science
Grade-7
Easy
Question
Observe the pattern of the following graph carefully. The x-axis denotes the time axis, and the physical quantity along the y-axis can be chosen from displacement and velocity. The graph represents ____ and ____ for the y-axis representing displacement and velocity, respectively.
![](data:image/png;base64,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)
- Uniform motion, uniformly accelerated motion
- Uniformly accelerated motion, uniform motion
- Non-uniform motion, uniform motion
- Non-uniform motion, uniformly accelerated motion
Hint:
Option a is correct for this question.
The correct answer is: Uniform motion, uniformly accelerated motion
- For graph as displacement in Y-axis, a straight positive slope represents that body is covering equal distance in equal intervals of time which indicates that body is in uniform motion.
- For graph as velocity in Y-axis, a straight positive slope represents that object's velocity is changing with equal intervals of time which indicates that body is in uniform accelerating motion.
Related Questions to study
science
Analyze the graphs given below and choose the correct option for them.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAApAAAAEoCAYAAADvxMHVAAAgAElEQVR4AexdB3QUVRcOSpGm2PG3F1RQUZqoIE1RQJqASBEELIgU6U2QaqFYKCKIShFQka6C9CQkBAKEHgi99xJqgJTvP98bJ9lstu/szC6575w5OzvlvTd33rvzvVvDIEUoIBQQCggFhAJCAaGAUEAo4AUFwry4Vi4VCggFhAJCAaGAUEAoIBQQCkAApAwCoYBQQCggFBAKCAWEAkIBryggANIrcsnFQgGhgFBAKCAUEAoIBYQCAiBlDAgFhAJCAaGAUEAoIBQQCnhFAQGQXpFLLhYKCAWEAkIBoYBQQCggFBAAKWNAKCAUEAoIBYQCQgGhgFDAKwoIgPSKXHKxUEAoIBQQCggFhAJCAaGAAEgZA0IBoYBQQCggFBAKCAWEAl5RINsCyLS0NFy8eNErYsnFQgGhgFBAKCAUEAoIBYQCyL5xIK9evYqvvvoKhw4dknEgFBAKCAWEAkFAgaSkJCxbtiwIeiJdEAoIBdxRINtKICMjI3H//ffj22+/dUcjOS8UEAoIBYQCJlBg5syZqFKlChITE01oTZoQCggF/KFAtgSQVF83atQIOXPmRKVKlXDgwAF/aCj3CgWEAkIBoYCfFKBJUc2aNVGgQAGMGzfOz9rkdqGAUCDQFMiWAJIqkrvuugv58uXD7bffjtGjRweazlK/UEAoIBQQCrigwPTp01G4cGHcdNNNKFeuHE6cOOHiajklFBAKWE2BbAcgaWNTv3595MmTBwULFkSuXLlQoUIF7Nmzx+p3Ie0LBYQCQoFsSYEzZ86gXr16Cjzmz58ft912G77//vtsSQt5aKFAqFAgWwFIqq7//vtv/O9//0PevHkVgCSzKlSokGJWqampofLepJ9CAaGAUOC6ocD48ePVoj537tyKL4eFheHpp59GfHz8dfOM8iBCgeuNAtkKQPLlRUREYPjw4ahdu7ZiWCVKlMB3332HhQsX4tq1a9fb+5XnEQoIBYQCQU0BRsQYMWIE3njjDdxzzz0KQD733HNo0qQJli5dGtR9l84JBbIzBbIdgKQK+9KlSyqEz4033og6deogOTkZPC4SyOw8FeTZhQJCASsowIX7vn37kJCQgNKlSysnmr59+2L37t04fvy4FV2SNoUCQgEPKJDtAKROk6+//ho33HAD3nzzTf2Q/AoFhAJCAaGAhRR4+eWXFYAU+0cLX4I0LRTwkALZEkDSFnLYsGEKQNatW9dDUsllQgGhgFBAKBAoCpAvly9fXgHIkSNHBqoZqVcoIBQwiAICIAVAGjSUpBqhgFBAKOA7BQRA+k47uVMoYAUFQgZAHjlyBGfPnnVJowsXLuDw4cMur+FJkUC6JZFcIBQQCggFTKWAAEhTyS2NCQX8pkDQA8jVq1dj4MCB+PTTT9GjRw/89NNPWdJcpaSkYN68eejVqxd69uyJIUOG4ODBg06JIwDSKWnkhFBAKCAU8IgCjN24fft2twt7xtjdv3+/2zoFQLolkVwgFAgqCgQ1gKQ0kU4uBI4TJkxQ4XaqV6+u7BfpNc1CpvPPP/+gatWqyrN64sSJeOedd9CyZUvlbe2I2gIgHVFFjgkFhAJCAfcUOH/+vFrId+zYEZ988gnatWuHX3/9FVeuXMl086lTpzBo0CC0b98eH3/8seLPrrRIAiAzkU/+CAWCngJBDSCZyuqXX35RuaoZeicxMVGByFdffVWFeCB1ycxq1aqFLl264PTp07h8+TI2bNiAp556Cn/++afDFyAA0iFZ5KBQQCggFHBJAfJO8lVmjRkzZgxmz56tFvQVK1bE1KlTM91LgEnezOt5jnEeP//88yxAU79JAKROCfkVCoQGBYIaQDIuI9XTtmXJkiUgs9qyZYs6zN9HHnkkS8YCrngbN25se2v6vgDIdFLIjlBAKCAU8IoCXKCvWLFCLdbJS8+dO6e0RG+99RYYFJyFpkcPPvggYmJilJaIvPyPP/5A8eLFs/BqvXEBkDol5FcoEBoUCGoAqZOQzOfo0aNYt24dOnTogP79+yvJI8/T9vHJJ5/MFAScjGjKlCkoVqyYXkWmX1sAKXEgM5FG/ggFhAJCAa8poGf34oKf/JWqa5ob2ZaLFy+qQOE0R3JUBEA6ooocEwoELwVCAkDSlubtt99Wdo6vvfYaYmNjFUXJcH744Qc8++yzWSgcGRmpcl5nOfGf3SQZHgOJUxUjRSggFBAKCAW8owBNjNasWYNp06ahRYsWmDVrlqqAfJl26LRdty/UCvG4vWaJ19kCyNGjR9vfKv+FAkKBIKNASABI2j/+9ttv+PHHH/H+++8re0emuCLDoY2kIwBJVfd9993nkNy8j/mvc+XKhbJly2LmzJnKTmf69Okwc6NtEDcz23TU1u+//25ZH/Tn5ztw1Dczjul9oIpN3zejXds2rGrXtg+0U9u6davDOSMHhQK2FCAPXbBgAZo1a4Zy5cqhUaNGYKg1Fp6j9JH2jraFxzt16qScapi+0L7wPM2TChQogKFDhyp1OG3azdz4rdE3M9u1b0v6cFm9B0qt7Wlj1v9geQd0GObcCMYSEgDSlnBc8ZYpUwbz589Xh5cuXYrHHntMDTL9OhJ7/PjxKFWqlH4o0y/PjxgxAnny5FHONoMHD8aAAQOUapzqcTM2tseQQy+++CI6d+6sQhWZ0a5tG1QztWnTBi+88IJSOZlNA/aFtK9WrRqaNGliCt1tn5/7fObu3burPrRq1Up99OyvCfR/9oFjoGTJkujXr58ldPjiiy+UkwMzNEkRCnhCAeavXrhwISZNmgTOHYZb40eX/JWmQfxvW3i8devWynPbGYCsXLky8uXLB2YI4yKfKWfN3L755htwLrDv1FLxv5nt622RL3LT/1vxS7735ZdfWtIH0p2LiD59+lj2DtgHfiO5ELKC/myTNCBP3rRpk+1UCpr9oAaQNNS2l4gwVAQ/tJQWsTDGWJEiRbB8+fJMRKVBN8NHOCo6gMyZMyeoEt+1axd27Nhh6rZz506sXbsWlSpVwuLFi8H/VvSBkt0KFSpYQgM+L2nPjw8nitnPz/ZI9+joaLz33ntKwr17925L+hEREYESJUogISHBkvb53IxkwEWNFKGANxSgjTrV2FWqVFERMMhf27Ztq+a1fT3ktwQlvMa+8BjryJ8/vzJZoq0kBQFmbgTDDEtUs2ZNJWSghsvM9vW2uKBu2LAhGJZOP2bW788//wyaEDAvOWMrW9UHxnOmHwOfm/GfzXp+vZ3Jkyercdi0aVOMHTvW9D7wmZnSk9J9zq9gLEELIMlMyEAonYqKikJycjJoC0kJDaV2OrCkeJce16+//roCIzoze/jhh5UnoCOis25KIGkDaWUubIYgatCggUdBdh09hxHHaE9qtSNR7969lYmCEc/jSx0nT55UgeoJ5K0qjHn6yiuvWNW8apfM6rPPPrO0D9J4cFOA2b646Dx27FimjnIBRE2Gbp9Os5jHH388k2aIi5SiRYuCWiNHRQeQVGFT6kP+yLiRDN9m1sY2CSIZ35ISVnqYm90HtkeQzbloBQ1Ia5ojUAhDMwWr+kBv/+eff169A7Pev207fG6+A74LfiNsz5m1z4QoXNQTxAdjCVoASWJxAnft2lWBLK7G9I32YrYqkPj4eGXEXadOHbViYLwxrqAcGWqzXlsAyThlVhUOSgJYSuGsKitXrlSx2qxqn++CKmQrJwiZZbdu3dLNIqygBccApdFWFb6Hb7/9VgCkVS8gRNrVF+zvvvuu0qAwGw1D9XARSik+ARcLF/u0L6dpBhdHBI+0l+SCmfc4KrYAkuo7qwpjW3JRqz+LFf3gYo5aGasK7Qz5jvl9sKowexG1Y1YWvoNRo0ZlivJiZn9oA0pzCkpDg7EENYAkwQiyuAriqpAr37i4OIfAkAyKDgEEIlzh2mdFsCV+sABIMlkBkMEBIAlidbta27Fi1r4ASLMoLe34S4H169crrQ8X9JRS8ZcSu23btmWqOjw8XAFGRtBgtIvmzZs71QrxRlsAaZUtLvtAhz7yA2dAN9NDBuAP+8DFHCVfVhVKmulJT+2fVYXmaeXLl3do7mBGn/gevvrqK2WLayuwMqNtvQ0uYqh1FQCpUyQIfjkwdBW2lRJIAZDaRyMYJJACIEUCGQSsKWS6cODAAZVClot6LvApZXRUNm7cqCIbzJgxQ9n3OrpGP0a+TBtIqrAFQFoPICkxFgApAFKfn45+g14C6ajT/h4TAJlBQVFhQ9n7CIAUAJkxK2TPCgoIgNSoTjoEgwRSAKRIIN3xAQGQFtpAigRSJJD6BBUVtk4J+c2uFBAAqb15AZAaHUSFDWWHKyrsIOOInKCiwtZeikggRQLJkaB/tMQLO8iYVTbqjgBI7WXrc9FqG0iRQIoE0h37EQmkSCDFC/vIEWU0L0404oXtjmHK+cBRQACkRlsBkBodRAIpEsjAcRs/auYEFQmkRkCRQIoEkiNB/2iJBNIPxiK3+kUBAZAa+fS5KBJI8cIWL2y/WEpgbhYAmUFXAZACIDka9I+WAMiMuSF75lJAAKRGb30uCoAUACkA0lwe5FFrAiAzyCQAUgAkR4P+0RIAmTE3ZM9cCgiA1Oitz0UBkAIgBUCay4M8ak0AZAaZBEAKgORo0D9aAiAz5obsmUsBAZAavfW5KABSAKQASHN5kEetcYIyVRRzYUsgcUllyFSGEgdS4kB6xDzkooBRQACkRloBkBodxIlGnGgCxmz8qZgTdMyYMQpA1qxZ05+q/LpX4kBqki/JRAOVD11yYfs1neTmEKcA+XLVqlWRP39+lULOisdhHySVIcBUhhLGR8L4uJuD2TaMz9ixYxWAfOONN9zRKGDnBUAKgNQHlwQS1ykhv9mVAgRv1atXVwBy8ODBlpBBAKRGdgGQ2rdJcmG7noYCIAVAWqrGJ8MWCaRIIF2zKTmbHSggAFJ7y6SDpDIERIUtKuyg5HucoCKB1F6NONGIEw1Hgv7REieaoGRZ2aJTAiC116zPRXGiEScacaIJQtYnADLjpQiAFADJ0aB/tARAZswN2TOXAgIgNXrrc1EApABIAZDm8iCPWhMAmUEmAZACIDka9I+WAMiMuSF75lJAAKRGb30uCoAUACkA0lwe5FFrAiAzyCQAUgAkR4P+0RIAmTE3ZM9cCgiA1Oitz0UBkAIgBUAawIMWLFiAL774ApxQy5cvVx87vdrU1FTExsaqsA/9+vXDgAED0L9/f/V7+vRp/bJMvwIgM8ghAFIAJEeD/tESAJkxN2TPXAoIgNTorc9FAZACIAVA+sGDCA45ierVq4eePXuiS5cuePPNN5UDzJUrV1TN165dA0M+lCxZEvz49ejRQ228nmFyHBUBkBlUEQApAJKjQf9oCYDMmBuy55wCBw4cwPfff4927dqhb9++WLVqVaaLOZ5GjRqFTp06oX379mr7+OOPMXr0aFy8eDHTtfof3iNhfDLmogBIAZACIHXu4MNvVFSUAoazZs3C4cOHsX//fsWUnn/+eaxfv17VePXqVfTq1Qtvv/22AozHjh3D0aNH1ZacnOywVQGQGWQRAKkByG7dumH+/PkZhDF5T+JAmkxwac5nCmzZskXx29atW2PQoEEKJDKe7uzZs9Pr5OK/RIkSeOedd/D5559j4MCBSjP066+/4vLly+nX2e4IgNSoQTpIGB8J48PRIADSlkN4uc84UIsWLcp014kTJ/DMM89gxowZ6jgBJJkYAYCnxRZAWpmJ5syZM0q6yue0qsTExKBOnTpWNa/apdSYHxarChcdlFj/+++/VnUB+/btQ+XKlS1rnw1/9913SopvaSek8aCmAHknNT5NmzbFpk2bcOnSJRw6dAi9e/dGjRo11D4fICUlBc8995wCleTRBI2UPCYlJWUyQbJ9WAGQGjWCBUAS/FOIY1UJljiQBPPUdFpRBEAaTHUyLa5sw8PDVc1UZX/66aeoXbs2/vjjD4wbN06dI9NyVnQAeeONNyqmxzq4kbmZtbF/lKqy3/Hx8eB/b9rW++zPLyW0tCml9IAM35+6fL2X7dI04eeff1bP72s9vt5HuhO8de7cGXPnzgUlJ3wPvtbny33sw7Zt21CxYkXT29b7yzkxdOhQAZDOmIYcT6fA2rVrsXPnzvT/3CE/LlOmDFavXq2Ok7e88MILiI6OVnOJ48td4TVUYRcoUMCyVIbsI/kAvynOVO3unsOI81T1Dxs2zIiqfKqDPKlFixZZTBN8qszHm2gmQZ5oZRk+fLhKe2xVH7jw4oLNSgGLq2c3NBMNJ9zJkydx5MgRHD9+XOXTdNW4t+fOnj0Lqk3ef/99UHrHwg/gN998owY7bUYozaJUkVJJTgJHRQeQuXPnVqtkgk5uDC5u1vbjjz+Cg/PZZ59VA2T8+PGmta0/408//aQkt8WLFwf3zaYB+0Hg+Nprr+Hdd9+1pH3SfciQISoHL+25fvnlF9PfA8cCx+vjjz9uetv6WJg4cSLq1q0LOqJJEQp4S4ExY8bg1VdfVYti3suF4SOPPKLU1l9//bXi0YsXL1bHndVtCyCpUaLJEqVQZm4ELT/88APatGmDDRs2YO/evaa2z2fdvXu3WsgxQxf7Y+bzsy0+89atW5V27M8//7TkPbAPkZGRoLmaFe+AdCDtiSfolLtjxw5L+rFx40Yl3Jg8ebKzaWPpcb8BZGJiIpYtWwZ+iElsrloaNWqE5s2bK8kSP1BkHFQT+lMoyqWkqnHjxiBR9UJGxQnHAc+XnpCQABL7ySefdGrTZgsgCeBoDE4GyF+zNrZH4ELwRs9x0smbtrlC9Xdjm5S8Pf300+nt+1unt/cTPFWtWhXNmjXz7nm+/wGjvx/n3T0OaMb3QA9/fvxo5M/+ePsM/l7P904mVaRIEWXj6299vtzPBQSl4XSIkCIU8IYCERERag5z7pC3slCSz0UhcwlTBUiJHheKEyZMgCvbdEog8+XLh2rVqql7aT9p5kae3KRJE1SoUAF9+vRRvMHM9tkWJU40ByC92B/+N7MP5Id0puO38cMPP7SsD127dsWDDz6onp99MpMGbIsamddff11p6GjDa3b7bI/zhmPhugOQBHRz5sxRA6xYsWK4+eabERYWhvz586uNTOCGG25Q+4899phiJlOnTnXqGe2KYVGa2bFjR7Rq1UqF7HF1Lc+RidWvX18BTkfX6gCSKmxOUtZPgGvmxjYJdqk+ptrHqj789ddfillTcmzm8+tt0aaVXpoEcnR+0o+7/D1+EsdOncaxk0dw7JiH97h4v5s3b0aHDh0wbdo0JUF32baLevy5b926dShXrpznNDC4H3wPXMiIF7YjjhGax7iw/ueff9TikFJAbiNHjsSUKVNA22faL/pbKCXiB45AkcIEvZDHUs1N+0jyNi7uKWUvXbo06DDmqPAe3QubAgg6tVGdbOZGO2jaQzPyB79Xf//9t6nt81n5XX3vvfeUEIYh7Mx8frbFb8Lvv/+OSpUqKfBoVR8olCpatKiix7x580ynw8KFCxVuocZz5syZMLsPfA/8JnEucM4GY/FJAsmJzkF+3333KdBIVQXBHVE6pSmUbOmSHa5gKOEiuLz77rsVE/OGEAzFw5UsX+L27ds9vvWDDz5QEiVHN+gAkgC3Vq1aji4x5RgZLoEuRfRWFYbfoOrSykIvejJrj8u1/cChQcDRrwA49uj0uC4ABE/sAxmGVYXqEqudaEaMGCEA0qoBYGC7nNNcCBDYkTdzMc/FMrdcuXLhjjvuUECOPJsmJLbAz5tuEFyRf9L5iuZF7gp5OQHBkiVLHF6qA0jaQPJbQu0SzZDM3CgdpS09VegEvnSeMLN9tkWzLIJ9SqCsoAH7QBMxOtHQttWKPpDuFLBwUW02/fX2+NyUfFKCTvM8/biZv5wznMvXlQ0kJzrROJ1ZONGowtYnG1UX+sbJSMkWPbmooitVqpRaATvkHg4OUqJDAEo1qzOQRTsZ2kDaMjCquGlPxvA/jootgKQE0KpC2hC8OVuRm9GvkAzjc2EtsLooEHM/cPWw32SizS7HsYTx+VYApN+jyboK+GHjIoDez1yw58iRQ6kh6THdtm1bFbORNuRUy3Exz2tuv/12NGjQAHFxcV51nJLNKlWqKNMlOp15Uqi1omkRHfccFVsAyQ+3VYXfDUohfQXWRvSb75FSXasKpdOUfNEJyqpC58aXX37ZquZVuzQhoNSeYNKKcuHCBaUZuu5U2Fyh0Bvv/PnzHtGVzI3XExR6UshMqFYko2OICIqzKdWkhJOTi2pHFqo933rrLWW3QtsvOtJQDUIjaGd9Y920+eKKnNcS8FpRuLoQAJkGGovTicPjkrQPiHsJWH4jkOR/CCQCSPZBAKQASI/HYBBeSKkNHcEIHGkrTqk+s3RRjcysXOTZXLRSk8PwaJRwUTtEZ0JvACRVa+SbdLojeCT/pLCAG3krN6qCKZnkB5AfXwIS2pTRM5vAwFHhfVzQ6xJIR9cE+hj7QHUl+YHuqBnoNu3rZx8kDqTEgeS4yDZhfMgkqDohUGSh/Q1jNVL66EsMJU4i2mTRPo6/NO7XN64OyRhZeB3txzjhKOrlNfSkZYgcZ4X30JibAJLG2mR8VhQBkNr78xpApiYBm+sCS8KAcyv9fnUCIDOyX4gNpN/DybIKyNeofeFimyYR7gp5NXk2vY49lSJSE/TKK68oFTilM1S1Ehhyn5lndHBIzQYlnXRMYzga2rDTUY3qYWf8lv1nTFoCyE/7DnLX/YCcZx8EQEIBfzo2ShzIr9RCyBcMY8QAzTYAkmpsri4pSSJ4o1rk4YcfVuqUSZMmKaDnLUGpFicjJNPiRubEXxpk20sXyZSoziYYcFcEQGZQKCRV2Ox+wgfA4jDgmP8ByAVACoDMmBGhv2erUaHkz5ZXUgPETDK20jVv1HPkwVStUtND4Mh9/T81QzqA5AeXDjZU//E8F/iUeuoCBkdU1gFkwYIFMHhADwCXgDRzAzgLgNTeDCXHAiDT1NilJF0ApKMZC/jkRGNfFScdVca0qWEcuenTp6t9emTTUYWG0xyQwVIEQGa8idAEkGnAvn7AsjBgL8PO+GeCIABSAGTGjLi+9ugk88knnyi1Nb2iaQ/50ksv4aOPPlILbm+flh9S2ptzca+njNV/ecweIFKyyfOeBOXWAGRd3FYoH6ImlQYODgAuxXvbRb+uFwCpkU8ApMYTufgRAOl8ShkGIOnyT8BI+xiCSdrVUPXM7AQElpQcBksRAJnxJkIWQB4ZC0TmBrY1A9L8M0EQACkAMmNGXD97lD7SRCdPnjzK85nmCeTF3MifKR10pk62ggo6gLzz9ry4tDAnsOoR4LS5+ekFQGpvXgCkAEhPeIBhAJJBiBkigkHE7733XmWcTTd8hpIgw7LS09ieEAIgMygSsgDyxHQgqhCw8TUg1XHGoYyndL0nAFIApOsREppnKXGk9ofh1mgKxJA+//vf/5SDTaFChVTGLltVttVPmQ4gb8uLC/PDgKjbgZMzTe2WAEiN3AIgBUB6MvEMA5C0fdRXt/xlHEbGkHrggQdUqAh6AQZLEQCZ8SZCFkCe+RdYWRhYVwpIvZLxQD7sCYAUAOnDsAn6W+htzbA5d955p3IsJF9m1idGw2DWIwb15tgPlmILIE/MCQOibwdO/GFq9wRAauQWACkA0pOJZwiAZENcyTKWHtMf6dlVuAImk6JKO9hUJeKFrQ2P0ASQjG8QA6x6UNvole1HEQApANKP4RO0txIEEDASOOpJH5gajQHzaW7EEGK28XOtfhAdQN5xW14cnUkAeRtwYpqp3RIAqZFbAKQASE8mns8Aktk7mA7LlgFxn2EhbDPGME9qMKmvSRQyCQGQ2vAIWQB5cSsQ+wSwIh+Q6l9KNgGQAiA9YZaheA1DqVHaeNNNNyl7dMbPZZgzhjCjZ7Q3HtiBfv50AHlrXuyfHgasLAQcmxToZjPVLwBSI4cASAGQmSaGkz8+AUhOMubKZA5spjtivsYdO3b4FKrHSb8CelgAZAZ5QxZAXjkMrH0WWJ4DSD6T8UA+7AmAFADpw7AJylsYN46Le70wLR5NiZgKjYt78j46NBI8MpxPMBX2rU6durj91rzYMYUSyALAkfGmdpF9kDiQEgeSg45jQbywXU8/nwEkUxky7uNtt92Gu+66C+XLl8fgwYOVtx8DZAdz4cAQCaT2hkIWQCYnAutKA8tyAEmH/BpuAiAFQPo1gILkZoJFZpdp0qQJpkyZgm3btjntGa+1Krads07pAPK2W/Ni4y90oskLHBrt7PKAHBcAqZFVJJACID2ZYD4DSKqrmQFm7NixKuAoPfyoFnnsscfQokULpSYJthWuThABkDolgJAFkCkXgbjnNQB52b90hgIgBUBmzIjQ3SMoZM7rfPny4Y477lD2jwz4vXTpUly+fDnoH0wHkLcWyouIUTcAK24EDnxpar8FQGrkFgApANKTiecTgLStmKtYZp75559/VM5qxoMkAytYsCC4z9SCZGDBtNoVAJnxBkMWQNLucV3Z/wDkrowH8mFPAKQASB+GTdDdwgw0TGU4ZswYZVrEkD1M5EBPbEbFYFBxT1IcWvVgOoAsdEtezPo8JxCZA9jT09TuCIDUyC0AUgCkJxPPbwBp2whXuZs2bVLSx3fffVeFj6AH4OOPP64yH3ByBkMRAJnxFkIWQKYlAete+A9AJmQ8kA97AiAFQPowbIL2FjrGHDp0CH///TfodV2qVCnliX3LLbeoPNZ9+vRR9pDB9gA6gLzl5ryY0CsnEJED2Pmxqd0UAKmRWwCkAEhPJp6hANK2wZMnT2Lx4sXKLpL2ka+88ortaUv3BUBmkD90AWQyEPeSBiAvbc14IB/2BEAKgPRh2ITELVzUM+7juHHj8Oabb+Lmm29WUsmnnnpKmRpRO2SbO9vKh9IB5M0F82FM1wIagNzewtQuCYDUyC0AUgCkJxPPcABJ20gGDU9MTDfQ+8sAACAASURBVARTafHjTC/ANWvWeNIfU66xB5BWhbKgsxFjsVkZ5ih0AWQKsP4/AHlxk1/jRgCkAEi/BlCI3Lxv3z7Mnz9fmRo988wzKnPYqFGjgiZ6hg4gCxbMj5FdCwMRYUD82/SHNY3CAiA1UguAFADpyaQzDEAmJSUpz+bmzZujTp06ChgRHNWrV0+lN6RE0tdy9epVtYpetGgRYmNjQWNxR4UMkivqqKgocAI4K2QSkyZNUk4/r7/+umVBzgVAapO0e/fuYCYjr0raFSDuPxX2pXivbrW/WACkAEj7MXE9/2eoHzpAfv3118pmMlielXy5bp26KFiwAL7p+rgGIDfXAlIvmtZFAZAaqQVACoD0ZNIZAiA56X777Tc8+OCDmdIZ0v5R32gb6UshyPrss8/w4YcfKkNw2lYOGDAgU6wz1rts2TK89957eP/999GqVSv07NkTx48fd9gk+8swF/Qaf+2115wCUoc3G3hQAKQfANI2jM+Vg369FQGQAiD9GkBBfDNV2LSFHDZsGL744gu1DR8+XMWB5CLa1ULb3WPt3r0bf/zxh1r8MWGEo4U9eS0X/gxezgw4rrQ9vLZe/fooWPBmfN75BSAyDNhQCbh62F1XDDvPPkgcSIkDyQHFsSBxIF1PLcMAJO1rCBafeOIJBeAI+Gw3emp7W/gC6cVdpUoVzJ49W0kW58yZg1dffRVkgrpnNwPjMn1ijx49sGLFCqWmqV69ugKRjtpkvVOnTlUAkqm+rApxIQDSDwDJQOJr/gsknpLo6DV7fEwApABIjwdLiF34/fffKyfGQoUKoUCBAmpjGkNGyiDvO3bsmE9PtGTJEuXp/fHHH6Ndu3Zqf8iQIcp0Sa+QmiOGEWrYsCE6deqExo0bqw+yM35LvtzgrbdQsGAhfPpJDWBFGLD2OeDiZr3KgP+yDwIgBUByoHEsCIB0PeUMA5AEdblz58aPP/4IAiPaQdpurlaezrrIFzh58mT8+++/mS4ZOHCgYn7Mv81rGIvyxRdfVPaW+oUMK/TQQw/h4MGs0ineowNISiCdMTS9rkD9CoD0A0Be3gnEFgMicksqQwMGKOcEs5NQ2i/l+qAAwWG5cuXUwv7WW2/Fs88+ixIlSqiN+9Tm+GJadPToUbWo7927N+Li4sD0iMx0U6FCBSWRJPU4ngjESpcuDS76GdScySfKlCmD6dOnOyQw73nrrbdQoGAh9PjkbSAmPxDzAHA23OH1gTio95tmNfy+WFH0uUjwbVURFbYASE/GnmEAcujQociTJ4+SGJLBEByROXFjaq3k5GRP+pPlGtpW2heqY2rUqKFWu1SbUHXdoUOHTJdx9UtDcarW7QsnaDAASNJGnGjS4JMN5IWNwOrHgKjbgBT/giRTAtmtWzclubYfK2b9pyMV46ZaVfSPlgBIq96A8e1u3bpVSR8ZvufPP/9UoXuYzpBbTEwMeF7X4njTOgUDBIzk83ohv23atCk6duyowCOPV6tWTc1t/Rr+cp6R5zlTd2sA8hb06NgMiHsUWJEfODHTtoqA7guA1MgrAFIApCcTzRAAyYboZZ03b17cfffdKmQPJXtUkXDj/v79+z3pj9tr+KFlSCCqZijVpLc3GdLIkSMz3UtGQLX6oEGDMh3nH1sASScaX6SjWSr14QCN2elkRBW8VYUfEzo9WVl69eqlAL1XfbgYC6x6CIh9BMA1r261v5gLHNrM0kbLqkJJOU01rCwjRowQCaSVL8DgthkRgyHUqLq2zY/tbzPkn/aFgJDgr1+/furU+fPnce+996pMV7bX0sTo4Ycfdij5ZL3pALJTK2BrBS3XvYn5sNmHYFFh02bVqsL398477yizMav6sGfPHjV+HY03M/rEdqnCpmbGl4WWEX0kRuCcoiY2GIshAJKEpgSSTim604z9rxFpDWm0TbVL69at0xkiJZ0EqFSd2xbGNmvZsiUYNNe+sL+6BLJy5coq6K4uKSWjNWNjvxMSEpQklZ7l/G9Gu7ZtUJJAVT9BNNU1ZtOAfWG7tKHigoBOT7b9c7Z//MRZnN/3O9Ki78SVmOdw4vhBnDihSbqd3ePsOOnOsdm+fXslreZH19m1gTpOutMrlupGT2lgdF+4EKNpCG2OpVw/FODiLFeuXMpGnIsk2olz69KlizL9IVAwokybNk1J0BkWjGXHjh1KmGArpeRx2sITWG7fvj1Ls+TLOoDs27sDcKgVsCgMODIiy7WBPEBVOyXxVpk28dl++OEHfPPNN4F8TJd18/tJZ9TVq1e7vC6QJxkMn99nKwvfAU3krCpcmDG//XUPICk9IWh89NFHlVSNhtNkBvrmyBbRm5dCGxo65bRp0wYEknrhB58StO+++04/pH7JjHjclQSSKnem+SLC50vitWZtbI/MvWjRoujcubPyjjSrbb0drnBJUzo+0d5GP27mL1d4lJLUr1/f4/Y/6z8E//zSACnhubHp9yfx+eD+GDRosMf32z4f3wM/qOxDs2bNQEcA2/Nm7A8ePFiNAdrsmtGeozb43JTsC4DMxEZC+g81K1xEM50heXOOHDnSN/5/4YUXMtmN+/qwM2bMUIv4n376CVRls6xfvx6FCxdWC2PberloZbQOply0LzqAzF+gIFq2aIyD0U2A5WE4Ffse1q5dg9WrYxWgIagJ1MaFHOdCixYtVEg4atYC1Zarert27aoWteyPq+sCcY7PHBkZqRYd48ePVyH0AtGOqzrZB9rO0maXAhZurq4PxDnSnoIFml1wYWR2H9geo8vQUY0mI8FYDJNA1q5dWznRcOXEfKvcqLbWN39EwGRGBKL80Nure7lKpESSL9q2kHkyhaIjg21dAkmnHw5Qvhxex5AUZm20SeLkpJE51e9kwma1rbdDVQ3BBFOdzZo1y3QasB/0rq9Vq5aaJHq/3P1O/eMvxM1piLRlYdiz+E1Mn/67z7Tje2CWDo5fAnoyLXftG32efeAYKFasmOlt689CqUuTJk3SVZC2c0n2Q5MCjItLZxmCxfvvvx8lS5Y0xInGlhrU5HChzvzbFy9mxGsk/7/rrruymC7RBOmee+7JJATQ60sHkPkLKGn83B+qATFh2DCtKPr16YRu3Xupb4AuRQ3ELzVWNH0qW7YsPvnkE2XaEoh23NXJxRxtopmK0t21Rp+npJpe88xWRDW2VX346KOPcN9996nnt5WeG/28zurjYrpixYpqYU1A7+y6QB3nM9O3g2aADDsYjMUwAEk7AYaGINGpmiXQow2DvvkKIKle/OCDD5QtAlev9oWidsYYK168eKbVNIEJV7r2KhTerwNIqtz5cqjG4cqZ4mKzNrZH5w0y3/j4eNPb53PynTBLUM2aNZWTk1nPbtsO+0B1Gt+h7XGX+1dTkJLwCbA0DMn7v/X8Pgfvl++BixwyCIIoLjxctu2gDn+vZx84Z8is6DTmb32+3M/npnOaONHYc5jQ/U+tDbULTF9IFXN0dLSyaWOiBUqYGJuXY8/XQtUew6Wxbnt1L8cgtVELFizIVD0XaOyTIw9nHUDSZrPZu+9jX9xYIDwMp5c8gdiI3xC9MlZJgigNCtRGSRa1MQROjP5BG/FAteWsXr4ngldq2yiFcnZdoI7zmZmQg6ZNfMdW9YECDi6ASA86fQXqeZ3Vy+em9I+OYZwvzq4L1HE+M2OoUkB23QNIonACMqotCMoISvSNMRq5IvW2cAXNQUz1IqWEtNcjAyI4JGMik2KhepwSJEopKVGhFJSSPdplOiq2AJL1+8NEHdXv6TEyUa52CbKtKhykpJ2VhWPHaxuPhBbA4hzA6bl+d53hTtgH+3BRflfsRQUc61bb+9AMRACkFy8tyC9lKlnObXph25r9GNFtLvio5rUHiHrd5LGMjkH+ZlvIowmMHEXlsAWQvfsMAJI3AxH5gNj7gSsbbKsJ6P7cuXOVNsKfIOv+dpApJp19v/yt25P7+W2lvwHBpFWF33WGhrKyMN4034VVhQszJk7x+vtoUocNk0DyRVNV4mzzxYlmw4YNaoVLRkU7BK7KuFGsS1WD7QSnvQJBAFXZbdu2VZ5TtI90VGwBpMSBXKlUyI7oZMYxvguvw/ikXACY4mxJGHBhrd/dlDA+mlRe4kD6PZSCqgJqbAjgaANJTQclKfpGxzV+GL11ouF8pbkNPanJlyl9pBqbC3ymI6W0SNc2kSfTzpL8mB9A8uaXXnpJ2dQ5IpQtgOzRqy+Quh9Y8zSwLBdwJrMk09H9RhxjHyj54rfEkZTUiDbc1cE+cDGX3eNAUov58ssvuyNXwM7zPdAelu9CH9MBa8xJxdnGC5t2EmRSZFgMq2O/+eJEQ+IxSC0NrsmMbDeqX+xXsfSopb0kVcKuXjgHhu6FLQAyBAHk5R3AutJAZH7giv8hkCQTjQBIJ/w7pA+Tdz799NNOF/UM6u1thjDyTgJFOr3R7IOLP5qgcOPCnnF39di9vJaqUNpy0VGQoIwZbGh25KjwekooqcLu0bM3gDPA5pr/eWKPd3SL4cfYh2AJ45PdAWSwhPERAOl8mhkigWT1dLnfuXOn080qNbGjRyeTEACpUYb2G3RisarwXXgtgTy7HIi5B1j7LHDthN9dFwApANLvQRSEFXAhTYnfHXfcoULq0KlF33iM855ho7wtDCHFMD20sWQb+kYtEwGpPUBkmCpew/tclUwAskcvAMnAzg4agNzTF0jzLRmFqzbtzwmA1CgigcQ1niipDO1nSOb/hgHIzNUG9z8BkBnvJ/QAZBpwbAqwPCcQ/w5AdbafRQCkAEg/h1BQ3k4QQIcZ2ikySL7txmN0Egi2hX26BLJHT42mh0ZrAHJLPSA5qxOl0YQXAKlRVACkAEhP5pYASMmFHXoSyANfah+V/cwV61gd5sng168RACkAUh8L8msdBTJLIHtoHTk1F4jIq2kckjLi/waqlwIgNcoKgBQA6ckcEwD52mvpNjueEMzIa2izSVtRxkazqoScBDI1CdjxEbAwDDhpTI5cAZACIK2af9JuBgUcAsiLccCaYsDSHMD5wGdFEQCpvQ8BkAIgM2am871sCyAZ7kePA2kbANc5qYw/IwBSm6Re2UBeOQBsqKRJJc4ZE2JCAKQASONnt9ToLQUI3t5++23lRMOoG6rQxnlTDWAxUxrSkSZrHm5v23F1vQBIjToCIAVAupon+jlDASQBEbNqMC+1/WZVSAT9QW1/dSZBAMmI/96GsrCty599AZA+AMjzq4DoW4B1JYAkY+JnCoAUAOnPPJZ7jaEA+XLTpk0VgKTXtip0nKHGgQByRxsg1ffA5570Uv82cFFr1TeLfWBILfHC3qNiQJMeVhS2K040rilvGIBkoNp69eqp+GD08LPd7rzzTmzfvt11T0w8qzMJHUBytWVFEQDpA4A8/rv2MUn4AEi9ZMhrEwApANKQgRSkldArmtmWmO1I38iPmdyBGYiCpZAvMwMMw/gwlV56OfgtEJ4TiCsLpGSkS0w/b+CO/m0QAHkBzZo1U05YBpLXq6okjA+QbeJAMtaXHkQ8b968sN2Y4pAhH4Kl6ExCACRUeqaQCeOTegXY01tzoDk00rDhJABSAKRhgynIKmIsSOYUrlKlipLmMKuXvvE4F7HBUpwCyDOLgZh7gYgCAE1YAlj0b4MASAGQHAsigXQ92QyRQJLQzOObI0cOFQh2woQJsN+cZYVx3b3AnNWZhADIEAOQV48D6ysDkQWB0/MNGxwCIAVAGjaYgqgipqNr2bKl4sv64t72t1SpUuDYD5ZCvuxQAnn1GBD3vJZ56oQxjnPOnln/NgiAFADJsSAA0tlM0Y4bBiCZdPymm24K2qTftmTQmYQAyBADkJfigcgCwNqSwCXjTCIEQAqAtOUP18s+ozs8+eSTSjNUo0YNkEczDzW3Dz74AMzzSxVZsBSnADItFYhvAiwLA7a3DGh39W+DAEgBkAIg3U81wwAk0/0QQDZo0AD0cGZC+jlz5qRvVjmqOCKBziQEQIYSgEwDTkzX7B+3NQcYzsegIgBSAKRBQymoqqHd41NPPYWbb75Z2T5SXc2sMNyYFYZaIfusMVY+gFMASc/rg8OByDzAqgeBtMA50ujfBgGQAiAFQLrnBoYByPfee0+pSnLlyoUHH3wQjz32GB599FG1cZ9pDoOl6ExCAGQIAUgCRgLH5TcCNKo3sAiAFABp4HAKmqqSk5OVIwSdUqZPn46DBw+qVINMN8jUswSSIeFEQ4qeiwJWFgYibgQurA8YjfVvgwBIAZACIN1PM0MAJFexZcuWTXeisbWz0fdpzB0sRWcSAiBDCEAyHlz0bcCqh4BzMYYOJQGQAiANHVBBUhnHNVXXN9xwg4qOwf033nhDba+//jp69OhhWagaRyQiX3ZoA8mLU84DsU8By8OAg187ut2QY/q3QQCkAEgBkO6nlCEAkoRm/EeqsUeMGOFwO3068HlM3T+udoXOJARAhhCAPP0vsDQM2PSaYeF79PEiAFIApD4WrqffjRs3Kg2Qvoi3/y1TpkxoONHoL2XbuxqA3FRVP2L4r/5tEAApAFIApPvp5ReApJefXiiFJMFdbfq1Vv/qTEIAZAgByITWWiy4Pb0MHz4CIAVAGj6ogqDCvXv3KscZSh7r1KmD2rVrp2+URDL0mlXBsh2Rh3zZqQSSdpC0gQ7PBay8J2DhfPRvgwBIAZAcC+KF7WimZhzzGUCuW7cOHTp0UE4yJDQlkEOHDlWeffTus92GDRsGIySQZIg0DGd7tuXq1asqzmRUVBTCw8MRERGhfrdu3Wp7Wfq+ziQEQIYIgKT6KuY+IPoO4Ozy9Pdo1I4ASAGQRo2lYKqHfJFjmzyTQcNtNx47fvx46NhAkrDKjOVuzZnmyI8BIbX+bRAAKQCSY0EApOtp5hOAJGPq37+/sq2hLQ2NsatXr668/W655RbYb4UKFfI7kPhff/2FatWq4bPPPoOt5JOPt2/fPpUFp379+vjwww9Bhx5u33//vcOn15mEAMhQAJBpwMlZQHgYsJ6ZKIzJPmM7MARACoC0HQ+huk8tENXWU6dOVc4y5JOrVq3C4sWLsXTp0kzbkiVLEBcXB/JyfwqdcLhoZyYy+8LvAvn2lClTVJ/Yr19//VXxa/tr+Z982bkE8r87ttTV1Nhb33JUhd/H9G+DAEgBkAIg3U8nnwAkvfvGjBkDpigkUGMqwEaNGinv64cfflgZbNv+PvLII9ixY4f73ji4gkyQdpUEhyVLllRA8fLly5mupKSRQXEp9YyMjEyXQG7ZsiXTdfofnUkIgAwFAAlgS20g/AZg/0D9FRr6KwBSAKShA8qiyi5evKhU1A899JDSBjEVHNXXjAVZtGjRTBuPkWcznI+vhVql3r17K97raLG+bNkyxbM/+eQTpUpnHMrWrVtj7dq1Dpt0DyCpxp6m2UKveRq4cshhPf4c1L8NAiAFQAqAdD+TfAKQrJahIBjvcdOmTaqV6Ohopc5m/EdHm6/5ppOSkpS34O+//66Y1Ztvvgkesy0EkLTxcQYYba/lvs4kBECGAIC8tEML37HiFuByYEJBCYAUAGnPI0LxP2PtPvvssyoaRrdu3RAfH68W+fbOM/p/gkiG8/GlMJc2hQdvv/02nn76aaUZsq2HPHbWrFm47777FF/esGEDuK1fv17Fn7S9Vt/nPW4lkFePAhF5gaibgWOT9VsN+9W/DQIgBUByLIgK2/XU8hlAkri+FG/vo1qG6hGqSr788ksFFB0BSBqFT5s2TalrdFDrrH86k9ABpFVBzqniqVu3LpgxwqqycuVKBHUu7P1fas4zm2oEjEQEkPzgzp9vXHpEbzvLMVCpUiVvbzPses6Jb7/9NgsQMKwBqSjgFCCP/PvvvzFw4EAF1hITE1VKWWpmvv766ywbF+WUWvpSEhIS0LdvX9DunIt6tmlbOJ7mzZuHl156yfawy33e4xZApiUDm6prWWkS3ndZny8n9W+DAEgBkBwLAiBdzyKfASTtZ95//33MmDED9ipl+yap8v7333+VfSJ/fS1kUgRc9gCSK+0XXnhBpeeiuoSr4rZt2+LYsWMOm9KZBAFk1apV/bYDctiIBwcJXKmapw2nVWX16tWKpla1z3Z79eqlwH+WPqReBDZUBKLCgAvzspw26gCBPFVxixYtMqpKr+uhJKhKlSpe32fkDSNHjhQAaSRBLaqL/C3Q5dq1a2BmGwJQAsgBAwZkapJ9oP1jiRIllEkRnSwpgXRVeI9bAKm8sf/Q8mKvfc7QlKbsm/5tEAB5Qb0LLhCsKjTBKF++vFXNq7EgANI1+X0CkJxkNIamKuTee+9VDISrXBpqU41Me8dt27Yp42p+lJjekFlpeD2D1/pS2OagQYMcAkim5OJql4M9NjZW7VOaQ4caR4V1Uc2eM2dONUDZZ3ooEsiZtdELkgyVTkj0Gje7fT4nM1NQzUQQTQDDPpn1/Ho7bPejjz5S0i/9mPo9cAwX900DVt6OMwtuxr69m7Bvn/H9I93XrFmj8gNPmjRJmWZk6ocJY4J0pwnIiy++CEYaMLt9tkeTlD59+iipkqM5I8dCgwLUvvzyyy9O1cS2T0HtDnnfqFGjsjgm2l7nap+5tLmodwQgmcqWCSY4rtq3b6++E/369YMzjQ/5cvPmzVGwYEF07tzZRbMngfWPAeF5gWMTXFzn2ykCX/bZnWDEt9o9u4s2pfymWlUozW7ZsqX6nlrVB/KkihUrWtW8apeS+x9++MGyPtDJbfDgwZg82XhzDSMeyicAyYapViYzeOaZZ5A7d27kzZsXRYoUUQbVZBoMUvv4448rz2ymN+Q+V3UM/+NLcQUgHdW3fPlyFC5cWIEk+/Osi0yCubvp7PPBBx+okETt2rWDWRsZKm2I2H6zZs28bp8SVn83SmspAaXRPUMy8dn9rdPb+zt27KikFK+88kp62x+3bY92bdti3bQSwMowTB9WHG3btUfbtsb3j++BjJKSkpo1a6JTp07p/fD2WXy9nnTnGKC9mK91+Hsfn5tzlmpJKaFJAUoFu3btittuu005yEycOFF5ZfNDTIcXbnSaIe+mgwvfNXk1r/eVLzsDkKQgF0NcHNPukRu9sUuXLo0ff/zRYQ5u8mXORQJISjUpkKBWIPO2GAsXzMWGmeWVN/aFtQ2xcsUi/Ltwsd119vd59p9t8rtGLRYX1/Rgz9y+Z/X4c8/ChQvVgpYaPsc0CGwf+MwUyFCwwOQgVvWBQiriC9LSivfA5+Y7oPPXggULTO8Dn3n27Nlo1aqVmjvByJV8BpB8GDrGMEwEpYxNmzZFuXLlULx4cQUWaVjN//T0YxxISgep8vC1eAsgef0dd9wBRykUdQBJYEvPbjIKTlqzN6r/SaMJEyaY3rb+rLR7o+SLk1Q/ZvZvw4YNlWRab/ffhYuwcNZgHP0rLxBzG+LXzcZCHgvQO6ItGPvAlZ5VdCCzpAMETTwC9Zzu6iWzZJgsKaFJAZoKUfrI+cxF/e23364WRvTEbtGihQJnBEYvv/yyWuyT//3vf/9TvJs2jb4UVwDSUX00V6HDo70ZEq8lX+bHkgCSixleS9tk+61z1x74ZdhbwMo8ODHvVnw7sDk6demd5Tr7+zz5T1MW9u/5559XUlNqzDy5z+hrKleujAoVKjilgdHt2dZHQQ+FC0899ZQaG87eg+09Ru+zD9QgUsPJuvnf6Dbc1ffpp5+qd0DToi5dupjePp+ZAg4KV7j4CsbiF4DUH4jMgOpQqk+oQqb0j84ZBG9Uz/lqqK3Xz19nAJJMk3Z89h7YRO4PPPCAwwDmOoDUnWisUlWQLpQA+uoJaUsfX/cZUoMqKCsLJypBXKZyfAgQfiOw4+NMhwPxh9k4+OFgbDyrCh15yCisLKNHjxYAaeULMKBtAjqaZAwZMkTxFoIAAskCBQogX758KkYvJd0EJ23atMHMmTMVj6b00pfiLYCkVJQfZEffBFsA2bhxY2XiQ1t7+23duvXYtXU5sOEFXJkfhm0xvbE2bnOW6+zv8+Q/JaVUW1IrxZBw/O/JfUZeQ2kwQRu1MzRzMrJuT+uiYIhAmgsSK2jAftIhjOH5rGqf7fId8PtEXOMp7Yy8bsWKFUo7SAFDMBZDAKQZD0bmQukIA5bbAj7aapC4tCWkrQIHHSWedKpxZkNiCyC50jMiS44vNKBEVryw09Tqkh+W9MJwPWuLAxH5gcSI9MOB2gkGL2yqFcULO1BvOPvVe+nSJWVLyyDftJ+ilojahnHjxqlwaww4TnU2eaE/xRmApFCBmhVb3srFPu3hKVXhvn2xBZA0qXFdUoG9/TVnml1cAF9wfbkXZ6m+pXqfNLSqMM6ys++XGX3i+6E5AYUzVhUKVrK7DSTn0eeff3792UCaPajIXMgIuRqwz55AJwCuuMl0KHrnL42QydwcFXsAaVU+WAGQmmSZovp0AJmWChz+AViaA9jyJpCS6OgVGnpM4kBq70HC+Bg6rIKmMi6yKWEk3yQw8Bc02j4YHRi5qLe3nWVbtMulhmXs2LEKTNLmmwt2SkgdFVsASbszt+XsMi1G7PJ8wNlwt5d7cgH7QKkseZJV3wX2gXORYeusKnR0okd8MHhhGzlevaEn26UXNt+FrxJ6b9pzdC0xDG1yrzsnGkcPG+hjzN1Kw2xHA4pInZ7fZE6MqUem6azwfjrRUIVNhmYVoxAA6QBAXj0CrC0BhOcHjv/h7BUaelwApABIQwdUNqqMUjpKSLKYoADKpIkLe9qP0UmLGiSq5Oj97aiQL+s2kB4BSC4u4xsBi8OAHW2ANN/U8LZ9YR8EQGr+DXTsEwD5lXIkEgBpO0sy9g1RYeuAjGoRW/VyRjPBtaf3VwBkEGWimTQJQCpwdLymltr0BnDtjCkDRwCkAEhTBtp12AjBIL28nTlIUhK5c+dOtbh3phHSyeI1gOSNRycCkTcDK+4ELmfNx63X7emvAEiNUnSQFQApgcTdRsYlCwAAIABJREFUzRvDACQzwdD7TzfMpqTQ2UrTXacCfV4AZAaFgyYTzaTJwLUTwJqngMhbgGPmGQ0LgBQAmTEjrp89ggDyYXfALVie2CcAefUwEPeitug8MMTvRxEAqZFQAKTGEyWQuOspZRiArFatmgoUzmDhjG1IQDl06FDlycZMH8FUBEBmvI2gAZCTfwMOjQaWhgEbXwOST2d0MsB7AiAFQAZ4iFlSPfNVM7wanVaYOIGOWsFcfAKQfKA9vbR0p7FPAMnn/XpEAZAa+QRACoD0ZCIZBiDJoGg0zVAkDBtBIMkAtc8995wKiRBMIFIAZMbQCAYA2a1bd/w8ZhCw+jEgsgBw3NyYVwIgBUBmzIjrZ4/24HfddRdy5MihMoExODcjVDCIOG3Gg634DCAvbgZiHgSW5wAOj/HrsQRAauQTACkA0pOJZAiAZEO0dWHIBjqwzJ8/X616GcibQJIZX7gaDpYiADLjTQQDgOzSrTcWjyupMktgU3UgxbH3fEavjd0TACkA0tgRFRy1HTt2TEWtYLIE8mFujAfJrEtMH8pF/5UrV4Kjs3aBxD1yoknveRqwo7XGP9Y+CyT7HrlBAKRGVAGQAiDTp5eLHcMAJNugAw297Oh5x/iGt956azrjcpQRxkW/AnpKAGQGeS0HkACm/9Idx+feCEQVBM4uzeicSXsCIAVAmjTUTG2GfI6aH85x5nnv2bMnypcvjzx58iBnzpyoVauWOm9qp1w0xv565YVtW9eF9cCKAkBELuDoz7ZnvNoXAKmRSwCkAEhPJo4hAJKTbvz48ahdu7ZKf8SMB/qKt1ixYiqEg1WhchwRgf2VMD4aZawGkEhLwZnoGkij7WPCewDjQJpcBEAKgDR5yJneHPkvY8m99tprYApD8mem6zt69KjpfXHWoF8AEmlAfENgGW2oqwCpvqnoBUBqb0cApABIZ/PU9rhhAJIrWx000vaRTjQjRoxQcaQYbDaYigDIjLdhOYA8OQeIuRWIKQxc2pbRMRP3BEAKgDRxuJnWFDVC//zzDzp37gzmw37iiSeU9JF8mjyaNuuJib6re41+EP8AJIDzq4CI3EDUzcDJP33qngBIjWwCIAVAejKBDAOQVIfQtoYBY2fNmqVsHiWMj+tXkO0DiTMEx8bXlPTxyKr2lCFYUgRACoC0ZOAFuFHGX2TeaX1hT1v0Z555BrQvnD59Onbs2OEy4UKAu5eler8BZFoKEP+2FtJnS12fbCEFQGqvRQCkAMgsE9TBAcMA5IIFCxATE6PyqzpoJ6gOkUkwZzbtgJh/2FkQ3EB3OlsDSKqqDw4DIvJg1Q+58c+ciQwjbkkRACkA0pKBF+BG165diyJFiuDBBx8EPbC/++47xaM53oOxkC8z3WHBggVVPGGf+pgYCUTmB1YUAk787nUVAiA1kgmAFADpyeQxBECyIVepAz3piJnXkEn8+++/CkBWqFABTJFoRcnWAPJ8rAq9kbbqdnzeqTQmTpomEshKlawYhqpNzgnJhW0Z+QPS8P79+xVonD17tsoGw7SDwVw4Bj/88EMFID/44APfukrbx4QPtPSGjOjA1KheFAGQGrEEQAqA9GTaGAYgPWksWK4hk1i4cGE6gLTKkDzbAkiG6YlvrFRNaQe7okun9pg4ybzMM/bjUCSQIoG0HxPXw3/m7w2VLDSkN/kywwtRAklJpM/lXAwQdTcQXgA4MsGragRAauQSACkA0pOJIwCyQgUwXpoVJXsCyDTg2ERg2U3AmmeRdm0Puvfog4kTJ1rxClSbAiAFQFo2+KThdAoYBiBTLwO7umhSyPUvAdc81zAJgNRehwBIAZDpE9PFjgBIAZAqHpyLMWLsqcs7tYwzSjowXqmtu3fvIQBy1y5lj2sssT2vjR9OUWF7Ti+50ngKGAYg2bXza4BVjwLLcgJHxlG+6VGHBUBqZBIAKQDSkwkjAFIApHkAkvZJ2xpp+a7jGwHJZ5Xaqnv37gIgBUB6wq/kmuuYAoYCSPKaPT01XrO6CHBlv0eUEwCpkUkApABITyaMAEgBkOYByIPfActvAGKLAhfXq/FJhi0AEioFKCMCWFX4HkQCaRX1pV1SwFAAyQovxQNrimsgck9Xj4gsAFIjkwBIAZCeTJiQA5AMjnvx4kWnz0bD8QMHDsCVxyGZhK0TjdhA1nJKT8NOnF0ORN8PRNwEHJucXi3fhQBIAZDpA0J2si0FDAeQVFsfHgWE5wNW3AacXeaWtgIgNRIJgBQA6XayAAgpALlq1SoV5mHRokUOn23dunX47LPPFCAhKHF2nQDIDPKZkokmaS+wsbImCdjVEaCR+39FAKRGiF2iwtaHhPyGIAUOHTrkctHORXp8fLzLcG/GA0gA104AG6pqKQ43VXOb4lAApDb4BEAKgPSEDYUEgKRUccaMGahTpw7uvvtufPPNN1mejVkXGCy3ffv2mDJlCgYNGoSKFStizZo1Wa4VAJlBkoADyJTzwK5PgOVhwPpyALPP2BQBkBoxBEDaDArZDSkK0PShZcuWYOBy+5KcnIyffvoJrVu3Vry5Q4cO2LRpk/1l6n9AACRrPrMQWFEACM8DHB7jsG39oABIjRICIAVA6nPC1W9IAMi9e/firbfeUjZalStXxuDBgzM909WrVxVgrF69Ovbs2QP+P3HiBFq0aIGGDRtmupZ/BEBmkCTgAPLIeCDyFmDlvcDZ8IyG/9sTAKkRQgBklqEhB4KcAkzA0Lt3b7z44osoVqwY5s6dm6nHTGX7559/gskaxo0bp7J/Mf92zZo1cfr06UzX8k/AAGTaNSChtaYBiS0GXHQMYPU+zJw5U2mxzpw5k6WPZhwgHQjKv/zySzOac9iGAEgBkA4Hht3BkACQZDbLli0DJ3T9+vUVWLR9DgYCp3SSk862EBzdf//9sE/dZQsgKaV0xMxs6wnU/vnz51GvXj1lsxmoNtzVSwktaReQQpuj2IeB6JuAUz87baJXr15Kauz0ggCfYDxO9mHx4sUBbsl59bTbZd5iK8uoUaOUCYiVfZC2Q4MC5KEEWlykM4ZruXLlMGvWrEydZxDzV155Bf3791eLep5kdpySJUsqQJnpYjsA+f7779uf9u//lT3A2ieB5TmA7S2BFOdZefgcPXv2RGJion9t+nE3005+9dVXftTg3630M2jevDmio6P9q8iPuyk4evnll/2owb9bOcaHDBmCkSNHgpJ0KwoxAufP5MkZfgNW9MNZmyEBIPXOJyUloW7dulkA5Pbt29XH959//tEvVb+UQhYtWjQLMNABZK5cuVCqVCmV1pD2kwRTZm1U9xCw0PN2zpw5Sv1jVtt6O3Fxcfj555/VJOU++6Sf8+s3bjP2JywDNpRD0vwwbP3rdcTGRGDN2qw0ZrtkVJwkfrXp47vje2daS/ZhxIgR2LBhg+n9IN05BjgWY2NjTW+fdOdzf/LJJwIgM3EQ+eOKAjt27AB5L7U+5cuXB1Mm2pYtW7bgoYcewu7du20Pq8VarVpZHffIl+0z0fCY/9t/USBPTAUicwFRtyDt6GSkpGnH9fr1ThIY9+jRQwkseEw/b+avrQTSzHbZFgslkO+88w6ioqLUfyv6wHFlCyDN7IN6aECBeIJ5ajVZzO4DFzH9+vXDr79al6lNp4Wj35ACkPSsdgQg+fErW7YsIiMjMz0jJZZUef/xxx+ZjnMQ0As7T548ePjhh9GmTRulsujSpQvM2rp164aPP/4Yjz32GLjaptOPWW3r7bDNRo0a4ZFHHjGs/c5duqFXt4+xatIzQHQY4qc/jv69P0THTo6fjyv90qVL4/XXXzf9+UmHrl27qo9WmTJllA0t+6PTx6xf9oGp2+677z507tzZ9Pb5nJTAUhXZt2/fTHNF/ggF3FGAINIeQJLHUqX9xBNPqI+uXgePE2gWKVJEP5T+y3M6gKTkkurvadOmGbT9hmlTfsaKnx5XquyUNaUQvXgipkybkal+gsdOnTqp0Gbjx49X3w7j+uD5szRr1kzxZmNp4Fn7v//+OyZMmKDeKRf2VvWBC3qOn6lTp+K3337L9J7MeCccC40bNwbfBQGc2X3ge6D9MPtAv45gLNcFgKRRNhlYREREJhoTQL700kvKAcf2hA4gKYEkeKEEiupuiuvN2tgeJZAEuJygVrTPNmmbRDV+TEyM/89OGq5ai9Vza+HU7DAgrgRO7v0Hq2PXOqyb7XOj9G/gwIEOrwn0+2D7f//9t1LF0TnLEDp4OY7YB35sORa54uf/QD+3bf1sj8/drl07kUDaMgrZ94gC27Ztcwgg+fF76qmnstTBsVa4cOEsx20BJBcznI9Dhw41aBuCr4YMx69jeyNl5ZNIWx6GJWOfxpdfDMLQoRntUPJHwECeSPA0fPhwg9r3/DmoNqWEljb9xtLAsz4MGzZM+RnQ1IBCDqv6wMU8JdikB/tk3FjwjA6UPNaoUUO9C9qjmt0+n3nAgAF44403RAKZhVv4cMCZBJIe2Fyx0lPbttD2kRJGMizbogPIG2+8UamQaatjReHzNGjQwHIbSNphGlbOTAbW3Qusugs48adH1X766afgasuqQhvYPn36YMmSJVZ1QdnpcgxbWcQG0krqh27bzgAkpUR0rrEvS5cuVbbp9sdtASSlLrSXpBrTuG2v4rWph+nYlw9n59+IPRuGYs++A+lt7Nu3Dz/88APo7LNx40bQDs+49j1/FgIHagWMp4H7PvCZ+U7puErhBmliNg3YB2oUqVlk+1a8B7ZLEMuILsQYZveB7W3evFlpyUSFbc8tfPjvDECePXtWiXlpt2JbOPhpA0l7DtuiA8icOXMqD0E64VhRTp48qVTy9MC1qlD65Mgeyaf+HJsGRN8DhOcGDo0CUq+4rYbvIhgCidOkYP78+W77G6gLxAs7UJSVegNNAUcAkm2StzzwwAMgf7YtY8eOVcDA9hj3bQHkhx9+aH/auP8picD2VkBEGLD5OeDq1kx10x6Zi1r770amiwL8Z/To0UrqFuBmnFZPmz86SDH2slWFjoWUBFtZKAX8/vvvLesCE6cQwIoTjQGvgACydu3aWZxoGC5i0qRJyrtvwYIFKlgtHQNo12Yf8kfvBtXHBJA00rUKQNL7lzad1wWAPP0PsOoxLd7j/i+AFOfZgvR3wN9gAZAEsQIgvxUVtu3glH2PKODIBpI3UgP05JNPZvHO5oKV882+2AJI2gQHtFzeDqwtDSwOA7bUTQ8wzj7Q9o39y+5hfGydaAL6LpxUTqknTdP4TqwobJee8FRlMxa1FYXaUTrRCIA0gPo6gKS9nH2hGlK3F2DsRwIzBhVnrDJHZfny5QpAcoAePpw5uLWj6wNx7LoBkBfWAmtLAUvCgB1tAQYP97BwkgaDBFIApOTC9nDIymV2FGCGmeeffz6LCRE/unTKIo+lzS15MaU5BJWOgomTF9AOt2DBgnj33XftWgnA3xOzgKg7gGU3Avv6qQbYBwGQmhc2bUF1L+wAUN9tlQIgAQGQboeJ5xekpKSoAb11a2aVg14DV4yUQDIuGZ0SXOW4Dg8PTweQBw8e1Ksw9fe6AJCXtgEbq2tBerfUA654B8YFQGpDTlTYpk49acxACiQkJKBq1aqYN29ellqphqSXPxf0tKmjvTU9Sjnv7QuPMVMNASTBS8BLahKwp5cWGzLqNuD038yeLQDyvzA+AiBFAuluDoaUF7a7h/HmvC2AZB5XK0rIA8ikncDm+hp43FgVuOQY2LuirQBIjToCIF2NEjkXzBSgrSDtHZ2ZAlHyyBi9DKdGh0aaHDkqpgNIdoKpVTfX0LQn60oj7coWzJyzAD26Z8SBdNTXQB4jHWzjQAayLWd1850KgBQA6Wx86McFQJYvDwGQWYP66gPE6W/SHiC+EbCMOa4rAxey5hx3eq/NCQGQGjEEQNoMCtnNlhSwBECS0jTBWfOMApFpuxvjjykj0aVb32xvAykAUgCkO0YkAFIApPde2EkHgPjGwLIcQNxLwHnfPfUEQGpTVACkO1Yl5693ClgGIEnYk/OAqMJIW5kHS8Y9jYH9euPEKc9tuY18N6SDSCChQgeJE4040Rg5twyrS1TYGim9DuND8LitqeZtvbYEcE5LdeXrixEAqVFOAKSvI0juu14oYCmATEsGDo0EVtyEkzPDEDOjsWW5sAVAaiNanGjEiSZoeZsASO3VeAUgk/YC8f+Bx9VPAGeX+f1+BUBqJBQA6fdQkgpCnAKWAkjSLuUcsKuTWhxfiyyMlOOZc3ubRV4BkBqlBUAKgDRrznndjgBIjWQeA8jLu4CtDTWbx9VFgTMLvaa5oxsEQGpUEQDpaHTIsexEAcsBJIl95SCwpZamYaFd5DnfzXN8fXcCIDXKCYAUAOnrHAr4fQIgNRJ7BCAvJwBbGmre1mtLGiJ51F+wAEiNEgIg9REhv9mVAkEBIAHEx07Dpsm3aCBy/UvARe+jS/jzDgVAatQTACkA0p95FNB7BUBq5HULIC/FA1vqa5JHOswkRhj6XgRAauQUAGnosJLKQpACwQAgGZ5yzrz5GNK7Gi6FP6CByE3VgCsHTKOoAEiN1AIgBUCaNum8bUgApEYxlwCS3tWbammSxw1VgHPR3pLZ7fUCIDUSCYB0O1TkguucAsEBINMwY8YsdOnSHae3/wisvl9bPG9r7nWSBF9flwBIjXICIAVA+jqHAn6fAEiNxE4B5Km5wLoXgaU5gE1vAOdjA/JOBEBqZBUAGZDhJZWGEAWCBUAylWGPHr1x5vQJ4Ph4YEUhYHlOYPv7wJXAJ50QAKkNWgGQAiCDln0JgNRejUMAeXwKsLqIJnnc2gS4uClg71EApEZaAZABG2JScYhQIJgAZPfu3XHmbCKQdgk49B0QcRMQngfY0Qa4diqgFBUAqZFXAKQAyIBONH8qFwCpUY8AsnZtPRNNKnDke2DlfZrtz86OQNIuf8js9l4BkBqJBEC6HSpywXVOgaADkGfOaBRPuQDs/xKIyAWE5wN2dwZ4LEBFAKRGWAGQAiADNMX8r1YApEbDqKhoVH+jPoBEYF9fIOp2IDwnsP8L4NoJ/wntpgYBkBqBBEC6GShy+rqnQNACSFI++Tywrz8QfgMQUQDY0xtITQrIOxEAqZFVAKQAyIBMML3S1NRUzJ07F5MnT8akSZPUNmHCBCxatAhXr17VL3P4qwPIcuXK4eDBgw6vCfTBU6dOoW7duiB4sKrErI5Dg5olgP3tgIjcwIpbgUOjgNTLpnRJAKRGZgGQpgw3acQkCnBeJycnZ9rIr10VWwD5zjvvuLo0YOfYB9pAKhW2LoHUW0s+C+zpASwniCwI7O0FpBif7pB9kFSGksqQw+7cOUllqE8/w3+vXbuGKlWqgMymV69e6NGjB7p164bx48fj8mXXACg6Oho5c+bEiy++iH379hneN08qDAYAeTxhOpZ8TeCYG1hTHDg+FUhzDb49eTZPryGzJLOeOHGip7cYft2RI0dUH+bPn2943Z5WKADSU0rJdcFOgUOHDmHcuHEYMWIERo0apbavv/4aa9ascdl18oLOnTujYMGCaNKkictrA3XSJYBko9TK7OkGLL8RiMivZa65etTQ7giA1MgpEkgBkIZOLPvKKGV8+umn8fPPPyMhIQHbtm1DfHw8Dhw4gJSUFPvLM/2PiYlJB5AcqFYUSwEkJYwnfgPWFQdiciJtQ3Xg7BIAaaaSQgCkRm4BkKYOO2ksgBSIjIzEc889hz59+mDQoEEYOHCg2l+xYoXLVskLKAAggHz77bddXhuok24BJBu+dlyTRFJjQ8eahFaGxokUAKm9XQGQAiADNc9VvQSQL7zwAnbu3Ol1O7YAcu/evV7fb8QNlgHIq4eAff2Us8yZ2WFYNe154MJmIx7J6zoEQGokEwDp9dCRG4KUAkuWLEGxYsWwfft2tZjfv3+/0vIkJia67HHIAEg+BSWR+wYAK5ix5gZgWxOA6V4NKAIgNSIKgBQAacB0cl4FVdhPPfUUevbsib59+4Jqko0bNzq/weZMtgWQ56KAbY2B8LzA6sKIm/s2PmxJJxprigBIje4CIK0Zf9Kq8RRYunQpqlWr5nXFIQUg+XTJZ4DDo4DI27Rg45vrAhc2eP3c9jcIgNQoIgBSAKT93DD0PwFkzZo10b9/fwUg27ZtizfeeAN//fUXOAldFVsAabUN5O7du1111ZhzacnA8UlAXOn/0hKWBRLnIjpyEarXqGNMGz7UogNIOkFZVYLBBpLMslKlSlaRQM0XGu5/9tlnlvVBGr4+KEAJZPHixdG1a1d8/PHHGDJkiEdaopADkHxdqZeAoz9poc+WhAHrKwFnl/n1IoMFQNK3ICoqyq9n8edmAZACIP0ZP27vpVdfbGwsjh49ipMnT2LHjh3o2LEjKlasqI65qkAHkC+99JJlXthnzpzBm2++iYCr0K8dA/Z0B1bdC0TlAHa+DyStV+RZHbsWtWtbByDZCUqQf/31V1evK6DnTpw4oRywFi5cGNB2XFVONV/lypVdXRLwc3R6EAAZcDJf1w0Q/BBAdujQQWmEvvjiC7Rq1Uot9MmrXRVbANmoUSNXlwb03OzZs5VTJj1gPSvJwJk5QNxzQHgYsPYZ4MQfnt3q5KqRI0cq4O3kdMAP0wn13XffBeMEW1Uo2Hn55Zetal61O3ToUPBduPOpCFQnL1y4gAEDBqhIM4Fqw596w/y5ORjv5Ye4SJEibldOBJC5c+dWtjpjxozBrFmz8Oeff5q2MVTEL7/8gjJlymD06NHGtT99uvYMM//CrNlzsDvuV2BrbSAiJ/ZNC8OckWXxx5RR+HPGXMyePQeDBw9GqVKlQKY5Y8YM055fp/WcOXNQp04dUHqsHzPzl+/hxx9/VH3o3bs32J/pOg1NGg+kO71VaTdmdts6rfncTZs2FQAZjEwtxPp0/PhxtSi/dOkSkpKSlHNjw4YNFZB0ZQepA8ibb74ZDRo0UCGACGTM3KjV+u2339ClSxdQM3HlyhUP2k/C5aQruHzkb1xaWQqpi8OAmEeUejs1+SouXk7R6rh0yYO6LoN0I3Ch8xH7Y+bzsy2+My6q6QlPcwSr+kCnWIbZM/v59fYYhopOYMOHD1fhdPTjZv3yPRw7dkw5oDFUYTCW6w5AXrx4EU888QSWL1/ukt4EkHny5MGjjz6qPP+oZuFq2aztq6++wqeffqpAA1U9/O9N259//jkcbl8Mw+dffYvP+3fEzwOL49SC/6lV8ZVVZbBwyocYPKg/BvOaz79QK9yPPvoITz75pNpn+w7rdNaWAceHDRuGChUqoH79+qa3zWf98ssvlQSUK90WLVooxm02DUh3frAefvhhS2jA56X9cNWqVRWzcjlx5KRQwAcKcKHy6quvKscaZ7frAJJe2FzUfvfdd+rjzQ+4WRul8JS8URtAAMd54Vnb32D48G8xtF9TRI8rjBSCyOg7cHZNK0z68QsMGT5anR8+bJjb+sgTa9eujRo1alhCAz4zeULJkiXRrl07y/rABT15Iunh+XswbqxwLPAdUMBBfODZODCufT4zASzN9KzU0Dmbrzwe0gBy1apVmDZtmlox8WEoZuZLJ/NxpxYmgMyVKxdKly4NhpegHSK9uc3a6DQRFxenjM2XLVumgol70zbvz7Lt3odde/di1+Zp2PXvCzg6MwxYeQew82MkJ64D47Ml7Nybfh+fmRIvAgfam2Spz1EbBh9jH1q3bo1vvvlG0d6KPnAstGnTRkmEraIDQ5/oEQWsoAGfmwxbVNiu2KWc84QClFjZl3nz5ik+Q89sZ8UWQHIu8KPJEG1mblOmTFHakOrVqyutAOPTetz+LxPw0y9TsGjeOCRtfAdYkR9JC8IQNa4wfhzeCj9PmIKfJ0z1qD6q8LmopuTJ4/YNohWTcVArx3fA+MpWvAf2gVJYahP5/NTWmU0HjgVKwhs3bqy0VGb3ge1RO/nWW29h6tSpzqaNpcdDFkCS2TDjDFcHHORcIfCXE59BbCl+dlUIGhhInDaQBFZWlPPnzysmYZgTT+ox4PhIYOOLQHQYsLkScOwXwEWg29WrV6tsOFY8v94m35uVE4T2swRPHE9WFWZDYlB8KwttfQRAWvkGQr9t8mWaY9AkgvssXBBRhc2FItWzzooOIKnCJnjitbRDNHOjBovAgRoBxhMmj/au/fM4k3gZKZf2AQe/BlY9grQlYUhc8TTO7R2Hc+cTce78ZZd1Us3P7xlt39gf79r3n158ZvoVEDjRLtyqPmzevFmpsL1/B/7TgDTnc1MKTQno6dOnTX8P7AOxCeOpigTSGdfw4zhfKlMZUg1JAEBxLxkXB5y7ogNIZqKh9MWKQuBiWCrD0/OBrQ2A8IJA5K3AjnbAhfVus8rQSLpWrVpWPL5qkx+NYMhEwwDGkolGvLAtmwjXScM6gCQAbN++PTp16oTmzZsr+1ouVl0VHUBShR1aTjROnirlAnByJrChkuZcs+ZR4MBnQLL7zDXiRAPQn4HmTVYWSkG5IHKXhjNQfdRBrNhABorCABiQ+/Dhw8oTm0zIk2ILIN2puz2pz5drDAkknrQL2NsHWP0EsJQegGWBY78C10561CUBkFDG8gSxAiAFQHo0aeQilxSgEw0X8gwLRUnaTz/9hE2bNqVLJJ3dbAsggzoTjbMHcHg8RVvIx7+j8eeIvMCWN4HTziM+kA7BkAtbwvikKd8E2uI6Mstw+LoNPkgpZL9+/cQL22C6+l1dyAPItBTg6KT/Vrc5gBUFgV2d/5M6pnpMHwGQAiA5WPSPlqiwPZ46cqEbCtBblWpoTz++1yeA/I9IVw4A+78Aou7UgOTqopqKOzUpCxX1uUjNmlWF4WOaNWvmNppJIPtHzWD58uXdLjwC1Qe+Bzq3CoB0TuGQtYF0/kienQlpAHk+Fkh4D1hxF7A8DNj4GnBylpYZwbPHT79KAKQASA4G/aMlADJ9asiOyRS4rgEcXkp8AAAgAElEQVQkacmg46fmAesraskcIgsC21sBF+IyUVqfiwIgBUCKBDLT1AiePyEJIC/v0PKvrn5OA46rHwMODAEubfOZsAIgBUBy8OgfLQGQPk8ludFPClz3AFKnz8WNwM4OWh5t3ezo8Bjg6jF1BY2wgkGFLRJIkUDqQ9bZr0ggX3zRbcgfZ8Tz97jHNpBJe4Aj44C4ikD4TZoaZPuHWsqs1Mt+dUMApABIDiABkH5NI7nZAApkGwBJWhEsHp0AxL2oSSPDbwdoJ3nmX6SlXsPQb8aqWL0GkNWnKkSFrfFEUWG7Hj7ZFkDSI5BhfOiFbUouagfvwS2AZArC478Bm+sAEbcCEXmAzQ2AE38CV4wJPSQAUgAkh6YASAcTVA6ZSgFbAMmwP1YU9oHZqehUx1SzAS1pyQDNkXZ3A6LvBZhLe1VRpO3tj59GdsZXQ0cGtHlXlQuAFADpanzo57ItgFy7dq0CkGXLllU5tHWCmPnrFEDSVoYgcVszIOoebYW64TXgyFiA0kh45mnuybMIgBQAyXEiANKT2SLXBJICHIOMCcswPvXq1QtkU07rNhVA6r24dgI4NQfYXE9zsAnPix1/3o+YGU2Ba8YICvSmPP0VACkA0pOxkm0B5Lp161QmGmsB5EnUqVsXu3brcShTgZOzge0tgZX3a8xkzbOa996lLUBa1gwPnrxkV9cIgBQAyfEhANLVLJFzZlCAY5DpXRlInPFxrSiWAEj9QS8nAAe+AmKLqriRqdG3AFvqAcenBYT36806+hUAKQDS0biwPyYA0kIJ5MmTiXijVn3s2rkTSFwIbG8BxDygSRxXPQrs6QucjwFSr9q/N8P+C4AUAMnBJADSsCklFflIgWwPIEk32rQnRiD+72o4PidM+xasvFfTRp0xL1OWAEgBkJ5MYwGQFgLIU8cP4MtulXEsogYQW0TzrI55ENjdE0hcoTETT96iH9cIgBQAyeEjANKPSSS3GkIBAZAaGWmg9OPYrzHxm7eAXc0123d6a696Qgv7c3YhQPvJABYBkAIgPRleAiCtAJBXjwCnZuPqxoY4+e8tSFlG5vAQsLuLWn0i2X0qRk9erifXCIAUAMlxIgDSk9ki1wSSAgIgNeqSDl9/MwKDPh8KJB/SvLU3VgWYxYaONjEEki2Bs4sApksMQBEAKQDSk2ElANJMAHl5O3DsF2Dzm8CK+5AWnhO7pufDlfj2QGIkcO2UJ+/M0GsEQAqA5IASAGnotJLKfKCAAEiNaPpczAgkngZc3KI5UW6sDkTeAiwOA1Y+qSWUOP03cGW/DxR3fosASAGQzkdHxhkBkIEGkPSoPhcJHBwObKgCRNwORORW+xe3dEPH98rhwO4NGW/E5D0BkAIgOeT0j5YEEjd5Akpz6RQQAKmRQp+LGQDyPxKlXQUuxQNHxwNb6gKRhTSJ5MpHga0NNIB5YT0nczpNfd0RACkA0pOxIwAyUADy6mHgxG/Arg7AmmeAZTcBkfmBDbWBQyOAy1tw8vh+VK9ZHzt37fPkXQXkGgGQAiA5sPSPlgDIgEwzqdQDCgiA1Iikz8UsAFKnYdoVgFnJjk0C4t/NiCHJWMEbqwB7+mgpE1PO6nd4/SsAUgCkJ4NGAKTRAPLCOuDAMG2FGF1Y86KLuR/Y9oE24S/vTPeqPnkqEXXrvoldu3Z58q4Cco0ASAGQHFj6R0sAZECmmVTqAQUEQGpE0ueiUwCp05KONFcOAqf+Anb1AmKf1SSSy28AVhcB4ptqmq9zMfodHv8KgBQA6clgEQBpBIBkINgTvwMJbYB1pYGIXJpH9boywN7+AMMv8Bq7curUSRXvTABkd0ycONGOOub9PXLkiMo8MX/+fPMatWuJY6BSpUp2R837q3+0BECaR3NpKTMFBEBq9NDnolsAaUu+lPPA+WjgwFBgUw0gPKcWR5iON2tLaLaSxyYCSTtt73K6LwBSAKTTwWFzQgCkrwAy5aJm27j3U2DDq8DKwhpojCqoSR+Zu/pCXLq00Ybm6btOM9GkXxH4HZFAigSSo0z/aAmADPyckxYcU0AApEYXfS56BSDTSZoKMCD5iRnArk+A2GIqKDkY6SPqTmBdOS2m5NFxwKXNTr9PFy6cR7Nm7yAqKiq9ZrN39uzZg/LlyyveZHbbbI/vQXJhu6a8AEiPAWSa5iV9Ya1mw0hP6piimrQxMh8QVxYgmDy9AEja7Zrq/50VAKlNUuadFQmkSCA9mjRy0XVLAQGQ2qv1D0DaDI/kM8C5lQCFGdveAWIeAcJza2ZVkbcCsWWArU2BQ98CZxYDV/YByYmqgvOX0tCg0XuIXOG9+tumB37tCoAEzp07h379+mHy5Ml+0TJQNwuAVAAywTl9rxzQYjMe/BbYXBeIKQ5EFNQcYmhzkvAhcPIPgN5vKdrkc15Z5jMCIAVA6iNCVNg6JeQ3u1JAAKT25g0DkOkDKRVI2qeFijsyFkh4H1hTUvPipmQyPD8QXQRYVxHY/h5wZDQuH/l/e/cBZklV5QF8JCdBhpxBMghIDpINuCKggCIiCCjRhAoiaYPusmJYA4qIIIIw6BJ1cZVFQEWSqKAEdVxEFNcEyKKyyghnv1+Nd76a4r3u1/2qmdf9zvm+6npddevWrX9VnfqfcO+9Oo4/dq/4zi1XR8TEzYQ2p4kdfiSBTALZ4bEYjE2z58JeILbddrv48cwyFzW/9d+GSnj4yxE/P2M2abx5vYivLxZx4xIRt20Rce/BEf9zVsRjt0XobT1OSQKZBLI8OlOJQHquf2J6zpREYAwIJIGcDVb7BLJ2E3zfdLx57NuzO3UKc9+5Z8RtG88eqNyMNzcsGU9+67kx8/PT439v3TPigVNmezEfujLisVtn9wCf9XDEU0/WKm7/ZxLIJJDtP1Ut1Xj7d++OadMWjA2et13MvOfWiD/cNPslue/4iLv2iLhtrYhvLhJx85IRd+wY8ZNjI35zTsSfbo+Y9auIeKLvlvz+97+PV77ylXH//ff3Xdd4K7j11ltjn332Ge/hrRz37ne/Oy666KJW6hpPJb/73e9CG6655prxHN7KMQ8++GDsvvvurdQ13ko+9rGPxXve857xHj7nuDvvvDMOOOCAOOecc8JHICUR6AWBJJCzUZpQAlm/EU89Mbtzp5FBfn/D375/J0T8YL946pb140nhboSy8lIuFXHTahHf3TLirr0jZh4Z8dOTI37xgYhffirioasiHrku4rHvRPzpnoi/PBgx638jnhz/dzIJZLsE8nvf+1787GftDhk4nCHsp56MH333qjhgtwXirBNXij/c9vKIe7aN+N7yEd9bNOL2FWLW7TvErHvfHLMePCdm/f62mPXnh2LWrCdi1pMRs/4aMWvWkzFr1qwRlyeeeCL+7//+r+Pyl7/8JZCGvfbaK+65557wf7eyZfsf//jHeOyxx1pb5Fd89atfjb/7u7+r6nzkkUfi4YcfHteChP3mN78Z8+J8b3nLW+LjH//4XMf++te/Dr2j21h++ctfxgMPPNBx+fnPfx7f+c534phjjokLLrigOl+3smX7fffdF20tPI8//vGP47rrrovtttsufvjDH8aPfvSjcS/33ntv3H333WNetAGJPvbYY6s2lDq+//3vB0I4luUzn/lMLLHEErHqqqvG/vvvH5/85CfjV79idKUkAt0RqBNIhvW8kiuvvDJOOumkSifOqzYw5t7//vc/w6c3APmfIp58MP760LXxmdN3iZ/deEzEL06I+OErI+7YLOLWZ0fcOG328q0FIm5ZLOLWZSO+s07EHc+P+MHOsx0w9+4X8ePXR8w8enZnHtP0/vSEiPtPnr386mzhvhGvz/dxp512GrHMRO/84Ac/WH2bJvo83er/85//HP/8z/8cl1xySbciPW/XKes1r3lNnH322dV3rucDRyg4JATyyYg/3hPx2y9E3H9qxL2vice/tXn8z+XPql6Ep66fFvd+dlrMOHVanHzwfHHU/svHYa/aMg49ZP849PA3xqGHHxGHHn5UHHrYEXHooYfHoYce2vNyyCGHRKfl9a9/feWlWWuttWLfffcN/3cqV9920EEHxWtf+9rWFg/Ti170olh99dWrB4vX6NWvfvW4FkRhPIvzbbTRRrHNNtvMdfx+++1XeWd9SPpdXvGKV1REHVlvLnvvvXe85CUvifXXXz+23377alilZpnm/y972cuizeWlL31ppShXWGGF2GOPPfpaXIt7OtbFeTfccMNYZ511qmNf+MIXVh5RQwvtsssuY1q23HLLWHzxxWPhhReORRZZJFZeeeV4+ctfHj6KhgdJSQQ6IVAI5LOf/ezwXjLQ//SnP1XPDGO3rUXkR5pFp8U5GJJve9vbKiORUd2pXH0b46ithcHMqP3Hf/zHOPnkk6t6f/GLX8R4FvWIbvHkjb7cHz+9/2fx0/sfiJ898Mu4+54fxb777heXXnZZ/PyBu+On914TP73jgvjJLafHzK8fFzOvfV3MvHr3mHnFRvHAlSvE77+yePz5uoUjbnxWxM3m67Y8K+KW+SJunj/iZmTTsmDEzQvGU7dvEj/+4Xfj7nvurRwonCj1hSH8X//1X7HVVltV2/1f39/8zeAdj7HbzTDmrbvjjjuq5+CEE04IkTqOhttvv31cy2233RZGPBnLcsstt8TXvva1OOKII6rnwbnL8TfeeGN885vf7HlxnO89vbzaaqvFq171qipC5DnuR6YegXxyVsQTv4547JaI31wYcd+Js4fVuX3riJtXivjGAtWwBn+5YYm4+az546y3LxhH7rVQ7L7lIrHeGovFEkssHgsuvEQstNBiseDCi8WCCy0aCy60cCy44ILjWhZaaKHotKjP9sUWW6xal/87lZ3IbT7wpQ0TeZ6R6l500UUrotEsg4A8U4s2WLThmTpnOY97UO5D+f1Mr7XF9fMc9rsgABbXMN9881WYbrzxxpXly5uekgh0QgCB1ON0ySWXjDXWWKMyrKXXMOAYIG0te+65Z1cD0DkYQAypF7/4xV3L1Q3Ifo2++vHOyXhj0K677rpVG/w/nkVKzG677VaNL8sQ7HVxzE477xIrrLhybL7F1rH7C18Su+724mrZedcXxc47vzB23nH72Hn7jWLnrVeN3bdeOl62w+Kxz04Lx/67zheve/G0OHafaXHSa6fF6UdMiw8fOy3OfMu0OOu4aXHu8dPicydNi4++baHYbZftY/sdXhAveEHnxX14znOe03V//TjG/7bbbtvasvXWW1dODWSLg0VbkNnxLltssUVsvvnmY1423XTTWGmllar3QR2bbbZZtTzvec+LsSzqYcgjkOU7t/zyy1eG2lVXXRWipeORKUAg/xDx2M0Rv/lcxP2nRdx3UMQPXhhx68YRNy0X8c1FZw+1c/OqEXfuFvGT4yJ+fW789HvnxWbrLhQbb7BaHHrYkfGOE06N4991Upx00imV5cf6O/nkk/62+D0xy4knnthz3aeeemq0uVDWp512WhWuYfH6f7yL4//pn/5pXIs2GH+wfrxcvPe+972tLcIA3RbncX7n/Jd/+Zeu5crxp59+erS5GGvMAvvye7zrM844owp9CX+NZfnABz5QXb+8xauvvjq+9KUvVYvf//Ef/zGm5d/+7d9i/vnnr4gAxeu+Gk+OdyclEeiGAALpHUQaGDE+dpZ+DZpOxxcjp9Pa+adPn149v532N7cttdRS0ebi/Msss0y1qNf/412WXnrpGM8yfemlA8GAw+zjrafH9OnLxPRllo3pyywX05dZIaYvu2JMX3alWHqZleM5y6wSS01fpVqvuNLKsebqK8d666wcG623cmyywUqx6UYrxeYbrxRbb7pSbLbRirHcsrOvsVxrc73ssstW5Km5vdP/yra5LLfcctX1r7jiimGBRT+L6NJ4FudG/KQDrbLKKtXab6R2LAuDzDV5F+hmDiv1in7yZD755Pg6RE16AvnozDNnj8f4reXiqW8uFv9z+bR4/PrlZ88Ic9c+EfedEPGrCyMe/XrEH++OeOJ3lf668677Ytq0abHW2uvFjTd+q8r7k8dXD0208Xu0nMLf/va31TlHKzcR+4Vy1Ou6/e53efTRR2M8izYIFTWPbStk1Us95fxyTEcr32YeqrqEdS3aUH73s5YrO9ZFqBD+f/3rX7t933veLtzEI4AQC52oN2X4EBACNLuT0Jsc79GkhLB5rXnf5M5Ke5Af/YlPfKK15ayzzqq84XLBOi3Oa+m0r9O2c889N9pazjvvvDj//PPDWp1+97MYP3C8i7F5hfPrx1988cUxY8aMEZeLL54RF108Iz530Yy48HMz4oILZy+fvXBGfPaCGXH+BTPC7xkzLonPf/7zIy46V45Wxv5///d/j8suu6y15fLLLw+euUsvvTSuuOKKkBfbz8IgH6shXso7VgfPG264Yc7yjW98I8a6CGEvsMAC8dznPjekw8FNDn4/On9SE0gE79Sjt4gnb9s+4p4D46kH3h2fPG3LOPt9r4q/PHLr7AG9nxDjf3qyrpyS1x10UJxyyimZ4