Ac/+AHKy8tRXFyM9PT0uOUy4YgUD+OenwgSASA9PR0pKSn3DVIka54IGGbiNuHYsWPQaDRYuXJl0u232+04deoUVqxYAbVanZTLboaZkGYPDAxAo9Fg9uzZSddvMplgMBhQUVExydsPtz/IpIycnAzDwGg0or29HdXV1TQac7w+5KYxmUyw2WzIyMiAWq2Om4/UC0xwGGNjYzCbzaisrJzS41Ks8fV4PHC73RAKhVR2kcwccDgcGB4ehkajmZYpt9vths1mw6xZsxLOQ4gkMCGPING8uRwpN81UIIuXK7eJtxbIZskwDJU9SCQSSuitViuGh4eh1Wrp0SsSUZ89CmIQa+FHexbJZiVStsVigVAoTDgIRSQIBzAd4WkkO/mg8nPP/ZHn70iCwM0TbxJyy+WWkUj7I8cokXGNlZcLMonJOCRzqxNr5042fzJ5Y0WJ4paRKDHgtiGRdpDxi3XbMxU3E6tO+uxREIOHjYe1IJPJGy8/V6gWLdhLLAIZj0B91cXALSOZ/ESWw7Is5QiS3dWBidsKn89Hr0eTfQdi7KNQKJKyb3C73QgEAtRNOcuy6O3thUKhQFZWVtzbHe67E9be4/HA7/fT8PKxQLgBi8VCPYX39vbCaDRCqVQiLy8PMpksZl8EAgHY7XaIxWLIZDK43W7cvXsXJpMJFRUVUKvVSc0bAv6uXbt2TZnrCQAZiHih1yJB7pkHBgZgsVioRDhRjsRut8NoNNJrJsKqxQL3HE7Sud1ujI6OUkFjZB1T1e/xeHD37l10d3djdHQUfD4/6hFsKpjNZjoR/X4/JBJJQtqYLpcLer0et27dgtFoRFdXF1Qq1STBcDx4PB50dnaitbUVFosFcrkcUqk0obzh8IQz0Zs3b6KhoQFWqxUSiSSuWm8oFILFYkFrayuMRiMKCwvh9XrR2tqK48ePo7e3F1lZWVAoFFH7IRyesGdpbW2lZ3OGmfDY1Nrait7eXhQVFcWchyzLwmg0orGxEQ0NDaitrYXVasXhw4dx4sQJ9Pf3IzU1NSZBIm29evUqxGIx0tLS0NHRgX/84x/473//i3A4jMrKyrjr4IkmBrF2yUAgAJPJBJ1OB5fLlVRYb6vVis8++wwfffQRLly4gLy8PKoHMRXIWe38+fM4evQoLl26BJvNhoKCAshksph5iACR+x6NjY347LPPkJubm5SHYIZh0NnZiX379mHPnj1obm6GSqVCSUlJQgSRYRi4XC4cOXIEBw4cwMmTJ2Gz2VBYWBhTEMjFwMAAPv74Yxw7dgyffPIJDh48iPXr10+SqMerv729HQcOHMCHH34Ig8EAgUCQsKPdQCCAy5cv4/e//z36+/tx7tw5hMNhFBcXx5QdMAwDp9OJs2fP4sCBAxgbG8Nzzz2Hrq4u/OIXv4BGo8GZM2fg8/lQVFSE9PT0+8pgWRZXrlzBK6+8AqVSifLycng8Hhw5cgR79+6F2WzGc889F5UoMgyDkZERHD9+HO+++y7Gxsbw4osv4uLFi2hqasJTTz2FlpYWmM1m5Ofn3yfDIQLvHTt24MKFC5g9ezYyMjJw6tQp3L59G5s2bcLRo0exYsUKSqSm6v9IPDbOTaYDQpHfe+899Pb2YuvWrVGlwtEQDodx584dvPXWW3j99dfR1dWFvXv34o033sD8+fPjsqs6nQ4nT56EVqtFeXk5GhsbIRAI8NJLL03ZXu53v9+Pffv2obe3F9/97ndRUVGREJtMynE6nUhJScHPfvYzPP3006ioqEhKpbq9vR16vR6vvvoq8vPzqfJLcXFx3LwlJSXYvXs3PB4P3n77bYyOjiYdjKalpQVisRivvfYavF4vdDpdwnl9Ph9OnDiBjRs3YuvWrfj3v/8Nk8mEvr6+KTcEj8cDlmWRkpICuVwOu92OmzdvIhgM4u2338aVK1fw1ltvYenSpSgqKgJwvywgHA6jqqpq0rFErVajuLg4rodtPp+PnJwc1NTUUC5RpVLhzTffhEqlgsvlgtvtjmnrkJmZibq6OrS3t0MgECA1NRUvvPACli5dCqfTmZDacSw8Upc3XJ2BqdJE80cY6wUlEgnmzJkDrVabVFtCoRA0Gg3efPNNvPzyy9i8eTOGhoZgt9sTyq/VarFjxw5s3rwZoVAIXq83qTOr0+nEwYMHUVpaCplMlvQA+nw+DAwM4NKlSzh8+DD+9re/wWQyJWWw1dDQgNOnT+PVV1/Fb37zG4yOjtLruXggnI7ZbEZbWxt++MMfxr2NiMTzzz+PYDCIN954A59++imWLl2acF5ybX3+/HncunULOp0Od+7ciWoERxAOTwT23bp1K5YvXw6/3w+Px4Ph4WE6dkuWLKFyhGhISUlBXV0dNmzYAD6fD7/fj+zsbCxbtgw1NTVgWTam0VY4HIZSqURtbS3q6uro0XDBggXQarX405/+hNOnT0Oj0UQlyOHwhMn62rVrodFo6NVuRUUF8vLy0NbWhrGxsWn783yknEE0NjlamkQl+6Rz165dC5Zlk7J65PP50Gq1WLNmDc6dO4f9+/fTe9lEOlImk0Eul6O+vp6ylrGOCJHwer2URf75z3+OlpYWjI+Pw+fzJbyzMwyDgoICbNu2DVqtFi6XC/v378fvfve7hHdogUCAsrIybNq0CZmZmWhvb8fRo0exffv2hG4YzGYzPvzwQxQVFaGysjJpByUNDQ3weDx45ZVXIJFIcOzYMWzcuDGhulNSUvD9738fPp8Phw4dQmdnJ42kPRV4PB7VJiQCQLVaDa/XC2DCp2S8QKhE6czpdFLdD26b481vHo8HlmUxNjZGZRA7duxAKBTC66+/juXLl8ckSKQeojxltVphMBjg8/mwadMmGI1GtLW1QaPRJCx/IXjkx4REJmkyV0tEBZTYPyTTDrPZjI8//hgymQwvvfQSFi5cmPC5vbOzEzdu3EBWVha2bt2K//znP7h69So2btyYUN1isRi1tbVgWRb37t3DwMAAnE5nQud1LogQKRwOJx3Nd968efjyyy+pmavZbEZOTk5CeRmGgdVqxZkzZ7Br164pd9NYIMJaopmazLiHw2FYrVaMjIwgJSWFnt8T0RcgV7Asy0IkEqG6uhpKpRLvvPMOdDodysrKkJeXR9NGA9EgJfOZqBmLRKK43BnDMJBIJFAqlQgEArh+/Tr6+vpQVFSE1tZWhEIh1NbWIjc3N2p+sVgMtVoNhUIBkUiE8fFxnD9/ntomJHtcJHhiBIixQCZTd3c3xGJxwjKDQCCA9vZ2/OEPf4Db7YbZbMadO3eQl5eHzMzMhCT558+fx+XLl2EwGBAIBLB06dKE6ufxeJDJZCgvL4dWq4Ver8fKlStRVlaW8G0Iuc24desWGhoaMDg4iBUrVmDevHkJTQSGmdB+9Pv96Ovrg8lkQmlpKerq6uKqrZL8LpcLfX192L59e9JHHYaZiAZF7AeUSiVWr16dsD9HrtxELpdj9uzZWLZsGYqKiuLehjDMhKmvRqNBZWUlNaAjNxIbN25EeXl5TEEy2d21Wi1mzZqFlJQU6va8uLg4rhCXm7agoADBYBBarRazZ8+GUqlETk4OcnJyou7sDDNh0KXRaFBUVISMjAzIZDJq+VlbW4s5c+ZAJBIlLUD8RugZeL1eGAwG8Pl8VFZWJpSHRFM6dOgQtTaTy+V44YUXkJ+fH3di+3w+NDc3Q6/Xw+/3Y9asWVi0aFHCOyu3HQ0NDZg9e3ZCi5ALm82G27dvw2AwQCKRoLa2Fmq1Oilll8HBQfoOxcXFKC4uTpggud1u6PV6LFiwYNo6GkajEXfv3oVYLEZJSUnCRy1gYq4ODg5ifHwcqampUKlUCR9VHA4HWJalarxer5c6OSksLIyr8+Dz+ejCJKw7UaWPd8UM/L87OqJm7vP5qEWlWCym19yx3puolxOlNK/XC6fTmbAF7DeWGACJa9FxEQqFqIkq0cGXyWRJ7c5EWJSsTjm3DIKvmn86ZXyV/A9S4Wk6ZTyId491zk+UO+GmS2YOxpMxJMKZRdadaN5YdX5jiMF08VUnFCnj29ZvM3iy8Y3TM3gQeBCLeIYQPFwkIqWfwVfHt54YPAkIBoPUvRbR1eD6e5huOHai05FIBGTiY4FIrB8FuHEsyJUz8YPg9Xqn1N+fQfKYIQaPOYLBIAYGBnDhwgXI5XKwLIvR0VGUlZWhqKgIgUCAXiVFs/zkIvKc6nA40NnZCZVKBa1WG9MEmRjSjIyMIC8vDwUFBfS3eHXGqp/7LFZZN2/eBDBh85+enk6dolgsFly8eBGbN29+rELFPemYIQaPOYLBIPr6+tDS0oILFy5AKpVSvwvkirO8vBzA/Wx0VCFRxII0Go3g8XjIycmhknECYg8SCoXw+eefg8/nQ6VSTfqNpI/mjYorMScwmUzIzMyc9CyaWTUAtLW1gWVZrFq1Cunp6XC73UhLS8PY2BjeffddVFdXo7S0dNpu7mcwGd96AeLjDmKRabfbsXfvXigUCtTV1WHWrFkYGBiA1WpFRkYG3n//fWpGTJSwNm7ciPnz56OtrQ1nzpyBRCLB+vXrsW7dOgDAyMgINZLq7u7GlStXoFAoIBAI8Mtf/hJlZWUAgObmZhw8eBCrV69Geno66uvrYTabUVpaitdeew1Hjx7FtWvXwOfzkZeXh1WrVkGv1+PkyZOQSqUoLCzEmjVr8Ne//hVSqRQejwfbtm2DyWRCU1MTxsbGkJubi/Xr1yMQCOCjjz5CYWEh6uvrsWHDBshkMvT394NhGDz11FNYtWoVjh07hu7ubuzatQsZGRlJ9ScwI3+YESA+gWAYhrrmSktLg0gkglKphFAoRE9PD3p6elBaWorx8XH8+Mc/xjvvvIPf/va3aG9vh9FoxNDQEDo7O5Geno7i4mIcPHgQzzzzDPWpeOvWLaovIBQKsWXLFly/fh2tra2UGOh0OggEAiiVSgwMDKC1tRUqlQoqlQq9vb3Yu3cvamtroVKp0NHRAavVSl3BrVmzBkajESdOnEBBQQE2bNiA+vp6NDc3o6enB9nZ2ViwYAGMRiNu3rwJh8OBqqoqrF+/Hk6nE2KxGHa7HXa7HVlZWVCr1UhNTUVFRQXq6+vhcDgm+Q+Yjh3/DCYwc+B6gkCclBK/CD6fDw6HgwrTFi5cCJlMhqqqKuTl5YHH46Gnpwf9/f2Qy+VQq9UoLS2lAkDCQbhcLhqevqKiAllZWZPC4BGvu3w+H3PnzsWWLVtQXFyMGzdu0JgFZWVlKC4uxsKFC8Hn8+FyuaDValFdXQ2VSgWz2YyMjAxUVVWhqKgIoVCIKsmUlpZCLpdjdHQULpeL+kXMy8tDKBRCSUkJVq5cCZlMhi+++AJ6vR4KhYL6n+RyszOc7fTxjecMEvEWlEgZwNe/qxA385Fek4hePPe8TpSgiGZeODzhKVgmk0EsFlPtNXITQbwgk3TcG4OsrCx0dXWBZVmMjIzAbDYDmDj/u1wufOc734HVaqVWfMXFxWBZFpcvX4bP58O9e/dQVlaG5uZmFBYWorW1Ffn5+VAqlXR8yHGouroaFy9eRHp6Oq5evYqqqioMDQ1RT8IOh4P6LRQKhRCJRI80lmQ0d2ZcZ7NPMr7xxCAe4