[Xây Dựng] Giáo Trình Cơ Học Ứng Dụng - Cơ Học Đất (Lê Xuân Mai) phần 10 pps

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7IvACyEWXbwzWlvb6+vry+wg++E672Jv1Ba1PsCUJLmu8B3yj+c4/a9nT59egbLzGp/QfYFgGnIZDLNzc25zPrMM8/MrM4hk8nk1oxbW1t37dpV+Jpxbt/bY489NrP7FX9B9gWAQs1HB9/pfvuGDRtmmVnFX5B9AeAC5qmD76IQf0H2BYDJLVaBr/gLsi8ALKjFLfAVf0H2BYAFUgwFvuIvyL4AMO/CVOAr/oLsCwCTC2WBr/gLsi8ATBTiAl/xFxaRaxoDUHSGhoai0WgqlYrH4729vZMG36Ghofb29jwH6evrq6ysTKfTHR0du3fvLv7gOxZ/XfQY5o91XwCKS4EFvrndb7mF0vMVf4Fv/vgbWP0F2ReAcCu8wLevry/X9mHSg5RKga/4C7IvAEvUtAp8H3vssSAIPvnJT55/kNIq8BV/QfYFYMmZVgff0dHRvXv31tTUTFgYLuYOvuIvyL4AEATT7+D77LPPBkHwuc99bvyNJV3gK/6C7AtA+M2sg+/DDz8cBMHf/M3fjB0kBAW+s4y/fX19119/fUnXeMDC0OMMgMWRyWQaGhoSiUQsFjtx4kSBwXd4eHhwcLC1tTVXEJzJZFatWpVKpVpbW3t7e8MXfMfib/7GZw8++GBXV5eTCmRfAIpFX19fMpnM/buQDr6T+uY3vxkEwac+9amgZDv4zkf8ve22277xjW84x+CCfDgCwALp7u5OJBKvv/76hz/84WkV+I7JZrO5ot7q6uqwFvjmj7/BFMUPGzdubG1tzWazyh5A9gWgKOzataurqyvXlHdaBb5jjh49GgTB3XffvWXLllQqddVVVx05cuSyyy5bOnM4VfzNpf9XX311ibwNANkXgGL3y1/+8iMf+Ug6nQ6CoL+//+qrr57uER588MEgCHLp+bbbbnvuuefuuuuu3t7eX/7yl6Ojo4cPH37nnXf6+/t/9KMffe5znwtHm7PC429jY+PLL78s+4LsC8DiG+vg+6lPfeprX/taXV3dm2++Oa0P6EdHR1OpVO7fkUhk69atb7zxRiqVuuiii84fvHLlyhBP5qTx95ZbbvnGN76xfft2JxvIvgAspgkdfK+66qp4PN7Q0LBv377CD/LEE0+M/TudTucOOBaFd+3atXLlymuuuaaioqLwnXNhir+bN29uaWlR8guyLwCLZtIOvm1tbYcOHUqlUu3t7bkMV4iHHnqopqZm7dq1t9xyy/iYu2fPnv7+/rBWOBQefysqKiKRyNGjR10CA/IoO3funFkAYD5kMpnm5ubcVSeeeeaZ8cux2Wx21apV6XQ6BJcra25u3rt379mzZxfl3nP9LnLTuGPHjksvvbTwtxOwBOnvC8C8yN/Bt7y8fGBgIAiC+vr6TCZjui6or69vz549Q0ND2Wx2/O3j+/7ecccd3/72t80VyL4ALKhkMhmNRtPpdE9PT1tb26QVqBUVFQcPHgyCIBqNTshzM5bNZoeHh+fqaMXmueeei0ajF110UXNzczKZHB4enhB/f/rTnw4ODo6OjjoDQfYFYCFks9kdO3a0tLREIpGTJ0/mv3TFhg0b4vF4Op2e1hUu8njrrbdWr17d0NAQvvi7YcOGffv2vf/++wMDA3V1dQ8//PDq1auXLVuWy8H/9E//FI/Hc/v/jh075jwE2ReAeZfJZBoaGhKJRCwWO3HiRCGXrmhra4vFYrl9b7N/AFVVVfF4PJVKhTL+BkFQXl5eXV29ffv2Y8eOnT59+uDBg2vWrHn44YcrKysff/zx3JgDBw44FWEq9roBMDfGOvjG4/H777+/8E5bc77vLbf9KxaL9fb2LkDDr8Xd65YzOjr68ssv79u3r6ur60Mf+pClX5B9AZhHEzr4TvfbM5lMZWVlEASnTp2qqKiYq/h78uTJ6V42uUSz74TJnJM5hFBS8wDArEyrwHcqc77vra2t7eTJk1deeeUS/IkIviD7AjAvZlDgO5U53/dWVVXlCmeA7AvA3MjfwXcG5nbfG4DsC8DcKKSD7wz09vZGIpF4PN7X1zeHj3bPnj07duwIa99foHA+DAL4rb6+vscee8w8FCKTyaRSqSAIIpFIZ2dnZ2fnLA9YV1e3ffv24P9f762ysrK+vv706dOzX0sek0gkjh8/vjCdHwDZF6AE7N271yRMSzqdntakFdIMoaKiYs57Jmzfvv2dd96Jx+MNDQ3iL8i+AAQbNmwonjZVzLm2trYgCOLx+M6dO3fv3m1CQPYFgJDH30svvdQ8gOwLAEtCrqoYWLL0eQAAQPYFgFAbHR1NJpMan4HsCwDhl8lkWlpaGhoaxF+QfQEg5KqqquLxeCqVEn9B9gWA8GtraxN/YUnR5wGApR5/gyCIx+NvvfVWVVWVCYFws+4LgPjbdvbsWcEXZF8AAJB9AQBA9gWA0v7TuGzZli1bbH0D2RcAwk/nB5B9AWCp0PgMZF8AWIrxt6ury2xAmOjvCwCTx9/169dfc801pgJkXwAIv4aGBpMAIaPmAQAA2RcA+P+Gh4eTyaStbyD7AkD4HT9+vKWlRecHkH0BIPwaGho0PgPZFwCWivF9f80GlKiyc+fOmQUAKFB7e3s8Hs8/JhKJvPnmm+XlmimB7AsAJa6vr6++vj7PgI6OjqamJhMFsi8AhMG6desGBwcn/ZJFXyhm6n0BYNoeffTRqb60a9cuwReKlnVfAJiJSZd+LfpCkbPuCwAzMenSr0VfKHLWfQFghiYs/Vr0heJn3RcAZmjC0u8nPvEJwReKnHVfAJi5saXfioqKn/zkJ5dccok5gWJm3RcAZm5s6fdLX/qS4AvFz7ovAMzKunXr3n77bZW+UBK8SgFgVh599NGf/vSngi+UBOu+ADBb2WxW9gXZFwAAioi9bgAAyL4AACD7AgCA7AsAALIvAADIvgAAIPsCAIDsCwAAsi8AAMi+AADIvgAAIPsCAIDsCwAAsi8AAMi+AAAg+wIAgOwLAACyLwAAyL4AACD7AgAg+wIAgOwLAACyLwAAyL4AACD7AgCA7AsAALIvAADIvgAAIPsCAIDsCwCA7AsAALIvAADIvgAAIPsCAIDsCwAAsi8AAMi+AAAg+wIAgOwLAACyLwAAsi8AAMi+AAAg+wIAgOwLAACyLwAAyL4AACD7zrX29vYylp7e3l7nUnt7u996ACxlZefOnTMLAAAsBWoeAACQfQEAQPYFAADZFwAAZF8AAJB9AQBA9gUAANkXAABkXwAAkH0BAJB9AQBA9gUAANkXAABkXwAAkH0BAED2BQAA2RcAAGRfAACQfQEAQPYFAED2BQAA2RcAAGRfAACQfQEAQPYFAADZFwAAZF8AAJB9AQBA9gUAANkXAADZFwAAZF8AAJB9AQBA9gUAANkXAABkXwAAkH0BAED2BQAA2RcAAGRfAABkXwAAkH0BAED2BQAA2RcAAGRfAACQfQEAQPYFAADZFwAAZF8AAJB9AQCQfQEAQPYFAADZFwAAZF8AAJB9AQBA9gUAANkXAABkXwAAkH0BAED2BQBA9gUAANkXAABkXwAAkH0BAED2BQAA2RcAAGRfAACQfQEAQPYFAADZFwAA2RcAAGRfAACQfQEAQPYFAADZFwAAZF8AAJB9AQBA9gUAANkXAABkXwAAZF8AAJB9AQBA9gUAANkXAABkXwAAkH0BAED2BQAA2RcAAGRfAACQfQEAkH0BAED2BQAA2RcAAGRfAACQfQEAQPYFAADZFwAAZF8AAJB9AQBA9gUAQPYFAADZFwAAZF8AAJB9AQBA9gUAANkXAABkXwAAkH0BAED2BQAA2RcAANkXAABkXwAAkH0BAED2BQAA2RcAAGRfAACQfQEAQPYFAADZFwAAZF8AAGRfAACQfQEAQPYFAADZFwAAZF8AAJB9AQBA9gUAANkXAABkXwAAkH0BAJB9AQBA9gUAANkXAABkXwAAkH0BAED2BQAA2RcAAGRfAACQfQEAkH0BAED2BQAA2RcAAGRfAACQfQEAQPYFAADZFwAAZF8AAJB9AQBA9gUAQPYFAADZFwAAZF8AAJB9AQBA9gUAANkXAABkXwAAkH0BAED2BQAA2RcAANkXAABkXwAAkH0BAED2BQAA2RcAAGRfAACQfQEAQPYFAADZFwAAZF8AAGRfAACQfQEAQPYFAADZFwAAZF8AAJB9AQBA9gUAANkXAABkXwAAkH0BAJB9AQBA9gUAANkXAABkXwAAkH0BAED2BQAA2RcAAGRfAACQfQEAQPYFAED2BQAA2RcAAGRfAACQfQEAQPYFAADZFwAAZF8AAJB9AQBA9gUAANkXAADZFwAAZF8AAJB9AQBA9gUAANkXAABkXwAAkH0BAED2BQAA2RcAAGRfAABkXwAAkH0BAED2BQAA2RcAAGRfAACQfQEAQPYFAADZFwAAZF8AAJB9AQCQfQEAQPYFAADZFwAAZF8AAJB9AQBA9gUAANkXAABkXwAAkH0BAED2BQBA9gUAANkXAABkXwAAkH0BAED2BQAA2RcAAGRfAACQfQEAQPYFAADZFwAA2RcAAGRfAACQfQEAQPYFAADZFwAAZF8AAJB9AQBA9gUAANkXAABkXwAAZF8AAJB9AQBA9gUAANkXAABkXwAAkH0BAED2BQAA2RcAAGRfAACQfQEAkH0BAED2BQAA2RcAAGRfAACQfQEAQPYFAADZFwAAZF8AAJB9AQCQfQEAQPYFAADZFwAAZF8AAJB9AQBgcZWbAgCmMjQ0NDQ0ZB5Cr7q6urq62jwg+wKwdLW3t8fjcfOwFMRisX379pkHZF8AlqJsNtvQ0JBKpWpqar71rW9dfPHF5iTcrrzySpOA7AvAUpTJZKLRaDqdbmxsfPLJJ8vL/aUAwsNeNwD+T19fX2VlZTqdTiQSnZ2dgi8g+wIQTu3t7fX19ZFI5ODBg9u3bzchQPh4Qw/A7xT47t+/v6KiwpwAsi8AIaTAF1g61DwALGkKfIElpezcuXNmAQCApcC6L8BSlM1mt2zZYh4A2ReAkMtkMqtWrUqlUqaCIj9Rd+zYcfnlly9btmzZsmXNzc29vb2mBdkXgGkYX+AbBEFZWVl3d3f+bzEmfGOKXzKZrKysTCQS6XQ6d8vevXtvvfXW5ubmbDbrhcyM/Z5rtQMsHe3t7XfddVckEnnhhRf+9m//NgiCtWvX1tbWXnLJJXm+y5jwjSlyQ0NDU9Xk/Nd//VdFRcV1113n5czM2OsGsCTo4EsJufzyy8eWeyd16tQp5zAzo+YBIPzGCnwbGxtfeeUVoYFiNjw8nD/4BkGwf/9+E4XsC8AkdPCltBw/fvyCY37wgx+YKGRfACZqb2+vr6+PRCIHDx7cvn37BcePjIx0d3ePjIwYE5oxdoaB7AsQfrkOvvF4vKamZmBgYMOGDYV815EjR7Zu3drf329MaMa89957pXXqXnPNNRccMx973bLZ7PDv6u3tTY4zPDzsF0sI2OsGEEKZTCYajabT6cbGxieffLLwOoeRkZH+/v66urqrrrrKmHCMyWazMyt0aW9v1wxqvEgk8vOf/9w8yL4AFJe+vr76+vogCBKJRCF1DjCVZcuWnT17dg7fko2Ojk648fDhw+eP7OzsfOGFF+b72TU2Nk645ZZbbhn/v1dfffUVV1wx9r9XXnmlcnnZF4Dikluri0Qi3d3dBdY5wKSy2exPfvKTP/zDPxx/4/Hjx3/1q1+Nv+Wdd945v+jiRz/60eDg4Hw8qquvvrqurq6srGzStJpzww03TLiloqJi+fLlfqbIvgChSio6+JI7E956663xt/zsZz/76U9/Ov6W119//cc//vH8pdVIJHLTTTdNuHHNmjUf/vCHJ9xYXV198cUXT7gxt8KayWS+8IUvdHV15VqeNTY2Njc3NzQ0+BEj+wIsdTMu8KX4w+vp06eHhobGD+jp6Rn/vy+99NKpU6fmI63u3bu3o6Nj/C0TygByqqqq5m82hoeHV69e3dHR0dTU5Nxg9vxyBCh5synwLSsr6+rquuOOO4yZjzFjKfZP/uRP9uzZ80d/9EdjX3r99ddfe+21sf996tO+vmQAACAASURBVKmnZnwCVFZWbtu2bXxg/Yd/+IdNmzaN3bJy5coJzROWL19eyCcDa9askTiRfQEoIrMs8O3q6qqtrTWm8DFjG7bGlmNbW1uPHDnyzDPP5Ab86Ec/mrBMm8vHn/nMZ/Lc0aZNm/73f//3gx/8YK6+9oYbbrj00kvHvjpWwPr888//+Z//+XXXXZdnaf/222+vra3N0/mhcG1tbV5ihIyaB4BSpcB3bo11bx3rPHD06NFMJpPLuwcOHCjwOJWVleOLB2699daxf4+vbS1w5XVxzW2fhxn/XNQ8MIes+wKUJAW+M5ix0dHRscXasVxbYLHsWFHBRz/60bENW+P7CcxrzSsg+wIsXTr4TmqsuDa3cJtLtxdcsq2urs4t046F2rHtXCWxNDuvTp8+7bwiZNQ8AJSYee3gOzIycuTIkfzVoos+ZnR0NJPJ5Pp2vf766//5n//5xhtvnF9iO2bbtm3/8z//8wd/8Ad/8Rd/8cd//Me5xdrzc21JPPcZjJnxdd2CIEgmk4tYaaDHGfPiHAAl4syZM5s3by4rK4tGo2+//fZ83EVXV1cQBE8//XQxjDlz5syePXuCIPjMZz7z4IMPNjY21tTUlE1hw4YNjY2NjzzySGdn56FDh954443xU1RUz2uBx7z77rszPh/KysoW62zv7Oyc9Afd1NR05swZvw2Y+Vlt3RegJCxMge/IyEh/f39dXV3+tcY5H5Nbys1dM6ynp2eqQoXcNrKKiorrr78+17dr+fLlv/nNbxblMZfKmNms+7a3ty9Kq4ehoaFoNDrVV5X6MBuyL0AJCFmB7/DwcK5i4ejRo8ePH5805m7atKmioiLXJOGGG25QerukXH755bk6h6mcOnXK+cDM2OsGUOzmtcB3vuX2nx0/fvzkyZOHDx+etKnCWMzNLeVWVFQsX77cz70YLEqPs+Hh4fzBNwiC/fv3a3mG7AsQNqXYwXd4eDhP0s1dgSx34YYbbrhBzOV8x48fv+CYH/zgB7Ivsi9AqJREB9/R0dGTJ08ODQ0dPXr0e9/73oRmCx/4wAdySXf16tXXXHPNlVdeqQ9xadHjjPBZZgoAilBfX19lZWU6nU4kEp2dnfMXGcvKyrq7uwsfk8lk+vr69uzZ09TUdNlll1188cXRaLSlpeWRRx4ZGhratm1bIpHo6ek5efLk+++//5vf/CaZTG7fvr2hoaGqqur3f//3p3VfCzlmdHR0aGgomUyOXd1tcR/PfI8p0LPPPrvwJ/8111xzwTHXXXed3xLM8JeevW4AxWYhC3y7u7vzd4fNZDKPP/54EASvvvrqU089Nf5L1dXVN9544/XXX19dXX3s2LEbb7xxwnH6+vrGP/4777xzrjIZxWzRL4MMsi9AaSiGAt9sNvvqq68ODQ319PRMKNgdC7s33HBDIQUMw8PDxXOl39yuu8OHD5//vHKt02699dbq6urVq1crQR7/NmxRepyB7AsQfotY4JvJZH74wx+++OKLE2p2pxt2J1iULgHnh93za5GFXViy7DkAKAoL3MF3/CLohEqGbdu25ULhn/3Zn80yf1dXVxdP2B17XsJuqbx7gflg3Rdg8S1MgW+umOHll19+7rnnUqnU+IT6iU98Yv369ddee+1vfvObI0eO5K8AHhkZKZIxubD73e9+94UXXhgeHn7ttdfGh93xK7vvvPNOCT2vuR0zm+u6yb6EkMs6AyyiM2fObN68uaysLBqNvv322/Nx/MHBwUceeSR3L2M2b978yCOPDA4Ovvvuu+PHd3V1BUHw9NNP5zlm4WM2bNgwJ8cZG3PmzJk33nijs7OztbW1pqZm/DNauXJlY2NjZ2fn+U9qzp9XaY05fzYKN5vvheJk3Rdg0cxTge9U67uNjY11dXUbN27MU8wwMjLS399fV1eXf62xwDHbtm3Ls2pYyHHeeOON559//ty5c6+//vpUNbsVFRW/+MUvbrrppjl5zOEbM5t132Qy6RIShIzsC7A45rzAN5PJ7N+///nnn9+7d+/YjbFY7Lbbbtu4ceMCl96OPcfplnDYoFZU1DwQPva6ASyCuSrwHR0dPXbsWHd3d1dXVzqdnpB3Z79ZbZauuOKKWYZdG9QWVzweNwmEjHVfgAU1Jx18h4eHe3p6xpc0RCKRu+++e9OmTevWrSuejDjpqqGVXWARWfcFWDizKfDNZrNHjx49f4n37/7u7zZv3jxPV8EYHh6uq6v7xS9+MbNvzxVaWNktXWoeCCHb/QAWxqFDh3IdCR555JHCv+vtt99+/vnnx3dpuOyyyx588MFDhw6dOXNm9o8qCIKurq5Jv9TZ2Zm7xzxjJj3OjLsx5H88xszhmEJ3xJeVeeUSMtZ9ARbCdAt8c1UNX/3qVwcHB8eWeG+77bY777xzbpd4u7q6amtrz19j/uQnPzl2zYtdu3adP2bC+D179qTT6c9+9rN5VnaPHTt244035ulIMNXjMWbOxxTo9OnTXryEjHpfgPk1rQLfoaGhZ5555vHHHx+ramhtbd2yZcvGjRsXrB4gk8nEYrHx+bWjo2NCo6sCa3aj0ahPzEuaHmfIvgBML0cWUuCbyWSefvrpsVXesY1r119//QI3ahjrvDbetm3bvvnNb85gg9oMepxRVNT7IvsCMO0cOVUH32w2u2/fvvvvv3+ssCEej99+++2L0os3m80+9NBDhfS0Krwbw/DwcFVVlTOhdLW3t7e1tZkHZF8ALhwa8hT4Dg8P7969O5FI5P63tbX1jjvuWPhV3jGjo6Mf+9jHDhw4MNWATZs2/f3f/30u7L7zzjtHjhypra3Nf72xI0eO3Hnnnfmv61bgcYyZzZjZXNcNQsh2P4C5debMmVxbhmg0+vbbb0/40qFDh6LRaK7pQTQa7ezsnLTdwUIaHByMRCJleQ0ODo6N7+rqCoLg6aefznPM3Jirr776gmMKOY4xsxkzmxNMnwfCx7ovwFyaqsB3dHT0iSeeeOihh3Kb2BobGz//+c8vSm3D+fbs2fOv//qv40t4zzd+u9vIyEh/f39dXV3+9cg5HLN161an1ozncDbrvup9CR/ZF2DOTFrgOzo6+sUvfjFXR5vbxHbvvfcW4UUccpdH7urq6urqOnXq1ISvfuYzn/nyl7883WM2NTUlk0knRukaHR11wRFkXwAmcX6B74TUu2vXrq1bt5ZE5eXw8PDhw4efeOKJsQrg6urqgYGB6R7HqmGp0+MM2ReAic7v4Ds+9dbU1Dz66KOLuI9tlk/t6NGjBw4c+Pd///f/+I//mO5T0OOs1Hn3guwLwO+YUOD73nvvTUi9Szn86XFW6vQ4I4Tv6EwBwIz19fVVVlam0+lEIvHkk092dXX96Z/+aa7yoaOj49ixY8UffMvKyrq7u+dpzOrVq+fjvpa4hZxDwZfw0fAPYIbGF/gGQbB+/fpcs7COjo5SqesNgqCrq6u2tnaexkxoZDFX97XELeQcqnkgfNQ8AEzb+ALfr3/965///OdTqVQQBPF4/P7773cdAUJD9iV8/IIGmJ6xAt9t27atWbNm/fr1QRA0Njbu3r27oqLC/Iynx1mpO336tEkgZKz7AkzDWAfff/mXf9m7d286na6pqfnWt75VJFepKDZWDUudHmeE8PeSKQAoUHt7e319fWVlZSwW+9KXvpROpzs6Ol555ZUwBd+RkZHu7u6RkZE5GfNv//Zvc3Ic595s5jCbzc74+C0tLSYZ2Rdgyclms1u2bInH46tWrTp16lQqlYrFYqdOnWpqagpZde+RI0e2bt3a398/J2N+/vOfz8lxnIGzmcP33ntvxsfPdeuDMFHzAHABYwW+kUgk99+vfvWrDQ0NoXyyIyMj/f39dXV1V1111ezHbNu2LU/NQ+HHEX9nM4fZbNb+S5B9AQoyVuCb09jY+JWvfGX58uVmphDRaHQGV0KmeKjYJoRntSkAmEquwPeiiy4KgiASifT09HR2dgq+hRN8AdkXoASMFfiWl5e///77jY2NJ06cCGudw/zRIqDU6XFG+Kh5AJhorMA3CIJwV/fON5+Ylzo9zgjh7yVTADBeX19fZWVlLvjGYrGBgYFwB9+ysrILNhGb8ZiDBw/Ox30tcQs5h3qcET6/p30JwJgHH3zwrrvuyv27o6Pj4YcfDn1179q1a2tray+55JL5GHP27NmVK1fO+X0tcStWrFiwOSwrK9u4caM5J1Rv+NU8AARBkM1mY7HY97///SAIysvLs9nswMCAq7XNkpoHoOh+L5kCgEwm86EPfSgXfLdv3/6DH/wgCIKbb745k8mYnNnw5iEE715MArIvQKgcOHCgsrLyV7/61YoVKwYGBhKJxLp16zo6OtLpdHNz82yuB4seZ4DsC1BEPvnJT27evDkIglgs9rOf/WxsnbKpqam1tTWVSu3cuXNJTcjIyEh3d/fIyMicjPnYxz42J8dxos5mDmfz/k2PM2RfgJD4xS9+cfnll3d0dARB0NnZuW/fvgnb2nbt2hWLxRKJRDKZXDrTcuTIka1bt/b398/JmOeee25OjuN0nc0cvvfeezM+/rPPPmuSCRl73YAlJ5vNfvWrX/3nf/7nIAiuvvrqw4cPX3bZZZOOHGv0u3T2vY2MjPT399fV1V111VWzH1NeXv7xj3989scRf2czh9lstry8fGbHt1sR2Reg5N17771f+tKXgiC4++67H3vssfyDh4aGotFoJBIZGBioqKgwe9MyPDxcVVVlHkpXe3t7W1ubeUD2BSjhv+XxeHzlypXf+c53/vIv/7KQb0kmky0tLbFYrLe3d8brZ0uTVUOg6H4vmQJgichms1u2bInH4zU1NT/+8Y8LDL7BEt73Nnt6nIXg3YtJIGSs+wJLwljlbmNj45NPPjnd5dtsNtvQ0JBKpTo6OpqamswnSyf7WrknbGe1KQBCr6+vr7KyMp1OJxKJzs7OGdQtlJeXd3Z2RiKRlpaWoaEhU1og7xNKnR5nyL4AJaa9vb2+vj4SiRw8eHD79u0zPk5FRcWLL74YuN7bdDz11FMmoaTpcUb4qHkAQmusUKGmpmb//v1z0qXBvrdp6evr27Bhg3koXWoeCJ/fi8fjZgEIn0wms2bNmsHBwcbGxhdeeOHiiy+ek8NWV1f/8pe/3Lt3769//eu/+qu/Ms/5nT17duXKleahdJWVlW3cuNE8EKqz2rovED59fX319fVBECQSidnUOUzKvrfCWTUEiu73kikAQmauCnynYt9b4fQ4C8G7F 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...

