请教倍速链设计大神
1、计算倍速链时,容许负载系数K2的选择根据传送物的平均重量Wa,如下表data:image/png;base64,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
请问传送物平均重量Wa是按整条链的,还是按滞留部的?如下图滞留部明显要大许多。
data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAYQAAACQCAYAAAAIjRzqAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAADAnSURBVHhe7Z0HmFTl1YAPvS4KWOhdIgJKtSA1KogiKrEkWJGoGBtqrPyxYSIWYuwl5jECioqiiKhABBVYFLEAggVEBRWkKEXasuW/79n76bjuAjt7587MnfM+3IedsjOzc797+jlfuQIPMQzDMDIeUwhpRMGPn8rqZR/JPx94TeSY8+Xwjm3k5LZ1pbz/uJFhFGyS3O2rZNqNf5c5BUdK9Tad5Ixzu0rjCiLeP8MoNSZL0oiCrWtk09cfyEtjx8qL876QD1f9JPn+Y0YGUrBd8nPWyJIXx8rkF2fL1LkrZL1n3pmFZ8SLKQTDMAxDMYVgGIZhKKYQDMMwDMUUQqQpEMnbJlvWr5Y1366QL7/80ju+kW+/3yDrN++QXEtAZDDeyc/fLhu+XS+bNm6VbXmWeTBMIUSb3K2St+5tmTzyDLn0uE7SokVLadniKOk37CG59blFsnprnpgcyFDyNohsfU/uP/5mGfvITJm9Ps9/wMhkTCFElp9k68YvZNZjD8rLPx4q1Y8fJQ9PmiavPn2ODN73U8mb87Tc8/Z3snlHnlWlZBw5krNhlaydN11mr86VFVvL+fcbmY4phKiSt0VyNn0vS2Yvl7x9WkvzLj2k7+97SZ+jukunZhWkVt63MnPRKtm80/MS/F8xIk5Bvmxf+a688dqL8uS4CTJu4ixZumWnbMw3hWAUYgohquz8SXI2rpOlS8pJq7YtpEP7htKiZiWpsl9HaXVQI6nXqKIsWLJSNnoKIcf/FSPaFOTnyqYFT8t9//ibXDD8FrnywTdlRU6ubDMpYPjYUogqFWpLzYYdZcB9o2VQj4Ok0/5V/QcKqVSxotSuXVPKl7clkCmUq1BZ9htwr0ya9bnkb/hCds6/SzplVZe9LJFk+Jg0iCoVakjlrPpyUOd20mz/LKlTjVPtXfhbl8uXn6+Rb1fkSKum+0qtiuWlcuFvGIaR4ZhCiCrlq0jFqntJ/SYNpG6tqlK9Yr4U5P4kqz6ZJwu+2irfbN1burTeV2p6CqGi/yuGYWQ2phAyhdxNkv/TMpn88GPy4tdZsmz/HnLm4fWkemVbAoZhFGLSIAPI3/CRLH7lUXlk6Hlyy5f95PDTBsuNVx4vHWtXlErlrcLEMIxCTCFEmYJcKcj5Tha/9brMnPu5vLKumRxz8tHSs1MraVcvS6p4ysDUgWEYDlMI6UrOdsnZ8pNs3rRJNv3m2Cxbtu2Q7d5zdm74VN6ZOVfmfLZNPq/XV84b3F2OaL2fNKhqpz5KlMvfKXk7tskW79z/dj14x5atsnl7rv9swyge2yAnjcj/9m1ZOvcVGXDa3ZJz+BnS7qAW0ufALP/RWKpLg/YdpVGTurJ/9i1y9sxDpFnHw+TaC3tIp5qmCCJD/hrJ2fyZ3Ne5p4xf30G2NGkvx53ZVeqVy/EsvV9f1uX3aSlVm3aUi/o009sFG5dL/rKJ0q3fcjl82AA54bK+csx+Vl6Q6WSUQhgxYoRUqlRJbr75Zv+e9CJWIXxfa3+pXL2q1K7x24u4YsVOcuSfjpXDjmwhtR69VMY3Ok9atj9EBh/eULLcVlrlK0n5irWkcePaUrlC+bQJHZ111lnSp08fOe+88/x7MpgYhTB2TU1ZVlBT6u6fJZXLFfzmfNbo0E/qHXuhTBnavvAOTyEUmEIoFUuWLJFLLrlEnnzySe+6aezfGy0ySiGccMIJUrVqVZkwYYJ/T3pRuIXmArnngVflB+/2zsK7f0PFigdKu+4tpWnDcvLxZRfJjAP6y16NGknn+tX8Z3jU2E/KN+4mfz6hjdSpViltehEOOOAAOf300+W2227z78lg/C00p9/4D5m9UeSbHf79xVCtVVepc9gAGdm30EMwhVB65s6dK926dZNPP/1Ufve73/n3RgtTCFFl82JZtWCm/LXX5TItP1/W+Xc7yjU4RMod/TeZd09/aV2nuhQXeEpFTCEEAyGjPFMIpSITFIIFlKNKVlupf+TFMm7nTvk+L0/yihy5Kz+Qnf8dJJ3TSBkYwVFurxZSsfNV8s6aB+Xekf3laFMGhkfGewj8+Ts9oUklxk8//aQHP69fv17WrVsn3377rVqlnTp10v+NYHjiiSfko48+0u90n3320aNu3bqSlZUl1apVk5o1a8pee+3lP/sXivMQcnNzZceOHXrufvzxx5/P5YYNG2Tp0qXyzTffyJAhQ6RVq1ZSq1Yt/7eMTOb555+XVatWSU5OjjRp0kT2339/qVGjhlSvXl3q1Kmj67By5cpSseIvitJCRhEDhQD/+c9/ZOvWrT8fCI4ffvhBNm7cqAe3V69erQtm+fLlcvDBB0vPnj31fyMYRo0aJXPmzJH27dtL/fr19ahXr54qAacMuDBREhQCVKlSRapXqyqHHna4DBw4UK6++mq9mFHamzdvlm3btum547Y7l/y8aNEiPYfXXnutvlft2rX9T2BkMo8++qh89dVXakhgZJAkRgmw9vbbbz/Ze++99TYHaxHlsGDBAjn++ONNIUQFFML333+vlQJUDHz22Wfy+eef689GaoLwR1E0bNhA2vyulVw2/Co55JAO0r9/f/Xe8Pa4sA0jaDBGWrRoocZgo0aN1NAYOXKkKYSogEIgPHT//ffLmjVrVDngBXzpWZCrvZ8XL16sYYyinHPOOSqAunTp4t9jlBUs9hdeeMG/9Wuwwlq2bKnWfPPmzaVBgwbq0tetW0e6d+8hxx57rFx22WUa1sP6x5tb452/bzwF8d577+l9sRAmuv3226Vz584amjKMu+66S9588001CmMhXImc2NdbJ/t5aw5FgAeBl4AiIFxpCiEicKIrVKggY8aM0VDRli1b9HBx5++++05Wrlyp8WdcScIQPH7EEUfI73//e+nQoYP/SkZZ+ec//ykzZszQCxBLjJAQbjk5HkI7++67r8ZzcdkR6MR33WMnn3yy9pRwfjTvs3mzbPIOQn1ff/21KgjOL49zlCtXTs4991zPszhEw1CGgVFIdICwImuMtcVByIjQcJb3Pz9neWsPw4S1+eGHH8oxxxxjCiEqoBCKJpWLkp+fr54DgoY49Nq1a/X+Nm3aSLNmfg23UWZmz56twhsBjVvuhP7ukr7FJZWLQm4B74Hzh7Inx9CwYUNp2rSpXuSG8frrr2tBCYYI3ic5A9YeyqEkLKkcMfZEIRipzZ4oBMNIBNaHYBiGYWQMphAMwzAMxRSCYRiGoZhCMAzDMBRTCEmEElfKXbdv365dkK5jesWKFXofM4d2BaWx/A4H/RXx8MUXX+hBk5eRfKiI4vwXPafZ2dnyySefaPVUaeE1qZpjTTl4/XfffVdfj3VUEvTpMP6DirDdrUcj/TGFEAL0MiBwudCpj3cwVoESV+5jjIOboUTnNBcvJbCxICC4uBHgVDrw+++//74sW7ZMlQuvj2IpejjFUxxuPEdsMxezgajfpwOYz01dPwfPoYzTSBw0TNIcyXmJFeCU6SKYOf8lwXmj1JZ+GhSAg9fkXLJOgOdRTs2a43ncLgnWI8oAZeSeR2Ei64O1wdpy64Pn8d5G+mIKIQTohnz66ad1hlLsmIVx48bJxx9/rEKWx7g4GcT2yiuvqJIoeqFi1aEE7rjjDrnhhhvkmmuukeuuu07Gjx8vEydOlMcee0w3jil6uEFyxcGFzcWOwHGgwPicNO/wuSdNmqQHzWRYqsmExsLy5aO7bOmW53zRBIVwd7z22mtqCOwKns/vPffcc3pOHRgFL730kjzyyCN6G6WCcuGc8l0yK6ok6OlA8E+fPv1nTwLDBOPjqaee0s/q1sfDDz+s722kLxVuTtftw+IAwcn0wtNOO82/JxwQYjS8cAFxgWFJMWKBixYvAGsQgU3TFFYcHZRY4ygSLHvGOAAKgefOmzdPrrzySh2n0a5dOznjjDN0rEbbtm21k/fLL7/UWv3LL79cOyxpumFgF41ZgGC/88475dlnn5W33npLhRAC4uWXX9b7+CyEB7jdsWNHnRLKe6Ow6ANwnycZPPTQQ/p3smta1GBN4PmhkLt27aprAGGO0UANPOsDYcy64T4UBB5mbMMkwv2BBx7Qhj/upxOccR00YGFk0G1PhzivTef24Ycfrr05dHM7pk6dqsMDWQsogg8++EDXLM1cCHz+5/XeeOMNfX1m/eBxYFzQ1RvVES8YaxhuzEKL6ggU8xBCgAuOBdSvXz856KCDtDOSrkguKh7jcM/jPpSWG8lbtHMXd53HEfAIewSCc+ddty9jH5j/Q3cuM1hQSLGgNBAETBg9+uijdRTEiSeeqCMkWrdurYKE33MXOO+FIuP/XXVyhgGCK1Z4RQHOKd/vO++8owqf88bYDixyQjZY6AheQKjjCXBg6ceGIFkPKAImd7KWGMuA0EaZoPBR6s8884yGGRFu3OZxhD7PcfD+Rx11lK4P1gkNnX/605/0NmvjwAMPVCODNcd6xdDg87NmWENG+mIKARLYrM1FQyyYC2bQoEFy5JFH6qwUOh25gJjkyQAtLDsuRC46hDDPwzp3Vr0DYciFjyBAUBBCmjZtml7g3EcsF0WCYsCa5H35ndgwC/NY2JuYi33w4MEydOjQn2f9MFgOi4/PAnwWLn68Az4nPycT/o6oKQS8McKGeAicP9YAgpbzDHiJfO+cU9aJOzAM+D7csAFuYxQcdthhuq5QGIQCCfPhTbAOCQHihboZXjz+9ttvqxfgwOu86KKLdH1gLAwZMkSGDRumXgszvVgjrA8+I58J44P1wVrhfY30xRRCQb7k527T/xMBlhmbcp9//vmycOFCtfqwtFEKDM1jAic/c2C5czFjtTulgXCIhRATFx/z3GfOnKneAElD3ock4dixY+XQQw9VC5HQD8IA4VHU08D6R0hQaUJoCoXCc/EAeM1YeD8+O58JpWAEC5VlnDcSsihwB9a4CwcRJuP7R2m7g/Ada4nzE5tvQrlj4bO2brrpJt17ghAhE18J9yHkCTlyHwdjQC6++GL/twtBybA+UBSsIzxRQpWsm6IbzPNc1gfrBg/YSF9slpEUeAs637M60Y3BW55YYljxCFuELkIfy49YMRYbXgKngLhur1699DEsQu7nZ+L3hHOAWD/uPglGRkDzGAKBeDAXLWEELlaej3LA+sP6JMeAcsGCw6vgwkYJIIBQAISUECiEnhA6hB2477///a/87W9/0/dgXDU5GCxALNFkgWA89dRTJSqpL5L3CNMxY8bo9873i8WNkgfOKeeXc0c4pmjIDmVPOIdqHyz/+fPn6/09evRQhRALHiNKAaODYY2EJR2sNbxR3pe1yTrjfQlV8RjnnLwFBgG/x31TpkxRL+KKK65Qr4FCB4wZPlMUsVlGGQExaWLsiQlD4FJjlXGBIqyx5qjQ4MLjfgQArjdKgIsM4cv0T8I/JPJ4rsONinZTO11ugHgzliVCncddfJnb5C54TSdI+B2UItYcVibvhQDCEyFMxXO5oF3NOeEZbiOQXNw5meAhRcmG4RzxXXPeELZ8z3znnBMOPDvOJeec9ePud4cLL3GwDggt4XEQDiKHgIXvDiqQuJ81hfKPfcxtEkUIinXIemF9kFPiffl8CH/2p2D98JndeeB3+Nyu6MFIX8xDCAm+ZpQB8X6sOYQ7G+/weXDNqXwibIDLzcU2a9YstfDxFC699FJ9DdeIhoXPxR4bXsCVB5d8jOWkk07SvMKegCJC8CMwbr31Vt0hiiQiYS+UUPfu3TXUlSz4LHxXfLYogGHgavip1MGKRyATtwdCepwDDsJHCN7dwbnCEOB1Ytc6yhSl4PJUsWuF+2655Rb/VsnErkEqbsgrUPrM+WAt47XiwUWRTPAQTCGEBAKbBC4HFx/hH2fhY9FR4veHP/xBLXTg4qW0EgvePQ+wwLhwKR/EcnOCHvedi5XEtYO4L8/lwiVU5SBMQRiL0JOD90MZYBViBWKtklhEEPXt21eVGaEnEtL8De5zhk3Uxl+7y4//6SWhqsgpBNYMZcH/93//p2sAzyE2oY5wcoUKsTiFgAJxggtlg+HBxkIoAhLH9KiwvlwI0P2PsUHpMj0GsRD+xFPhHBByoh+GdchroiQIR7GWUQ6sj9h1GwUsZGQEAi4/XgEXCK43sWLAfcfVd0Kd/138HouRHENxFxXCmwuPHADuPwcXJKEid5uDx2Ndewe3eQ3CFexZ/Mc//lG9CBQBwojHYwUPn8FVk6A0uCCMYHBCPrYKzEGojpzJ9ddfr02I9AYgxLHuXWIZgV4SvC5CnnAkBgBGA9Y7OSaMCXJCeKF4KLF5Ic4/B+uDMBHrgwMhiMfK2nGf28H6QAlgcNE7gadjpB+mEEIAQY1VTnzXlQ8CFw0XmCvxxHPgIDSDRRcbEioKj6EwENAcvBYXsLvNweO7gwueMlPCQAh8FEIsvA/eAZ8HAYXV6hKeRmJBSZBDIEzGeeLAIsdoIDHMz6yXkmA94CW65jYKCkj64nli5bvKMjwHF3IsCp4A64MDJcLajIX34HdZH87wwItFaRjphymEEECAUknChR17QbkEMZY54OITg42t/igJktEkpblgOUgS83ruNseurMc9hRAGn536daxMLv49iWMnCryV4qzpKEIIkN6Ev/zlL1qFRNUXIyhIHlNWSkXYrsAz4PmEduh+x8pnDXJQ0Ubsn1wABxVF8YCxgLHD+kC5oIAIV2XKOYoadtYSDAKUi40yUOK2eAQlQQiJ5zFzBi+iuHBRUPC5iBNTo37jjTfq//Q14M0Uhedy0Z955pma0E1mUpnQRqYIG8IvlI6OHj1aPT4UMgdhJB4rCsKYOVgcKBC6kllH5IIuvPBCtfId5BEwRBhjMmDAAA1dkiNwlj3WvssjsD44GGlBKLM4WB/kMuiBwAPh9Yz0wxRCgkGo4+Jj+eMBYN2hFHD3OWKTs4RruI11z8VbtEEsFhcicuAt7Gmii9/jgsdbQUnxObA2+Yx81lhhw3PwYuhQRRHgdfA3JItM8hCI0VP+Semnq+7iZwwMSkVjhTM5JG5zPyXOHFSsca7JEdCf8Pzzz6uXwYHCwKp/8803dXQFyWuXR0ApECrk3LMm3FolzIRnGnv+Efx4pqwPPiPrid+LzS8Y6YMphASDkEegcoFSuYNlRh6BGLAbMcDFQ6zYXfwMraOap7hSUYSh8x74mbg+BwKdURfuNgcXK69b1NNAGfA5UCJUXlGpQqIRJUS4yv0O/6MgEAQ8h/cgHJBMoqwQWCucs1jrGiHNeWAOFucIoYvlTvkohQMOPDsEP3kCqrCoBKM6jO+KLna8PxRA0QMlgUdBBQ3vy/NdLoD1gaDn3HP07t1bw02u8IF1SPgQI4bHWc97Eu40UhcrO00yxImpQsK642JCKRQXDnBguSEQsNIQFLsKQZFUpryVi9glsvcEvA/CRAgSwgoIgFSBSZqMXqDUMWq4PgSEMoZCcfA4z+P8o9RjlYdL8CbaQseDILxE5RzrCoMnE7CyUyPhYMkj2LHCEe5Fq3yKgsWIp0E4aXdCntfidXelYIqD90Dg8LuuwzlVQBhF1Ybh/BN+2VXSnnPDcxD6rJ1YsNpREokO1/D6vA8GTGzI00h/TCEkGaxBBDdKgf93Fw7hcRQBQt7FfEuC5/K6RUNGu4ML3oUqigqdZBNlhVBcyKgonBse5/wUXSvuvCUa9z4oJRSDER1MIRhpBY12rhLGMIxgSRuFQOychFlsZY2ReRBDRykYhhE8KakQmKVCIw2DvaiEYDYK444Z8bwn3bdGdIlyyMgwkk1KKAQsPqoW6OilKobOWFrtmdnPwW3G89Kck7BwQd4OT9rY/JVUB2VgCsEwEkNKKATa31EEL7zwgk55vOuuu3TDGGDzD6Z10oLPYC4SnYkgf8t3UrDjR/+WYRhG5pE0heDGIRASOu644+S+++7TyoV7771Xf2bkL5M4qYOnmiHRlK+5r+RXqqm5CsMwjEwkKQqBhqf//e9/8vrrr+sYZ6Y4MgeFcb6026MEaMyho5cSu9KWTcZF+apSrvzuyz4NIzAKCium8vKjEwIjnKdjVby/KV/De3mS6xlZObne/xH6O6NKaNLPLRRyBcxbYVAWc1SoYx4+fLgOxWJzeJpzElVLTbip5JATdd0VQ6njNuKHrunSdF2nNAX5qhCiVEbL30IloFMI/I15OTsKFUJeeisEenJoCA3FQE