i10svAeh4EuKChASkoKZDIZRCIR1Go1WJZFTk4O5s6dC7FYjDlz5kAikSA/Px92ux1FRUXIyclSMjVCAAACs0lEQVTB3bt3YTQaodFo6GSWSCSoqqpCWloalEolNXyJNEUuKytDU1MTrFYrhEIh7HY7wuEwysrKUF1dDalUira2NphMJmRnZ6OmpgZpaWk4d+4cdDodtFotVq5ciaGhIVy/fh0pKSmoqalBeno6pFIpsrOzUVVVBZVKhUWLFqGjowMdHR3IyMhAdXU13G43BgYGkJWVhQULFkCpVKK+vh4FBQXUf8CDJNjJjjfXivBJxtciQPyqiyuZ/PHSRkqyo02qx4EzYBgGPT094PP5yMrKAo/Hg8lkgtPpRGpqKhwOB8rLy9HS0oK5c+dSXXexWAyj0YirV6+Cz+dj1apV1CIvEAjAaDRCIBDQyD8ZGRkYGRmB3+9HaWkpAGBsbAx79uxBbm4unn32WbjdbnR1dUGj0aCurg5utxsNDQ2w2+2oqalBQUEBXC4Xurq64HK5MH/+fKSmpqKvrw86nQ7l5eUoKCiAzWYDwzDIyMigEZPS0tJgMBgwMDAAlUpFXYgRq86CggK43W7s3LkTW7ZswZo1ayhHQ/rpYXKC0eYTUUlPNlbo14nHRh35qy6uB7lTc9sSaQDyuCHyLn8qbiYeAYyWP5rOAPn+r3/9C1arFYsXL6Yu4WPthNHK4Ua5Sra9kWnNZjP++c9/4ic/+Qm1lvy6OQMuZohBEuBGx3lUiGXUES3dkzCY0RCv7dGUfhLpF/KcjBsRYEYLRRcNxJNwNL+A3GMYad9URA6YPG9mBIbTQ7Q+/lq2v69r552uNdd0kIz7sQeFeO8X73dunMVo+biRmqLFVYwFYuqbTJ2xQLiMROqdLr6tBGZG6egh4evgML5KnYlyTtHSJ5rnQdT7KPAkc4eJIqFjwgxmMINvJx4/KdkMZjCDrwUzxGAGM5gBgBliMIMZzOD/MEMMZjCDGQAA/gdeJCU1IWaxUgAAAABJRU5ErkJggg==)
From the graph match the following given below
List - A List - B
i) Velocity along AB (A) 1.25 ms–1
ii) Velocity along DE (B) Zero
iii) Average velocity along CE (C) -7.5 ms–1 (D) 2.1ms–1
The displacement – time graph is shown below
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQMAAACmCAYAAADed+oiAAAgAElEQVR4nOy9eXxU9b3//zyzTzKTyWTfQ0IWAkmAhB3CIqCobArYVq5XrUqr316vXm9tH3a7td7+btvbe9tqb33Y1qW2KlWLWBUQWWUPEHYIYclO9m0ymX3O7494jpOQnUkmlLweDx7AmXM+53M+y/vz/rw/7/frLYiiKDKGMYzhloci0BUYwxjGMDowJgzGMIYxAGPCYAxjGMMXGBMGYxjDGIAxYTCGMYzhC4wJgzGMYQzAmDAYwxjG8AXGhMEYxjAGYEwYjGEMY/gCqu4XxhwSxzCGf3wIgnDdtVGjGYwJoTGMIbAYNcJgDGMYQ2AxaoRBT2rLGMYwhpHDqBAGLpcLi8US6GqMYQy3NAIuDFpbWyksLGTnzp1j2sEYxhBAXHeaMJLweDxcuHCB//u//6OxsZH8/Hzi4+NvSaEgGVBvxW8fw+hAwDQDQRBoa2vj6NGjfPjhhxw+fJg//OEPtLe3B6pKAcXYacoYAo2ACQOv18vFixfZv38/LpeLjo4O3njjDU6fPo3D4QhUtQIGhUIxphWMIaAIiDAQBIHm5mYOHTpEU1MTDz/8MGlpacTHx/O9732PmpqasYkxhjGMMG5YGIiiOCQV9+rVqzidTpYsWcKcOXMYP348f/zjH4mPj6eiooKOjo4brdoYxnBTYqhz6kZxwwbEoRi+RFEkMzOT2NhYOjo6OHHiBB6Ph7S0NP7jP/6DqKgotFrtjVZtDGO4KREorfiGhUF/Ffd6vYiiiFKp7HLdYDBgNBppaWlBFEU8Hg8qlYr09PQvBEwzJ9//Ix9uP8Jpw3RmL1vL00tSbrS6fsXYCcAY/pHQrzAQRbHPwd7Tb77P9PWsKIooFArUavX1P7ae58inhRzZf4xzQQ4sZHDPkhTGDbBeA4WkkikUQ9sxDbUOkgBUKpX/kMLkRtvVX/07hoFjQD01mP2LdK/vqtmfQPB4PHg8ni7X20sKOdkcQvSMhSxOV+A6f4TC6qHVaTAYTLljg7V3SMKgp/aUtMUxjC70Kwx6msy+Hdm9U3vSCPqaNF6vF6fT2U0YWLlSWMglZQix85dw+7QwTLZTfF5Y3191Bw1BEOTVq7cBLAksfw5gQRBQqVQDFij+fv9g0Nd7vV5vj9eldh2qwPR9zuv19vqeG8WYUPoSg9bhBtJ4gxkAKpUKvV7fdRLaL1NYWEL1tQpqrjXR0OTEaq3jyP6jNA/hHYNBb9set9s9LO8bKAZrYR6JQS6KYq+rfG+LiKT+D9bgPBzfMyYIumLQBsTunXijk1KlUhEUFNTFwOgqPcCR804cVcf5/O0LHHa209qsI0h5kAPWO7k7uH9bxFDq1tf9w7G3H8y+WKUaeFdJk1SadEOp90DsPoIgdGmX/tpd+n2wdoTuxmd/oTeN91bd/gU8UMnj8eBwOPB4PF90gpfKg7s5Y8nlnv/vLbaeOsWp7a/yv98YR3vLDvYc7HuFHo5VRKFQDGoyjgaM1Fn1YBYHhUIxZIPiSOBW1xT82jO+K1Fvf7pDq9USGhr6hV+BCJRxcNcJmiZnkpUaRzJAQjLJ2ZPJa2nlg70H+q3DzeLaO5xbHUl4DXWAD6VuN0Ob9wSp3kMdN32N795+629eBAJ+W+4EQcBut3P58mWam5uJj48nMTGR9vZ2zp49i8PhICQkhIyMDIxGo/ycy+WitbWVlpYW6usbiIiIZ+UvP2M+BkJDjAgAQiLZdz/LK7O+hcsYPqg6weBPCHozivqW1ZdRtaf7+3qmNzvFQN8t/db9uq963dO7+1LnB1qnGylrMNeHgsGU1d99A/1G3zHXl9bU2trK8ePHOX78OCtWrCAlJSXg2qdf3i4IAk6nk40bN3Ls2DFaW1uJjIxk6dKlVFdXs3nzZtLS0oiNjSUiIgKj0YggCLjdbo4fP87LL7/MxYsXeeaZZ/jxj39MYmIiRpXKZ/Cp0RnCiDGE9VmP3gZrf/aFwdzf1/65pzJ7mjhutxtRFNFoNIiiiMvlkoWQ5KClUChwu91YrVZUKhUdHR2EhoaiVqux2Wx0dHTgcrmATu3KZDLR3t4uO3F5vV6MRiMhISGIokhLSwsWiwWFQoFWqyU6OhqA+vp6eZumUCgwm80EBwfT3NxMXV2dLFDCwsIIDQ3FZrNRW1uLxWJBEASio6OJj4/H6/Vy8uRJOjo6cLvdmEwmkpKSUCgUXLhwgebmZllrmzFjBiaTidLSUqqqqrBarYiiSEJCAllZWTQ3N3P06FE5gjUxMZH09HScTifnzp2jqakJh8OBTqdj4cKFBAUFcfbsWaqrq3G5XISEhDB+/Hji4uIoLy9n//796HQ6HA4HOTk5ZGRkcPHiRQ4fPozT6USlUpGVlcXChQux2+18+OGHtLW14fF4yMzMZMaMGdjtdg4cOMCFCxcwGAw4nU7uu+8+dDodu3btori4GJVKRUhICNnZ2cyaNYuSkhI+/fRTHA4HKpWKgoICpkyZQnl5Oe+88w5vv/02FouF48eP89Of/pSEhISAbqP8Joqampq4dOkSycnJjB8/nqtXr3Lq1ClaW1vJyMhg/vz5JCUlERERIU+Q4uJi3nvvPfbt20d7ezsff/wxgiCwYMECMjIyyMrKwmq1cvLkSSorK1EqlSQlJXH77bejUCh46623aG1txeVyER0dTX5+Pkajkf3793Pu3Dncbjder5dHH32UhIQEDh8+zNGjR2lpaUGn05GTk8OSJUu4du0a7777Lm1tbbhcLubOncvMmTO5du0a27dvp7q6GrVaTVBQEA8//DAGg4HNmzdz4cIFnE4ncXFxFBQUMGnSJIqKiti4cSNKpRKz2cy9995LZmYme/fu5dNPP5VjLpKTk3nqqadobW3l5z//OS0tLXg8HiZOnMhdd91FXFwchw4d4o9//CN6vR6bzcZ//ud/Eh8fz6ZNm9i5cydtbW0EBwczbdo0Hn30UQ4fPsybb75Je3s7Ho+H22+/nRUrVmCz2di8eTOHDh1CFEUmTJjAv/3bvyEIAm+99RZnz57FYrEQERHB8uXLmTdvHgcPHuTNN98kODgYl8vFPffcw6JFi7hw4QKbN2+moqICo9FIZmYmzzzzDDabjddff53KykrcbjfZ2dmsWbOGiIgIPv/8c/bv309kZCQOh4OUlBRMJhNnzpxh586dNDY2otFomDNnDpmZmdTW1vLxxx9TW1uLy+ViwYIFREREYLPZ+Pzzzzl37hxqtZrQ0FDy8vJQq9WcPn1aHkfjx4+XBV5dXR2FhYV4vV4cDgcmk4lx48ZRU1PDiRMncLlc8gRcsGABCoWCK1euUF5ejsfjQaPRkJ2djdfrpbGxkUuXLqHX6+no6KCjowOtVovNZpOFnRSBC19uO6TTsuLiYo4dO8b+/fvZt28fpaWlCILAjh07uHbtGjExMWg0Gn9NyUHDL8JAFEWCgoK48847MZlMtLS0UFJSgtfrpaamhoaGBjo6OsjLyyMyMpLg4GBZm2htbcVqteL1emltbaWtrY3q6mpCQ0MZP348DoeDpqYmamtr5RVQemdbWxutra2IoojT6cTr9coGSWmVtdvt8vGXKIqoVCo0Gg1qtVpWy7xer3wdvjw5UKvVGAwGzGYzZrOZoKAg1Go1SqUSnU4nx1DExMQQGhoqC4D09HRaWlpQKpVyWUFBQYSFhcnvjY6ORhAEtFot4eHh6HQ6lEoliYmJhISEyGVNmTJF9uQLDg5GpVIRGRnJxIkTEUURg8FAWloaSqWShIQE5s6dK6+0mZmZBAcHo1aryc3NlbWE+Ph4dDodgiAwdepUoqOjcTgcGAwGkpOT0Wg0jB8/nrvvvhuNRoPD4SAtLQ2dTkdsbCzz5s2jra0NnU6H2WzuHEgqFYsXL6a1tRWv10tMTAzR0dEYDAbmzJlDbGwsRqMRl8tFWFinhpeeno5CocBms6FSqUhMTEShUBAREcGyZcuwWq243W7GjRtHaGgoBoOBBQsWMHHiRFQqFTqdjtDQUDQaDVOmTMFsNuN0OgkPDycpKQmVSkVycjKrV6+WF4b09HT0ej0TJkxArVbLpy7h4eFyny9ZskTWsOLi4ggKCkIQBGbNmkVSUhJKpRKXy0VERAQ6nY6ZM2eSlpYGgEajISIiAo/Hg16vJy4ujt27d1NWVobD4cDhcNDR0SGPDa/Xi1qtHhV2LkHstkG+EYNTa2srR48e5dChQ+h0OqZPn86FCxdkdXP//v089thjLFq0iJCQEOrr69m2bRu/+93vOHDgADqdjl//+tdkZWURGRlJfHw8breb6upq2traUKvVhISEkJ6eDsC5c+dwOp0oFAqMRiMREREolUpqa2ux2WyIoojD4ZAnRWNjIxaLRT65MJlMhIWF0dHRQW1tLR6PB6/XS1hYGGazGZfLRVNTEx6PB4PBgFKpxGAwIAgCdXV1AOj1erRarSwkJNW+paUFh8NBfHw8wcHBtLe309zcjNPpRKlUYjQaCQ/vtH9UVlbKAsloNGIwGGQBZ7fbcblcsgqqUqlkDcZXqKm+2Fb5nsxIv/meLPg6WQ0U0hbC154iDVxpMvleGyr8ebQ30mV5PB6sViv19fVUVFRQUlLClStXaGxspKysDEEQiI+PJzU1lZiYGNrb29m9ezeXLl1i6dKl/Nu//RuxsbEjtk3o6Vv8tk1wu93s27ePAwcOYDQamTdvHmlpaVitVlavXk1kZCTz58+noqICm81GSEgIkZGR3HHHHTIPonT0lJubi8lkkjtBWn0kSHvySZMmXXcdIDU19br6iaJIeHg4ERER191vMBgwGAzX3a9SqUhISOjxW6WVvbuRUlJfQ0NDu5QlBWb1VN/ExMQev0+v16PX67tcF0VRtrl0vy4IAjqdrseyug+ywRg8lUrldQLF9x7fOITejLY9GWZ7Q/c63MiRnz+PC3v6JpvNRl1dHVeuXKG4uJiLFy9y9epVGhoaZI3qjjvuIDMzk4yMDBISEtDr9VgsFnJycvjb3/7GsmXLCA8PD/ix6w0JA19vsra2NrZs2YLVauX2229HEARKSko4dOgQ9fX1xMfHEx4eTmpqqrzyAURGRjJ9+nSio6OJiorirbfeoqCgAIPB0MVNuKd391Wvgfwm1X+wZUmu0z113lDqNdjrvf3mjzYZynVBELpsxaRrA31/XxhtZ/+iKNLR0UFLSwvV1dWUl5dz+vRpioqKKC8vR6lUEh0dzfz588nLyyM/P5+4uLjrbAFGo5Hs7Gz27dtHU1PTsLlbDwYDEgZSZ0sqoe9KIXV6e3s7MTExnDhxgj//+c9ER0dz5513MmfOHP7nf/4Hq9XK1772NfLy8ggKCupSvlqtJj09nccff5wnnniCY8eOERUV1WV1HSh8V6mBfNdQMNJGHn8etw0XpEnbk5Yw0nUYyHu7C67efAQ8Hg9OpxOHwyEbCi9dusSpU6fYsWMH5eXlcuj9V77yFebOnUtO9kRC9F7KLtfRbrFQXFwsv1NniiQiKgazrvNYvaqqipCQkOsC9W4UXq930JpGv8JA2rNarVY6OjpkNViv13dxbElMTOTZZ5/t4qsu7aMXLlyI1+tFq9WiUCi6SHuPxyMb+RYuXMjs2bP53e9+R2xsLHPnzu05vPkWgD/3vCMBf52RD2UQ+2Iw7eV7lCu1t0KhkAWAy+Wivr6eq1evcvXqVc6fP09RURElJSWYzWYmTZrE2rVrmT17Nunp6V9uA50NtJz6Aw/P+Qmng4IQVAoUX1Qre9WTbHj6+3x1Yue7goKC5KNmf0KyGw2mPXrtQckg+Oabb7Jt2zZ5D2S328nMzOTpp59m/vz5XT5CrVb3qB5KrEW+0liC1+uVhUF4eDj//d//zfLly3n33XeJiYlhwoQJA/4Yqd7d6+Drp38z4maotzSBNBrNsMUS9IfBtJOk4fb0TFlZGR988AG7du3i7NmztLa2Eh0dzZQpU1i2bBnPPvuszNSl0Wiut5WI0Dm18njqvbf45+kxxOq+0PAUSiS5aTabefDBB+VgPX9iKLE0vQqD8vJynnnmGcLDw/n6179OTk4OarWahoYGTp8+zZ/+9CcsFgu33357l1VhsHtZpVJJUFAQKpUKj8dDSkoKq1atYsuWLeTm5hIXF0dISMigPkp6p69xayQm1GC2KP0h0AJA2sMO9Fu8Xi8WiwWTyXRDwmAkjGjdDaYWi4VTp05x6NAhtm3bxuXLlwHIysriG9/4BjNnzmTcuHEYDAY0Gg0ajQaVStXlO7uOcenfAkq1+otnrq+HRqNh4sSJCILgV+9D6fRnsOi1BsHBwTz99NOEh4ejVqtpaWmhra0Nu91OXFwc3/72t9HpdL0a0XyNi31B8sCTjvW0Wi1r1qxh9+7dfP755+Tn5zNt2rR+3UGhqyuodL/b7e6yNRnOSSaK4pA7YrRh0PtNlQqz2Szvs0fDubkvfOvicrm4fPkyx48fp6SkhLNnz3Lu3Dk0Gg2JiYmsXr2aWbNmMWHCBKKjowkJCUGr1Q7KRRvcwFle+38r2WTQoFEAxDJt9XrWP3oPM8zgdDopKSnBYDCQmJjoN42qr3nX1zzqVRiEhIQwbdo0KioqeO+99zh79qwc05+ZmcnSpUv9EuMvSUXfVTwnJ4eFCxeyc+dOioqKmD59+pDKlf4eqUHZ/Qivt+O7f0RIfg3+NoQNFT21d0VFBcXFxRw5coTDhw9z7do1tFotkZGRrFu3jvHjx5OWlkZERARRUVEEBwf3KRT71joVQCyzv/I4C9PNmDUginoiUzJI1ouAQHt7O9u2bSMhIYGoqKjrDOtDxVAXo16FgTRBz5w5Q0tLC7m5uSQlJQHILsWSQ0t3DMUJxdeeEBwczJo1azh79iyHDx9m1qxZ5Obm9rnd6H72LaGvYB1/Q9qH3sqQBmKghJ/0Xo/Hg8ViobS0lEuXLnH+/HlKSkpoa2tDo9GQlJREQUEBCQkJREdHk56eTmhoqOwdOxCDXt/jXAGEMWH+ndw5I5bYL9w/fIWHy+WisrISg8EwIkeL/X1TvxsVQRDkDEc6nU72lPP9vbfnBgJpNe1+yjB58mRuv/12Pv30U7Zv3056evp1DjUDeVcgV+R/dG2gJwTym91uN/X19ZSWllJWVsbFixe5dOkSzc3NOBwOIiIiyM7OJicnh0mTJpGcnHydIxgMPsq1Z3iBKvb9+TdYdhsxfjFljOPyyJtdwNyU4H6e9y/68gGR0K8wCA4Opq6ujtraWrlRExISKCgouGHvMKlikjFGko6iKKLX61m2bBlFRUUcP36ciooKMjIyRp0TyhgCj4aGBiorKyktLeX06dOcP3+epqYm2VszPT2dnJwcpk6dSkpKCkajUdbghmU8KXRowrO588HFXPXUUVdWR90XP5m1iaR0dG6lNBoN6enpREVFjQqNsl9h0NDQgNFoZPz48WRnZ2Oz2eQoLH9JNUlqde+YCRMmMG3aNHbu3MmRI0dITU0ddKPdDA47YxgYRLEz/Ntut9PS0kJDQwOtra2cPn2a06dPy8FAJpOJnJwc5s+fz6RJk+Sw+e7Et8MGlQH9uLv5zit393mb0Whk2bJlXYLkhgsDsZ0NSDMwGAyEhYURFRWF3W6X1fWhNGhvRrXuhidpEs+fP5+rV6+yZ88eCgoKSE5OHtR73W73oFiIB4pbyTgYSLhcLux2O1arlebmZpqbm2loaOD8+fOyxtje3k5sbCyzZ8/m9ttvZ8qUKQQHB19X1o2M1+HoY6VSSVhYGCqValScQPUqDCQJnJWVRV1dHRUVFVy7dg2XyyWHF0seVL0Z73oKOOnt/Lq3FX/ChAnk5OTwl7/8hbfffpvvfOc7g/pAu90uG4X8Cck9W6FQjAoV72ZF98kmHU263W7a29spKyujuLiYo0ePcuLECerq6tDr9WRnZzN58mS++c1vkpycTFxc3HWOO/5Y/YdT0FssFrZs2UJYWBjz58/v1SY2UuhVGNTW1vLCCy+wbNkyVq9e3SVOoLS0lJ///OfExMTw2GOPySpO94br6f+S62d3AdKT/UEUO9mAJk2aRGRkJB9++CFPPvkkQUFBA+5oKeTY3/A1fI6hE/1FP/r+Jhmm29vbUSqV8vjyeDxUVFRw8OBB3nrrLQoLC2lqamLChAncfffdzJ8/n/T0dFJSUrqovv6wX400bDYbhYWFxMXFMWvWrNErDGJjY1mxYgWbNm3ipZdewu12y048Wq2W6dOnc99993URBFeuXOH1119nz5495Ofn8+ijj6LVavnRj37EqVOn+MEPfsDSpUtlgpLukFZY344VBIGMjAwWLVrEr3/9a371q1/x3HPPDdipontZ/d3fH6T7e9IGeiqrP2epwfw21LL88e7BlNWTE5ggCF3cwktLS3nxxRf56KOPSE5OZunSpdjtdjZt2kRLSwtut5upU6fyzDPPMHnyZFJTU2UyEcng3D0C9WaDr4/NaECvwkChUFBQUEBmZqZ8Vmu1WgkPDycxMZGMjAyZG0AQBFpaWvj973+P0+nkq1/9Kk1NTWzatAmlUoler+c73/kOr7/+OiaTiYKCAtkI6XK5sNlsuN1uLBaL7M4r+bg7HA40Gg2zZs3i2LFj/PWvf2XdunWkpqbS2tqKIAhYrVa0Wi1msxm3201zc7OcyFUQBDlWXGJV8ng8csCVRqOhubmZ9vZ2ebCGhYURFBREa2srDQ0N8kAzGo3ExcXhdDqprKzEarXK16OiolCr1dTW1lJbWyu7rCYlJaFWq6mqqqKxsVHeJiUmJhIbG8vly5eprq7GZrMhCAIpKSmMGzcOi8XChQsXaGtrk98xefJk3G43xcXFVFVV4XQ6CQ0NJSsri5iYGI4ePSpTgul0OnJzc2WKr1OnTtHW1oZWq2XKlCmkpqZy+fJlzpw5I3MjxsbGkpubi16v58CBA1RVVQGdR8pz584lMTGRkydPUlhYiNPplK9PnDiR06dPs2fPHjo6OrDb7eTn57NgwQKuXbvGxx9/jMViwe12ExkZyX333ceOHTvYtWsXly9fprKykqtXr5KcnExeXh7Tpk1j/PjxJCQkEB4ejsFgkIPcJNyMk7871Go1ycnJMnFOoNGnAVEi1IyPjycnJ0fWCoKDg69TaZRKJZMnTyY8PJzIyEgOHTrE6dOnaWlpYeXKlSxZsoR3332X4uJiJk2aRExMDOfOnWPbtm0cOHCA4uJifvzjH6NUKgkJCWHlypXk5uZy+PBhduzYQX19PcXFxVRUVPD3v/+d1atX87vf/Y6Ojg7a2tooKChg1apV1NTU8Je//IXm5mZ5O/Hd736XkJAQtm7dytGjR+no6CAhIYGVK1eSmprKgQMH2LFjhyy47rrrLiZMmMDRo0fZunUrNptNpg5bv349VquVTz/9lCtXrgCddo3FixdjNps5ceIEu3btkunM1q5dS2hoKIWFhRw9ehT1F77qt912G7GxsfJkaW1tRalUsnTpUuLj42lqamLPnj1UVlbS3NzM1KlTSU9Px+v1cvbsWfk7kpKSiI6OJiIigtLSUoqKijCZTJjNZlJSUmTnm/LyclpbW9HpdKSkpCCKnUxK1dXVNDU1YTQaCQsLk20hHR0dNDY2olarcblcsrep2+3GZrPhcDhkTRHA4XDI1HO+K7dEEScJWomnory8nPr6epkeLC8vjwcffJDk5GSio6MxGo09Br79I8FoNHLnnXcCBHyLAAPkM+jOuCPBN4Zdr9ezaNEiLl68yNatW2lrayMrK4u///3vjB8/ntDQUMLCwmhvb8dutyMIAkajkbS0NOrr6zl16hS5ubnodDp0Oh0REREyV2BOTg52u50pU6YQHR3Nn//8ZyZPnkx+fr4cAp2ZmUlQUBDh4eHMmTMHm82GRqPB4/HIPICS45JkBI2IiECtVpOamorL5UKpVKLRaIiPj0ev15OSksKiRYtwOp2o1WpiY2NlYtS8vDzGjevMCR0ZGYnJZEKr1ZKeni5PhqCgIEwmEzqdjokTJ8o8iRI3nyAIjBs3TlaRFQoFqampqNVqwsLCKCgowGKx0NHRQVxcnGwhz8/PJz4+XmYClsgz8vLyiImJkdswPj4erVZLXFwc8+fPl5mA4+LiUCgUxMfHs2DBAvmEyGw2y4FGeXl5spFYpVIRFRUlay4GgwG3241arSY6OhpRFElOTuaOO+6QtwRhYWEyT+SSJUtkYaBWq9m8eTP79u1Dp9ORlJREdnY2Dz74IEuWLJEZo28FqFQqYmJiZKEZaPTLgSgIAg0NDVRVVdHR0YEodpKf5uTkdFHbBEGgqKiI7du309jYyIwZMwgPD+cnP/kJ3/ve95g/fz5f/epXmTdvHmvXriU+Pl4Oey0sLOS5557j/fffJyQkBEEQ5NBQybIMnavPnj17+Na3vsWaNWt49tlniYiIkBuzJ3ou34Cp7ufLvl6P3bn8ut8/FBfr0Yze7Cj92Ve6/zbQI1aJHHfLli288847xMTEyFuS+Ph4Fi1aRGhoaEAEQaC4Izo6Ojh27BiCIDB9+nQ51H8k0NO39qkZCEIn8efu3bu5cuWK7PQRFRXFpEmTupwMWK1WNm3aRGFhIfn5+ZhMJpmMVBIQHR0dpKSkyJZjafWUWH81Gg16vb6L0U9aSQHZcLl48WI2b97MunXrCA8Pl1cT6ZnuQqqn37pP9O7hqN0Hua8xTPq7t1OQ7vf2d/1GnrnRydPb832VO5hnBKGTBbu0tJR33nmHDz74gPz8fP75n/+Z/Px81Gq1fGoUSI0gEM5pNpuNgwcPolKpyM3N7cL7ASMvnPo9Fzt16pRsGEpKSiI+Pp6YmJjrjtQ6Ojrwer0YDAZqa2vZsWMH7e3trFu3jurqaj744APmzZvH1KlTu5CPSr4HEs25dM0XvpPTbDbzwAMPoNFo+Oyzz6ipqbkuyMPXo7Gvsvq737duvr/1VX5v7+jr+o08M5ohCJ2RecePH+e1117jnXfeYebMmTzzzDPMnj0brVmh2PQAACAASURBVFZLTU0NVVVVo/5bhgMSsY/E5C2hrz4fTvRrM2hrayMsLIz8/HymTp2K0+nskb7MbDbz5JNP0tjYKGe7iYyMJDQ0lIkTJ9Lc3ExKSgparbbLc16vF5fLhcvlkhuhLxVVp9Mxf/58HnjgAd59912ysrIICwvrQrLqT/TkxjlatgrDvYLcSPmi2JnX4ujRo7z22mucOnWKBx98kCeeeAKj0Ygodua0+OSTT2hubuaZZ56RtYSRRqD6U6FQyAZV3zoEynelT2Hg8XjIzs7mzJkzbN++nUOHDmGz2YiPj+epp56SO8/r9aJUKomKiiIqKqpLGaIoEh0dLafz6q6eSwYqpVLZayy8KHaShoiiKOcC+Pa3v83WrVt59913SUhIYObMmdcJqBtFX/7co0kgDGddJC/LwfodNDU1sW3bNt566y3UajWvvvoq06ZNk8uU+qm1tZX6+vpbUjMIDg5mwYIFw0J7NhT0yYF47do1dDodd911l5zfzm63YzQau6jmHo9HPtfvzRmn+9/SIHM6ndTV1dHe3n6dROzJqCc9r9Fo2LBhA7/4xS/Yt28f6enpXXIiBBIjtf/sbsiThLI/yx+MIJDua25u5uWXX+a1114jPz+fn/3sZ4wbN66L05FCoZADjqSMWv7EYPsgEMJdp9ORn5/f5VogbBcS+tQMXnrpJSIjIykpKeHSpUtyRVNSUigoKJANHtKA6U+98f1IibBRpVLJjDLdmZOkASKdFHTHmjVrOHfuHLt27SI5OZn77rtvYF/dByRPy8FMgkAZfEbinYMVBAcOHOBXv/oVRUVF3H333Tz55JPXJYmREBISwpIlS7BYLAHNMdgdI9WfDoeDixcv4nQ6ycnJkdtgoCc0/kafwuCb3/wmGo0Gm82G3W4HOiun1WplRxLpmvRHUgF7mky9faRkPOy+Ovi6J3eHdMS5fPlyTpw4wblz52hra5PzCQ4Vg92vjZbjx4EI4+F8N8Abb7zBG2+8QXt7O48uy0KvuMRXvvKVL06DVIjiBO78j2f4RsF4Yg0aOSOzxJno7y3ejaC3Y1R/9q3VamXnzp3U1dUxfvx4NBpNQLefvQoDURRlp5qeIGW1lT5A+oi+sg1J5Xb/YCngZyiGutzcXCZNmkRlZSUnT56koKBAfs9Q9ruDnVCjxXYAgauL0+nk7bff5uWXXyY0NJSvfe1rLEtzs/WDz7EoEvn6c3eR4bJRf2ozL/38JSKN32Ht9CRidIK8/ZT8SwJlO/AdlyMl1CVPTylZbaDR78i32+10dHTgcrkAZF45i8XSY5CFb+bh7vDVILpfk3wYBgNR7GSyWbVqFWq1Wk7J7Vv2SKAvQ+M/MtxuN1evXuWnP/0pL774IlOmTOGJJ55g1apVX+SoNGKOzmHeypWsXr2Krz6yhtm2nRwqukJ1sxOPx8OBAwfYunWrTK03WtDb+L0RiKKI1WrFYrEAnQuPTqcbNVukPrcJ5eXlfPbZZ9TX1xMbG4vJZKKiooKWlhYeeuihLslRJQzGbuD7zFB5AURRJD8/n927d3P69GmOHz/O/PnzB13OGAYHl8vFxYsX+e1vf8uhQ4fIy8vjkUceITs7G51Oh9jaTctTqglJmsKMmBZeuVRGY+sUxEgjlZWVlJeX43K5AuqfP1LCXDK2Q6cBMS8vj4SEhNEdmyAInSrcoUOHKC0tZcKECcTGxsrkEv46ClEoFHIatqGqiEFBQWRmZnL06FE++eQT8vPze2S6GYN/4HQ6uXjxIm+99RYHDhxg1apVPPDAAyQnJw/IV8DpduP1fpnkpid70UhgpC33gtCZWVv6Vr1ez4wZM7Db7aP7aBEgPj6eFStWUFxcjFarxWQyyR6I3VOYDxWSnwF0Jm8dSge53W6ysrJITk6mqKiIw4cPc9ttt/mlfmPoivr6es6ePcuuXbs4duwYjz/+OP/0T//Uv/AVvWCro7bFyKSCJMJCOnMExMXFAf+YJzE9wTd3qMfjobm5GZvNhtFo9GtWpaGgTwNiZGQkM2fOpLKykgsXLsiOQdHR0eTn5/slsEJaRYbKAyf5vsfExLBw4UIqKyv5/e9/z9SpUzGbzbekM4u/IbVxTU0Nn3zyCR999BFqtZoNGzawdu1aoDfXaDvWtkpKiooI8jqg+lOOts9i4eTxxIZpUSoFVq5cidvtJjg4+JbrK6vVyo4dOygrK+Nf/uVfeiX9GSn0K4qKioo4c+YMCxcuZNWqVfLK3Zc66Ha78Xq9cgixFO0oqUm+EtDXP7u3FFZ9QRRFdDoder2e2267jZqaGl566SU2bdrEQw89dEsa9vwNp9PJ+fPnefHFF9m7dy8LFizgmWeekZPi9jgOlFr0xjYaSz7lubvfANRALmtefIF7ZsQT/4VWfCtTx3m9Xtra2mhpaRkVpwn9CoOIiAiam5s5duwYYWFhOJ1O9Ho906dPv06aC4KA3W7n+PHjNDQ0sHDhQmpra/nNb35DS0sLRqORhx56iMmTJ8sWVIn8QqlU0tzcTFJS0qAnsGTNDw0NZd68eRw6dIhf/epXLF++XM7+NIbBQ2q3/fv386Mf/YhLly7xzW9+k29961uEhYUBfQRLpSxh/fOLuf/56wrFtzc+++wzysvL+drXviaHo99KkMhnbgphEBYWRlZWFsXFxfzlL3/BbrcTFRVFRkZGl32iIAhUV1fzyiuvsGXLFhYvXsyMGTM4cOAApaWlbNiwAZ1OR2xs7HUrgURzJllUh3LeLN0/YcIE1q9fzyeffMJrr73Gk08+KVOsjWHgkATBq6++yv/+7/8SExPDb37zG5YsWTJwx65uE7+n8quqqrh69eqQJkMgPT/9Aa1WS25uLuHh4aP7NAE6Gzs+Pp7Vq1ezZ88erFYriYmJmM3mHqW4VqslKyuLK1euoFKpcDgclJWVYbFYuHr1KhMmTJDTrwNUVlZy9OhR9u7dS2lpKZs2bUKv15OVlcWsWbO6MDJL9YG+O19iLlq6dCmvvvoqS5cuJTs7Wzbc3OwDqD/4w0Lu9Xqpq6vjV7/6FX/729+YM2cODz74INOnT/eL4di3D6So1aEIA+mIrje/lhutY3fvQ+mav96l0+mYPn06U6ZMGRWnCX1u1gRBoLm5md27d1NYWEhpaSmFhYV8/vnnNDc3X9dYISEh5Ofnk5OTI6/uRqNRTje9ceNGCgsLZccgqYE1Gg3BwcFYrVbcbrccoThUxMTEsG7dOlpbW3nttddoamrqUs8xLaF3SBre888/z3vvvcfy5ct54oknmDlzZo95CYcKqR8SEhLIyMgYkuNNb56r/oSvq/xwjBuHw9GFKDeQ6HebUFZWRkVFBWFhYZjNZpqamvB4PJw/f14OS5agVqtlJtuWlha0Wi0zZ84kLy+PqKgoWaikpaVhNBoJDw9n+vTpCILA9u3byc/PJyMjA7PZfN1RVW9cBz1dCwoKYvr06axYsYItW7awatUqQkJCrmNRGs0Y6gp/IxPD6XRy5swZ3njjDY4cOcKGDRtk0tjuPBS9YaD1lu6bPn06kyZNGhIfxXAaHn1dkqV6+Vvw2O12jh07xunTp3n00UcJCQnxW9lDQb/CQOIibG1txWKx0NzcTHJy8nUqvAS3243T2elq6nK5qKmpkdVAh8OBXq+XVfbg4GCCg4OpqalBqVSSmJhIVlZWr6neof/BLg2yqKgovv71r7N37142b95MSkoK48eP7+9zRwV8WZSGMuCHIkiampo4ePAg7733HmfOnOGhhx5i/fr1hIaGDjqIqL/3+5ZlMpkwGAwBPWPvq76+AWD+1kBcLhfV1dWcO3cOl8sV8IWq3x4YN24cWVlZVFVVyZNWr9fLx0rdodVqSUpKwmw2o1arsdvtnDhxgtDQUNLT05k3bx5RUVHX7d19YxN6apDe9mq97es0Gg35+fmsXr2arVu3MnfuXCIjI2VVN5Bx4wPBUAfFYJ/zer1UVlby2WefsWXLFurq6li5ciUbNmyQJ+hgy+yvXX1/lzImz5s3b1T5GviOz+5jTLo+UDtCb2PNNwJ4NIzFfg2I0uQeP348RqMRo9FIampqj3scURTlJCkul4vIyEiWL19OfHw8bW1tTJw4kYSEhOv2h6IoyoFQNwrfRlWr1TzyyCMcP36crVu3kpyczLRp04ZtFfKXgJFWo6FMjMHUwWKxcOrUKbZv386JEycICQlhw4YNLFu2DI1GI9PH+3ug+qrgp0+f5tKlS0yePDlgLuQ9bT17a8fuwkCKjO2pnJ6e8YVarSYpKYn8/PyAE8LCANiRa2pq+Otf/yrHXLvdbmpra2ltbSUoKOi6Z6T8AvClUXHBggXy7z198I2oxN3r2x0ZGRk88sgj/M///A+ff/4548eP76KZjFYM1Wo9kOcEQaC1tZXPPvuM3/72t1y7do2HH36YRx99tIv/wEio7lJdBxuxOtzwbcfetARBEPrk3OgPer2e2bNnM2vWrBuKzfEX+u1tq9WKTqdj+fLlrF69GviSyLG3