... 3.29 3 .10 6 2.25 1.98 - 2.37 2.09 - 2.50 2.21 - 2.72 2.41 - 3.14 2.76 - 4.00 3.53 - 7 2.35 2.06 - 2.47 2.18 - 2.61 2.31 - 2.84 2.51 - 3.26 2.87 - 4.18 3.67 - 8 2.43 ... 2.43 2.14 - 2.56 2.26 - 2.70 2.40 - 2.94 2.61 - 3.38 2.98 - 4.32 3.82 - 9 2.51 2.21 - 2.64 2.34 - 2.79 2.47 - 3.03 2.69 - 3.49 3.08 - 4.46 3.92 - ≥ 10 2.58 2.27 ... AωCONST b = 2 x 1.3 = 2.6m Hệ số nén tương đối ao = kNma /100 03.065.01 100 05.012440−−×=+×=+ε Độ lún S = 2.6 x 0.003 x 10 -4 x 300 = 2.34 cm 2.6.4 Các thảo luận nhận xét rút ra...

... có khuynh hướng định hướng theo kiểu Diện-diện; Có thể nối mạch với các hạt cỡ lớn hơn. 2.3 Hạt là gì ? - Có đường kính D = a. 10 -3 mm > 100 mm ( sự phân loại tùy theo tiêu chí mỗi ... Peck): 1- Geologic Soil Classification System 2- Agronomic Soil Classification System 3- Textural Soil Classification System (USDA) : - Chỉ xem Cát, Bụi, Sét, và số lượng hòn sỏi (Gravel) - Có ... một cỡ hạt nào đó  Hệ số thấm (Công thức Allen Hazen) k = 10 -2 (D 10 )2 ( 1-3 ) Luôn nhớ rằng khi dùng công thức trên, D 10 biểu diễn theo milimet và hệ số thấm tính theo công thức...

... thức Allen Hazen) k = 10 -2 (D 10 )2 đơn vị m/sec trong đó D 10 tính theo milimet, ở trong bài D 10 = 0.07mm. Ta tính ra k = 49 x 10 -6 m/s (hay 4.9 x 10 -3 cm/s Ỉ có tính thấm ... (công thức ( 1-6 ) khi biểu thị áp lực nén được biểu thị theo trục log 10 (Có thể lấy ở phần tuyến tính của đường cong e-Logσ, thí dụ cấp áp lực 0 -2 ) CC =)/(e-0220σσLoge ( 1-8 ) 2.5 Muyn ... nguyên nghịch đảo của áp lực (thí dụ : đơn vị là cm2/N) mv = 01 10 011σσ−−+eee=01 10 0 - H-1σσHH ( 1-7 ) Trị số này không phải hằng số theo loại đất mà tùy thuộc vào khoảng...