0SoY2uYEQDVULkCZjqyRgJPAPrdDQMw0gNEq4QsBgIC40bN07H82LhMXSLkBAt+rsb1WAYhmGEQ0JDRvQMMIiLiiEmMTIfh719OZjkacrAMAwjdUioQmAkL/0Dd999t04HZCzvsccea4lbwzCMFCRhISPCQ5SPjh07VjfkYJY+4aJkKgP6GKhsMtIbNptnB68gYWcyuuMTBeHR2P0LUh28+11t0FRW/v3vf+uWnkZqEbhCoMKARjO23qPzmLDQsGHDVBnsaopjGJDIZmPxoUOH+vcEB1sbPvbYY3LnnXcGOgESD+vhhx+W22+/PdB+DGa6P/jgg3Lbbbftck+FeLnpppu0aIDNfoKEMSYXXHCBfu4gody5YcOGuglN0LA5DRV17E+dLqAQWMc0inbq1Mm/t+yQU7z88st1x7azzjrLvzc9YB8SthylR6q4zasiAQohKLyTXbBhw4aCOXPmFJx99tkFd999d8HixYv9R5PPgAEDCk455RT/VrC89NJLKNaCH374wb8nGKZMmaKv63lc/j3BMG3aNH1dT0H69wRL06ZNC26++Wb/VnC0atWqYMSIEf6t4GjTpk3BNddc498KltGjRxd4BpF/Kz3Ytm2bro/x48f79wSDZzDq63oKwb8nfcjOztbP7hlT/j3RI9D4DX0GaFGsZLbewzrE8jIMwzBSn0AVAlvMzXr7bWnfrp3uv8qerMmE0BVhK7an5GA4Hm67p+l/PuiNoEfCU47+bxmGYYg20TrZwUGlJDCG391HrhT5ERUCyyHQbPbcs8/KF8uXy1Ged9CjZ08tMw0Dt5csJ2fDhg1a6krsnZg7n8F9DuLw9ESwgb2DHAex4ypVqkpV76hcpbL3GqUfcsdwPvImI0eODDSHQKz/8ccf1/HfQeYQSKCS8yA5m4iBgX//+9+la9eu2nMSJKNGjZIOHTpotVqQ4NW2bdtWjj/+eP+e4HjbM5IY1UL+I13gmrruuuvkzDPP1O87KMghXHPNNTq0kkR+KpFVK8s7akl+bp7KM70vK+vn645r5oYbbtBimQYNGqgRidLYtGmTypjGjRurLCFfSl4uLPkXJIEpBCztZ555Rq1yykxJILPVXiJh0RKm4j3ZQ+GTTz7RSg6UwfPPP6/hqlatWkmzZs30+ePHjy+xkqRypaoqGLNq1dCwF1ARRbu6m6dk5bKGEQ1+HrHhyxCu78ZNm0gTT1YU7MyV5Z5hS2UY43RookWWUZDC5OVLLrlE97VmbD8DOt977z0V/sxjQ8m1aNFClcM+++yjBievzZFoeRgEgSmEQYMGqTXIl0LjWaLhJM6bN08tL/ZOwH0bPHiw9js0bdpUTyJaOnbuCFVGr7zyin9r93BSe/ToIX/+85/1dbEKDMNIf4gUsAEXYW5K0Q888EA1IPESudYbNWr0Gwuf53br1k29dp7jYEIykYnvvvtOZRGz2lAoQNVax44d9fXZBz3VKbNCoPmMLwJXigF1ffr0SdieBfDFF1/ol86BhsZFQxPjpvEz7h0hG7cJfaxWLq1C4HV43SZNmugEVnopzjnnHLUOUm3zecMwdg1GpBPalFxjuJLnpN8C44/pyoSIGJ7ItR9rTEJJCgFvg9emVHfz5s0qE1E4vNfKlStVWeCJoBxQDHgeqUqFmwlOlwESLHPmzNEv5bDDDlN3KWgQ/ISFGJtNaIqwEF88XgAaHc3erl07/aI5mS7EU9RF21XIqDg4ibwPruKqVas0N+EUAa/P4jEMI7VBNhHnX7BggYaTv/7qK/nakyHIDvIjXbp0UYMPwxKDkjBPceHh2JARz3UgZzA+MUIxhhnYiWziZ3Kb5BlQEMgxCltQHrxPKhqVZfYQaLj517/+JX/961/lgAMOSEjDBl8ocX2aWYjZEdcjqYgSKA2l9RBKAi+BEBkb+BiGkdoggCn6oKkMWdK5Uye54MIL1aArTbNsSR7C7kAZYMTileA9oIhojiWikWp5hTIpBOJkeAeMtJ4wYcJvQjRBgHtHspq9lakAISSFdsalK22SNyiFgGbnZHJiGc2RqtreMDId4vlvvfWWvPjii3L++eerMUmRCV5AaWVVvAoBEYuXQq4BL2XKlCm6MyRyjTA0+YpUoUxlM4SLCKtQXhi0MiBEhMIhzIPwp8mNkBTxvniUQZBgcdDfwOb/WB0sFMJJhmEkHwQw1+jkyZNl1qxZWkLKuBPkFIUhYVRAxsJ7EWJGbpGzoOydiMq0adNk+vTp8uGHH/rPTD5lkqqEb4iR8UUHCckZYvaUcxEqQqMfffTR0qZNG838p0L5J7FAFCIewtSp02TRoo/1vjJG4AzDKANcf26/dqoQSeySW2SwZevWrZOe98OgxUu58MILNXyEt0FeFIMS4zrZlEmyYhmTRScpE6TGpZKIUrDRo0drg9NJJ52klT6pBm4g5a533Tlabv/HKI1TkjgyDCM54BkQWaDREEVAmPiiiy5SryBV+ohIPpNrfeihhzTsjEJ49tlnVUEkm7i+ITQZgpA/jBLMoKZlcjL5cuj4xfomHIOLh6uVyuTm7ZCFixbIDTeM0FBSlFrZDSOdYLLsq6++Kg09uXGS3wNQmsRxmPC5KI5hnxiqHwkhUQWVTOJSCFjBuGIoAzRd0XrdeCDhgtuEMiDhQ7KFKqJU0uwlgZu6ceMGTRhNnDhRy2MNwwgXJhUQXSB0y+j1evXraxl6mPmC0oBcQ4ZSqn/IIYfoCH0Opi4ki7gVAjW5KIOgundJIhP3o86X5o2jjjpKG0WCBE8jUd4GXsHatWt044/58+dLjnkJhhEKroqHikfmmRGx6N2nT+DXOoUzyKQgDGAHr4VSoGiG0lSqKgl5JSsXGXfIaKnn4tT2vpwg+g5IIuMu3X///dpr0K9fv4T0M9xzzz1yxx13+LcSA5VHE557Tv8OwzASD82jy5YtU2OMwhNq/AlnB+0ZUDxDxRLz0YKEknUMazbeIenN1AfehxB62JRKIaB9ccuYAbLUOwErVq7UmDnWfVkgbkYnIe3juHpBewZh8/4HH8ikSZN0XG4yTqphZApcX/QoPfnkkzrLjKkF6ThlFOhHoECnV69eWlSDbA2bUikEYnPEuGisQIhTFkrZFGVe8YBbRO7gjTfe0H0KyBm4OuF0BsX58eLFGjriOzMMIzEgNwhfU+TSs2dPFaqEdtIRGlzpU2Bi6tzsbM3TEj0Jk1KHjIjT0WVHjS9NYzNmzIi7qsbNKHr00Uf1j4/dpyDdYaAV34+bq24YRvBQwIEljSHJXCKGUaYzTEBgD+t3PflKLoGxF2FSKoVAXK7oiAYSN/EmltHu7FtAnfApp5ySkLxBLFdccYVce+21/q3EQk0xfxu9Cem0ubphpANEF7Cen3vuOc0fnH322QmvJiIiQm8D75co8G54j+HDh2uRDWM3wqRUCoHpfSgFBwkcBtrFUxaKd0CMnXkevAbTBhNdXkpoK97wVmlx4TB2y0IpGIYRHBS2UGJKmIUwEZZ1ouE98fwT3XyKUqB/AqMSL4H3DKvqqFQSmJpeSrpc0pcBTwjyeEAw4+pRZsWGNoyMjSLZ2XNlyZJPtCzOMIxgwNjC0GIUBDIIqzoqYBjTm4BioNiGJt2UVAiAV+D2s6UqiLnf8UDNLZqPTXUIOcV6HlFi3rvz5ZMln1r3smEECOEiBsNhTCKTogShLwprevfurfOX6L4Oa85RqRUCXcS4aYC3EO/uaAytozqAPzpdy8T2hJ25Ozzlt1yy57zt32MYRlnAuCLZyrgHjMlUnHMWBITSkbWM7E9ZhYACqF+/vv5MRj/eOUbUDtPTwB8d5b0ECgryNTRGw5phGGWHRjQKNZBDyKN0L1MvCeQrfx8KkI19wuhpKrVCIH/gNnRgo5p4YnfE0ykXQyHwWmEpBMJSyQhNrV23XhYuSu7QKsOICoSa6fXp2KGDZPnRijBgzAQCOqzZauRska+MtqB8PYyehFL/ZQhvF+KJVyFQHUBHITugUbYa1vAptvpkLG7YrF27ThYsMA/BMIKAvVIwKDt26iQ1Q9zfgH0MqPwhqhEWJM0Jq1NtFEZPU6kVAlqLRDLzPNCW8XQFklDGUnehp6izZctPsnr1Kv+WYRhlgfAJwpHKRHKaUYa/j9ARJfr83Ymm1AoB7wCthUIg4RGP+0QMEIWQ7l2FewqxP/5mXF2bbWQYZYMx+RSloBCinH8E8iPIW3ImYfRQxaUQ6Chu3769egvxwu/iYWQK1BHj5pZ1EKBhZDqET7KzsyMx92x3IG8praWqKiUVAiEiRrQylS9egf7+++9rYjneHoZ4ueqqq+T666/3b4ULCsE8BMNIXxhdQd40kaMrkk3p4z0exLWYTBqvh0BNLYol7PgfMbgw4nAlgVIIq+PQMIxgQW4Rukn06IpYqGxCzhIiC2PP5XKegCq1hOJXaB0nfudyCIyg2FOo9mHLOHZGCzOxfPHFF+tsoZKgYop4nYPwDlNYg4CcCVNiGfdBGVm84CLHVjngae1uH1ba4GOb/1auXBnK4ioNfO+xww3xpmhcLAkMCtZPLIwySDWFS64tttSZMc3kk0qCtRF7TTC6gCKMVAJDjg5aB9/57uZ1FV2DnFvOcTywOT37jUydOtW/Jxh2twbZ7/2ss86Sl19+WcdlhLEGiSgwQp9hd+y97KZElIaia3CXeB8+EDxNxreQ1seQIUMKPvvss5+PBx54oNjnJfNo06aN/40X4i2WYp8Xe2RnZ/vPLmTw4MHFPi+Zx4033uh/ukLGjBlT7PPc0bBhQ/+Zv+AJqmKfm8xj4cKF/qcrZODAgcU+zx2XX365/8xCPMFX7POSeXjKwP90hezYsaPY58Ues2bN8p9diCdYi31eMo8RI0b4n66Qp556qtjnuaNevXr+M3+hWrVqxT43mccHH3zgf7rdE5eHUBzkBfb0pdjiDis1GXsFsFfzqFGj/Fu/hvhgbF4jKOuMzffZR2LAgAFqhZRlr1d+t23btv6tQg/BO+H+reLBinHjRgD3M9VGcpMgjB2jzufjc5YEVurBBx/s3yqE7yHVhghyrmLPN/HnXVnGWKjMCHPw3FSLWWNtEjJ2cN1z/e+KINcgW2VOnjxZLfUgwTOLnZpKIpcEtoPNwc477zwda0+ilwgJkY5Ygl6DJJKpqmJ8xZFHHvmb99sTSrOLXGAKoTR4VpK6XyiFsGHfhQkTJvi3woEwFYv3ggsuUKEXe2EYhlE6brnlFnniiSd0v4AwmTt3rnTr1k13iST0GwYubM0Woccdd5wqhUQSV1K5rKCFy1Kymm6QbyFuHFbLu2FEGSYbkGxNgi0bOvyNHGFNc0iKhGIeUtgVRsmEmU1sp+ma+QzDiB8S2mxEzz4BUR8rT0KZQgRmNlUJQWYmRSG0aN5UatUKbwZJMqGaByXAPqmGYZQd+qDI9xFbj3pfD38feaR69etLjRCMyeQohBbNpVaIQ6mSCYkpkk9Fy9MMw4gPGmIZW8F8n6h7CEw4JYdAsUsYYfakKIQD27STvWtnxhwjxvRKQYG0atnSv8cwjLKAd0CVD1OTwxgJnUyodKS3gbxrGKN+kqIQKO9q2rSZ90cW7qsQZdgICCumaImkYRjxgfwgH0f1XrzNbekAFUbkH8eNG6f7xsS7GVlpSIpCoNqGemu30U4UoTKA+B+LdsXKldLEs2gMwyg71NRjLa9bt057mUi8RhH+PmqLevfqpUU4YVQaJUUhQOPGjaR16/A2mggb5p3g7tHYwvyk2KYrwzDiB+FIoQb/oxCi6iXQp7UzN1f69+8f174z8ZA0hdCjRw854YQT/FvRgw5DujdPHDhQ+vbtG0r8zzAyBRKsgwcP1tLT3c3ySleILtAE19PzEOi7CIOkKQQGyZEYoq06ij0JlJtqi3uzZtKieXP/XsMwgoDxGd27d5fXX39dpwDgjUcFoguff/655hAosaXvIqym1qQpBFwgqgX69Omzx3M20gVcWErF6E4mVLRPzARVwzDKDhazy0PyM8nXqEDu8a233tIkMslz5GOkO5UdjPo9+eSTNZwS1h8cBigDSuLoyKYigv8NwwgO5AVhI8KxCM133nkn5QYbxgPFKJTSTpkyRUtN4xlmVxaSqhDQgEwfPfqoftKq5S/z1dMZTuarr74qL7zwglxxxRW/mq9uGEawEGFggvBTTz2l+YRkboAVBIypcHu20Mwa1hA9R1IVguOUUwbJoYceKpUqpv/+qNOmTpVcz+VDs+MdhFUdYBiZCLkENow68cQT1QjDM0/XcRaUzy5cuFANyjPOOONXo7jDIiUUQpeunfWI3YUp3WCiKXXD899/X+ffd+7cWRNCYVUHGEYmwlgYBGfv3r212oi9