牛顿粘性定律的表达式是? A: τ=μ(ux/y) B: τ=μ(dux/dy) C: τ=μ(Δux/Δy) D: τ=μ(Fx/A)
牛顿粘性定律的表达式是? A: τ=μ(ux/y) B: τ=μ(dux/dy) C: τ=μ(Δux/Δy) D: τ=μ(Fx/A)
牛顿黏性定律的表达式是: A: τ=μ(Δux/Δy) B: τ=μ(Fx/A) C: τ=μ(dux/dy) D: τ=μ(ux/y)
牛顿黏性定律的表达式是: A: τ=μ(Δux/Δy) B: τ=μ(Fx/A) C: τ=μ(dux/dy) D: τ=μ(ux/y)
如图所示,电阻R=650Ω,电感L=1.9H,P=40W,接在220V、50Hz的 交流电源上,要把电路功率因数从0.74提高到0.85,在日光灯两端应并的 电容为( )。data:image/png;base64,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
如图所示,电阻R=650Ω,电感L=1.9H,P=40W,接在220V、50Hz的 交流电源上,要把电路功率因数从0.74提高到0.85,在日光灯两端应并的 电容为( )。data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAIcAAAC2CAIAAAB8owlVAAAUFUlEQVR4Ae2dd6xVxRPHadafDRVFxYIFe0VFgqCo8ANsWLEkKmqMvSCiUWPBGDEmohCIDUQUrKBBY0UjivxUsIAFRewNUVTs3d/nMWTZu6fee3ffPe/duX/c7Nkyu2e+Z2d3Z2dnW/77778t9FcwDrQqWHu0OQ0cUFSK+B0oKi2Q4d9///1vv/1WHHwUlRZ///333XffPX369MWLFxcEmJY62tNLunfv/tVXX6233nodO3Y85JBD9txzzw022KCGCCkqDczfaKONPv30UwIrrbTSTjvtBDbrrrvuZptt1rVr12222WbFFVckic+3ZcuWDbnD/9qEr6LCGv7444/Zs2fPmzevdevWFZLIUWy55Zb75ZdfyLj88su3atXq119//d+SHzF0l/3222+77bbbeeed+QenHPT8ZCluX2EEvvTSS0eNGiWfqp/XjaNCD6CLrLnmmnwHCxYs4N/J1a9fv3POOad3795OfLjH4qKCxOAr/v3338O9PJRXWGEFBvkePXogweguP/30E5Ft2rT566+/+Bo6d+7ct2/fPn36IMdALmhLbOKuBItKz2iMXT5cmE/4P0t+4aoQylTCNIwuIr2EMYbBv0uXLp06dVpnnXXat2+/1lprAVjoZtj0XVTgxZQpU5gmitwYNGjQGmusQYFaYWO3NVCYOdjqq69Ob9h+++2BhEGeAAPJaqutFqjGTLIuKu+9997EiROfeuqplVdeGSS22mqrHXfcEYRoayatJpqB2QQyqkOHDvxvvvnmhXgLWG9+SFW+mttuu83E0JFpZc+ePU2MBhqBAw2i6Z9//uF/zpw5yNDHHnsM8WoqXrRoEZBsueWWEiM5TaoGAnFg6Rzs4YcffuihhxCm5557LkMLlfEvfRm07r//frrR8OHDC9G7i9QIm1Ee27V0XGGEnzp16pgxYyBt10R4hx12YOmw1157bbrppiysCqXF88iI/KTgCUMRE7O9996bRWj+gvlzLkVllVVWYYIoxUwv4VHCf/75J+HBgwcHXWbnb3Rtc8ITFlJt27ZlZgQ2IRrjzsFi62Apx8IK/QcKItFPxGark0jwGDdu3GmnnUanCfTKS1Fh2Pj555+lDkeC8WmwrGWt265dO1bC/AI1pQmRRT0TDhL4sHR/5YgjjkC1cNVVVwkkpkogmTVr1hNPPHHxxRc38vq2yCCJFiBcCxv6ChigemMZBTAsa1lMycKepC+++IJZ2ddff/3uu+9KThlpwjVIKcOBhr4ijEblgNr8hBNOGD9