... hạt và độ lèn chặt giữa các hạt – particle shape - degree of packing) 3- Độ nhớt của lưu chất trong đất - Nhiệt độ –Những thành phần hóa học; 4- Sự chênh lệch về năng lượng thể hiện bằng cột ... stresses). - Để xác định sự thay đổi thể tích trong các lớp đất (cố kết đất _ soil consolidation) và độ lún của nền móng. 1.2 Dòng lưu của nước trong đất phụ thuộc vào: 1- Độ rỗng của đất 2- Loại ... của nước trong môi trường rỗng? - Để ước tính lượng dòng thấm dưới đất - Để xác định lượng nước có thể thoát ra từ dưới nền công trình thủy (đê đập), hố móng. - Để xác định áp lực nước lỗ rỗng...

... thân. - Ứng suất phụ thêm Do tải trọng ngoài của công trình Những ứng suất trong đất phải thỏa mãn 3 tiêu chí sau: - Điều kiện cân bằng - Tính tương thích giữa biến dạng và dịch chuyển - Quan ... cố kết cơ sở), và áp lực ngang của đất lên các cấu trúc chắn đất về sau. 1. Các thành phần ứng suất trong đất Ứng suất tại một đỉểm trong khối đất được phân chia thành 2 loại chính: - Ứng suất ... ngang trong đất) - Làm được gì sau khi học chương này ? Vẽ được chính xác đường phân bố ứng suất trong đất do trọng lượng bản thân, do tải ngoài và do dòng thấm. Đó sẽ là những cơ sở quan trọng...

... ⇒ a = 8.87 x 10 -4 m2 /kN (chú ý đơn vị tính) mv = =+)1(oaε8.87 x 10 -4 / (1+ 0.945) = 4.56 x 10 -4 m2/kN Cv = VWmkγ= smxxxxx /105 9.5 105 6.4181. 9100 0 102 52646−−−= ... 3.7 Các tỷ số nén khác: Tỷø số nén ban đầu: ro =fSaaaa - 00− Tỷ số nén cơ sở (Log của thời gian ): rP =fSaaaa - - 0 100 σ’1 σ’0 ε0 ε1 ∆p ∆p dz H H σ’0 ∆p ... Biến dạng của nền đất Tỷ số nén cơ sở (Căn thời gian): rp = )-( 9 )-( 10 090fSaaaa Tỷ số nén thứ cấp: rs = 1 – (ro + rp) 3.8 Độ lún do...

... vẽ : Hình 5-1 0:Các góc của cung trượt theo Bêrêzanxev Công thức của Berêzanxev về tải trọng giới hạn của nền : qgh = Ao γb + Bo qo +Co.cu ( 5-9 ) Ao , Bo , Co là các ... σZ σ3 = σX =σ (1-sin ϕ) – σC với σ = ϕσγsin1p zC+++ σC là áp lực dính = c.cotϕ σX =ϕσγsin1p zC+++ (1-sin ϕ) – σC = ϕγsin1p z++(1-sin ϕ) –ϕϕsin1sin+ ... (cũng được hiểu là độ bền) của đất. Có 3 dạng phá hoại tiêu biểu: - Phá hoại trượt tổng thể; - Phá hoại trượt cục bộ; - Phá hoại cắt thủng nền (không gây trồi cho đất vùng quanh móng) Dạng...

... trượt, lực nước =0) - Tính tổng trọng lượng của nêm (khối trượt) - Những lực tác động trên nêm trượt được vẽ thành đa giác lực. - Từ đó xác định áp lực chủ động lên tường chắn - Chọn mặt trượt ... nêm được thể hiện trên hình 6-1 2b (đa giác lực), Để cân bằng, đa giác lực khép kín , vậy ta có thể dùng đồ giải để xác định Pa = 108 kN/m Lực xô ngang Pacosδ = 105 kN/m Chọn các mặt trượt ... và hạ giá thành công trình. Có thể giảm áp lực đất lên tường chắn bằng cách: - Chọn loại đất đắp thích hợp; - Đối với đất tại chỗ, cần đầm nện tốt để đạt được dung trọng tối ưu (năng lượng...

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