I3Q6QBpBmMglkvEQiDIwZrtOnfCnOaSEQsDl69Gjuww+44/+PekHiWQ2x6AzuVHjxhoKMwwj8TDXyO0TwFa+8+bN05/TBRQCBuXEiRN19hl9Byi5Pd72MkBSQiEAox3OPfdcGTRoUNrF3ZcuXapuHjuxXX311WqtZNJ4b8NIBW677TZNLL/00kvy5ptvai9QOoASePrpp7VUnSgJ4a9kkTIKAdcPFwmlcMQRRyQlflZaWHxUFLH4cFVRBPRWECqKUtWUYaQDyA88hfbt2+uWkxhqqd7FzFai7733nk40IExE7jEZnoEjZRQC8EXQvUy4BY8hlTeTyc3N1cYR3FO2AyXux57JLErzDgwjfCjgoDgFg5LkMtclApd+oFSDMBGeAXkPEskYkCiEZOdRU0ohONh7+KqrrlLFkKrbTq5Zs0b3WKWPguaYoUOH6iY4lkQ2jORBKXvXrl3l/vvv173TH3/8cZk2bZr/aGpAAhkD8j/eZ5vxxhuaPxgxYoRGRZJdlZiUTfZ3Bx+JVnQ2wLjyyitVg37zzTf+o2WjLJvsu+QPXsG7774rH374ocb7UAScTKqLDMNILoRy8eDnz58vixYtUm+hSZMmukk9/8crdIPYZJ88AV3Vb3iKgJ4JPBrCRISaU8H4TUnzG/cJTc+Xfuqpp0q/fv30S6tQvqKU04Gw4UOCinzB9OnTtZIBLd+uXTvd27Vx48amDAwjRUCwErbl+kRuEIbBuJw5c6bMnj1bfw4TFBSGJOGrSZMmyYwZM1R+YEgyyw35kSqRkNSMx8RAkvnss8+W/v2PkxrVs6RCxQqhJmzxCrA2GLOLZfDEE09osop2+WHDhmlFVJUq6d9QZxhRg5E4Xbp0US+eTeoZgkd0gHp/BDRCOdEBEpQBjXJEPJh+/OCDD8rUqVM1R3rSSSepskql5tWUDBkVBzE3WtPvuOMOmTNnTtwjb0sTMiJpjFcwZswYfT8W0MUXX6xJKyqJDMNIHwgdITuo9wciD0xMpSppTyhNyAhFwE6JKAHekzBzy5YtZeDAgdKmTRud45aKpI1CQBgTtkEwcxAb/N/0GfLlV8tl8+Y9H327K4WA0nFKYMGCBdo1uHbtWj2BjOtmOmvbtm31ZFImaxhG+sC1zfVMPhIvgcIQZArhaSx2ikN2NYxyTxTCihUrNCTF/ygD5AYH1YcoBHKNeC6pGlVIG4UQC184dbtTJr8mHy9Z5Anwb2UjI6dXrfa08nYN8ZQEGvrJJ59Ul5E/HUXDQsGlozyNRA+/j9Jh8fA4lUScTBaLKQLDSH+4vkk60z+EIdiiRQs1+BDeTFElAkBekFJ4KgeJ8SPg6SLG4kcegDNUkR/IC7wCeh9QNkwtwPsgT8CB/Eh10lIhxLJq1Sr5zNPY2dnZ8tTT41U57KoZheYxOho5YfzpKAC8DZpD+BnNffrpp+sJbN68uR6GYUQThDlbVZJsXrx4sXoOzEIiGd2sWTNN+NIPhVxAeQwfPlxLWtnnxMmPr776SpXL5MmTZciQIeo9cJC/IMeYTkZk2isENDQWPYmbrVu3edb+Zm34IPGLht60caNs9U666xugSKlD586yd80s9QjQ6lgLzmMgYY1lQKIHyyCVEj6GYQQL1zwyhOsfOcLBbYT4XnsV7mfCNNVtO7bJ954MeTd7rtx0003qUaAo+H2eQ9gJuUFoCJnBwWukW19S2iuEoqAY0Prr169XYY87yH2EhfAMEPiXXHapVKtaTXI89w4Nz5RSwzCMWPAKatSoKXXr1tHN7skdjLz1Vt0aFyXh8gAoA8JMzpBMZyKnEHYFYzGICcbbmGYYRuYSRGNaqpPyfQiGYRhGOGSUh0DLONUCUdXuhmEkDnKOjNGhwziqkwkySiEYhmEYJWMhI8MwDEMxhWAYhmEophAMwzAMxRSCYRiGoZhCMAzDMBRTCIZhGIaHyP8DbsSCJbTPgwQAAAAASUVORK5CYII=
2、 以电动滚筒为动力的滚筒输送线在计算电动滚筒功率时,我用这个公式不知是否合适:P=/367,其中L是电动滚筒与改向滚筒中心距的水平投影,H是提升高度。不知只有水平传送的滚筒线哪里有改向滚筒和高度上的提升?
请高手赐教,感谢!!
有没有图片,这样看不出是什么问题咯
页:
[1]