+vGFN//79X3jhBfQQEqOQGM4EDZTsEDNmvPnmm8888wzzMRRzDCRDhgz54IMPxo4dG7QRStzhgDsHQ44NHDhw6623RoiJZKuhks5pa55HGRdNTufRxBc84KLCa/x3yc+0u2m9GDL25ZdfZhLPNOmggw4KtMozzAkUcFGJjhzRmEBN8UV2woQJI0aM2GSTTZjCNFFUSsYVX3ypLZ1hw4Z9++23dBcUFrVtScW1u32lYkIFKYi8Zc3LryDtqawZza2vNDl5Gwtbc+srCC602mjt0ESwAmui6tRmhQqbckcfffTcuXP5AFlszZ8/P9y0PminzCXBENaxHa1okZjZPfvss4cddhgN++6778I1G2O+tddem+oCcSCDLnZyDz74YNDvwteLCQaoJFZddVVMQTDo5t8XcZsO6nM2nCAeji0ZqNx8883Tpk2z21TYMDwCGPoKI8oVV1xx+OGHs1gJ0V1k0OI/EOpwOGNcwRgsXN3eAQaDAw88EEjOP/98wuDEr5paIIJlJdMHRiwhhdRiDxADfiLREGJ8bFt3kp8MKKswFaqm6gxUqnmlmpRFrwoHqboappiWM36ceOKJqGvBhs4hZGE9QowwFg3UwqPJTzx47LPPPnfddVc1X7OLCnXY7yPIm1oJOBnspBqGpVW0lk1Vj3vYcPn5558HGFRqUDYvyIQbkMREy0QSQJuAXcqdd94psNlJZYVdVIDk3nvvffHFF/noCLPfxUYkb8ur0gjUydtuu21ZFTROZmkqOw4nnXSSR+N5wP7xxx85ZIQ5S84XQdkzevRoCubMH5vNRYVMnN8AbTEv5gN5++23Fy5ciH00wPTq1auYqNDs999//6KLLvrwww/RS/rq0IBNtyir85GZIhSMZXfOyBhUbljyk/JbbLHFkUceefXVV+ckV8NsIvf5tGlDlUyp4VtI1Rkz45q3L08DRFyIPRt9Ok+RgueJ6St2i7GaNBZJdnxxwiKsONpxxx13TJo0iVONtM2XBKvVa2b0laOOOmr33XevVePy1IuwmjlzJiMKRwmwO8AU5J133mnqEiyjr4wcObL4nx7bXDNmzGBBN2DAAHr2rbfeyrGbPIgWNk8GKtLugn96sj6QRiK7mvqWFzzPhUphvylpWHQV3czHlYLjkdS8gnfupGab+IzR3uTTQGNyoDlIsMbkV5V1IVqjKjJ0Aei0bMqKis2N4GGs6ffYYw+wEdUikvaHH37g+CO6O3ssVFSCI2FXgEXn9ddfjxKLI6iXX345+iE6yuTJkz/55JOTTz7Z5FRUDCsaI0AXYV11/PHHszVw6KGHSpX48OEgiqLSGADE1vH5559z7hf9ULdu3SSDbAhhbmDnLxlk7AQNh+AAfYWxRHZLoc9YgusPtk4c41uVYCGYH0NTBnM5UImlBzoh1Nts/nPqEZnmuO5TVGI4GCKKLsL+Ifu8nDBlcszGPvOxK6+88phjjpHqdA4Wgu3ZNLHKGDp0KNwnK96KmBBz3hFpJosVWx+hfSWbm75yiEUSdjPoT0855RT8K2288caype1UoaO9w5Agj9I/sBrEgknCVCMeP2ScN5FSvaISBAaHKNKJrdJXXnnl6aefNm4kcDJ60003YVDICWEylADDg/6SOMCnzTYB+zdJGaLxZKaI9AlJZa716KOPsiLBXzIrFR6JZziRVPDjHOrrr79uk9K+4nzW/h+BgQ1sNklZMLKAF78WMrYzM2YDHos7Oo1dsY72NjeChBlOWCfSFaAOGMbvB4+EMVcHNudUraISBAmHaHS31GSI3c9WCWb4U6CAolIgMExTFBXDigIFFJUCgWGaoqgYVhQooKgUCAzTFEXFsKJAAUWlQGCYpigqhhUFCigqBQLDNEVRMayICYjySs72xSTHRUlmKRiXnitO9WBpbEKZyI/dQzLZ3g6SyrB3QmYplZQnT3zpZkueEvWUB3NTzut+8803eGE3nz8BnJKgcCSVbRIwMCwhjFcfHO/gQr8ad0vaVwxLYwIodG+55RaMUVC2G+5zLBb1O3uL11xzDbcX2H7AAQwL1fXXXz9WExxTQUKU9pUExqQeeX388ce5gpVdLDBIKg9CBsikPEnxOtoncSbt0D54wHSEVWLh6s78KyopjK1ZkqJSM9anVJwLFXqrTcJ5tJM07IUDueZgjFqYxuIIiVMw3O7FlXhe6lYiSRzI1VcojCsfTihxT/KNN96YREvjfXEgV1+hMgwvMZ9hfYutv6+6lU4SB/Kigt04pspCpZqZeFI7NN7mQF4JZpepeHFkE9FwCgcqQSWFnCZ54YCi4oWNnonEoHLBBRegX+MyvO7du3OWkiN7OCk11d5zzz04diSJYQYNnYnXgEcOxIz2uOllkwBbf87ucSYc96T2AoUTShy84CrpAw44wI732CYl1XC42P6ZcxV4gIU7r732mqRKvJy9+PLLL0ni4D5JJr9NpNmHucScDS7cCgd6U1eCmfnVZ599xiaBcRor8XKuUpLQm4KNya8fuEcOxEgwqDNgXHfddW+88UbHjh2dytgFGjVqFIeUzdWeTgZ9rJ4D8aiwJ8rZVk4fUwGd1O4QdFtcwTDgR5Oqb41SEA64EgwMSEB2MWDIIVcDiSRxPInRhVSymSTlpl8OuKjAaDaiGTO4FMthOo/owZiecfOq30YoNYcDMRKMG5g4pscxZCcrj9xugv3ASy+9FE3SGI8ccPsKpDntGvXCJ1XShxBfHqtvcqREjHNJFZJDLngI8QoxqNBRZAZs6pOmyGPBHbSbNgcKAAaeDK699loOZV944YVcMy82fH6ri5FgjCtYodnVyACD4EL7gg7GTqrDMAsG5qg9evTgQrePPvqIuxBxY0Dv8ckK+oHzY/DA2IlIlpDyY8a1YMECrNNwpORkrttHJDlX0aFz4jNlDSdaD1/ccDUu0GVCPHz4cIQYV1TJj9kw+kpuKPdVa/OggzDn2rVBgwZhyzB16lREma/3ciUYdLEqp6/wb/zAMPhjVrvbbrvRSckgAs1nh22atOAJP9Tn3P3Fd9ypU6cNN9zQz6tE4U1ROKYkRenUSQyaDnzg8gXjusjXK8fMwVK6QkqSn2+kCVKhf+y6666sr0Xf4eUNYlDxQrd+iHBeAqN9lhMeP1lFpdrvhxtWGVeYGZd1JCy9VkUlnT/ZqSwqWckNHjzY8RSdXTI5h55fSeZNXArjuUgq5sT85syZw53mrCXuu+8+2/FXXNEy4rSvlMEssgok8+fPv/3227nHFY/3gME2oEdIGhrkazJXP3Quu+wyhhAse7lm9oEHHmDx6H3BoH2lvL5CbvZhMctCVcgViPQSzkh6nH1Ja1pzG3zZ7arvAuwwse+HBgyjBgx9kGao9Dlq7JErOtpXxUyOrXL9ADfQ4m2dSwiqomUVVglmMaP8YJ8+fc4880w0uccddxyql/IJxJdQVOL5kj+Wm49RUM6aNYtdj/RSXFeAeoZ7vTp06DBixIiUzIpKCnNyJTGi9OzZk1PeYhKUUgYDFS6OYsnJ5Su77LJLSk5Xk5+SVZNiOYAjBMdHdGw2Itmjwm77rbfeYpeMLRmzII3mV1SiPCkvhg1j3ODjuyUTGyxSzzvvPPbKxCwiZT6tEqw8DKK5QQVH9wz77NtGU+0Y6VWZgo4i2ldsvmWHbbHDngqfPz/G8CFDhrRr1y6pvJRiZ4yj8XlMtxSVJE7GxyN20Eiy7YiW5eOPP2ZaRRdBIcatnBSwMbPLUwpvBSw5kWC5FP4Q0l9ZHOC6