D+aZs/9icAYEGCQyPlhGKQMHwI+SGeeeWaVJy5/S343IshYGkkQSMcJtzlGBwKGEOPm8ccfb3UpHRPbWCPHbS7CiRZ1lt/jXcsjdT/GujjOOZvH81S1ubjnIy3aPdL+sm+k5yr3zUaAEXbYYYdVxFEn0PF6Het4TloC6cG54IILY4fttoin/nBXNbbVU08+GjMuujC22XbH+NnPR+716eWQZCz52e+URCARaAcB72bK8CLAc7PDDjtUnjMdAXiR5NX1MpuG0QB4LRkgKYlAItAeAkijYXwYBW3JpCaQ3LDHvumtc2Hx0MOPxkYbbVzlcc21I/9JBBKBRCARmFAEeDV0epHbXcLWDHRDRBnlYTSvdPEopREyobcpK08EWkFg0hJIisq4efJEmrLbbrvGRz/60ebm/D8RSAQSgURgAhEw5qoezIY9qYvxZvUClheZkggkAlMDgUlNICVaNwfYZLkaN1Bv1EGzYrVHXs9I7dLhQGeWNvITmo+o8+og4hzFO9As43/5RtowlYdc4RXplroAG9cv/6ptcf/LPXYOHWfg3emZKPeq7TbU65NjJMesm8BAO0d6Xrodm9uHDwGh50022eRps2sZo2/nnXeOr3/968MHSl5xIjBFEZjUBNKYTGa9aIpBlA0lMkiiY4HhTI466qjQ87opet1++MMfjsMPP7waUNyo8W3O3iHf01AtkmgPPvjgMDjqt7/97WYzqqFb3vzmN1eDlRtMV0+vqSZ6CRuQ3WwTTZGzdfzxx1f7jz766KoHXidy1zyul/+F74TxDjzwwKoXnBQMA7rKDasTNM+He2UQeZ0JPvShD1UkrpdzjKUMI+W4446LT33qU087zDV/4QtfqJ5X7fS8GFw3JREYCYFrr722GuuuOT2rudHlQRoYedCkjLbRrV320xl6rHYzOrsd28t277v65X/6DnQS+mHmzJlVOUbnVBQOC9+pThjQVZ4pA4abpaxNYSTLDSyDkzuH351wdq/sMzD7RIpOvt06nTH4PStmLetWZiLbVq970hJIHzizmDRJgIfBoMW69A+K+PCaKo8CNShop/kojT9oFhGE+HOf+1w1K4uPexteMA+93pBmijEsA68tkoRoexCLGPnfNm3RxR+2ZkkxDEe/QvkZisCUfcJcnYQ3jAfjK1/5Stx1110dvXKdjhvLNorYvXAfhNTqQjEYSPgd73hHdf1IHDwM6dCGUArGtdMbrgxNYViM7373u3OGUqBEjQxgsGP3ymIwZTllbYtzmwWoGW50HkNW6AjBENPWt771rdWYYfXnpe32ZH2THwFGqWeqSSCFrnkgB80gNTQKvchA6iR0H0OS4c2gM7VdJ2LR6dhetgntq9/sZs6hHYhBXehv484y/JUz9SuPbhuiQ4UpaEeKQjiPKAQiPZFiuCI6+Ytf/OJcp/ENNKwS/F0//e070obgEYbqofcZys4BZ4Z701vu/ze+8Y3VfbKf4S161LaYHYfOt24K7uC7DAdt9dvUt/NKJjWB9FAJl9RJlrGTEMhB+dB5QCkd3jyepjXXXLOysuo3nDWz9tprV+NOle0Um+swyGe/Yg5nBKT+0tm24447VmRR/RQIbxjSWsbt4wHlLXvTm9407iYIwxqcmpJEYt/whjfEkUceWY1nVa/U+RFXL0YZ+gPBadviR86RM9ck1cH9KSLR38CqsCEsYQPImyu8k1Vcjut1bW5Xg7eO1AvOdFlmGECiiyDeprxEcNsS74dBvo2J1xRK0ceex7woSITAbBgGJ5+I9IpmG/L/yYkAkrHBBhvETTfdNNcF0Mv0TVvEZ67Kx/GP99lYiyICCK/ZYJrifTXjDIPSO0gf+d87wNjtV5BTM57Qe4ik3uv0n/H6ir5hUJrAAMEREaAXGHP+74fQaT9C5NwmpzCRAqOxqZvoXw4HZZAV42CKprUtP/jBDyrdayYwQzkVoZ99N82qo78DnODhWWrjG69+jgL9KYz3CN+yMPiL+Eab0hUOngVjZPrfCAP1b0gpP941LuObi6AyHOpCF/tueT48K8aH9D1leLRp1NTPOdrvSUsgXRhPFq8eED1YXnCTr7vJ9ZDgaCBM9H6kACmhPI0ez01fxMPH6/j85z9/rgfRdkrCzAz9frApIVg1H3RzRFOOxAtsKqjrr7++NK1aGzQWmai/THMVGOUfL8Hb3/72qlOTQaURYmTaXLf1Oj/96U9XU1bx9gkjGzyYkjDnZ1siBOVDwavnfKy8ggmlyAPcDOfyiFLy2tSvmOe2eKB5HZuhGPfZeHme4brYbpsUhzbER+HYY4+t7kOn+njMzVxQiHQpY8Ye3pp+PlylrlxPTQQ8q4wwRmJdpMXw8BRiVN83L357382AhUT6KGtzXegFqSN0Xz1cSS/55rRBXnhrGWn1j793z4wjpbMRL5Qp+3jnivA4dUvfKmVGW9Nr3mUGMmKGlDEQEaO6cNLQmR/5yEcqnYxww60YlvWy4/3tmfB8aAts6cAidCY97ZyF3Lp3jPp3vvOdpdi41+6zDrfN57VeoTKINu9oIc+ec7OvIba8s20Jgu5+C6M3xbd5m222qeYIL/t8T32351XEdVITSCAiGBSAB5CXy02tE5MC9CCsvbSdCOS73vWuym3ebGPZruNF20JBbbjhhnPc9F/+8pereVebXi5T0LG0kL/xCCLvZai/ZHDwkhjvjfA+UoiUVBG5HVIUhNoR4H5FHbyw3P68opQmElsIpDYKVzNE6mLsLAqUcdKvqMs0aBQlAsfbwPoteSyIHQ8wD2xTPN8MpTaEsjGtVvE4C6mXfFt48HQIX9c/9rab7cFHpv5BbaM9WcfUQkCY2ry9PFaeGWszE9ExgyL0krxMREjKiGhEXTzvSAoDvi7eYe8Gb12/Qu+Vd7/UxeA2ZR6DnjDg6cryftqmbULd++23XzlszGs5lzyLjETvOWMWmWW0I0cEPggLXYnkikwJ93ZyNIy5AbUD6BvEUXjWNdX7L/DSepZ8M+qC6HK69OsJhiUCqe8BLuF71/T8KeMeNA14RF7ksC2vum+vudDh0RRtQPIZOiVCqAxu4DtSHEHN4yb6/0lPIAGEMLrxHrY6uBMN3ljr70Yg5VUgCHXxwAh9c1e3ae05h/xCuY3CFkiLc8lzQ5TkKtaFRSzk2/RM1suM9TfLmzVXOvF4cczT2fTI8QZ6oZov9FjPpzyyyotX8v1YeizbIrazJpt5L8JYiCxPRb/iI0AZa4swiNA+he0+UwTuRengVD9XUR5CG/0KT7Tr9GFg6VPWrG9hEGFq50IoeWObBFIHCfejDe9Lv9eRxw8uAggIguWjRq+JOIgstGEITsRVM9SbBNL7yKht5j8jfXSnd2QiBGH1jnn3vIu8oAzdQuqc03YECpEbr/Dm1etUD51kmjviHHQVXVHXv66f59I0pW0IfeRbUFJpjCFaCKQ2aBMCKU+zLiI40sHqbavv7/W3c+iw6tsgt5QuZFjT94Wcworjp54Cpn5GiDQzoeR+hSHhXTHPtfC1PE/4l3dGOznIpC/4TtTFM8MzXDy09X0T/XtKEMiJBqmt+rsRyPLg1s/jgWERIg3lIarvH+9vIRFWDKVZBvV1LgofaWgmcGszz1y/ye8UMs8XhegFQZ7KdV199dWVN7T5AiAslHg95D+e6xYGoYThWURopq6YKSTK0jnrwipWrhnaqZfp9Xfz+vzPqkUieQIodN5Hz0Nd3B/5ma973evqm8f8Wz08GsgjEsswoYx4o5Fp3nsiXMbrXPeOOFYeGw8kz0RKIjAaAowvz1YzFWK0457J/Z5rkYkmgaQbTalYz0XWLuURKEZf28Jg9t4VY50+YOQzYOuiDUiLHOYmCayX6+U3EsS7KM2K7kGmiHPwciJUSGNdRFCkI9Dp/YhzlAHmi65BIEsI234eTylETccQYxepa+PZ4sjwDeKEEhJ2b2HLe060TepR0wtqH3LbHEpwPJi45/Lj3QPRLl5R9136l3sEC/rfs+p3Eb+Vpb/L97TseybWSSCfCZT/do5uBFIYk/evKcKtyESTeDTL9fo/EkhRyucouRzlWC8PIsPjWBcWoPBTM7RdL9PLbxa1PBbWnaR11hXxAkhE9iI2LSt4eZE79Vrv5Zz1+oWFWGosS+c2jI8PBCLr2pBMYRQKqy4ItZAVBTMRgtBTkLzCRBsR1qYg/d16ijbLdvsf1kgio6SJtdwuBgSr23Oy/vrrV6H+el28tp5TxCAlEZgKCHgnOhFIxhWdpGNFXWzXkaaQnPq+8f5GAukhIXP6R5uItQ47ctWbQmfSG/2KiIvoAw8cElLSv5yboS+lpq4rbOch5PGq526OtR3qYcRKo0LakFE4wMA1F9KKwG+++eZP8zQKG/NANqNWY22H8tpSF23hDRT906nF//JSm9EpuOjE2286g2eKQ3ZD9WgAAB/MSURBVAd5LoRYm+hh1+7b43+RSvejyQf00Ec2m9vr1zRRv5NAThSyHertRCAV02NxxRVXnCu3zIux2WabtZJ75xzOTSFQfJ0sFR0jECVEoi7ygxAaD3k/4uFGxnj6dGKhhEu+odyo9dZbb64XwAuDvPKW9eOBpJQoITmHOoGw6JE053dOv+V3ah9S2UwlYA3yggq19CtCv8XSLnWxchF0uVWEsjBAfv2ahb5Z201vSKmj1zVMDbAvBNdsB3JPgSnjwyCUVVeMtvM6wIdFnJIITAUEPNedCKTtvO3NvDcfeHpSyk8b4l3iQEASDV9T9yhqg1EjhHjrZE0Z7yuy1a/QO3QQUiiXrnRAdW4518UDVs5jOw8dR0A9r73s73WtHnUYccK5kUbfJoRS51GRKt8c3y1EvuSElvoRbY6IOrkt+9pYwx2+QuTaypFRnB6lfs8CPVlSscr2sa59exFyz0FTkFjPJ3HP6eC67kZujS2tH8i8kCSQzyDqevKWXrj103pReAYlELNyEBoPhQ99sQjr5cf623kpIZamh53XC5ETtijERZ1eZHk1SJP9QioIXD/KshPZQGCFgSTXE72jEWhewLpQKMLn/ea5eOHg6Fp1ALEgjqWHZQmPUOCsep15YCPkLqQkeblfoYTgi8gabxO+cHV9FEMh6AwHhF0uJK+wBfFHeOs5ieNtj/vvw+hDoW7/y+fifa739JTjZGgLmMCCcvNsDOJA0OPFIo9LBLyX3Qikd8C7Urxh0NLBgcFXIgb9IMjbL/cPUSth62Z9crMZsPUOSPSVd7Pe6bB53Fj/R8ToJR1TnBMu9DNS2dQ7vGW+Jf14vNTPWcGgRRaRUnoIKWTIIu5wZ0jLCW2mDPh+dOpsONbr1qHS91F76oKQCRmX8LFnRDvqor3uQ79eUPhKFWhej7Z51oSoCecCMu3bUcS3UxlOmXkhSSCfQdS53eXZNYmSJlBIXNSlR7kXFJlsPthjbS4lJTzixURKKQXJ7SxL7vD6TD4sIXmCFJp9lAcl1VQgvbZB24Up5BvWr0N+ERwoD8KKQlTrRM02FiAP6ERYmSxYZK4uFBaF7rpdPxyQu2YCd/2YsfzWy08StHsMfwpD/fUQPZwYEOVZUFY5lngbAkueRdeuLdrhOinzQqSdh1L0oXBunSCQWM9KJ+91G+3KOhKBeYGA98273smbp0Oh0C6vu2hIGY9QGgj91I84L6OMXpZSJIyrkwYDzbr0uqZ7pa4wNOUvi0LQ44htKTPWdniHGY/N0RQY2tpDZxNkGXmt6z+eUJ0qeQz7FQRJKpXroG/85ujwDXJOnlb6ik5G1KTQwAexF9ptpluNpz28qHQhPYiguXbfSPddzncR32fOBaOCaINh4PyPRJbONqXsWNeu07n09PYN9Kwx3OlepLXcJ/rZt4mDQecuebBILsdTv06Wsba5lE8CWZB4BtYeVpZmt4+wxGAPD2uz2ZllvM3zcBqywQMqZOwlKYttvEt1oSAoF2UQmfog7fVyvf5Wl9w6SliyMUtJqNhLUO/xjdDJJ3nf+95X5QEhTjyEvKUTIcIPzWt3HiSSV871G8y9zTEPfTRY1OqFvdSFbvXrqOJ++WCwMtsUngPhdB4HCpNF2+k+U+iMGG01wkG357bNtmVdicAziYB3koen25iC9DFdxNjSC9YHvo2oENLh48+QRkqcn6FmQWjruknkBGnSM1dOvKWfTo1IGeNdCLmMNyhFR4cW4flCGJESREr7kD3vv3y7tjywne4zHErnlbKfjhS9QZzdBzg0y5SyY127D3R9wd13Cr7qrxsJnhN6sLTBGonupr/H2g761/dRO1yjNSwYFnWRr8+g8ExaOIPaci7Uz9Pr7ySQvSL1DJbzsE6EeFkQyubS6VzKtCFeQiRICMCLYaEMkbS6KKensxfHi+HlYen1a93VzzGW321df7dz9lr/RD0LpV29tKOXMqW+XCcCkw0BxuRI08HZz9hD6upe+n6u03tNBwqfMrIRBRGKsjQ9Sgx7Rpx2tEFgGebCplKndMCQgyffrplnbVQKxj6yydOlvBSnidLLHCedInQIljbDh3Hdpk5yL2AqdA9fjpxO9SvHmNcGowt0Mrr7eSZgqn7Pg7Z08zB7Nuzn4OmEVT9tGOuxSSDHiliWHxcCrFohfBYva7aTeEG564Um5vWL0al9uS0RSAQSgamCgNQZ6SxSU3jcmh1VynWKUCCNokdIS6e89lI218OFQBLI4brfebWJQCKQCCQCiUAikAj0jUASyL4hzAoSgUQgEUgEEoFEIBEYLgSSQA7X/c6rTQQSgUQgEUgEEoFEoG8EkkD2DWFWkAgkAolAIpAIJAKJwHAhkARyuO53Xm0ikAgkAolAIpAIJAJ9I5AEsm8Is4JEIBFIBBKBRCARSASGC4EkkMN1vyfsao2VZvqpMgCuAVYNumtGFWNmDbsYosjA3QYPNvOBgbxHE2POmZPVEBudxiUb7fjcnwgkAolAE4HUJXMjYvxFg6tP1NiWc59tav2XBHJq3c9Wr8aMJaaYMntKfT7YTicxvdfSSy9djYxvv4FOp02bVi3vfe97h/7lRCDNpgCTJZZY4mkzDHTC1MC55j5de+2155qzvFPZ3JYIJAKJQBMBs6eYGrBMh8fANyi42VYMyD3sQi+bSvIVr3jF06a27YYN4990h2bpGnZJAjnsT8AI1296K3PEmnfV9IrdxCwOm266acw333zV/JzKGc3/wAMPrKbqMlVUWr0RZ555ZjzrWc+K5ZdfvprxoBueZbsZB8z8gHSaZiwlEUgEEgHRHUTQ/Mzmyu4mDz74YLz0pS+NhRdeeM4MMx/84AcrfbLAAgvEFVdc0e3QodmOQJpvmo5da621Rr1u5c0RvuCCC8bLXvayePjhh0c9ZioXSAI5le9uH9dm3lMWVvEiCkd7WTrNQmAuWUqKsirzh1rzoJmz1Rzg5LHHHguk1BzLxDnMONNr6MBxI5V//PHHq/qdZyRBzEwTxcPaScyaY3+T9GqnY11DmRda2ZHmQ4VZmVXn3HPPrUh2JwKpjk7Xhnzz7K600koVfp3am9sSgURgeBBgzG+11Vax1157jZgeNGPGjFhsscWq+a2Lt9G8yYcccki8/e1v7ymNZqqjihC+/OUvr75zz3ve83q63HvvvbfC3zePh3eYJQnkMN/9Ea79+uuvrwghSwuJpLDMlerlqQui+PrXv74qc+GFF87Zdd9991VhkkMPPbQikXZ42eQAmu/6nHPOqdb+Fw7oNo2W4xA2JPXwww+vvJq8cazAMi+t8LpcQfXuu+++1YT355133tPC7qz2008/Pd7whjeEdp1yyilVPZSIxXy0wj2HHXZYdU2nnXZaXHPNNdU+7UAGnfu1r31tvP/976+Wgw8+OI444ohADutzoyKxn/jEJ6q2UNjve9/7qnnAiwfSfKdEaIlXQHvMR3vyySfH5ZdfPsey5WHYcsstK3yvu+666pj8kwgkAsOJgDmb3/Oe91T6YPr06dU0hDyNTcOebqRT6O5Pf/rTc3QYY95czqaLLWlJ8tfNQU3PEucohHM0lBnSM2fOrPRY0+Aux6pP2Hckb6m2qMf0ip3E9Lfd9qtXe10D8b/zdTPstVNd2kVKlKdJIOVFqlc0rS6+FWeccUaFrW9FcSbUywzL7ySQw3Knx3CdXhDznsrVQ3goocUXX7