yg/GYi+Kopw0ZLgG3/Lly9m6dSsXL17k8uXL1/E0+gujQdUbSB3a29v5+9//zgsvvEB4eDg/+9nPuOOOO/xC1T3YZ6RkNqPJC7EvXo3e/t0X+uL2cDgcWK1WzGZzwNug37dL3HWvvPIKDz74IF//+td57rnnKCsr67MxhuJW7HQ6B/XMQMs1GAzcfffdlJeXc/z4cb+/42aBIHRSl//mN7/hiSeeIC8vjxdffJG77rrrutwTkgo83Jg/fz5f+cpXRg1/5UjC4XBw7Ngx/vCHP8gcB4FEv0txVVUVarWau+66i/z8fOx2O8HBwURGRvZb+EAFglarJTY29jr+eH9ixYoV7Nmzh7KyMkpLSxk3blzA1bKRhCAIlJeX88ILL7Bx40Yef/xxHnvsMZKTk3vlkRhuTUcURTmYzN+0ZzcDPB4PLS0tXLlyRebeDGQb9KsZeDweWltbgc6cguPGjZP52vwFl8tFc3PzsBir4MtgpoULF1JTU8PHH38MjA61fiTg8Xg4deoU//Vf/8X27dt5/vnneeKJJxg3blyvW7ORYm+6cuUKRUVFtLW13TL94QtR7MwvcVM4HZnNZsxmM6dPn6apqQmFQkFUVBT/9E//RHx8vF8qIRFcDLd/9oIFC/j88885ePAgS5cuJSMjY1jfNxpgs9nYv38/r776KiUlJfz7v/8769atGxUBXIIgcPHiRUpLS2UmrVsJSqUSs9lMampqn741I4V+jxbDwsJYu3YtRUVFOBwOjEYjJpNJzorjD6jVakJDQ4dVOkr8DOnp6Vy4cIGtW7eSkpISsCw+ww1BEGhra2PTpk386U9/wm63s379eu67775RtT+XCEFH22nCSECtVpOZmYnRaPQbWdCNoF/NQBAEXC4XTU1N2Gw2ORGGPy2fSqVyxLzQ5syZw/nz59m9ezfTpk1jzpw5w/7OkYbkLv7ZZ5+xfft2lEol999/P2vXrh1VggCQ09b7MgDdKlAqlZhMpl6TD400+g1UamhoYOfOnZSUlNDS0sL58+c5f/48ly5d8puaqVAounDDDRdEUSQ7O5slS5bgdrv561//6jdnp9ECu93O1q1b+cMf/sC2bdsYN24cTz/9NPfff/+wHaneCFJTU5k6dapfNc2bBW63m6qqKrZv347NZgt0dfrXDBwOBzabjejoaMLCwigvLycoKIiWlha/VUJiRrZarcM+IDQaDTNmzODChQt88MEHFBYWMmfOnJt+IIqiSGtrK7t27eLXv/41KpWKu+++m5UrV5KWljZqvy89Pd3vaeFuFrhcLsrKyvjoo49YuHDhsCUPHigG5GeQlZVFSUkJ7733HgcOHKCqquq6HHG+cLlc2O12+dzabrdTV1cnp23v6f7W1tYRcbqQOBoWLVpEdHQ0v/jFL/wq2EYSkuHV5XJRX1/Phx9+yA9+8AMAnnrqKR577LFRLQgAWlpaqK2tHXV5E0YKvlnJAo1+DYiiKLJo0SLi4uKoqqoCICUlhaCgoOsGmSiK2Gw2rly5QkdHBzk5OQCcOHGCAwcOMGXKFPLy8ggNDe3RrbO3LMz+hrRdWL9+PU8++SSbN29m5cqVmEymETtS6ylQq7egq+7XoFPFbG1tpaWlhY6ODvbv388Pf/hDFi5cyAsvvEBGRsZNcXZfWFjIlStXuPvuu0lOTh719fUnJC5Ro9E4+oWB5MP+8ssvYzKZWLNmDWfPnuWVV14hIyOD6OjoLoPaarXy/vvvs3HjRtLT0/ne975HVVUVv/3tbxk3bhw/+clP+Pa3v82iRYvkuAbJGOmbZ663KDFf9BWQM5BgHYPBwPjx41Gr1fzwhz+kra2N9evXDyujskSQIQgCDocDpVKJRqPB6/XidrvlbFRS4JbNZkOtVssnHu3t7TidTlwuF8XFxXz00Ufs378fu91OQ0MDd955J7/85S+JjIwcFYNrIGhoaKCmpuamqa8/oVarycjI4OGHH5Yzmw+HgX6gGJAHotfrJTU1leTkZBwOB3l5eRw6dIhVq1Z1uVdiRdZqtRgMBpqbm/nwww+Ji4vjqaeewmq1cvz4cdLS0pgwYQJutxu73U5zczMWi4Wamhrq6uqw2+0oFArCwsIwGAw4HA4sFgsulwu3243JZCI0NBSn00ltbS1OpxO3241OpyMqKkr2tmtoaECv16NQKEhMTCQkJISamhqsVit2u53NmzdTU1MDwPe//30OHjyISqWivr5e9oqzWq24XC5UKhV2ux2lUolCoZAntsvlkmPRJUgd6RvsI9VRgsvlQqFQoNVqu7BJS45Xbrebjo6OLsLAZrPhdrtxu904HA457Z1GoyE3N5eXXnpJzll4syA8PJzIyMhb8mhRqVQSGRkpx+X0FS05EuhXGISHh+NwONi1axeNjY1cvXqVsrIyFi9e3OU+UeykOFu2bBmiKNLQ0IDT6aStrY3s7GxMJhOZmZkUFxfLHo1VVVV88sknfPDBB5w6dYqysjI2btyI0+nE6/Wyfv16li5dyunTp3nnnXeor69HpVKxbNkyHnroIa5du8avf/1rSkpK0Gq1zJkzh3Xr1qFQKHjttdc4cuSInPxlw4YNTJo0iU2bNrFz507UajVnz56VtyZtbW0cP36chIQE2ZjlG5Cl0Whwu91yWLc0YX19+UVRlIWFFP4rseN0Z8vxjdKUJrtarZavabVaNBqNTDMvJSfVaDRotVoKCwvZv3+/LAzMZrNMOHMzqdpJSUno9fqAs/wEAh6Ph9raWs6fP8/s2bO78INKuJGgscFiQE5H69at48iRI1RWVqLValm4cCEpKSnX3a9UKgkJCcFoNNLY2Civ/BaLRR7QDodDNpqEhYWxcOFCgoODcbvdLFy4kOzsbJl3Lisri5CQENLS0rj33nux2+1oNBrGjRuHWq0mPDyc1atX09zcjEajIT4+nrCwMBQKBffeey/z5s1DEAR0Oh0TJkwgJCSE2267jaysLBQKBUeOHOHHP/6xnN7qm9/8ZpfkML4Wbt/9tzShfY0/fdkA+op68xUKvvYKSZBIfJAej0fWHBQKBbNnzyYyMpK9e/cSHh7OunXr5PfeLBDFzkzf8fHxo4rYZKTgdDq5dOkS77//PtnZ2ddRAoy0pjAg2rOoqCiCgoJoa2vDbrfjdrspKysjOzv7uvtdLhcWi4X29na0Wi2JiYkUFRVRW1vLyZMniY+Pl70NpRyJoijy2WefkZuby2233SZPPI1Gg0qlIjExUeZblNKxKRQKjEYjs2bNkgkmfDNAT506tctkla5PmDCBzMxMoDN9XGlpKR9//DHf+MY3WLNmDXFxcb2SVQxWSvt2pO9+sL/Y9Z6IM7r/bjabiY2NZcWKFQQHB4/48ai/ViyPxyNvkwINqX9GavJJW7+GhoZejecjWZ9ehYHH40GpVNLW1sbevXs5evQojY2NNDU10dDQ0GvIpSAImEwmIiIiCA0NpaCggJKSEt5++23UajVz587tkl9PMpZI6d11Ot11LsLSvrkn9JbiTSk64cp2/vv9k9icX7IthyZkMmX2HGbkpBAdHc3ixYs5f/4869evvy6nQ198DQNBX0QufT5nr+FaySF27T5Kcb0aQYgnd9GdLJ4WjSm4U5CEhobKBLJ2u52YmJgRFwZer/eGvEYFQaCkpITq6mry8/OJi4sLqHbgz0k3EGEp0fP1dpow0raDfoVBU1MThw8fpqmpCYPBQEtLCwaDQd73+0KKDszNzSUlJQWz2YzJZGL16tVcunSJe+65h1mzZl2Xyl0URXl1GAwxSp9wWXEXf8R//+wIE++czPiwYHS2Si4dK+RarR19zMNk65QEBwcTGhoqGxr9uTp03xIMyELsqOVq4Sd8um0bRS1aFO4gsFxm4/lyxKcfZ9HkGMK+oNh3Op2UlJRw4cIFHnzwQbmIkVAt/dVGFRUVXLhwYVQEjY345FOpiI2NZd68eaMib0KvwkAauBqNRua2l6jGJQt/T9BoNKSlpXVp2BUrVnS5p/tk93q9dHR0DOkD+pbACmAWX/v+D1mbHUdE3Xbe+Y9fsOVIESfueogpEzs7Iz8/v9dYcn9OrIGU46w9yd6tn7LpVCgP/Pw/WZ8ehLd2O//5nbepbLLR7kQWBjabjTNnzrBt27YuwmAk4Ev5dSOQtk+BZvkJBNRqNSkpKcTExIwKA2qvwkCtVtPS0oLH42HatGnYbDZsNhuRkZE4nU7mz5/fZ8HdJ1Z/xA1DcTrq38AiAo2UnjlBUUclpuZiTrQItIWYMQd1bklycnJIT08nKChIrmMgj+Zaykq43CDinbScBRPCAVDEreT7f1rRY70kYyswKuo/WISGhhIbGzsqVkZ/YiB9IC2CDQ0NBAcHB1wg9rnh27dvH/v27cPtdstGO7VaTXR0NA0NDZjN5gG/qC9BoNVqiY6Oxm63D7zmDERVFYHdvPL0Qf6sVqLAhc00gzsfmEX+OC+iqJBdpyWtpy/+u5GApa2BlpZa6Na0PdVDpVIRHh5OUlIScHOdJEiYP38+Ho9nVMTzjzTsdjuFhYVs3LiRn/zkJ8TGxgZUkPcpinwlVWRkJMnJyYSHh/uV5Qi+tBm4XC4/DwgFsJafbi/kRHk55eXb+P3/02M7t5HXdnT6QRQXF/Piiy/S2Ng4KgajOTyeyKgkEL18WR0Rr8eDVxSRLoliJ/P04sWLeeqppwJU2xuD5JchJeq51SC5I1ssFpxOZ8DHX689IIoiixcv5vvf/z6PPPIIFouF999/n4MHD8oeiX6vzDDnzesOj8dDc3MzR44cwWq1jorjrdDxmWSG2VEeepX3j10DtxXvlVd4MHcCT71+juLGL+8VBIGQkBASEhICV+EbgCAIss2joqLiptre+AOS743dbh8VY6/PbYJWq8Vms/GXv/wFj8fDv/7rv1JdXc3Ro0fZt29fl3wINwLJrdf/yS29wMf8dN1+/k+vRoWNVnUkOaseYElBOB6Pjba2NjlOYDQMRkVYHnc88CjGyD/z1o+WkletB1c0WUt+ygPzEhnnwwxmt9spKSnhypUrMo39zYaqqirOnz9/0wq0G4Hkjjxt2jSCg4MDPv76PSRua2ujrq6OnJwcCgoKKC0txWKxyBGM/mB0ldQlv0YtakJQz/wX3n53DS6Pj9TVmYgal0J6iAplh5LQ0FASEhJGj5qqDMaUPIu598YQPbmSWosAhBKXPpHMJAO6L3pMCnY6e/Ys27ZtY/Xq1QiCIMd1SH4box1SCPZIRayOJki0Z+Hh4YSFhQW8vwbkgahWq9m7dy8tLS3Y7XbOnTuHRqOhtbWVNWvWEB4efkOTSTJM+jVYRalBEZ3Dkttzer3Fo9UyceJENmzYgNlsDnhnyFAZCYnNIS+297pLsNls1NbWyv8P9L5zsDCZTISHh8sGRMlYfStAYviKiIgYFeQu/c5gk8nE3LlzSUtLk8krjUYj06ZNk/nbbhSCIKBSqUZ8dVAoFAQFBREfH3/TrKS+UKlUhIaGdvHcU6vVo2bL0x9EUSQ1NZXZs2fL4fA3mzC7Ebjdbq5evcqf/vQn6uvrA2436FcYqFQqDAYD2dnZZGZmotfrSU5O5rbbbuPee+/1S1ooKRBnpBvD7XZTXl7OW2+9RUNDQ7/vH02DVYpyzMrKYsWKFXK9pECmmwUhISEyTbq/HJl6g+RCPVr6UOJA3LJlC21tbQGvV7+jRuLVKyoq4sqVK5SUlGCxWDh06NCg8hxIE6mnD/Z4PDIlmj8bpL+yXC4XVVVVvPfeezQ2NvapmfRV/0BA4kpIS0tj2bJlvbIa9VXn4fqWgbaTxDtx4sQJGhsbh53UY7j7cChlS8Q+o0Gb61fHl+LpW1tbUSqVpKenk5aWRl1d3YBe4HQ6KS0tpaOjA0EQCA8PJyIioosgkQaBP7cJAwn/lLYnvuHI/SHQHeYLj8fDtWvXqK6uZtasWT3eI7WD7yQbTd9QVVXFmTNnMBqNxMTEDOu7emPSChQhqyAI6PX6G7a5+Qt91sDr9ZKQkMDMmTOpqKjg6tWrBAcHc/LkSZYtW9Zv4V6vl8rKSn74wx/y7LPP8oMf/ICtW7fS1NTU5T6VSoXJZBpyg/QkjQeyykjCQKfTdSEq6e3ekfaD6AsKhQKn08m+fft4/vnn8Xg8vUa++TIvdf9tOCB5cg5kJdZoNDL123Cjex9KR9pWq9XvgWkDgVqtJi0tjccee4zIyMiAC4ReNQNBEOTIxDlz5hAWFobFYkGr1SKK4oCizOx2O+Xl5djtdr797W8TExNDQkLCdUEZkieav6mf+gsj1Wg0pKen853vfIfk5OSbzootee91/z7fyEvfgQ8jqxX4cjL09l6JACcQtGdS+/THL9EXpLEq2b2AAY8jhUKB2Wxm+vTp/R7Rj0TMyXW19o1T37hxIx0dHdTX13PmzBmqqqpQKBSkpqYSEhLCwoUL+32B3W7n6NGjfP/73yckkouINQAAIABJREFUJITHH3+c2267DbPZTHV1tUzftWfPHkwmE2VlZWi1WtauXUtWVlYXHgOpwftq7ME0mkKhIDIykmXLlqFWq0fNqj8YSIFKvgOpJzU4EIJhIAbBjIwMwsLCiI2NHda69Ia+uDIGi8Gu7F6vl8bGRs6ePcu0adMGnGJtuPrvulnl24GrV6/G5XJRWVlJRkYGjY2NxMbGMn369AGRaWi1WrKzs3n++eeZMWMGH3zwAR988AEmk0kWJFIIqzSgpVTvPe3jexpcvqpo987or7EkW8jJkyfJyckhNDQ04KraYKBWq0lISGDq1Kk4nU55UPtOeqkNu5O2jITgG0j7x8TEEBkZedMHKg2F38HtdlNdXc2bb75JQkICKSkpvQpP37IlLcrfJ0d96jMhISH89a9/Zc+ePUDn4Dt16hTXrl3jmWeeAfq2SNvtdqqqqmRK6OTkZE6cOCGnkgoPD2fu3LnExsbK24977rkHtVpNWFhYjxK7v6jCwXSIdLTz8ssv893vfheDweD3IKzhgrS1ys7OJiYmRm4/X/RmNxlJKq3+YLN1uoTrdDoiIiJuOoHgj3aUEg4NFL3R8t0o+hQGJ06coKioiJSUFHJzcwkODpZ94fft28e8efP6LFyhUKBQKLhw4QK//OUvqa2tZcaMGaSlpcmchVFRUbhcLsLCwnC5XCQkJPRKZdYbhtoootiZ7ammpuamG4TQWf+Ojg5qa2tJTk7ucd85Gui0eoKknVRUVFBSUkJycvKoSwo73BAEAa1WK9vQBjoGAyIMSkpKMBgMLF26lGnTpqFSqZg0aRJ79+7l2LFj/QoDrVZLSkoKBQUFNDQ0kJaWRnZ2tjxw4csGEEVxxMM4pc64mZKOSBAEAY/HQ0lJCX/729+YOnXqTWcABWhqaqKiooLw8PBAV2XEoVQqiY6O5t577x3U8eJwjdU+R4+kwl24cEH2kHK73TQ3N2O1WvstXDLQ3XnnnV2ud5/wUjKRgZTpT0hRY8uXL/eLJ2Ug0NzczLlz5266QB9pq6JSqW5ZPgPpNGHRokWj3+koKiqKgwcPcuDAgS57Uo/HQ0FBwYBeMFBPtEA4fSgUCqKjo7n//vtvylUVOo+xurNJ30yIiYnB6XTekpqBKIpYrVbOnTtHZmYmRqMxoEKxzxkwe/ZsgoODaWtrk/0AvF4ver2eyZMn+60SkqFrpAe0RC5RUVFBXFyczIN4M0Dac0tJZvx1PDaSEEWR5ORkEhISbpp29yekjEqvvfYa3/rWt+RkuYFCr8JAOvbpy0XUn5NXoikfSXg8Hq5cucKPfvQjvvvd75KTk3PTnCZAZ5vNnDmTnJwcdDrdTakdSLkjpQQ4txq8Xi/Nzc2jgvas3/RqI4FAawbXrl0bBv7FkYGU0vtmhCAIVFVVUVZWRkREBNnZ2TdlH9wIRPHLhLqB/vZRY7UJlDCQjhdvBmHQ3c9fFEVOnTrFL3/5S9ra2gasao+m72xsbOTy5cs0Njb2f3MvGE3RpIOBlCLw9ttvHxUG7FEhDHwDW0YSSqUSo9HIhAkTRtWedSBx91J9a2pq2L9//6DLHk3wer2Djk3wjQXo7o490OcDJUB8PWajoqK4//77R0VszKgxoQ8mjNhfUCgUJCQk8NxzzxEXFzeq7AU9+Z/35G3p9XpxOBx9riq+ZQ03Z8BgERwcTGRkJCaTqf+bfeA7mQdrawi0FuHbj5LNQEoyHEgMalQMtzQd6U6SJoZOpxsV57wSBhouLQgCoaGhpKWlDartRuI7BzJWRFEkPj6e6dOnk5qaOuhvkITAYN2re+I1CAS8Xi8NDQ1s3LiR6urqgERu+mJQwmC4G2+khYHX66Wuro7f/e53XLhwAafTOaLv7wsDCfIBSE1N5atf/SoajabH9vN4PAFxSBroWAkKCsJsNg86vVpvAmCgYyjQggC+dCc/d+4c7e3tNzz+b/T5QeuLw02IMZIQRRGLxcKOHTuoqKjA5XLdcHn+wkBX1rCwMCZPntxrPEd3YTDS7t79/d7U1MTFixeprKwcFRN0pNGdbGUgGK4+HPbNo2StP3/+PGfPnsVisVx3jyQIRvp4RRA6k68ajcZRZ1QbiHAUBIHa2lr27t3baxZrKVhstE602tpazpw5Q0VFhV/K6+07extXN7oI3cjzgiAQFBREeno6er1+SLYc38S7EtxuN1arddAa4bALA4fDwbFjx3jzzTd55ZVX2L9/Py0tLdfdJwmDoWCozMqCIMjh0kN1eHG73TgcDtxu95AGhdfrxWaz9dhxfZUn/Xbp0iVef/116urqerxfclfurcyOjg45q9RQ6t7x/7d3pcFNXWf7uVqtzZssWcaW9xUMpiRshuBCCCRAGRgmzNCWtpOmTSZN+4P2R6aZoZTONJMMnTZDUwj9QxZoKENDJ4StpiyxDcE2BmNkhC1v2MiSbUnWLl0t/eHvnO9aSJbkAIHEz4zG8tXZ7lne8573vIvbjXv37k37KOL1euFyuaa9CbjdbgwNDVGz+GQQDAZhsVjQ19c37bEbHByE0WicVv/xeDykpqZi0aJFSfnS4LZ1cHAQ3d3dk27khoeHcfbsWej1+qT69r7aH6SQkDTsz3/+M0KhEGw2G95//320tLRQ7zvk5biOGhIdGIZh4Pf7MTAwgNHR0WkNqEgkwrx581BSUpL0bQLDMBgeHoZer6fefZPNT5yrEBdzySIYDFI9iWTBMAx0Oh0aGxunFevQ7/dDp9PhwIEDsNls05o3LMuCZdlpjR3DMOju7saBAwfQ1dUVN23k/w6HA+fPn8eePXumVbfX68UHH3yAY8eOwWQyJf0OxLnOp59+mrAAkSx6snmeOnUKH3zwAVVPDwaDuHPnDnbv3o09e/agqakJFoslpo9MLh4qZ+D3+zE2NgYej4cdO3Zg9+7dyMnJgdVqvY+SE3fpyeLevXt47733cPbsWQDJyTTIzmAwGCAWi6fFpl25cgVHjx5Fd3f3pOfcQYv1CYfDuH37Ng4dOkQXY6IfAhJKjQjgki3jxo0bqK+vR29vb8z8sRAIBDA8PIyGhgb4fL64PvwiP8S9nkwmg1QqpdxdtLSx8rMsC71eD6vVSp8RHQ1uusgPkaWMj4+js7OTcpfkt8h05Bn5TlSoPR4PdXceCAQm/c7NS55xP9z4omKxmOpbTPXx+/2UgBIHNwzDgGVZKgB/5pln8Pe//x12ux07d+7E/v37YTAYJm3A0RDV7dmDAmGByYsrFAqoVCoIhcKoLs2496yJtiMUCsFkMsFqtSadlygduVwu2Gw2BIPBpA1+yGLkXnMlA4VCgfT09ITr5XJu3CtIs9mM3NxcuiiJ+2/yeyzZgVgshkQioX0fqQDEsiycTieAyXYEYrEYTqcTJpMJXq8X/f39NJI1dzGS8vx+P/h8Pv0/GAxCKpWipaUFt2/fpkc2oVAIi8WCcDhM3dhznaby+XwqW+LxeOjq6sLY2Bhu3LgBu91OIxqT4D/AROwPco72+/0IBAL0iNPR0YHBwUHs27cPfr8fAoGAOv4VCoVwuVzw+Xz0TO/xeCAQCGicjS+//BI8Hg+NjY1QKBR0gVqtVqhUKrAsS6OFkXM8UYMPhUKw2+3o6emBxWJBKBSifUCID5lXEokEJpOJ6pTw+Xz4fD709vbC6/WiqamJGhN6PB6kpKTA4XDAYDDgj3/8IxobG/GrX/3qPncCXDxULQdyh08mhs/ng8fjoQPJTRcOhynLlpmZiZSUFNqJxIiD+Mnzer30jGqz2aDT6ajrKI/HM6kTye6lUCggl8tpCGxSv8vlwrVr17B3715kZ2dPMgcmC4e0j7CzZFKKRCJ0dnZieHgYBoMBx48fp2lMJhNEIhHEYjEEAgFdAESngcgYBgcHcfv2bdy5cwdpaWk0HXcXI5Of7AZE2Yg41Ozu7sbQ0BCysrJoP5A+Jm0nk5DsUmRsBgcH4fF4cPr0aWRmZtJyyftzFZW440Cej42NQa/XY+fOndTLMJdgkfayLEuJAekDwpl5PB5cu3YNcrl80pGRfA+FQrRukUhE5xTJr9PpEA6HkZ2dTecUabPD4aB9IBaLwbIsHROn04n+/n5YLBY0NzfD4/HQMSc7Lul74jCXtI343xgfH4dKpYJUKoVAIKB9TmQAhIjweDzI5XLKRQiFQvh8PthsNty7dw8qlQpKpZLOWzJ+ZM4rFAqUlpZCKpVSoiWXy9HU1ITR0VFs27YN4+PjVCgpFArx+eefo7e3F7m5uVixYkVcS+OHSgyIcC4tLQ2HDx+G2+2G3++HWq2eFERFIpFg7ty5WLduHViWhclkohSSO5G5ikFkUpKFz3V3zRUGCoVCzJo1iy5eqVRKhT1kQPh8PlJTU5Gamgq5XE7jKPh8PgiFQqSmplI2j0wMMiFsNhscDgeysrJQXl5OF3lhYSF9B0LUGIahV4BkoDs6OmCxWPD0008jPz+fCiMJsROJRHC73ZDL5XC73RAIBBCLxbRPurq64Ha7sXbtWsyZMwcOh4P2B5fb4go4g8EgZDIZMjIycPbsWXR3d2Px4sVYtGgRfD7fJLaW1Mfj8eD1eumCACa4iCtXrmB0dBQvv/wysrOzJ3EehBDweDwEAgG645HyQqEQrl+/DoPBgLKyMsybN+++cSZ/uY5duUTniy++gNPpxIsvvojFixfTuskxLBAIUMJPiAIp3+Px4NKlSzhy5Ah+/etfT+JWI6/7uPIs0gdutxt/+ctfoFar8b3vfQ85OTmT