齿轮系计算题,求帮忙,小白
图示轮系中,已知齿轮的齿数Z1=30,Z2=25,Z2ˊ=20,Z3=75,n1=200r/min,n3=50r/min(与轮1的转向相反),求行星架nH的大小和转向。data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAANkAAAD1CAYAAADd0FA7AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAEU6SURBVHhe7Z0HnBPFF8d/SS7J9V44eu8g9aSrCEpRUVRAUIoovdvxbwEFRUG69C6CICDSpCgivYlI78cd13tNcin7n5md82rggCRXmC+fZXbfbLnszpv65o1CIkAgENgNJQ8FAoGdEEomENgZoWQCgZ0RSiYQ2BmhZIK8WIx8R2ArRO/iI44hJQ6XL1xDWGQ45syaDiktCY2a14O3WyASJS16vdgVbdu1AZz9+BWC+0Uo2SPK/j9+xe6tv2Drxq24HJXIpRQ12fKWZnWrBmBAn+fR7+2xqFS9MZcKiopQskeMPXu2Y9o30/HH7wfYsULjjKe79MCrL/VEpXI+8Ayqi4wMEwzJd7D7z4M4dHA7zp44ys6lbYvhw17HxI+/RPmKVZhMUASokgkeDTZuWEczVLbVbt5CWrxypRQRHcNjC8dEtnNXr0pjv/hCcvcLYNdWCPKXtmxcJ58guCdCyR4RJn78IVMQjcZFGjfhPSklI5PHFJ2wqGjp9bdG/qeo639cw2MEd0MoWRknKytLev+D95hS1KlTVzp3/hKPeXCmTJvzn6ItWTiNSwXWEEpWxpk+YzpThlq1a0t37kRw6cOzatUqdl8nJ5V04tgBLhUUhuj4KMMkJCagWrXqyEhPx+7du9GpUyceYxuGjhqLxfPnoEnjejh27CS0Lm48RpAbMRhdRrFYLJj0+SSkpaaiW7fuNlcwypdffgnfoIr4599LmDlrBpcK8iOUrIxy4K+/MHfuXEChwAcffMCltiXA2wOjxrzP9ufNnw+dLpXtC/IilKyMsnzlahZ27fos2rVry/btwTtjh8A/qAIiImJx4sQJLhXkRihZGcRMqoqXzl9g+716vcJCe+HppkW3F15m+0cOH2ShIC9Cycog0VGR+PffM/DwcEenp5/lUvvxykuyku3fv5v8b2H7ghyEkpVBDh45AaPRiIYNG6JixYpcaj+qV6sClUqLK5cuIT0ttx2kgCKUrAyiyzKxUO2qZaG9qVK9MoIrVUdSsgGGLFGS5UcoWRnEZJaHPps1bcJCe2Mhj7MolEjLMECnE/PR8vPIK5lBr0diYiLbkpPlsKibbFlU8qhSsxYL/by9WGhvPLQK+Hg6w9lZC7XaiUsF2TzySvbm24MRHBxMtnKoUKEc3w9GjRrVUbNmTVQoXx7lgoIQFOCP4HJB7DwaH+jnh3Xr1/C7lCyi7oSzMC4+noX2Rme0ICUlHS4uWtI2U3GpIJtHXsncPX1RnihS+YrVEBhUhexXIEpUnpRqKUhKSoKXny9q1K2HOu2eRvkqddl59Py2L/ZErUYt+V1KFq5qOaEnJSax0N5YSPXUbDZDowYpzURJlh9hu1gIWSYLqtdugOSY27gdGQk/L28eUzrYtXc/uj3TEW8NGYgli1Zwqf1IyjCierUaqBykxtlzl4mEzq4WZCM6PgpB46REpYpV2aCukuTQpY2IyAQWqsjvcAQeLmrSJnNFEin99XodlwqyEUpmBWc3Z5JgDDh24hiXlB6MZrkbXaW8v8+bkZKM84e24sDGmbh8Ju/vNhmzENK8MaZP+4JLclAqSNmlUSEuIQVpaULJ8iOUrBDMFgk6XTrbd3NzYWFpIiU+hoXubkXvXbx96xqaPNYYjdq/iCd7TUD9Zq2xbNbnJEZuTfzxx36c/Pscrt6UO1VyQ5XMCQq4umih0Yg2WX6EkhUGaaa6OWvYbnpqGgtLEz5+svu2sLA7LCwKU75bBqVLAHYeOYNZi9aiXJUaeGv8JOzbs53F37x9m4X93niThflRqlVITMxAaqooyfIjlKwQVColAoPKsX0vL08WliZc3OS/uWq1SiwsCqNHjcaZf06ja+smGDukLz7+fAqTX7p6i4Wnz51Flx6v4Il2rdhxbsKjExEaHgO1k4K8O1KsCfIglMwKMbFxLHR3d2VhaULi6dyQpZd3ikCjOhWQ2wqrejm5NHz66U7M5PfU6X8wcuggJiuAgg4ZyElJIXSsAELJrBAcIJdkeoOBhaWJckGBLFQ6PXj7aPPmtQgJaYn69eqz42lfz0C3Lt3Yfn7KB3qhUnl/GE0SLMJ0sQBCyazg6yWXYFnc2LY0UY4keMq5cxdZeL/8tncHtu/8DavXyBM/aSJ5pkMr1sFRGNR2kRoGu7tp4OIsxsjyI5TMCldvym2R9PTS1/HhpJRLsCqVKrDwfjh56hheeqknZs+ejzq163Lp3cnMNEGnNyAjM4uU/MJAOD9Cyazg4UE9LykQFBQkC0oYZmMWTp48iciwC4i8fQEnTxzCieN7mQuAbRvXs3Ounj+H6xf+wuljv+PEsW04tnclTu5Zg7/2bMCVC/+yc3Jz4fxZdOrYGV9NnYpeL/dkMqPJAEm6ex1Qq6a9sSraKcs2QT6oWZUgL7FxMdJTT3eUVCqlFB19h0tLFn8c2E+Ts0TKLElFNrp/P9uwkSP5nSTJaDRKG9avlfx9vVlc+9bNpUF9W0v161WXXnixm2SxUGfd1klJM0p+gVWk2jWCJb0unUsF2ZRq20WjwQC11nYTE8+fO4Olyxdj7fotiI+OATWYOHXqKJo2LdhtXdxExcTg8MGDiExJx+lbkSjn640GlYMQkaZH5JWrmDdtMtxc3TH2o4nwrFwTl8NjUSfYGxHxiQj0cEX/l7qjSjm5cyc1NRVdX3oFt6JiocvQMT+Nvv4+qFEhCCOHDEXfPr3YedZII9XEOnXrIiX+Dm6FhiEwUL6vgMNUrZSxccMG6Zmn2ksVgwKksaOHSenpiTzm/rlx67r0v48nSh3atZXKlQuU3hg4QFq7eYvU+fmXWa7+14G9