z6vxCfUp0Xfscdd4z555+/CqmU7XIgWb+O/dSnPlVt/td//dcQOlHviiuuGM95znNioYUWqupmBfIgNsXLeeSRR8ayyy5blV955ZWrOpXnJdTWE088MVZdddWqHqF0ZdV/6qmnzvEiIoc77LBDdW5tsri2o48+ujolcrv55pvHIossUu2zn4W58cYbV1goRFGr37Uut9xysdRSS1XeQaF757/qqququiied73rXbHCCivMqcsx2qRe2+HzyCOPVHk3yyyzTFjUYf+LXvSial/BAgF1Dl7glEQgERhOBOg6BuxGG21U6Qm6arPNNqt0iDz1uiBTQrIiF9/+9rerXY7/0pe+FHvvvXdl2OrcaNs73vGOKoyrwyMD2376lQ4rJKted/n9la98JY455ph4yUteUoVz5VV+8YtfnENmzaFNB6tv9913D8Y2r2iJUqkH8WXsM+qdkwPguOOOi2IsI44f//jHKzJc9h9//PFz5ZD7Jsnr1I4PfehDlQNA6pUUqssuu2yuSBO9q53qQhx1/CwGeiGQCKbz++7sscceVVnOCXUV8T1ZbbXVqu+AqNSwShLIYb3zo1w3q8vLSEkhWpQLgiRkWxchEZ08KCqWbJFbbrmlyhNBiM4666xqs2Rl/1u84HJw9tlnn+p/xNLL3RQeOoTQMZSE8I16Lrnkksry++pXvxrPfvazKzJ39tlnVyGd888/PxBNBPX73/9+5amUJK0OVjsFpUPLm970piqXiPJFgu3fYIMNKgufxxB5tI33lUJ27fbb5pw8jOopxI81ypJ27fYrt+uuu1bl/uEf/qEiibYhkLyhvABrrrlmVe6oo46qrg3J/uxnPzsnrE/B84QioDywKYlAIjCcCNAFokBLLrlkpTPoBL/l8PGo1QWpYnQiQMWz6HiEiQ6iH+lO27bddttqG11PP9Llyiy66KLx93//9x09bEjpNttsUzkEnvvc51ZkyjFIp1Qf6UsMYXp9nXXWiRe84AWVsb366qvHxRdfXBn2iJr6i1PA8WWh5zkPhNqL/i/7XLc2X3vttdUlX3rppXMwgQdix/hXng73jSKiZzvttFOFS6nLNZeyhUD6ZjgOfr5tpX2iQ0WQxp133rk6x9133102D906CeTQ3fLeL5j7HhFCIIsXsXk0S2yVVVaJ9dZbby5rFRks5POTn/xkdRhy5MWV08cSJUgYRWV73cIr5+GlK0Ru3XXXrfJ3EEghcoIEOpZXk0V50EEHVRav/23/yEc+UoVXtMX/LOYS+i4hDsqWUnKdrF0eRMqNV9IxvKRIneM23HDDahuLmvCCyv1UrngOS3iDB0AqAKEM3/nOd1bnQCApYIR7++23r47l2dR24ez//u//ro7xh4LneaSIfTxSEoFEYHgR4NVDqugbURC6hq6tp8/QGYxzZXj2Sqi6G4FEBJWlI6Xm0HvFoObtbHrY1ENv05mO0zmQ5/EDH/jAnJxMQ5XRp89//vOr4csQSt5I27beeutKb0pbKmSYke4bI1VJPfQ+gliiWBwAUqR8Q0pkh96lp303isGO1Ek7KjpY+z72sY9VDwzHgf9F03gxP//5z1feyHJsIZDSo5QTYXI+RFvaQH3oNSSZF9P12D+skgRyWO98D9fthSlhbDl+nYTyYoHywtXDKLaz7LxgTQLJwjUmIuEtLCTVi9tJkDAeUOEaLz+LlLePYhMW8bIjeZQdImYRjqYYeSVdhzLaQiE0Rf1lv04rRVj1tlsoTHmNhUDKVyQ69gi7KINAypOkKP1PIRWiqyxFZjsFePPNN1fKj7LjWVSva7PPtRVPL2VNeSGQck1TEoFEYLgRQKTokTXWWKPjaA50BgNdGSk6JT/Sdga17Yz+kt9dPJBSbErZt771rVU5JLV0Aiyoq4f+5jRQF++icDH9Rv8JOxdS6ruA/DHuyzbH6EFOp/rNoSCMXUTnRueQo27/+uuvX+lL++0TTrZd3SJUyCuyR7/LrSecH8VpQH+qz/fDcbvsskvVRuUQVaOM2F4I5E033VR5HXkgEVv6mGHfzOEUmnfOK6+8sjrnMP5JAjmMd73HazY8DwvQS8J972XlnasLckYxIIvKFxnJA0lRyZ8hFEchkAbMbgqFIenbSyovRf6Klx1hZI0XUsaS1QFGvZSn3xSt8I3cRd5Ax7Gs//M//7M6Vkhe3iVlRqHaz8un57j2CyvbRol+7Wtfq5RNIZDC6QSJLeFxoSRJ6ixixyHfOgjJNdJ2OZi2FwJJqenpzltAIdfPVx9jTCcdyqweQmnilP8nAonA1EeAzmDM0yPSXxiiTVEGqVJGR5q6B3IkAkkHEseLljjeiBFNAqkMvSl0LAK03XbbVSRQqNd4wPQtL6PjGftyE4XSGdhSl/z2LSleQvnfzSGFtIGXUB0iUPUwcSGW2svIl9dZCGSpx3bfBN+uQiBL+pF21GXPPfeszlMIpGiROuld5Jhh71xyRYvwQOoFr/4SSi/7hmmdBHKY7vYYr1UC9SabbFK9XF4gBKie56g6yunVr351Vaa8vLaz4rz8FpYm8SL7n8IQJiE8hCUHpYS1qx1/+4N8sRwlOlOGJeQrrwZ5RRALMaMAhBWElxE9L7wXXdK23J8SDkEmhVbk48gvFP4RJi4eU8eqC2mzCBnxPlKMzusaWJ/EQOtFAQmfsGh5JSke5ZBj3tBynG0sbnmSro3ytZ+VWyxkntTS2x2BVsZxBbM6Pvk7EUgEhgcBxErUhj6gR4V7kaV6xxRoMLqVYdTWcyALgeS9a3og6wSS7nR8NwKJVCKydD6yuttuu1XleffoRBEax4tO0fF0Fy8efes3klYiP0Lh9Km6kFILRwWngTqkOPGkig4ZbaMY8fQiIuu4QiCLE8K3oU4gYVJ6pbsmueucDUhsyfksBFJakjxN7ShDJmmHckVcfwnz18lt2T8s6ySQw3Knx3GdlJLcP4nHrF0hiyaBVK2cREQLkZSTQpAjRAhJ0+GF6EyDSCF8xcPmhUeg1O1lbYqXk2eOl5MyYkVSNhdddNGc5G5WuDJIJsWoLtahthePKVKHRCJ7cimFf7QDqdVmSo+CYyE7j4Wlan+5ZorFfonVPKFEHqW8StcpxFzyKxFoOY2sZ+eCIe+m9iPBcoJ4bPX0EyZRp1CNa/OBKO3mDaXwJLe7hpREIBEYbgQYnzxfhdQgRozbutAt9By9Ue+FTcc5jmeQvkVI6V/bRFqIbSXSI4rSrNt+ueL0EqOX0e486uC1EwbnlUPIbLNmXNNv9DPdTYSES3RFOft4MUVokEfGeCF9SCY9qo3KuraS8iSXUUTK9vKt0elR2o9tOuoQnWm0wTbkkiOhOC9so4N9C4TBkXOzgPmOIKf213PQRZRE0pDukm5UnWTI/iSBHLIbPtbL5Z27/fbbK5e+l4bl2BRkEcH0Ugr9EqFcCop1WAiYvBShAcqlvHTyJlmCrNJOoRIkFrmjBIWclaUcmhY3codIql842LmabWWt8uyxvFmzekI7jkIkvKn33HNPdQ7n0RuvPii5+m644YbK4hY+J9qhHtfp2gvxs88QR0LfzoUwCtvARPsoR2V5BxzHipeMTfGXdqtbEryPBaKZkggkAokAncxoF2lBzt785jc/zbiky5AzxKdEgOg5UR6kTwcU+tI2JM02xjGxjYdO3c7R7ESjDO+hjjK8cHLOEURh76IXRU7oUCFuhjpD2ogUOrIYfaKIb4OOO3IkRYWEvhnevjWEzjQiBiLnPCI7vJG+BeUb4Hvi/I4v4WS6l9HumJK/jxzSs/LmkUPnolf333//yvkgLUkZOp5DwrUVDFybVKciIlZFL5d2lH3DtE4COUx3e4KulbIoFitvXEo7CCDmrHJeAL9TEoFEIBGAABJJJxgFw6gNUnWaIrpDdyBWxYhnsIpqMMjLDGEM5bKt1IG4IVKM29KxpuyzpvNFX7TBsUgho7guiKioiX1C6npdlwhNvRzDnsEvasNLyONZjGjl7BeSNloGgsr5oO4i2sErqx0lSuMY21xDfSxLx3FaIM8wQI7VXQZXVyfDvn5tjP+Clf2cEAg3r+gw98CGRRLI8hTmui8EvFTCvbxrKe0gwDsq7G94Cwo7JRFIBBKBXhFAgoSXeSF57FL6RwABLb3geU3rxLL/2idfDUkgJ989G9gWl95+A9vASdgwnoV6WHwSXkI2ORFIBOYRAkLNcvp4FFPaQYC31HiVPJzDLkkgh/0JyOtPBBKBRCARmJIIZORi4m5rp7SBiTvbYNacBHIw70u2KhFIBBKBRCARSAQSgYFFIAnkwN6abFgikAgkAolAIpAIJAKDiUASyMG8L9mqRCARSAQSgUQgEUgEBhaBJJADe2uyYYlAIpAIJAKJQCKQCAwmAkkgB/O+ZKsSgUQgEUgEEoFEIBEYWASSQA7srcmGJQKJQCKQCCQCiUAiMJgIJIEczPuSrUoEEoFEIBFIBBKBRGBgEUgCObC3JhuWCCQCiUAikAgkAonAYCKQBHIw70u2KhFIBBKBRCARSAQSgYFFIAnkwN6abFgikAgkAolAIpAIJAKDiUASyMG8L9mqRCARSAQSgUQgEUgEBhaBJJADe2uyYYlAIpAIJAKJQCKQCAwmAkkgB/O+ZKsSgUQgEUgEEoFEIBEYWASSQA7srcmGJQKJQCKQCCQCiUAiMJgIJIEczPuSrUoEEoFEIBFIBBKBRGBgEUgCObC3JhuWCCQCiUAikAgkAonAYCKQBHIw70u2KhFIBBKBRCARSAQSgYFFIAnkwN6abFgikAgkAolAIpAIJAKDiUASyMG8L9mqRCARSAQSgUQgEUgEBhaBJJADe2uyYYlAIpAIJAKJQCKQCAwmAkkgB/O+ZKsSgUQgEUgEEoFEIBEYWASSQA7srcmGJQKJQCKQCCQCiUAiMJgIJIEczPuSrUoEEoFEIBFIBBKBRGBgEUgCObC3JhuWCCQCiUAikAgkAonAYCKQBHIw70u2KhFIBBKBRCARSAQSgYFFIAnkwN6abFgikAgkAolAIpAIJAKDiUASyMG8L9mqRCARSAQSgUQgEUgEBhaBJJADe2umZsNOPvnkmDZtWpx99tmtXOAxxxxT1fflL3+5lfqykkQgEUgEhgmBbjqZjqarDzjggDHDcckll1THqjtl6iKQBHLq3tuBu7KHHnqoUiqU0n333ddK+xBH9a299tqt1JeVJAKJQCIwLAiMpJPPOOOMSrfuscceY4ZjpHrHXFkeMLAIJIEc2Fsz9RpWFNJ4LNqR0EAekcj0Qo6EUu5LBBKBRGBuBEbSyWXfeAiks5ToUHoh58Z8Kv2XBHIq3c0Bv5aJInolBNM2MR1wOLN5iUAikAj0hcBIOrlfAlmiQ0svvXRfbcyDBxeBJJCDe2+mVMuKMuEpFN5oU+688845ofG2626znVlXIpAIJAKDgsBoOrlfAuk6kceMDg3KHW+/HUkg28c0a+yAQPESjjcc0qHKuTYVRSV5OyURSAQSgURgZARG08ltEEhRIQRSODtl6iGQBHLq3dOBvKKtttqqUiSU0kRIKqqJQDXrTAQSgamKwGg6uQ0CWXpyZyfHqfkUJYGcmvd1oK6q3iPvxhtv7No2+1iqRbGxXHkWkcPROsgUZZeKqiu8uSMRSAQSgQqBXnRy0aklaiS6U9fNfo8W8aHT6XFLWyNv5C0cHASSQA7OvZiyLelFiRRLtSibTuuRlFU9n2fKApkXlggkAolACwj0opMLgUQUS4Snk14eKTzdC1Ft4XKyinmEQBLIeQT8MJ22Tg67XTdlRVEpq1NMEb+L1TtSb766QvQ7JRFIBBKBRKAzAr3q5DphRCKLF9G66GVlRooQlTro+JSphUASyKl1PwfyaoolS5GMR+q9rLuRQwqtKKpuZcZz7jwmEUgEEoGphkAvOrleplP0h3exdF5ELrtJGSooCWQ3hCbv9vF90Sfv9WbL5wECRRGxWMcrvZDDUmYka3i858/jEoFEIBGYKgj0opNLmZID2enaS0/ukZwDjrdf2ZSphUASyKl1PwfyanpRRKXhvI3Ks2gpnrIUcjiSd7GUcXxKIpAIJAKJQGcEetHJvZSph8J5JDtJIZDWKVMLgSSQU+t+DuTVFEU0kgeS8imKphDBTuteCGSncMtAApONSgQSgURgHiDQi04uZUYifvRx0dPddHPR6yN1tpkHEOQpW0AgCWQLIGYVIyNQFBFF002KkpFTgwCWZO1SfjQllTmQBalcJwKJQCIwMgK96ORSZiQCSVcX3dztjJkD2Q2Zyb+9+xd98l9bXsGAIFAUUTcCWSd/3byHRUl1s3J7sYQHBI5sRiKQCCQC8xSB0XSyxpUyIxHIkgM50ggZRXerL2VqIZAEcmrdz4G8mjq5qw/RUxpb39+JIPbSC7s+DmS3XJxyvlwnAolAIjDMCNR1biedDJtCIBHAToZ9vRd2t/C0MoVAZufGqffEJYGcevd04K6o7mHspkSKkmkOB6F8GSpCmU4Es67sciaagbv92aBEIBEYMAR60cl1Akn3IomOI0hnfRzIbnq5TlTLsQMGRTanDwSSQPYBXh7aOwKj5cHUlZWywiblGASy/O6mqEoOZZOA9t7CLJkIJAKJwPAgUHRqt9By0cnC1HWyWIz9su7knSwoljpGCnGXsrmefAgkgZx892xStpj1SuGMlE/D21iIoLIUHOUlDIIY2tYt3FK8lCMps0kJXDY6EUgEEoEJQGA0nVzIn6F66GD/F9JJF9PJ3Qz60tyit7uFuEu5XE9OBJJATs77NulajRxSOhbKqE3JMEmbaGZdiUAiMAwITKROLvgVnZ+GfUFkaq2TQE6t+znQVzNRXsLSEzDD1wN9+7NxiUAiMGAITJROdpmFoGb4esBueovNSQLZIphZ1cgITBTRK2GVtHJHxj/3JgKJQCJQR2CidLJzlBB5hq/riE+t30kgp9b9HOirqff8a6tHXrFykciURCARSAQSgd4RmAid7Oz14Xva0vW9X1WWfKYQSAL5TCGd56kQKBavhOw2pCRpI5IpiUAikAgkAmNDoG2d7Oxljmx1p0xdBJJATt17m1eWCCQCiUAikAgkAonAhCCQBHJCYM1KE4FEIBFIBBKBRCARmLoIJIGcuvc2rywRSAQSgUQgEUgEEoEJQSAJ5ITAmpUmAolAIpAIJAKJQCIwdRH4f2MIi71LqyW1AAAAAElFTkSuQmCC)
Analyze the graphs given below and choose the correct option for them.
![](data:image/png;base64,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)
scienceGrade-7
science
The velocity-time graph of a uniformly accelerating body is a ____.
The velocity-time graph of a uniformly accelerating body is a ____.
scienceGrade-7
science
Look at the position-time graph below. What is the kind of motion shown by section no.1 of the graph?
![](data:image/png;base64,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)
Look at the position-time graph below. What is the kind of motion shown by section no.1 of the graph?
![](data:image/png;base64,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)
scienceGrade-7
science
What does the steepness of a position-time graph indicate?
What does the steepness of a position-time graph indicate?
scienceGrade-7
science
What is the correct relation between the acceleration of A and B?