8nGPWdzv5B2CwSCsVitGR0exefNmFBUV3SfsJe9B5jr5S8bW6/Xi7t27eP755+lmYbfb8cknn2B8fBzr1q3DmjVrsGzZMqjV6imPcg+dM8jOzsaPfvQjahmYn5+PioqKSYtXKBSipKQEP/3pT+H3++nOFWm8FNmxRAik1+tRXl6OdevW0UXHHURSDsnD3fn6+vrQ2tqK1atX0ysecozhcgDcHY8sMLLDBwIBVFZWYu3atZPay2XNuQuD/MYwDNLS0mCxWLB8+XJUVFRQroCUQ7gKciblLgYAaG1tRU9PD5YtW4YlS5aAZVlaNvfDdZdO2FGyw2q1WixYsABLliyhRIZwCKQ+sktyJzVhn10uF5599llkZmZGnQfk/SPHAQBUKhXKy8uRm5uLyspK+nuiEAqF8Hq9WL58OaqrqwEg6pyJhkAgAKlUCplMhnnz5t33e2RbIssNBALYtm0bpFIpampqkJGRkbQQVaPRYPv27aipqaHRmJMpo66uDuPj48jMzKTz0+l0QqFQ4Ac/+AHKy8tRXFyM9PT0uOUy4YgUD+OenwgSASA9PR0pKSn3DVIka54IGGbiNuHYsWPQaDRYuXJl0u232+04deoUVqxYAbVanZTLboaZkGYPDAxAo9Fg9uzZSddvMplgMBhQUVExydsPtz/IpIycnAzDwGg0or29HdXV1TQac7w+5KYxmUyw2WzIyMiAWq2Om4/UC0xwGGNjYzCbzaisrJzS41Ks8fV4PHC73RAKhVR2kcwccDgcGB4ehkajmZYpt9vths1mw6xZsxLOQ4gkMCGPING8uRwpN81UIIuXK7eJtxbIZskwDJU9SCQSSuitViuGh4eh1Wrp0SsSUZ89CmIQa+FHexbJZiVStsVigVAoTDgIRSQIBzAd4WkkO/mg8nPP/ZHn70iCwM0TbxJyy+WWkUj7I8cokXGNlZcLMonJOCRzqxNr5042fzJ5Y0WJ4paRKDHgtiGRdpDxi3XbMxU3E6tO+uxREIOHjYe1IJPJGy8/V6gWLdhLLAIZj0B91cXALSOZ/ESWw7Is5QiS3dWBidsKn89Hr0eTfQdi7KNQKJKyb3C73QgEAtRNOcuy6O3thUKhQFZWVtzbHe67E9be4/HA7/fT8PKxQLgBi8VCPYX39vbCaDRCqVQiLy8PMpksZl8EAgHY7XaIxWLIZDK43W7cvXsXJpMJFRUVUKvVSc0bAv6uXbt2TZnrCQAZiHih1yJB7pkHBgZgsVioRDhRjsRut8NoNNJrJsKqxQL3HE7Sud1ujI6OUkFjZB1T1e/xeHD37l10d3djdHQUfD4/6hFsKpjNZjoR/X4/JBJJQtqYLpcLer0et27dgtFoRFdXF1Qq1STBcDx4PB50dnaitbUVFosFcrkcUqk0obzh8IQz0Zs3b6KhoQFWqxUSiSSuWm8oFILFYkFrayuMRiMKCwvh9XrR2tqK48ePo7e3F1lZWVAoFFH7IRyesGdpbW2lZ3OGmfDY1Nrait7eXhQVFcWchyzLwmg0orGxEQ0NDaitrYXVasXhw4dx4sQJ9Pf3IzU1NSZBIm29evUqxGIx0tLS0NHRgX/84x/473//i3A4jMrKyrjr4IkmBrF2yUAgAJPJBJ1OB5fLlVRYb6vVis8++wwfffQRLly4gLy8PKoHMRXIWe38+fM4evQoLl26BJvNhoKCAshksph5iACR+x6NjY347LPPkJubm5SHYIZh0NnZiX379mHPnj1obm6GSqVCSUlJQgSRYRi4XC4cOXIEBw4cwMmTJ2Gz2VBYWBhTEMjFwMAAPv74Yxw7dgyffPIJDh48iPXr10+SqMerv729HQcOHMCHH34Ig8EAgUCQsKPdQCCAy5cv4/e//z36+/tx7tw5hMNhFBcXx5QdMAwDp9OJs2fP4sCBAxgbG8Nzzz2Hrq4u/OIXv4BGo8GZM2fg8/lQVFSE9PT0+8pgWRZXrlzBK6+8AqVSifLycng8Hhw5cgR79+6F2WzGc889F5UoMgyDkZERHD9+HO+++y7Gxsbw4osv4uLFi2hqasJTTz2FlpYWmM1m5Ofn3yfDIQLvHTt24MKFC5g9ezYyMjJw6tQp3L59G5s2bcLRo0exYsUKSqSm6v9IPDbOTaYDQpHfe+899Pb2YuvWrVGlwtEQDodx584dvPXWW3j99dfR1dWFvXv34o033sD8+fPjsqs6nQ4nT56EVqtFeXk5GhsbIRAI8NJLL03ZXu53v9+Pffv2obe3F9/97ndRUVGREJtMynE6nUhJScHPfvYzPP3006ioqEhKpbq9vR16vR6vvvoq8vPzqfJLcXFx3LwlJSXYvXs3PB4P3n77bYyOjiYdjKalpQVisRivvfYavF4vdDpdwnl9Ph9OnDiBjRs3YuvWrfj3v/8Nk8mEvr6+KTcEj8cDlmWRkpICuVwOu92OmzdvIhgM4u2338aVK1fw1ltvYenSpSgqKgJwvywgHA6jqqpq0rFErVajuLg4rodtPp+PnJwc1NTUUC5RpVLhzTffhEqlgsvlgtvtjmnrkJmZibq6OrS3t0MgECA1NRUvvPACli5dCqfTmZDacSw8Upc3XJ2BqdJE80cY6wUlEgnmzJkDrVabVFtCoRA0Gg3efPNNvPzyy9i8eTOGhoZgt9sTyq/VarFjxw5s3rwZoVAIXq83qTOr0+nEwYMHUVpaCplMlvQA+nw+DAwM4NKlSzh8+DD+9re/wWQyJWWw1dDQgNOnT+PVV1/Fb37zG4yOjtLruXggnI7ZbEZbWxt++MMfxr2NiMTzzz+PYDCIN954A59++imWLl2acF5ybX3+/HncunULOp0Od+7ciWoERxAOTwT23bp1K5YvXw6/3w+Px4Ph4WE6dkuWLKFyhGhISUlBXV0dNmzYAD6fD7/fj+zsbCxbtgw1NTVgWTam0VY4HIZSqURtbS3q6uro0XDBggXQarX405/+hNOnT0Oj0UQlyOHwhMn62rVrodFo6NVuRUUF8vLy0NbWhrGxsWn783yknEE0NjlamkQl+6Rz165dC5Zlk7J65PP50Gq1WLNmDc6dO4f9+/fTe9lEOlImk0Eul6O+vp6ylrGOCJHwer2URf75z3+OlpYWjI+Pw+fzJbyzMwyDgoICbNu2DVqtFi6XC/v378fvfve7hHdogUCAsrIybNq0CZmZmWhvb8fRo0exffv2hG4YzGYzPvzwQxQVFaGysjJpByUNDQ3weDx45ZVXIJFIcOzYMWzcuDGhulNSUvD9738fPp8Phw4dQmdnJ42kPRV4PB7VJiQCQLVaDa/XC2DCp2S8QKhE6czpdFLdD26b481vHo8HlmUxNjZGZRA7duxAKBTC66+/juXLl8ckSKQeojxltVphMBjg8/mwadMmGI1GtLW1QaPRJCx/IXjkx4REJmkyV0tEBZTYPyTTDrPZjI8//hgymQwvvfQSFi5cmPC5vbOzEzdu3EBWVha2bt2K//znP7h69So2btyYUN1isRi1tbVgWRb37t3DwMAAnE5nQud1LogQKRwOJx3Nd968efjyyy+pmavZbEZOTk5CeRmGgdVqxZkzZ7Br164pd9NYIMJaopmazLiHw2FYrVaMjIwgJSWFnt8T0RcgV7Asy0IkEqG6uhpKpRLvvPMOdDodysrKkJeXR9NGA9EgJfOZqBmLRKK43BnDMJBIJFAqlQgEArh+/Tr6+vpQVFSE1tZWhEIh1NbWIjc3N2p+sVgMtVoNhUIBkUiE8fFxnD9/ntomJHtcJHhiBIixQCZTd3c3xGJxwjKDQCCA9vZ2/OEPf4Db7YbZbMadO3eQl5eHzMzMhCT558+fx+XLl2EwGBAIBLB06dKE6ufxeJDJZCgvL4dWq4Ver8fKlStRVlaW8G0Iuc24desWGhoaMDg4iBUrVmDevHkJTQSGmdB+9Pv96Ovrg8lkQmlpKerq6uKqrZL8LpcLfX192L59e9JHHYaZiAZF7AeUSiVWr16dsD9HrtxELpdj9uzZWLZsGYqKiuLehjDMhKmvRqNBZWUlNaAjNxIbN25EeXl5TEEy2d21Wi1mzZqFlJQU6va8uLg4rhCXm7agoADBYBBarRazZ8+GUqlETk4OcnJyou7sDDNh0KXRaFBUVISMjAzIZDJq+VlbW4s5c+ZAJBIlLUD8RugZeL1eGAwG8Pl8VFZWJpSHRFM6dOgQtTaTy+V44YUXkJ+fH3di+3w+NDc3Q6/Xw+/3Y9asWVi0aFHCOyu3HQ0NDZg9e3ZCi5ALm82G27dvw2AwQCKRoLa2Fmq1Oilll8HBQfoOxcXFKC4uTpggud1u6PV6LFiwYNo6GkajEXfv3oVYLEZJSUnCRy1gYq4ODg5ifHwcqampUKlUCR9VHA4HWJalarxer5c6OSksLIyr8+Dz+ejCJKw7UaWPd8UM/L87OqJm7vP5qEWlWCym19yx3puolxOlNK/XC6fTmbAF7DeWGACJa9FxEQqFqIkq0cGXyWRJ7c5EWJSsTjm3DIKvmn86ZXyV/A9S4Wk6ZTyId491zk+UO+GmS2YOxpMxJMKZRdadaN5YdX5jiMF08VUnFCnj29ZvM3iy8Y3TM3gQeBCLeIYQPFwkIqWfwVfHt54YPAkIBoPUvRbR1eD6e5huOHai05FIBGTiY4FIrB8FuHEsyJUz8YPg9Xqn1N+fQfKYIQaPOYLBIAYGBnDhwgXI5XKwLIvR0VGUlZWhqKgIgUCAXiVFs/zkIvKc6nA40NnZCZVKBa1WG9MEmRjSjIyMIC8vDwUFBfS3eHXGqp/7LFZZN2/eBDBh85+enk6dolgsFly8eBGbN29+rELFPemYIQaPOYLBIPr6+tDS0oILFy5AKpVSvwvkirO8vBzA/Wx0VCFRxII0Go3g8XjIycmhknECYg8SCoXw+eefg8/nQ6VSTfqNpI/mjYorMScwmUzIzMyc9CyaWTUAtLW1gWVZrFq1Cunp6XC73UhLS8PY2BjeffddVFdXo7S0dNpu7mcwGd96AeLjDmKRabfbsXfvXigUCtTV1WHWrFkYGBiA1WpFRkYG3n//fWpGTJSwNm7ciPnz56OtrQ1nzpyBRCLB+vXrsW7dOgDAyMgINZLq7u7GlStXoFAoIBAI8Mtf/hJlZWUAgObmZhw8eBCrV69Geno66uvrYTabUVpaitdeew1Hjx7FtWvXwOfzkZeXh1WrVkGv1+PkyZOQSqUoLCzEmjVr8Ne//hVSqRQejwfbtm2DyWRCU1MTxsbGkJubi/Xr1yMQCOCjjz5CYWEh6uvrsWHDBshkMvT394NhGDz11FNYtWoVjh07hu7ubuzatQsZGRlJ9ScwI3+YESA+gWAYhrrmSktLg0gkglKphFAoRE9PD3p6elBaWorx8XH8+Mc/xjvvvIPf/va3aG9vh9FoxNDQEDo7O5Geno7i4mIcPHgQzzzzDPWpeOvWLaovIBQKsWXLFly/fh2tra2UGOh0OggEAiiVSgwMDKC1tRUqlQoqlQq9vb3Yu3cvamtroVKp0NHRAavVSl3BrVmzBkajESdOnEBBQQE2bNiA+vp6NDc3o6enB9nZ2ViwYAGMRiNu3rwJh8OBqqoqrF+/Hk6nE2KxGHa7HXa7HVlZWVCr1UhNTUVFRQXq6+vhcDgm+Q+Yjh3/DCYwc+B6gkCclBK/CD6fDw6HgwrTFi5cCJlMhqqqKuTl5YHH46Gnpwf9/f2Qy+VQq9UoLS2lAkDCQbhcLhqevqKiAllZWZPC4BGvu3w+H3PnzsWWLVtQXFyMGzdu0JgFZWVlKC4uxsKFC8Hn8+FyuaDValFdXQ2VSgWz2YyMjAxUVVWhqKgIoVCIKsmUlpZCLpdjdHQULpeL+kXMy8tDKBRCSUkJVq5cCZlMhi+++AJ6vR4KhYL6n+RyszOc7fTxjecMEvEWlEgZwNe/qxA385Fek4hePPe8TpSgiGZeODzhKVgmk0EsFlPtNXITQbwgk3TcG4OsrCx0dXWBZVmMjIzAbDYDmDj/u1wufOc734HVaqVWfMXFxWBZFpcvX4bP58O9e/dQVlaG5uZmFBYWorW1Ffn5+VAqlXR8yHGouroaFy9eRHp6Oq5evYqqqioMDQ1RT8IOh4P6LRQKhRCJRI80lmQ0d2ZcZ7NPMr7xxCAe4i10svAeh4EuKChASkoKZDIZRCIR1Go1WJZFTk4O5s6dC7FYjDlz5kAikSA/Px92ux1FRUXIyclSMjVCAAACs0lEQVTB3bt3YTQaodFo6GSWSCSoqqpCWloalEolNXyJNEUuKytDU1MTrFYrhEIh7HY7wuEwysrKUF1dDalUira2NphMJmRnZ6OmpgZpaWk4d+4cdDodtFotVq5ciaGhIVy/fh0pKSmoqalBeno6pFIpsrOzUVVVBZVKhUWLFqGjowMdHR3IyMhAdXU13G43BgYGkJWVhQULFkCpVKK+vh4FBQXUf8CDJNjJjjfXivBJxtciQPyqiyuZ/PHSRkqyo02qx4EzYBgGPT094PP5yMrKAo/Hg8lkgtPpRGpqKhwOB8rLy9HS0oK5c+dSXXexWAyj0YirV6+Cz+dj1apV1CIvEAjAaDRCIBDQyD8ZGRkYGRmB3+9HaWkpAGBsbAx79uxBbm4unn32WbjdbnR1dUGj0aCurg5utxsNDQ2w2+2oqalBQUEBXC4Xurq64HK5MH/+fKSmpqKvrw86nQ7l5eUoKCiAzWYDwzDIyMigEZPS0tJgMBgwMDAAlUpFXYgRq86CggK43W7s3LkTW7ZswZo1ayhHQ/rpYXKC0eYTUUlPNlbo14nHRh35qy6uB7lTc9sSaQDyuCHyLn8qbiYeAYyWP5rOAPn+r3/9C1arFYsXL6Yu4WPthNHK4Ua5Sra9kWnNZjP++c9/4ic/+Qm1lvy6OQMuZohBEuBGx3lUiGXUES3dkzCY0RCv7dGUfhLpF/KcjBsRYEYLRRcNxJNwNL+A3GMYad9URA6YPG9mBIbTQ7Q+/lq2v69r552uNdd0kIz7sQeFeO8X73dunMVo+biRmqLFVYwFYuqbTJ2xQLiMROqdLr6tBGZG6egh4evgML5KnYlyTtHSJ5rnQdT7KPAkc4eJIqFjwgxmMINvJx4/KdkMZjCDrwUzxGAGM5gBgBliMIMZzOD/MEMMZjCDGQAA/gdeJCU1IWaxUgAAAABJRU5ErkJggg==)
From the graph match the following given below
List - A List - B
i) Velocity along AB (A) 1.25 ms–1
ii) Velocity along DE (B) Zero
iii) Average velocity along CE (C) -7.5 ms–1 (D) 2.1ms–1
physics-General
physics-
The displacement – time graph shown below.
![](data:image/png;base64,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)
From the graph the velocity between 4s to 6s is _____________
The displacement – time graph shown below.
![](data:image/png;base64,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)
From the graph the velocity between 4s to 6s is _____________
physics-General
physics-
Diagram shows a velocity time graph for a car starting from rest, the graph has three sections AB, BC and CD.
![](data:image/png;base64,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)
The ratio of distance along AB and BC is
Diagram shows a velocity time graph for a car starting from rest, the graph has three sections AB, BC and CD.
![](data:image/png;base64,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)
The ratio of distance along AB and BC is
physics-General
physics-
Refer Figure, the ratio of speed in first two seconds to the speed in the next 4 seconds is
![](data:image/png;base64,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)
Refer Figure, the ratio of speed in first two seconds to the speed in the next 4 seconds is
![](data:image/png;base64,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)
physics-General
physics-
The figure given here shows the velocity-time graph of a one-dimensional motion. Which of the following characteristics of the particle is represented by the shaded area ?
![](data:image/png;base64,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)
The figure given here shows the velocity-time graph of a one-dimensional motion. Which of the following characteristics of the particle is represented by the shaded area ?
![](data:image/png;base64,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)
physics-General
physics-
Figure shows the displacement (s) - time (t) graph of a particle moving on the X–axis.
![](data:image/png;base64,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)
Which is correct given below?
Figure shows the displacement (s) - time (t) graph of a particle moving on the X–axis.
![](data:image/png;base64,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)
Which is correct given below?
physics-General
physics-
The figure give below shows the displacement time curve of the particle p and Q. Which following statements is correct.
![](data:image/png;base64,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)
The figure give below shows the displacement time curve of the particle p and Q. Which following statements is correct.
![](data:image/png;base64,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)
physics-General
physics-
The velocity-time graph of a certain body is shown in the following graph. The path of the graph that shows deceleration of the body is
![](data:image/png;base64,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)
The velocity-time graph of a certain body is shown in the following graph. The path of the graph that shows deceleration of the body is
![](data:image/png;base64,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)
physics-General
physics-
The displacement-time graph of a body is shown in the figure. The part of the graph that represent the body at rest is
![](data:image/png;base64,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)
The displacement-time graph of a body is shown in the figure. The part of the graph that represent the body at rest is
![](data:image/png;base64,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)
physics-General
physics-
The magnitude of acceleration due to gravity upon.
The magnitude of acceleration due to gravity upon.
physics-General
physics-
When a body fall freely under the gravity. The final velocity of body will be
When a body fall freely under the gravity. The final velocity of body will be
physics-General