/MySgYmUOhaLhR8Vzo2waPa39+r3MpcUjQyyRSdnSDEpGZJOFhWJTL1Bql6rFntmeHg4lwqyKXVtssNHDuHVXr1w+PQVJKYbMHvuQnR8uh1SUiL5GUXjzLljePf90aj/WGOsWbcRz3Z/AX8dPILVK1ai70svIph3g8cnJLOw5HDvisetW7LpU7kgHxbei6ioO5g6ZRJMKckI8nJFoKcrnHlcUVCqVKT1KiclhRgoK0CpUjKSgeP7hcswbsK7iI0OR+itG3iiw7OkwX8Ru/Zs42dZJ10fSxTqOwwZ0wXPdOmOfXsv4qtJC3Dt6hVM/PB91KpZg58JRETI9n/+fh4sLCmonNT3TMhVK8pd+LeuhbLwbkTGxqHl44/jl207ifo+mIIYsozQGbL4kSA/pUrJaNp67933MXPGt3B10SAgwB8TP/uExUWGW+9qv3zxLEaOfRMNmzyGKVOWw8slBLu2HsI/Z37H+HH9oS7EFCjb0sPXT06wpYn0dNl+8B6dgrh67RKakXdSo3ptHD50GF5eD+auwImUZE5OYka0NUqZkinY4ga5iYq5wcJOnZ5hYTbR4dcx6+tP0LRRbTz7fA8kJiuxYM4GXDx3Ht9Om4wWLfLeJz96vZ4kHgW8vYtW5SpJpGdmsNBksW6tcuaff9C8eQs0atIMe/fthfohrENMZjNMptI3aO8oSl2bLD+TJn6Gl15+CY0by2sZx8bFYdyYEajfqDEWrNyA3m8Mxf4/j2DdqqXo+kx7q1YL+fFwd2Fenwyl0OKDaAwL9JmF/+1n/v2HtGOfwmNNQ7Bl88/QPISCUVTkelqNFRROqVayadO+RpVqVbBqxSouAfPNYbA4YcOvu3H58hV8+P47qF6pPI8tOmaTEUqlEp4epcv1AMWbZBCUCsG+LMzNhYv/okP79mjetAX+2LcH7s7308VROG4aJ3i5Pfx9yiqlVsnmzp2HZcuWYueOXfDwyOmcqF2rJhbMm4NOHdo/YDNepmJ52dJDqSp9r8hFKyuZhnq2yUVqWjJatmyBrl26siqiRm270oe+JTquqCxqVeERolQq2YIFCzBmzGhMnvQprl25iP37duHrL/6HjAx5NrMtUBIVpWt8RUTcu4eupKHnpvDu7jkD9WlEwZ56siO6PvccVq9a/VAZUH4MpFqdQarV9LG0B1iQl1KlZDTRDxs2FCNGjGDHr/UdQNoVLdCxczccPvEv1DbMmVN0etab6e1T+iZtqnlpkpIqZzqhYdcwaOCLeLprR2z6aTOcbVBFzI2Cdv5zrZWE8WIBSl1J1ubJ7pjw0ZcYNGgQ+vcfgAEDR2HYiPFYv2ETqR7ZzsQqPDKSGbsaS2HHR3Iy7V1U4k5EOsLuXMcz3bujYrVW+ObL6fIJNkZNqtRqUld0d6dehGW3DYIchN9FK7zwSm/88dtWREZFwNNDniVcWrh8/SYa1K2LypUCkanPxKuvDcK87+y33KyZJKF6desjKSEKV67ehK9vwQ6XR5lS2SZzBHVqVUdmpgE3blznktKDq0YFlVJCWFg0unbpaVcFo6hIXdHF1Q3xCdTvojxGJ8hBKJkVjMxJpwLeXqVvMJr2PRiNJrRqFYKVK5ZyqX0xZhlIia8ulT5R7I1QMiuondTMFPfylauyoBSR3XOYmppC/ndMm5J6qUpNMyKKtGUFeRFKZoWI+DjaVcZMuYpCZkY6bt28iVCywWhAcnwMwkJvseOwUFl+s5AtMTYSKYnRbD/8lnwu3b9Ntuxr4mJkY+WiIvG/2cuLjh86xqbQJ0he0VMhUlRBaMeHoCC9+w+iBZm0bdsvXGIdk9ksPR7Skp1Pt3pVK0i+bpr/ju+2ebsopEAv9X/HJI3miafbs5078icVjUMnTrPrXu/3LJfYn5AOT7JnRkfHcokgG5HvWCGIr+SSmprJwrthMpnhFxiMpi1CEBLyOCQ3f3hWbMRsA0NC2qJlSAfUb9QUnpUa4rGQEDR4rAW8Kj2Gmo+1hEfVJjAH1UftZiHkvBB4VKoHv4p12H4I3158WV74vKgE8rG9y1ccsz4Z7Z+2kDYZJSnJds/cuGkVXu3VCkOH9sTRo5uJhOpxKYQrmyAfQ0aMYjnzH3/u55L7Q59v8jI9vJOSsx+RKrHZx3Q2coJZkgw0ghCZapaik7P40YNx+Xoo+9ubN2vOJfbFSErylu2fYM/ct3cnlz4cm3ZtlcrXqC698Mqb5L5KydublJIxt3ls6UKUZFZI18nz09TqBxtc1eZrytHDCtx4hO6XJ80landB++J8yVfIfkqwh5KUog9nueLPSzKpCDk/PYM6cbv3mdbJMknIMFhAV2pqSEpsW2B28sfOXfuxdeMy7Nh/AMnJwNoNG3ls6UIMRlth6PDRWLxwHt4fPwQ9e/eESZcMJxdvGDLvkBSphJK08FVqFSSjO7x8fREZGQp3D08k3gmHTmeBt58H8w3v7OFOMmIlSOkFyeIMV49AxIWfhdbNG1p3D5iNOnKfAGSkXkZWmhE+wYGwpKVA6ewGk9KFXGOG1tkfusQriE9JJdd4w1nrRp53m4Ra8mx3GIx0zeZAhN38B/6BFREaHoehQ95H8xYtcOrkSf6LrJOdAIrWxVOQ9Cwz6teth+iwawgNvY7yFXNmmNuCWzdvoXWbNtiy7Re0bvk4l5YiWHkmKMDrbw6laa9Ub23atOK/xv481qQFe2bEHdtV6QwGnXTkyB6pRYsWUt/XenJp6UOUZFYYNPgtrFy+DH36vw3fyvXg7u+LhPgMOGvUpGTRIpjU94JcSC6eqUdKegZqBPrJneWkOMhdIoQlZ0GrUUFnMKGitxY6kwWpegkVPGRnoDeTDPBw0SCQbOdjExEVm4ZODfn8NxJP1/n8+3okFE7uaFjFCy6sgk8/mQKJOjP+/PcG2jesAm9XDZIVCniQuFMXr+K7/32INm1a4vDhE/QCu9Ok+eM4+/cJ7NuxEU93e4VLi0ZqWiI2/LQaWYY0jBgpu5OgXLtxDcPHvYvft/8KL28NZnw7A4PfGsVjSxFM1QQFGDxkBMuZd+ywTUPekVwPC2N/e/Pmjun4oDRq1Ig98+yZo1xyb27evCaNGNVf8gvwlqpUqSqNG/shj8nLr9t2SWq1m6TRKKTwsOtcWnoQHR9WUGvlrghbzlFzGCS5q9Ra0p5z3BIrKg11aw5S4tzdOFinT8emzT+hbfu2aNi4KU6cDMU305eRttwtzJz1FT8rL88/1wWfTPoUJmPOlJrShKguWuGNAYPww+qV2LBhA1599VUuLRyzxYx1P8xDVPhtXLgQikxShSzn6wy9QYLSSQkfHxXuJCjxZNsG2LvvLGpX84aTkwkGUxqqBVXF6X+j4OSsR8PqVXHkVCgq1/RC81ZPICMlEvv2HkbL9t0wbMjIIvsnuXMnEpWrVEbTJo1x+vTfXGpf2j/zHA7t3YEjB/egdbvOXJpDUtJtzJ47B8uW/Yj0dDNRnB7kHfdH547t+Rn5kMwwGo1Qa+S5b0PHv48fly5A+J2w0mdPysozQQEGD36bVX+IknGJdYiSSeUrV2Ln003hEvTf/sNtCskrqLbUtGVHyWC6u9fg3JBSgV3fzEHjZFkms1STexA++89pLpXZvv1H6bnnu0lunhopuHw5afqMeVJs3L09Pnft2lHy93SV3hz4ovT20MGSt5+/tGvnHh5buhAlmRWGjRqDRfPnFqkko1y9cQPRsbFwd/FGUKXqCLtxmVnDWyyZUKnckGHWQWMEktPT8ebrvZGYlICvvvoKTzzxBL8Dqd5JFihINc/ZwwP65GSoXdxQt05NpCYmoXz5os/Run37NqpWrYrHH2+JY8fs3/FBf2ebpzrj+IF9uPzvSQRWqIZ1Py7FkuVryHu5jSc7P49eAwajV6e2cHEp2qzs6fMX4pd9BxCoBRo3boj+r72G6tWq89hSBlM1QQEGvCV3fBSlJLtfGjWX7Rx37/mNS2zL9RtySda6jeM6Pto99Qx7ZrvmDSRPLy+pQvVa0qj3PpYu34riZzy6iI4PK/h6yR6fyDtioa2gXREaV9lTr7e3/Axbo3Z2BZTO5P4P50/xfkiLl6e4hKeaMWfRMly9fBlzv/kSdaqKFV6EklmBjk9RnB7S8Wd+6AsvX74K209ISGKhzWH+uc3Q6xznOtvdW3bR8MUnH2NA75fhqhZJKxvxJqyQyBVApbJ9QvX1lEuwjHT7TKiUTAZSZBqRlCT7xHcEBoOehe5qxw0blBaEklnBRSs30LP4FA5b4ushj8HZb5kh+b50trKjMBnkst/MXYQLchBKZgUFaz3RNpltEyrtibvO1w9TU7N1u5DdjrRte/JuWCS5VK5SRZ4hLchBKJkV3NxkCwaVjddRoCqrN3EFZv/bE8d93uxCmQ4gC/IilMwK/ymAjZsYNDE+9aQ8Nqa0s42QQpJs3jtqDUmScyN/P3mFUkdy9MhBzPjmC1jMJVPBhZJZITFFXsbWnN3NaCPMZgv+2v+HfKCwjwLQuWuUzMxMZBls36YsHLm6aMhyrK2nXq/Dq71ew7sffIroiJLpI1MomRVctLLLb1sXNlkmE06dOgW1xolUSe3TSUDXVaO4uLtAa2O/91bhbbK4WOqGzjFQC5nRY8YiPjGFfSfq2askIpTMCnTWsT2gS7+6efmgUkV/NG3anEtti4uzC5QqDSnSHNed7uopD7Dbcj2Ce/HJp58iPDIGI0ePIQpHSjVHFdr3iVAyK9hroXEFUTIXd0+S60bj7L//cqmtkf1FmlkbxTFtMqVKLpWNRscs0H7sxAnM/X4Bfly9AlqlnJn4+pTM9b2FkllBw8d7bL3eFh3arlSxAtuPiS6axcf99l3QDgDJYpRLszzztO1HWlICC53YM+1LQmI8Jk78AGtXr2GLW2Q7c01OspMFzUMilMwKZt7jYWvf7jQ91KoiK1lRPWHpSUZ9P7ru6uoKd09vmEy0VHFMlTG77Wqycw8fnbs3auRIXL5wAfqUaEz9YjL+OvAni/tx/UpERFxm+yUJoWRWSEnjTk0VNu5eJCSm3p+5kwsp/u5nldj09HSkJidCxatwjkDrIo8rKogS2BMdaXidvXwVsUmpeLXfYHz86Wc4cuQoi1u28if89NMmtl+SEEpmhSBf2eA1PU22ybMlfu72Tfw+PrL3Y6WSPscxn9gjMNv5j31LTndSSh86cABXQkNx/MJVHL8Yge4v9mdx85atwJAh49h+SUJM2rTC++9/iG+/nYbtO7age7cXudQ29Bs4GD+uWo5NmzahZ8+eXHp/0M82e850pKXFwokpkxP0WWlw0fogNPQ2Fi1eAWeNEyZMGAZPz2ASryRttCxSnaPnKvDkk+3QurWVqf8PQMMmzXDh7BnMnzMLI0aP5VLHMGrsCPLcBfj3/Bk0atCES0sQVMkEBXnnvY9o5iNt+eVnLrEdw0aNYfcmSsYl909sSoqk9fJn93mQ7e0hb/E72YZur/Rl9929YwuXOI49fx2T+r0+UEpOTuKSkoWoLlohOUNuN2Vl2b76E88XTH8Y/Dw88dcff2LL/sP4JyICp+6E43xEOA5dOI/d5//FumOH8eORv7D931PYc+lv7Lt0BsevXkIEOfffKxfw2eQv+J1sQ7MW8phfWmoqCx0GUe0ANxN+WLMCXnyRkBIHVzZBPsaMm8ByZnu4H+j0/Evs3ps3P3hJVtLoPVQundeuXMYljiEyOlrSaFTSgQdcGMQRiJLMCio7vhmzSe6Bc8wIlmNIS5OXTPLzd6yB8MUrl0ltwwx37i6iJCKUrBioXUXuibPYeK5acVKxojyPLDQ0lIWOwmxUQkFyRI39x8AfGKFkVrBn8nfjbtEki2PWc3YEVy5eYmFQoGNNm8wmCZLZArOl5GZYQsmKgdRM2ZJVsjjGzs8RqLlBNWmCsNBRqKn5m0KBzPSSO1lUKFkxkMHneCmdbGuyVZx4edJF4AF3N3cWOgoPtvi8wuHKfT8IJbOCPe0WyvnK00Ky7f3KAlmp8jyy2xFRLHQUrm6kMUbeo50NTR4KoWRWsZ8GxHJXbZYyVF1s9phsaVGrTl0WOor4+Fj2pejKpyUVoWRW0PF2kz3Qcfdp4XdusbAs4MSNkaOjHVuSGelwCK0pluBqgVAyK7h7yFbl2V6rbEmFAO4JS2ljV1jFyNZt21lYrXolFjoKNzfSJmPVxZJbX3zkDYRvXLiMbSsWIj0tAfUfq4eUZD0MegP2njqPzbt24vVevdCgdm1oyGvycHKBSUvXsE2Fs8KA7kPeQmDlGsyFjJyPF40hQ4djyeKF2PLLFrzYw7bGx8VF285dcWTfb1iydDHeGvw2l9qfvX8ewjNPtceRw4fZ4u0lEqpkjzITJ09n5kAPso0Y/ja7R9FXDpPp3e9Ndv3KNSu4pPTTtFkr9pvmzJ7BJY7hl2272XMPHTrIJSWPR766+M7YIfj99z/w+x9koyHfstck+/TTT8nx7/m2AywcM/49ds79tgayzPJrV5aht+/lL6+fFhTg2FUw1WpnVrUPDJLn/5VEHnkl8/X0QMeOT6HjU2SjId+q1azJ4kNCQshxx3xbBxbWqVWLnXO/eHrKbTIP11K2LOtdqFynPgsTkvmMcgehz0wi5ZgkehdLI9lOQamDUFvj6UxrONSzUwn1YfYABAfIJZmrxrr7ga1bNmD50nnkd2di9erlSLUyLebSpUv4aOKHSE0r3IdjWNgtjB8/HvHx8dBqnNg3Sk/P+U6hoZfxwfvvMfmhw0cwbMibiAq/wWMdj1AyK6iU2RanskLYFF6/1GfJCeNeT7DDX2Bz4pPkOXLGu5hjfvLpFxj89mg0qF8P58+fh7YQ35YXL15AmzZtcOdOBJxpJ1M+QsOvosNT7XE7/DacnZ0hqVyYe0mFSu5dDI+5ic5dnsKFC5fh5KTGOxMmYNGSFdi0ufh8fwgls0p2l7Dtx18MfCKos4tsgnQvJSq5I0A5hHLvvek6613prh6y6VXHp7vhm2++K6BkVPHaPdEeb48YjjWr10CTz7T+xu2LaNm6BVGiZ7D5581wd3dHfaKwgeUrwN3VGwlJCWjWtCXq1AzB9h3byPVqqN3kiZzxyRksLA6EklnB3YMrgB1GODRqPj5mkrP9svAROreVZ0Yr7uLf35BlhKurM6ZPn8YlOdAqYvMWzTFq7Gh8M2Uql+Zw88Y1tAppg96938CS+cu5FKheORgXz12Ak0aLhg0bon3rJ7F9+1YeC7R/qhM8vTzRvWtnLnE8Qsms4MZz3fvBQDLxbG8FWaRpYi4kU6f+HC9ek9sHCcmOXZzBnpj/m+VqPUmplEoYDFmIi4vjEpkbN68jJORxvP56P3w28TMuzSEyKgwdOnRA375vYt6M+VyaQ2JqJNq2a4O2bZ/E5k15q4VOpB6QlpaO8DvymnDFgUOVTKfXISpWNiUKu3MLUdHRbL8wQqMjkMyNTgvj6tUrSEpK5EcFOXfpPOLi5Y+ZmBKH6Ngwtl9UoiLkhcbvp6pGF7bMXtxSo6KJSt7PDXWfreareJp5SVYWOHHmPN+zjor8drqqjSErx83excsX0bxZc7z55gAsW7qcKWJuzp77B+06tGMKNHvmd1yaw/lL59CmbSt07doVP29Yx6U50IU9PNyc/1s5tThwqJKdOn0CHTt3wOIV35GcpxXOnj3DY/Ky9ucNqFe/PqmDFz7L9tdt29D4sca4fPUCl+Rl8y9b0LRZM1y4fAGn/vkbjRs3xoD+b/DYoqHV8irdfdjEOeVSMmsoSSJqWF2eRezu5rjFGeyNr7c8HHH36rUcl+3K++LFi2jdqjWGDh2G2bPnMllu/vnnDFq0aIGnOj2DnwpRoGOnjqHzM8+iT6++WLxgEZfmEENKzF+3rKc9/JDMxWiMzYakHcTWbTslpVIlaZzV0vr164ikoK3E77/voV9Cmjp1KpfkZe8fv7P4efPnc0ledv+2k8Srpfkr6P0lac/+w+z8Zk0ak6Oi22ZMmzGDXffTTz9xycNj5uHIMbLTmQ0bbe+kp7jo/eZI9pvmz53FJQVp1Uq2ComNDZOuXr0qubi5SiPGjeGxeTl96oTkF+ArDR89SjKZTFyaw+m/T0oKpUL6dNKnXJKXs2dOSn5+fux5dPv8s//xGMfj0JLs6vVrsFjMGDZ0CGnA9iGSvNn+jp0bSM7UDdO+mYOPPvqIS3PYsXsHOj/dGYsWL8HIESO4NIc/Dm7Hs126YcqsBRgxkN6fVktlq3BPbzqOU/RSKZUvXmDLxdMzsiToyCenJR4l23I9nVvll2YCuaWH0ooHIoPJjOT0dLZ01MVLN9C6dSsMfvstzJ85m5+Rw/FTR9CufXt88O6H+H7OXKjINbk5eeYESSddMWzEGEz6dBKX5nDq1HE81rQVXnixJ+v4YPw3JON4HKpk4IsRNGzYmIW52bN/G57r3hszZs7H+++N5tIczpCqQ99+A/Hd7PkYQj5Ofv46sgevvNwXCxYvx8Sxg7kUCCpfjvxKJ7g605RNM7WiQRvLtsZDo0DuP4Nkcix0pQ24Uk4lbtakp70/hUBKHUgaLfvN/fr1w4cff4K5hSnY6aN44YUX8PnkqXjvfdlsLTe79uwk6aQb5syZje/nzuLSHK5dv4oeL/fA0mV04Hsx2rV9lsldPR2b1HPj0CdXqFSFhXSRutwcO3YYzz79Ar6bNQ/jRg/h0hx27tiB57t3x+rVazF+9DAuzWH7jl9Iw7cHlixci2FvD+JSmSoViJJJZkTHUpdl1sdw8lO1enUWZiuCraA6Zsx3y/tZTKKkciVM7oSy9ls0pC3q5qSC2WIBHTeuV7sWNm9chvWrv8dPP67Bpk2rsWjmVDz9ZEdoJAUaVnTGpp/XYO2i77Bu6Sz8/ON8zJv5BXp0fwEqUxZ83YHV86Zj8Zfv4adFM8j167Fp9SL0ePYZeGhdULmSC9avm4O1q3hbz07rzRUJWmd0FPMWLqHJS5oxYzqXSNLPG1dITiql9PVX33JJXn7ZsllSq9XSvHnzuCQvK1eukBQKlbTqh/Vckpfla9axZ7Zv355Lisb8BYvYdT/9VPh9H4Zho0axe8+dN4dLSj9vj/2A/abZs6y3yTp0fIadUxzb9/Pn8r/C8Th0Ptm3M2fh/Qnj8f33czF8+ChS9G9Dt2dfwLSvv8H7HxSsGtAepTfeGIBly5bjjddf59Ic1qxZg/79++PHdT/jtT4vc2kO4995B3NmzSHtQBM6dGiPAwf+4jH3Zsy48Zg7exY2bNjwn0W+rRg0ZChWLlmM+d/Pw4jhI7m0dPNi/2HYumYRZpJvPG5c4QtO3AiPxtGTV1El2BlaUkOm9QpalcqySIhI0sHf25W0VxUwkRSZqpfgTM5xUpqQpjfDVesEN3oRiU/XW+BKdl3UTjCS46hUI0wGE4L81HAjxzo6MqKQ4EJurifHWoUSTRs3ZhYgxQJTNQexZNUylqts2fKzdOToIUml1Uoz5yzksXnZ+usWdu7eP/ZxSV7Wrv2RugaV1m7YzCV5mbVgKV3TVZry1TR2n7Zt2/KYojF+gv3cdPcbKM8nW/+T3ANaFnh50Dj2m7ZvLTs9prbCoSXZdzPn450Jo/Dcc8+zMZL/Tf4Sg/rJvYC52f/HfnR9rjsWLliAgQMGcGkO330/ExMnTMTmzZvQrVs3Ls1hydJlGDvhXazfugHNGrdBJX93tG79OI4cOcbPuDcf/u9jTJsyFaS6iF69enMpSUXkbZHM8aF4tW9//LxuDSmpyb1fzbl3aWbYmPFYNHcWnuncAY0fC2GlCN1ox6mZtIn1kpKUPgr4+LrBx8cTV69FgbpMNJHizEOtRKrBwpalreDliujkDAT6+8LPyx1nrt9mpV39YD9ciUlk7VlnUkplkSyWloTuWgWeJ2klIzUZe/YeJG1eUpIRuYLUEmnLP81oQGJ8NPyDKkLjpMbLPV9E88cdPIOaqZqD+GbGLJbb0W3q15OktLRUKSY6WorOtW3euFZydXeRvp09TTJm6aXEhGgpJiacbLfZucuWLZIUTgrpu+++ltLT0/NcS7dFixaz+y9YvFBKJfdf/eNadtyyZROJVBv5X3Jv3v9AbmOsX7+aSyTJZJEkvZEfPAQTxo9n996yxfHLDNmLL77K+bYleSOZMv+LHYdDS7KFy1Zg+Ftvsn2tRgUDNfCzAh1uodYTtNSg0yfy9wtq1Apk5e+my4UTuZ7mktnUb9AQ586dLfLkvg8++hjffD0VixbNw5Ahcrspuw3xsIwdOxZz5szBipXLSEktv4/SzvUb0Th96hIpaRLIOzLn6mVUwCuwOvSp0TDoM0gy598sd3WAiLIPWXKkBySkZ2qcPSAptTDp00gzS+4hlFQeUJipVT0p/SQVLJKRlWAKpTO5xsC/Ed2nMg1cqQNUhSsyE6+iddu2qMz99jsKhypZeEQ0Pvr4a8QlpiE9JZYokoJUI0ij1tuT9rJDodZAn5GF5o1qwMNDi5h0I6IiYhAbEwUfP3/4ePtBr7NA5eQEXVoSlCr6Io3w9fNCRqaOxOnhROKi78RDaTGiYcva8PeqBIspE/Xr1sDgvi+S71c0NZkybQb+9+G7WLNmJV5/Xa6ymsmbSjEAXtp7m0/djWwlW7v2B/Tt249LBWUWqmSCgnz40cc085GWLFnAJTKZpLpIq40PwxhuVvUjqcoKyj62qP2UTXj9xdsrr4MWF9JYf5hSLDca2kctKPM8dHVRnxIBZy9Pskft8KjOkmpe1G1SpVPA398HUZGk6qZSIagctR1UwmJIgclkhkbjBqjpggv08WboUpLg4u4DS1YaScUqJCTrEBefjnKBrlCrlfAg1T56HpAFQ3oKq4Nr3IkCSKTBRhK9OSsdKk0A0pJDoST18LT0LKgVFvJEUreXaBVTjSRS13N2dkK5SjXIfcjfrouHITMJXj4BSEzUIzo2kbT1VAiu4I/x70zEkoWLsXbNMvR9PafdlN1keBiyq4tTJ/8Pffq9AbVGAXd3LyQlJUOrdUJysp5Vpd3dXJCSlgkt+Zuo+V6mXm7DUiVXkngjqb+S2rE8/Z7INKSdS6eSaMn9MjIlIpc/rYo0cFVK6b82rLOzBh5urohLSGbX0OckcvcB+dGSd0/nxZn45LhqVQKgN5gRFZ17mpEFAYFuSE01kHZXroYwgc5coRttY2cbXdDjbF+knh4a9n38/cm3S0tDKvm92UsI03Y7/T0mM3XT4ET+VjPKB/uS96Qjz5Gg/8+Ig6QZ0DYaXYCQpkHav0hnONB9ljzIM/TI0seieu3HyTMd68DogZWMTj58ucfz+PfEPngTZaKfX6NSw8nFC5fPX2THFSsG4HZoHOswqFrVjyR3FVGQRKJkJmi07nDz9CQvn8RaTIgkyujpHQClMZV1z8Yk6KEj7R/q2InOCKlaoxr5ACaYTXpmvKshiUzrGUhenokoEEmAGSnw9quMO7evwkmpQmIKUWTydmmCpL+QnpNM7kezgvqNG5LnkrZb5BVynY58YC9Ex2WShCnbVpYLckN0jDxd/ce1q/Ba3/5snw6a6o0WeNJB0Ydg6NAhWLx4CT+S8fUmCZ1kLORPh0XWJZZE8iZZGWvy+8FZoySJVL4L7Uq/m2+O3AQFuCMz04C0jLxLFTmT/FL/ED6HggI8kJyUBsM9/g66/Fl8/IP//gULZ2LY0HH8yDE8sJJlEUVp3/U5nLsQDpWUhVqV/BGXrsedsBi4+vqhYgVvxMSmkFxag/L+rtBkmViOwlIRyXYVRCF1JNE6WRRQWbJIjqxAEknwSSShl/d1h5pkfW4kJ0vUmZBiMMJHJUFLqm7O7h7QxUUiMt0If2cgnXwUJ/ILvEgJZTaR0kvjgnTyCTxIdkk/BE2QenoOycnlXJnk6LpMUD9RGicttET7TCYjSWhKttYVfR0xJEcOvXEN+tQEjB49mpU6lOwXxX7HQ7Dqh3VYs3IZK2loZkXaeIjT6RFEXYLTd0ISPX0WLT3oeyBNQCagpdeffx4mMUY8+VRHKMl7NEsq8hHN5O+mGx1/V7BSgpZ82X9v9k52CcyeSzTZxzcQLt7lEHXzHJyo0xq6NApdmFBNSgQplfwBevZs1nPHr9WT4kjt5kVqLwEwJmRPhNXAaMwiz5TY35hNueoNkJFGvobCmSgmyUCMCTAbMqCg96elDblG4RcMY6qOPDoDAXUbwZCaCc9KFZAaGQMdef+WjFQoDJnwr1YDrgHlcePfc1BkpkKpdoaS/HaVhztcg/yRdoPIybeHRQ0pS4d6LeojqFZtnDv2NxJuXoFfwxA81bgGOj/RFrVr15H/QEdBlexBMZAtKtUsxafLg0f0+FZ8phSRZpHoiFQCEccXfWiKkVrI+Toe5iaTh9lztGwJ7dcYNloey/riyy9loZ0p6mvadeC4VK56TWnIWwO4RFDSkSutDwidoVPOQwk/N1oJk4+r+rmgvDspnci+LxH73WfNyqOQ8/NMHJfktkO2Hf9D/QAr0LzYnVcJmzRpxEJ7U9TX1KVDCPbs3oMNm37FmBEFp/wISh72SKN2hibH/ypCdoM3i2AibbCSRqOa1fDLjh1Yt2Ezhrw1kLSncnxmCEoeDh2MvnjhIkaOHIbY6BhIZhPcPF0R7OWNW5Gx8CN166SUFGi0WlSsVB7xkVGoW7s24uITcYfsZ5Lz1Wo1nJVOSCV19FrlPaB194XKxQcXzp8j1XsDXLRu0JPzqA6qnTWkzaWE1kmNZNJQH/x6H0z46BP+l+SoqbX21cRPPsNXX07GypVLMGBAySwxboWHo1GLEDz/ZBOs+2kXlxYntNfChCwz+Y6SK/nGEiTSNo4g37dSxXLkZZMMi3w/2jusVDghMjoJgd5auPiStmiWkVSFSF1IQS3lSRZH2uFpqWlw93SHgvlnpPUkFUwZceTbkbYqWzaXfj0lUuPTSJvQyGZlm7KymKcwnVFCsK8r3Lw8EB+TDGdnNdyZFQHtCb/P6tVD4lAlm/rtdHzMZ7s6qd2hUpphMMirTkKhJI1mF7kBb3GGkyaTvbBslCryUslfKiGTNMJ9SegJlVMsTAZSfVT4w9U7CLqUS+Q2ruQkE7lXAIk3waCT3Q/UqV0N5y5cgNop74RRayxatgbD3uqPtWvXoG/fgtNsSgo3omLQpWNnvP5SS3w2dRmXOh46JWj2nCnQqHW4eTsUWosn+QxEyVQq3AiLQ8PqQUThLOS7k0wvIR4SUaawmAyUI/oVEOwOo95AMkYXkslqYCEZZWaGAUkJOnj6OsPNzYXFKYjCxobfIfcBvLy8WCeL2kmFm7eSSDqysM4eI0kyPEUhkDRbggJ8cT00gdxDBf8AN7w1eiDeGV9wRrY9cWx1kbwQyhdTZiA+LhpPPNUZLi4u2Lp9D+JiYxATfQexMZGIj49A6M1beKbrC6hVpw727TtA4sIRE0PjY8i14YiNvYJO3buiUdMQXL1xDXdun2dxMVHh5F7RiEsIw0uv9YPGleSE5J+zmwf5CEWfT3T1yhUWOjuTVFCCqREchN2/7caqrYcxaACd9+awPDMP165fx5HD/+LPP6/Bw70JXHyqQBtYDe6+ldD88VZIdQ5GmjIYFnUQFAH14RNcFy1atUJQvccBt7ow+jaB5FYLBlVlZGlrAN714VItBG4BDWFxrg69JQja4Hao3q4/vCuEQKetCZNzDehVVVCtfgvUa/44aj32OBqEtEIIeV4rcu+KdVtC4VUVDR7vgMqNnoTWqxbS0orhe9KSzFFs3f0bTQHSV998LX0yabJUo3Yd6dKlSzw2L2/07S21DGklpaRncEkuLEap/8DXpDbPPi1FxUdzYV569+sn1WjYQNq2d59ElEyqU6+OpNcX1k9ZOO+8N5H9rcuXL+aSkk1YdLxUqWpDqc8rHcmRXhY6kC+ny+u8/e+zyVySlyyyZU9gKOpEBsf/CvvgUCX789gJ9iFUKpVUpUYtKSounsfkZcyoYZKPr58UFxfHJXlZvGCOVL16VSkqNpZL8tK372uSu5e3FBoZKcWTe9BnNmv+mJSVRQcZisbET79l1w0b3o9LSj6k7SMFBARJr736gmQy3ufYyUMylSvZ/Nk5riUEMg5tk236dSde6dEdFSpUxoG/DqBG9ao8JoceL3bHlSu38Muv21C3lmz+lJux40bj4OEj2LtnD/x8Ci78NmLMEPy0djOOHT+OWjVr4Mr1a+Q+tdG8eUOcPPk3ac/lVBmpVb01O8Rlq37GWwNfxez532LMiHe5tORDOxk2//wLhg17k3nPdRTfzpqJ98dPwKzvZmAsCQsjPjkG1y7fhJb8WZ6kiZ2QQgfGeSRM0DhrWDtLn2lmfRqsH5kWBPSA9n0QFNQcxmwmbXYNs6jLXpedHnj5qGAykesNdEw9nbTtnUg7Tgs/f1fUqtGEXV8sUCVzFFu2ydXFDyZ+wiU50OHrN958VfIkJdjFK1e5NC/9+r8mObu4SCdPneaSvPQb1EPyJiXY2XOXuUSSzpw9z55Zu3YVSadL4VKZu1nT/7D+V3bdll/LzsRKezL0o8/Y+5p1F0c6vfo+x85x9Eaa5dLJY1v5X+F4HNrxkRAr+75XFlJ8dOnaBdu2H8CBA4eZu7D8PPPss9jy614cP34CLZo341IZar84YsQQHNp/Aaf//huNG+aYzehp1zDB1ycQzs55F5G4mzW9p6c8BJ4UH8vC4oRk1iy1FAXyTXHk2FbM/PZDjB35BlavWMBjgMPHjuDrqZ/g68nvYufWVTCbqHGZbUiKjeF7hUNrDRfP32H7XXq8hr5vjQO1H6PDMj1f7YOevYfhpb6j8OLgD9GzZy/0HzwE/tVrs/ObtOmIniMnoufgoSSuD15+80P0G/gOtER7qJlej1d6o+eID9Fj+Md4ceB7GPHtCkycuR6V6sorzWSmAzt2nGD7xYKsa45h06ZNLGd554N3uUSSzGaz9FKP5yQ3Nx/pyvWbXJpDWnqa1Ktff6lijQbS+WuhXJqDIUsvPd2ps1SzdgMpNa1gx0ZUVBR7ZkjLJlxSNJYuX8muW716KZcUH/drOnbqn1Pkb6cWnZB27drBpZIUGx8vVa1dl8nXrFoomU1F7YK4NzNnzWT3nWOlJKO/oVnzFuwcWm/5ZfMGtr+Yu1PPzw9r1khBFSpKK37+pdDfv2DBQnb9N3O+55K8zFuxTCpXtYZUtXotdt6Mmd/wGMfj0JIsjLQXKHTWMoVa43d6+mnSbgrFkSOHULtGNSbPhsa/9Opz2LXrNxw7eggNasrOUXPz0ss9EB4VhmPkeg/3git3fP755yzU6zJhMmaPoNyd6JhIRCfS6RN0JZpkFhYn9/uRalStBW8/Hzhr1GjUoAGXAgF+fmjaSDYTq12vHikEbNdmM9GiikDSFAvzQ3+Dhpr7E8aOISUWKa3mLl6Ft7k79dxsJO3x1994g63yMpB83/y/f8pXX2L48GGYOuM7vDd6OJfm8OW0LzBq0GCsXfYDvvpKXgvNmEUHyosHhypZpkUeJ7sVFsHW86W+EP+9dBkHDx9C48bywt7ZZOr0aN2mLZKTjDh++AAqBMgrJmajM+jR8ZlncP78Ffy2Ywf8/PLGh0dFoW2np7BokbzaR2qmjhq435WExHgMGPAa2j3VBi5edK4bkJZpfXmmkoqLqys8fH1QuUqF/7w2Z6NSyj0IKr6yiq24HE49NNNnW1+iiK5oQ5kz93ssXLwEo96WpxDlZu2PP+HNwYOxeOUP6N6l4MJ902fNxJQpX2HB0sX4aMJ4Ls1hybJlRLG+xZJVP6Bjx1b4+8ZtJjfo807NcSQOVbJWTRuiWbNmaN/uCTbFo1v37mz5JF8vL35GDrFxCajRoBV++WUb6tWt+18rNptMnQ6du3fF6dOnUa1KwV7I5JRkdH7iKWzZ9zt5ZnOSc74KDZ0KYYWNP69F7do1ceLkWWz8cTMir1xicoXjOl9tRrrBgAydATHRMfj9tw34+8Q+UtL/jluhV5GWLhtYW3jJYysq+smDvCbyXa2RXcotX74UQwtZz4D6t3+9Xx+sW7sObw8o6Ptk3qIleG/8BCxdvgrDBr/NpTn877MvMGToCOz94wDe6i9fH3Zbtvix5cIh9w2rNNoJWpd+SHcYdufSlTPSs106SkHlgqUpU76RsoxyO2XC+HeZXr/34UB2XJpITMuUyteoz/7+5o1bSr1fGSA1a/ac9NzLr0lVqtdm8sOHD/GzbcPsmd+x+86cOZNLCvL444+zcw4e+pNLcpj89TSJlK7Sjt8Kd2Y76ctJktbTS1q67hcuycvnU6dJTmq19PtfeX/Xkz0GsGdOnlywR9tROLQkK0mQ346pX3+ETp27IyCgBo4ePYaJE9+Dms6YJNDJnRQPjwAW3gv5bNvDUgjfioqPuwuCywUw89nlq1Zg/caVOHZ8Gzas/QHNmvAVdRS261mkRCTLMwHuVmKQLJeFlSrmbXt/OvlLTPliMvbt24Nuzz7NpTksIlXD72bPwd9/n8LgPj24NIe538/H5xM/YG7bO7Zvy6Uy7du14nvF5KKbYFclozcvxkLaKieP/Y527drh+6WbSBtgC9asXoxqVSvzWJnA8vJxzco5HQd3gyaf3IqQf4LM/SpKNvQa+g7v5z0asrKQnpYCX9IuK1fen8lon4OLVvmfP0RF3ll6D41XEVwyKKnxNiE1Va7CUebOnY1vv/0K23dux5NPPsGlOazfuAET3nkPO7fvRP0aNbk0hzmzZ+ODjz/Cxi2b0ad3QW/Mulh5fe7i5JEqyTLTkjBm5FD0fGUgXujTCxfP/oMn2obw2Lz4VZBLsGs3r7LwXtAkllsR8r/Y+1WUbB7oAylUSE5KRpbBCK0mrzKpFLKqu7oUbTZCUbHcbdCRQ63oKXfC5YQ//duvMW7cBOz/80906vAkk+XmY6I8I4YPx6aff0abkILf6YMP3sPEjz/GgT/245UXX+JSGdrmX7BgIXnGdPnY9Ih0fBQny5csQdPHGuM8aQj/tu8APhg9Fp5ucs5aGH4e8sB1ZqbclV+aOHHqFFJTkpGWkU5KgjUg7Uwmp8MSV8LkUmTJyuUw2nBh+LT/JrdaV7b09AQWNmrWCr/9thuffD4d+/cfRKvmLZk8NytXrcLCxSuwY+dOdOlcsJdx6cpVWLJiDY6fPIGWTeVB59xs3rYXk76ajeZturBjna5owzf2wKG2i8XBkeNHMfGjj3AhNBRfff4l3uqfd26Ynrz8lSuXIvxONFxUSvh5uyEtLQP7/jqKvX/8jnp1a+Pll15C7eoVUalKMG7fuoXy5SsgLCIWlSvVROdu3fmdSgb0Yy5esQqh4beRpJNQyVuLIW+/jQBfPxw9dwt79+yEU1Y6tO5uGPjGAPJ781rBPCgzv/uOVOvewcwZ0zFuwjtcmpc9+/bj5PEjJH480tIziJIrUClYrs7m505EBNzcPeFDXWwXwpWbYaw0rhRceJs5Oj6JvQw6gXPNiqV4o19vVK6ct0ngMKiS2ZKS0puYmqGTRo6WPfX2f3OwFJ2UyGPycvTESXbOg2zB5crzu+RwNxsKaiv5sN6HSyrTuRX+N19N4hJBNmWyJDt/+Rz6DxqOmDsRmD5zJl575UUeU5DEtExs274dSpOBaQ51uGowG6C1SNDBAlcvH3j7BCHu1iVYFBpoFBbozCbm07FS1WqkLdGe3acoZFeoymIdfcaMGXj33XcxZdInmPjpZC4VMJiqlRHik2OkAUP6SIHlg6Qevd6Q0tKLPklT8HBkl2TTp4mSLD+lLlO1WCzYtHEjbl6T3QNks2zlYtStXw/XL8Zj164/8ctPq+HuZttuasG9SUouflvPbEpKHa1UKVlyagae7fY8XunVizTgt3MpK41x9PB5fP6/6Th0cC+aNa7LYwSOxtW9oIlcsfEgYyZ2oFQpmZOTCv1f78v2L1y9yUIKtTJYumQORg4fxCWC4sLNteQoWQnRsdKjZLTkd3d1Rks+YdPPl/rPE5Q0JLYCiyA3pa5NZqJu3ZRORMnyTm0RlBCUxWcjWFIpNUpGi35qn6Cj7gQsJuizRI5ZEonhLiYEOZSukozUGTXckjuSz7IuDqiBfgnpuCoxqOiijgSttmQ7gy0OSlfHBynOLNQPM6FihYITNR2FiWqY0LI8WIzyVBc/v8LNpB5lSoWS5bafVjHrcQWyDMVnuKshb604J9qWRDSucglmMIgVZvJTKpQsd1M6IYW2xSSkpCSygWlHQwswxz+15GPISGUhdUUqyEupqi7Sz3f8xDV0fm4Q4lNd2JyhYkGkI6u4uYqhlfyUKiWjNbQPx/TGnm3LseT7b5hjTEdD22O6YtLt0sCdO