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c+cHO4giKgTp06avKeCWQ0aAArkZQqwD2RnS0zzj9fNgY5CiYbuFtfflnNHGw1wlZF4r8P3BzO9OjRQ3n27tu3T01dMX0VbIYYiYnxpqcKcFc/8IA1IDPbkkzgZnbrJnMDAdkVFNHSrI957AM3hxv4mGkRQe+x7kokpQJwDyxfrgCjB2Rme5MBXGTYjKZNlUyLbGuXfODmcArRgGBxaGNQmxL8jKB0domemhE4unhzDVd6bgzTKRdXIZNSAbjza9WSZW3amNWyjhMN3OyNG9WswZIrr5RDDjuJsxq4qGVZfxf7AeLXEiITc0a2jRs3Wmpb60lGOcAoBeADWuLg6kB2BBpBBYzhC0Ycpjr2dAN3+4cfqgHZEWNAZjYxkcDFZXz+BRfIqtathflap3RWAxfbWcQCpmkwB9Qigt7btQ4LZjq9K54DhNa/8847rdPYK5ghmk4ncI8fOCAzzj1XNr7wglW/4AOvgYsWjs5h76efKk3Y+p49g29p+/9ZDdzs7GwFMABKT4n1kt6w7nFKWIE9/vjjygsCUE6ZMkUeeeQRqxhMHhFJNGEUg5GNVwGAKdeuddjq+++XjBo1dFXC7gmajEG0V0Tw5G/uvFPWFyki2R995LpYu221c6O0sw4DNJGswHBdwR3HLmG6iD0mBtOYRSKGmIbk2Hziz6YJUQWnTPIPGTJELTuP+0i8G0GWW7ZsqQzaI5XB12XsgAFqQPbKPfeoeMCR8mI/jLuR27phZI/J4Iybb1bh9vu3bateCDflDho0SLWVNkeqv5N0PFU6dOjguq36nnzBWYrACwqxx6XHrVSpkhQtWlRZv+MoiZs6AzMChSAyYLHvlLCAx3KJnhyDYk1E+MbMURPArVq1qqD8oJHYBrjZUNFyP+x7I5WDePRZ8eKy9LbbVIipSPmoD642GMe7qRvxhWd8+618UqSIfBUIyLJJk1S4IzdlUmc6HNqKOBOpDXbTqQvPvk+fPq7aat6vb9++nrlkhQAXADHSB6h4LRDYmSBoBD8jFDo9pl2iN8Xell4XhupPLG8xPTefXUwneVk0AVxeHK/scSmXWY1olPXppzIrXz45unNntGzqHANMwOuGTm7ZIqurVZPtLVrI4P79PQucTJ1itdVJvVk/w8uAIET9TIohOY3ENsEElpOG42yHEoONz5hWXhBMDa9fNkwnTdLA/dJmtBXz2nDHsQzJTxw8KNPPPVc22dBMUb7bwRlzw3MLFJA1HTqo6vIy8xJ7QWf14MwLBropI9nAXdWtm/xUvrztKrsB7o7hw5XL+EbDvQaZ1is3JR+4OY8ROYfPfDIpmcA9sGyZGpDtNdaqiNXWeIG7sW9fBdrtQWKGXeuwWPXivA/cHC5df/31KlYqCgMGMMmgZAJ33jXXyLK2bR01yylwUa6s6dhRRZQJp0L2geuI/VbmsIMzfZaBGAqCsmXLKgC3aNFCUOMmkpIF3G0jRqj4A0ccRuZxAtzDu3apmF2LypaVg0Gx0zQPfeBqTjjbRwUuRaHpQuvlVnNmt1rJAO7x/ftleoECtgdkZt3tAnf/8uWysHRpWVG/vhwJsscwy/OBa3LD/nFU4Jqxw2688UZBc5ZoD4hkAHfVfffJTxUq2OeSkdMOcH+ZPFnm5c8va+++27gy/KEP3PB8iZUaFbgYwBDY2bQliFWg2/OJBu7+xYuVN8HeadPiqmos4G57/fVTLuMx5o71zX3gak4420cFrp53dVaku9yJAq5uy7yrrpLlt98edyWjAXd9r17KUGaH4TIe60Y+cGNxKPz5qMANf0liUxMBXFTN0PYRI2RaICDHHAY4NlscDrgnjh79zWV8xgwze8xjH7gxWRQ2w1kBXCymjmVlqQHZZpdxv4KBi7G3dhk/tGlTWCZHS/SBG407kc8lFLjYPGDSyGIoGJQzQQ5ho4D1FxvB9ExKRI+LdmpF164yp2JF81ZxHZvAxa1mftGiUV3GY93EB24sDoU/n1DgstQQlmR4U2AFpo1TWFoVAw509BjumDMVXgOXZj/WsaPSkGXNmhWeCw5SAS7Wcoe++06Vua57dwdXh2b1gRvKEzspCQWuqS4GtAQKxiYXEGvq2rVrLq0cwGW9CDNmrs4b735SyZKyzsbUlJ3yN23aJEPq15eMAgVkV07QajvXRcqD9ZWXszY6lH6k+zlJR1vqZZw07I9N30MndQnOm1Dg6pvhBYExN4v/TZgwQQV61uew0cRWVxOj/6uuukqFIcVEjwcR78biKO936iQz8uaVp3v3VovNxVsWcjKKmK8aN5b5efPKM82aKYs3virxlkn7iA/MlKObcvT9WRCGNXgJfKfT4t1TH6z3WrVqpUwl4y1HX0dbbyXm2fz5+lG72iccuBiON2/e3DIWx00HxmrCjSc4Ri4eEJj70WO72XZt2iRTAgF5tUEDtaRnvGXhlbxj82aZXaeOKm/ya68peT3e8szr8HYmJL+ZFu8xC8tg+M3KSPGWYV5HPGTWlDDT3BzzxcWw3wtKKHBZzA83F/Mt4/ND+HhNOE4GD9Auv/xyTxY9zuzeXaaXLevauPro1q2yrFo1WVe3rkybOFEIz+8V4b7v1cqdfK2eeuopR57Y0drBc0MG94pYCCUtRIVmzZpJ586dlU8ZMi5G41hLoZFDfUxDWBwjmAAuru1uaP/ChUpDtmPKFMEHy3SBd1IuoTwXFC6sXMblxAm1TKiXcp8/OHPyNH7Lm9Ael08gS0ERPwHXdHytIGYZcOtBBmVds2DyArjzqleXlZ06qaLjDaXPKuMLglYZP51hRoP5FPzft8cN5kiS/7sF7rZ331UasuN79qieNh7gWquMB30qzXlcL9ji97jxcTGhPW58VRJxA9zj+/bJtHz5ZPOgQer2sXzOwtURq655+fLJnsmTQ077wA1hie2EpKyebrs2CcjoBrgZXbrInEqVrFo5Aa61ynjp0kLgu3DkAzccV+yl+cCNwKf9Cxac0pD99JOVwy5wD6xeLYvLlYu5yrgPXIu1jg984EZg2bwrr5QVOQMyncUOcH/94YdTq4x36BBz9sEHruas870P3DA8+/mdd2QqJot79uQ6Gwu4O4YNc7TKuA/cXOx19McHbhC7jjEgy59ftgwZEnRGVAy0SLMKxDdYGAjI9mHDQq6LlOADNxJnYqenHXDXrl2bKyA01mAoH4gCGU4x4HRwtvKee2RulSphOReuxz1x/HhUl/GwBeUk+sCNxp3o59IGuAAUiyDijpkWUNjnEpIJBQS69WByAtys+fPVgGyfMSAzywsG7pHdu2VZrVqyqFw5YUDmlHzgOuXYb/nTBrgsLYV6FDNGraNmpXAWoNbUvn17FdhY/2fvBLhzr7hCVtxxh3l5rmMNXBKZ4lp00UWyvH59YeorHvKBGw/XTl2TNsDVTSSmrA4ligpY+4Bxnhiswba3AHf8+PH68oj7rW+9JTPz5xfJyoqYB/terJJwGV9UsKBs6No1Yl47J4jzxQPwinwjm/g4mRTNWc+ePWVqTnwugjhjo6kJe9xJkybpv2qvzRqxLgu3EaRk75YtMi1vXln89NMquk64fKxhgbjy5s03q0HYwp491bJX2EqEy28nDRNMTBHt5LWTB7NBFvi2kzdWHswZ6QhYGSlWXjvn6VAQ5+zktZMHb5i0MGvUaDSBS1gnZFxN3bt3D4lWWLNmTbX+RCTjah728MqV5buLLlJh8rWxsrnH8BumD61aVRbnyyfvde6sgkW7MU6nPsT5bd26tSeG35SHITkG25HaarYp1nGiDMm9qBt1TytDcgCKhb8O1EzsMRqA/MtsA4GdWRvCpCuvvFJYGyESHVmyRJksZs2ZEymLSt/Qvr0sKlJEXr3vvqj5nJwkgiUzIl4RYoeXAQUBiFeEGaqXC25j2qrHOm7rmBRRAbNG01gceZdgemzhghpXr15drRsRqXFzq1aVDGPlnuB8h3EZr15dllapIlmZmSq6erhpt+Dr7Pz3B2d2uBQ+T9oNzsI1g0GTji4TfD4acLe+/rqSbY/9+mvwZeq/XmV8ZdOmcjwnRD+DQR+4YdkVNZH1G1h4xCs6I4AbjRmRgAtYp+bJI1vffDPs5bvHjQtxGUcMiaQ5C1tIjES/x43BoCinz1rgIh7MrVYtLGtYXXxRICDBq4zreVy/xw3LtqiJfo8blT2hJ8P1uFlz554yWZw3L+QCgnKoVcbHjQs55wM3hCW2E3zg2mbVqYzhgDuHAVlQUA+1yniTJqdWGY/gr+8D1yHzjew+cA1m2DkMBi4Dsql58wpuOZpYZXxJlSoq4Nyhbdt0csjeB24IS2wn+MC1zapTGU3gHt2zR6blySM/G2pWXMbnFypka5VxH7gOmW9k94FrMMPOIcD9KCc4shqQXX65dRku4/ODXMatk2EOfOCGYYrNJB+4Nhmls6E5mzh5spxYtUppyAjuAW1+5hk1c0C4ervkA9cup0Lz+cAN5UnUlBpXXy1jJ0yQ1bVry+qcMJ5rcBnPn19ZeUW9OOikD9wghjj46wPXAbPIWqthQ3m1Xj1ZdtllcnTvXlnJzEGpUhFdxqMV7wM3Gnein/OBG50/IWcb1qsnnxQsKDv695elNWvK8jp1QpwgQy6KkIBZI1ZTXhG2FWiAvCIv7XGpE0HvvFK24LXiZZw0vGHC2aZE4mW0diTFyCZSxSKl16xfX95o1042lCkjmZ07R8pmK53G8zC9Iq+Bq0MwYbdB7C83G+rtJ554QtkcUw5fG9Li3bDkwgjfvP7AgQPKf9DpnlCt2D1g45uVlWVt2EZjNx284SnToEED5ZfIvYIp5YDLA/zX//2fzMmTRx4sWFCq1a4t1a++WhiwxbNhlH7hhRdK5cqVpUqVKq43/OdKlCghFStWlAoVKrjeqFvp0qWlfPnycvHFF0uZMmXi3rj+ggsusMqh3N/97ndSsmTJuLYiRYqo8vT1lFW0aNG4N+pWqlQp1Vbay8Zyu/A03AZvqEOTJk1UzF8TvEkHLgua4EEwePBgOXLkiFkXdbxvyhSZlyePfHTXXTL4jTfkxZdeUsGFMR6Pd8PynsVTvNgGDBig1rXwoiz4QN0ok2MvNnpIXY7bcnVbdTns3WzUjWDRGCrhCcGGfTPxgYM3PE0uvfRSIfD3ypUrQ2L+JhW4mDIS1HnUqFHKG6FXr14hwD158KAM6dNHVgStxhOS0U844zmAK1IkSipwGaXi+qKpQ4cOwmIgPvkccMqBpAKXnpaAzprwPfvhhx/0X3/vc8A2B5IKXNZOwIlRE27rRC1PBH366acqdL8um5EsI25eFidTMlyP6xF1ZbFBRr9Qdna2mq3AEVS73ut7JXvPElxvv/22dVsWQKSdBFvZuXOnlR7rYP369crBlLEEjqZ4C0O4XVEePGAxGqc0a9asXN693AcxEd5xHA8lFbi4YdN4Tci7Ory+TnO7R45m2oURq+nUCJN4uDwEPGujyU9mHagzC6yw5BUrVD700EPqNG71rC2Bwyfl2XkAiEoPPvigCpDC10cTns+ssknZduulr2WPw+m1116rknhB+b948WLlcMo6cnZp+PDhak0OQglMmTJFuf3zgrKIInX/8ssvFS+iza8G34ulElgqjOktiHl1FrThHnxtO3bsaK04GnxttP9JBa728OVhM7Kk0gDNS4IxMISJcxa/g5gr5F6acLdm8RQ7RLwA5jEh5PE7cqLmwHxdd0badrxhWZAFALDkUtu2bWX58uWqbtrrmfNOgEadaCdfkkcffVTV8auvvsoV1qpTp06yceNGdS7WDwoCQmOZsz18TcwFFe+66y41yo9Vlj7PF9bkNbMHuONror3mqkw6PdY+qcClMnym7733XlV5pjkSRTxQDSbuYw4KR4wYoaaMnN6b1YIAFy/g3YZRO670vAxOiNWG+NpMnDgxV4AUgMZChnaIXp4Xksl9vXoR4ONLoKlHjx7Cp9oOURfaiFjANBRz6qNHj5bnn3/eurx37962xTs6KFYJRcSCPyhFCP5iRjLipWPRRgaf1VMAAAXwSURBVKeUdOA6rWC8+dFIaeAiHpg9GZ9E5jqdEADQ4ERsoOfRxNq+duMZ0OO2adPGEjkAmalCpjcinkEsAgT0/qzKyeecF4kvAxEwmRvWRG9pF7im1zWBWlhMkflU3W7KdDIuQfShB+erxaCceiEiAGRNHPvA1dwQUQvLaeDSQxJcTxNev/QkdokewgQ6AGEqD7EEYiBjytPRyqV3RESgV8vIyFDRLHnJNBE8hcFVLEJ2pE2EXAJkaAgRjRCTkOc1IdIQfMUpEeONJWB56XVvThkELFyzZo2t4vh66MEsYbPozbnW7ERIQx53Smdsj4uWZuDAgRY/+vXrpx4E2hpkSuRMOwQoGfjwiUMk0DMI9CC8AIg+hGTSI/BIZTKgQdbWBMgAO7I+n19NgBHtol2il6RcLXPrwRQaKu5hyqexykQkYClatFl8FQjwBwFAenZmhUyRK1Z59LC8RLyI7LUIw9eK3pyNYyeDPX3PMxa4TBGZPQMDDqZ5HnvsMWuEq5kQbT9t2jSl6QNkzEroBbNhNi8H5dn9tD/wwAOqhyUcFSNtel4++YBVy7qm/BetXuY5BomATH/qkX2pF3HSwi2AaF5rHjP4RORhxsScX2cKjDSs7MyXz7w20jFhl5BjEWE0MUWHiEC6k+k6fT37Mxa4ZiNT5ZjPJWCnZzPBzqcckDGgjKf3SZX2JbMePnCTyW3/Xp5xwAeuZ6z0C0omB3zgJpPb/r0844APXM9YGVoQA0I9+GD2AK1RKhMarI8//tjSFJp1ZQAYjzraLMPLYx+4HnCT0Xi46TXmaq+77jo1c3Duuecqw2gPbpewIpjqCgQCYaf2NmzYoLwRmGVJBfKB6/IpMAuAO4s5SU+RTBvlzZtXTX/xn/lfPS9q55ZMbenpLZ0/XBrntM2EzseeaTanhL0DwDV7VnOW46abblJuNE7LTUR+H7guuYpVFw+7UKFCaskAXRxmlQULFrQ+u2iImAvF8Q8nQDRQuKbUrVs3xGiFaTE0YVi4aY0drkLab05rBJleoxz8svCnwwIL+4Abb7xR+dndcMMNlvUdFmzYNbC+BmVrRQpKFXznqlWrJr///e9VnZn7RWSoUaOGlCtXzlLRok0755xzlKOjbufp2vvAdcl59Ow8TABorh7EZH2lSpWs0nE4vP7665VWDKADWmwAOMboSBNaM9IaNWokTN7jIs7SWaThp4cmj2MMdNA6cYxWEMUFNhSUi8MlyhZAx0bvj6MjLxIav3z58gm9J/I3x9Qd9S55eAFROOTPn19pDKkDZpcQLwVfkSVLlujqnra9D1wPWH/eeecJRjgmASZ6Nk14BTdt2lRZlgE27TIPUFAZa+LTzLWAvk6dOgo0qEu5plmzZupTTU+MFg8vXsrUhLaQfIANwuaX/4AfL1rUuBAqbMrG5pbzWoQB/PzHtgN1LT38NddcIyNHjlTXIecC3FQYZPrAVY8k/h8MbejJGIRpY2lKw+KrWLFiVsG4jjds2NDqcbX9LD1bq1atrHzMRGBtxmeZ6wEOHhgACnUs9gf01BiMN27cWAEJEANWZFN6dtz4uYZrkb+xzipcuLA0b95c3YcXig2NHeVyf/LTU/Mfs8rPP/9c9fT04LyYEDMjANeu2aXVqAQc+MD1gKnIrjxcVhHSlJmZqUCg3YTq168vnTt3VrYDpuwKgLAI0wQoatWqpWI3ABrd22EsAwiJTdCuXTulGqYHRJ4FbACTZafoXatWrarS2GtZlgiYeJxALVq0UKIIx8jT9PpsiDJXXXWVMjwnlkHx4sWVqIHnB4SZIr1wKpAPXI+eAvJisEELgyPkRz7/9KTaDJJjPRPAcbgZAHrP4AgumAjqeWGz2jt27AjJG9wrmvehHvzXhGjABmlvD44pg54dQu7lBbFrvqkuSuCPD9wEMhfrNEz3zCmlBN4uoUUzwEOc0C9fQm9mo3AfuDaY5GdJPQ74wE29Z+LXyAYHfODaYJKfJfU44AM39Z6JXyMbHPCBa4NJfpbU44AP3NR7Jn6NbHDg/wH1Ps/EhO7bGQAAAABJRU5ErkJggg==)
What is the correct relation between the acceleration of A and B?
![](data:image/png;base64,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)
scienceGrade-7
science
The steepness of a velocity-time graph indicates the ___ of a moving body.
The steepness of a velocity-time graph indicates the ___ of a moving body.
scienceGrade-7
science
The ___ the velocity-time graph, the greater the ___ of a moving body.
The ___ the velocity-time graph, the greater the ___ of a moving body.
scienceGrade-7
science
The position-time graph of a body at rest is a ___.
The position-time graph of a body at rest is a ___.
scienceGrade-7
science
The steepness of the position-time graph represents the ___.
The steepness of the position-time graph represents the ___.
scienceGrade-7
science
In a position-time graph, the ___ of an object is plotted against ___.
In a position-time graph, the ___ of an object is plotted against ___.
scienceGrade-7
science
A body moving at 2 m/s uniformly increases its velocity by 5 m/s every second. Its velocity after 30 s becomes ___ m/s.
A body moving at 2 m/s uniformly increases its velocity by 5 m/s every second. Its velocity after 30 s becomes ___ m/s.
scienceGrade-7
science
A ball is dropped from the top of the building reaches a speed of ___ m/s after 10 s.
A ball is dropped from the top of the building reaches a speed of ___ m/s after 10 s.
scienceGrade-7
science
The value of acceleration due to gravity is ____ m/s2.
The value 9.8ms-2 for acceleration due to gravity implies that for a freely falling body the velocity changes by 9.8ms-1 every second.
The value of acceleration due to gravity is ____ m/s2.
scienceGrade-7
The value 9.8ms-2 for acceleration due to gravity implies that for a freely falling body the velocity changes by 9.8ms-1 every second.
science
Naas notes the speedometer readings of his friend’s car the moment he started applying brakes until the car stopped. Later, he calculated the acceleration of the car and found it out to be ___.
Negative acceleration is also known as deceleration.
Naas notes the speedometer readings of his friend’s car the moment he started applying brakes until the car stopped. Later, he calculated the acceleration of the car and found it out to be ___.
scienceGrade-7
Negative acceleration is also known as deceleration.