NMNxLn/EjiJP8X333ZepmuTM1JvpuGI4nDdgDEtx5da/f/+cBnI4LDDTgZRxXhqhqOQFw+RjMT9z5kyUkpxBHDly5Kmnnjpt2jSTmhRgkGcv2aRiEzNgwADz6AR0XHEYkvGICGJs50c+9lRYDwIPC3WOi3JBVNQSWLoFN0JzmJR5mqHOmIQ1rHl0AoqKw5CMR1v4dFnywySMD3/ixIncDoVMs8uTGTUMAw9Xqp1++umollnZEIlLSnYB0oxg84xUmieFA6+++io7kqwi586dG82GwSk40auYFrNeMT8ie/XqFc0vMdpX7I+7kjA7kn379uUUvJkF2FSYC6BLRrIJu+2kFI+hiorNqErCbErCX7H+dsqDBKkyCDlJ6Y86B0vnT3YqV9Zz2yMyyhnqKWkPQtmErByKisWMioKMHE8++SS7Js4d9RURW1pIJVg13GuBmw42ifmfNGkSivqqaFmFFRWLGTmCDBUil1AVjxs3Dj0YJpOXXHIJY75Zuucgk5FFUclgkJMMJI888gjOhfBzg7YRYxeOXHM6ziMkDTXKjE3/83PgjDPOgG8sCbGgiF2j5CeVlFP7itMZsh8xA+NYF6p73KZhbYQCODr7yqaSmkPnYKnsiUtkrsWPuzzQTnbr1o2TxHG5qopTK72y2YdikR/n31mpsBGJpuvYY48966yzIIREqniNYrdDUbG5kR12+M6OPfpg4OGCek7zmvO92YRSc6gES2VPJNHpCvg/QBkMVEOHDuU4SyR7hRGKSoWMM8WwnWRyPGPGDHEuaOKrCSgq1XCvoSy+anv37o2VVx7jlZyVKSo5GZWYjZnxwoULE5MrSlBUKmKbVQgrpClTpuB3yHFJZGUpO6iolM0yp8D06dPZut9///0zbSedgimPOjNOYU5MkjMz5nLCsWPH4q4WzVjaPnwMpbQo1bikcSeaxswYz9vMuHDqPHv2bPRg+EbH7ZFHSKhUUYlyPiMGSDADAx6OEbNjjykFh1czypSZrKiUybAWLTAawoUeqklMjeRwkCPWyqYYKaCoRFiSFYFdPSvH0aNHm4zOgt/EVxzQOVjZrKNneFfdO41QVByGZD/SMwAmO18VOSpBJXSbqnidZlK0ZFyB3QhNVAhJL0cGDJ9SjP6SCmp8WRwoQYUjZWwSzJs3D4vmWCrs8Jx99tl6kWcsczxGlqCCocawYcM4ZpF0SgzY5KiZxxYoqSgHlqGCdMJiHJ+50UxODDm9zwWdKur8cdlon5/R+XPWOXMrfv1lqFRMQgt654Ci4p2lHggqKh6Y6J2EouKdpR4IKioemOidhKLinaUeCCoqHpjonUQ8KqwTvdekBPNzYNna3i7DOhEdJdfaYnlGgMP9cpmqnUfD4TgQjwr1sQnK9qe4GMNfDw4WwjVCKTsccCWYyK7Jkyf369cPpzE4XsBPIte84aSEa4nx2uuU18cQHHD7CrJrzJgx9Aw09l27dpUq27dvDzZ4K1m0aBExda6d5PVTtqC8gFSCCpXh15VzscguDgBIBTQCExs5pcEBJyRbnY8xbD6F3vcrQYX7QrmcEr+uAwcONB3CaIi5LBJ3ys899xyOe/BB7uWjaHJE+EDZfHJ8G3l/ixJUAEBcklCNAcOuEoeXXALDqUAws+PrISyfKT4ocNnWuXPnoK9cggo1pdvUcHAG4cY1FHV7GzEXSiBR8DvVeKjwOZjtYSPB7OqxteBcM4f+7cj6DMfyxxcrSmbGdBTmXZyRYdiISjD8XDEZY37sq+4mTSfKH5+vA+bOj/NkBx98sBO5ePFihpPx48c78foYggMlfUXQ5lg/tx9wX6gBH08ynP5jUPF4nMkQ10CUA/8HHcJQZQRMRw0AAAAASUVORK5CYII=