7f4niCbUqVkJQE10XS+eq8gNwrZ/YDKSVSm8yOUTGAj5Dp0UlISCwU5CCUT2AY+fimZRZLKj3gjApuip+sWCfIglExgU4KDffmeIBuhZALbwGdIOrHFZAS5EUomsAlKvmKLt6cPCwU5CCUT2AQ6O52hKkEzo0sIQskENkGiizcTFIriWwespCKUTGAbnOT1zkxZ8tJMghyEkglsAzfWVquFh7D8CCUT2AbeJtPpxDhZfoSSCWyEXJLpMsV8svwIJRPYCHkWq39QMS3qUIIRSiawCZJF7l3UZ8awUJCDUDKBTdC6yeNjycmJLBTkIJRMYBNUKtniwz9AVBfzI5RMYCPkjo+w25dYKMhBKJnAJri5yksDX8u32o5AKJnARsRFR7CwSqXaLBTkIJRMYBOcPWQvVW5u7iwU5FBmlcwiSTmW4QK7ExRcgYWGLGHxkZ8yq2RGkxlm6rRe4BAiw26zMLhCFRYKciizSiZJZiiEF1KHYdTLq+x4eorqYn7KrJKplCq2AqfAQfBXffzoIXlH8B9lVsnUTk5QKsvszytxaLl77viEOywU5CBSocAmWMxy1dzf34+FghyEkglsgsJJdtNdHCvtlHSEkglsQlZGCguFjhVEKJnAJii5j49boXEsFOQglExgEyxGeRCarpsvyItQMoFNcHbzYKGHm3Ckkx+hZAKboNbKyiUSVEHEOxHYhMwMeaH8tExhu5gfoWQCm1C1XiMWGk3Cg3B+hJIJbILEre+rVKnIQkEOQskENiEhPoGHwpFOfoSSCWyCh5dsu5gl5pMVQCiZwCbEx0SzUBhlF0S8EYFNcHZ1Y2FWluj4yI9QMoFNcOOD0S2a12OhIAehZAKb4KyVbRdjYuNZKMhBKJnAJmictSzU6TJYKMhBKJnAJly5cJ6FaemiTZYfhST8ppVaTp08jvXrVyEj0wJ/Xw18vRW4ccsAT3cFs4b3cHWCwmRCdJIZHu4qEu8Kk0KCr68aksUFg94cBxc3b363h+OnLdvRp+fzCGnRHMdPnuJSAYMqmaB08unkyTSDfOAtJjKM3+nh2b7vL3bPDu2ac4kgG1GSlWLiklNw/MRxsLUemGcuBRTOzpB0Okz630c4dfo0Zs6egyat2pDSTg+lkxIW0may6PXwK18ebZo3Y/exBQuXr8Hwwf3RoV0rHDh4lEsFDKZqgjJHj5f7sZLl+JHfucS+fDN9Dnteq8dDuESQjej4KKNkZcnORmPjolhob/zLBbPQYhZOPvIjlKyMUqV2HRampMnzvOxN9Ro1WJhlFP4H8iOUrIxSp6q84uWdMNmm0N54e8gzo2tUF1Nd8iOUrIwSFZfEPGe3bNlKFtiZqAR5qktyimNKztKEULIyyj/HDrJ+end3eS1ne2OR5LZYWpqw+MiPULIySmBwORaeOHmShfbm5s1bLFSr1SwU5CCUrIxSp2lTFprNWSy0N1UrV2JhhfKycgtyEEr2AJSGTuqb18NYGBzkmERfrYrc0RItrPALIJTsASgNq56lpsodEBaLvBCEvbl5W14yqXywbWwhyxJCyR6A0qBkZrOehRUr1WShvYmKjGWh2SgPggtyEEpWRvF0c2FhVHQkC+2NViNP2qxXvz4LBTkIJSujOCnlXr6oiJsstDd16tZl4bkLV1koyEEoWRlFUrqy0Cw5pkv9yvmzLNTpzCwU5CCUrIzSuUNLFu7dtxsWi9w+sye3blxhYUBgEAsFOQglK6O0bd0WLi6e2LVrP65fs/9M5X379rGwVk3hrSo/QsnKKBUqBiKonDxGduumfae73AwNxT9/n4FCoUDrtm24VJCNULIyikqpQp9+fdj+wgXLINlxMecf165FRkY6WrVuhU4dO3KpIBvhfqAMEx4TiwZ1GiAtJR57dm1C5y49eYztuBV6CyEtQxAfH48dO35Ft27P8xhBNqIkK8NUCgrE6FEj2P4XU79moa2Zv2gBU7DefV4VCmYN5oRAUGZJSEqWgitXZ/43Jk/+jEttww/r1rH7ajRO0uVLF7lUkB+hZI8Ah46dkDw8vZhCzJz+BZc+HJu2/CxBAUmpVEobN27gUkFhCCV7RDh48KDk4eHNFO2D99+S4qKv8pj7I8uok6Z8/Sm7D90+/t/nPEZgDaFkjxD7/jos+QZXY8pRMdhDmj9nqpSWksRj745Br5NmzZoptWjx2H8K9tmk6TxWcDdE7+Ijxq2YZAwZ9Dr27drBjqtULI8+ffuidq066PH8c3DRaODq48viosPDkZyUhC2/bsUPa3/AxcuyXWLj5iH44otJeKFrF3YsuDtCyR5B9EYLNm7dhgXzF+Don7u5FPDQauDj5ooa9erDrFTi+MFDyL04beUq1TB4yDBMGD8O7i6y1b3g3ggle8TZuvsADv/5O/bv+w3xySlIYd6mLEhPS4OXtzeC/APQqXNn1K1TB716vQpfHy/5QkGREUom+I8skwVp6RnQkhItjSgZdYrjL5TqoRFKJhDYGWHxIRDYGaFkAoGdEUomENgZoWQCgZ0RSiYQ2BmhZAKBnRFKJhDYGaFkAoGdEUomENgZoWQCgZ0RSiYQ2BXg/5hbBq549TA0AAAAAElFTkSuQmCC小白学习中,就各位大哥大佬:loveliness:谢谢
图? 楼主,请把图传上来。 本帖最后由 XGWJ 于 2018-10-20 14:41 编辑
图示轮系中,已知齿轮的齿数Z1=30,Z2=25,Z2ˊ=20,Z3=75,n1=200r/min,n3=50r/min(与轮1的转向相反),求行星架nH的大小和转向。
图片忘记上传了,哈哈哈data:image/png;base64,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 这个需要图示说明才能说明的。 行星齿轮? 以n1=200r/min为正,则n3为负,n3=-50r/min。
nH=n1/(1+75*25/30/20)+n3/(1+30*20/25/75),代入:
nH=200/4.125-50/1.32=10.606 r/min
nH与n1同向。
学习了
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