![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAA0AAAAPCAYAAAA/I0V3AAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAC9SURBVDjLY2hsbGQgFTNQVdMqBgYmBgYGZgT+z4hXU1paKJ+HLONuoOI/IMwI1CHrllOCU1N9faykMQPDXVmPvCIY34iB4RaDcdR8nJoaij0MZBmMT4bm5clAnLWKiaCfQH6pjzT2hTkN2QasmjrK03jdZRj3YFOIU1OOm2wJg4zHnrSODh4Q/z8DAyM09BhxaooyZpjPKOO+JzQtjR+kOAtkCIPsK4/iBgOcmuAhBfMPg9xLdA3UTxGDQxMA8UsM5jTv4/8AAAAASUVORK5CYII=)
- коэффициент влияния абсолютных размеров поперечного сечения (
![](data:image/png;base64,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)
);
![](data:image/png;base64,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)
.
![](data:image/png;base64,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)
где
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABAAAAAPCAYAAADtc08vAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAADgSURBVDjLY2hsbGSgBDPQxAAgYARiZjyYEacB/4GS1VkuxrIMDK+ACv9A8V8EW+6lR3GDAVYDQCZnucmWMDAY346tr5cEiXV0pPG4GbvVppV38BL0Qn2ksS9Q8x2YZhjOcZMtlnXLKcFrAMgmDxmGPbIeeUXoinJArjKOXoDXgPo8D0NZBtmbHnn1hsgKysvTeN1kGPZiMxiLAQyvjSPrfZHDpDbS0I+BQfYVcsDh9IKnLMMuRhn3PaFpafyg6IJoZvhjHNvgTVQ6qK+PlTRiYLiFiDKjW+gBSp+UOLQMAABm00nzj/pN7gAAAABJRU5ErkJggg==)
- номинальное напряжение изгиба, МПа
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAWAAAAAzCAYAAACpDNKhAAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAA1ySURBVHja7V29bxzHFd9jWstpUviDy86pw5tj6bgxjkvLccfYx8M1kXEFQWwAS8AFUJSjOsGQ+0guLKmRLKQOYFEuA5hKnzgh+Q+I+hNCMjuf+3Zudndmd29v9+4VDxL343beezO/efPmvTfe3bt3PSQkJCSk+gmFgISEhIQAvMRC9ry1VSXUPxISAvCiAfgqootVJJzwkHAyRgBeOACjHHDCQ/I62D8RgBdhjV2gLHDCQ0JCAG45GIAlXaOsiaa0q+kTXlP1hzwiACMA59B0OnqXeN4JBRi/f3CrKTw2qV1Ntn6bqr958oggjAC8NAAcBsHuaDp9l3byrtc9ov9vAo+wXcQjLxbZriYD8IycJpP3lq2/rwKPCMAtBmBqEeTtCsNn0iyIPeJ/E4TTzQrb2ch2VQXARSwxbRe/YysPm28NiX+/ajkVtTaz+Ey7tygeEYDnM2gqGfxtAOAh8R5F1y49j5ylWYrTAfmd3Mn3g/ArkyyGQXBjfO/eW1W1s6ntqmLCm0xG77la5vwdvpSmctkc3PlMB6CDvn9L7vCTwZTKpiMtv93J5P2svlylnACPP7iuPqZhsOl73huh1yuP7D3Ok4Hg8QcLHv+wyL6AAFzj4G8o+Bo3hDgv/huTdXB7/+MuHxDk1CQLNgCi98no8HrVVlGd7aoLgDlP5MQFmO7dG78VbPQeyHfCwP8qmv0vKchqv3saL7e9E3mfgtqGt/Hvj/dvkzr0V4RHSdEkchOGipHh4ac2Mji8Gfwmi8fDIfl00X0BAdhlJi4x+Nti/cbLdO+xidfJZHxtm2w8pLz6/YObaYPX6+49sVkJ0EG0vUEe2sqsrnbVNeEVsXwZuIyCD6EMGBj53pG0Dtnf695LCVbsnQhwvPXg5XgyuRZbluQY+kBjOX1Rmf6K8sjaSPcSunuHprbkyUCCMOURWsKKRzKI+pL3C9yEawkAFx38bQNg2un7/f4fI4vpDA5gZmX0yZf9PrlD39PvSSskYa3kWBguAFxpuwzPLELetE9V1WdY/yTDRzG4+v+BfVVeiyzCbkIuEWBJEHKVk43+yvAIVpVX3L1w1bGVQRqP+w3pCwjAjjNx0cHfNgCmltLWaHRD55Va+VtBeIP7Faux9F0AuM521SFvHiniv6piE0i3eJm1q7nLhBsiITsOyt1XRSMB8vRXhkf22773AoDlpbDMO6kyiCxgfQyW5REBuAGN4P6i0Zc5g/+sTe6HNAAeEjIdTMMP6ICWlgu18gMS/Dk8DN+h13Urw/GbarNyPN59OxrA39IlYt4G5rzbVbe8TSCpyyeFOkYXmL/zTG4oWQOwvAZ8x1XqryoeJRjrfu4sGWg8nrrwiNQwAF6GwW8DwKyzkuE0Xs5xfxq18qkVI33dZSx9saF5kbBs4N8GOdbRrrrlzTeXZsFpMCufJJHBIx3M9HAqBXzA6hPRBOcmAHZxEUTy/y5bf3H70ng0/EYmj4m+A3y8WTLQAbht7kEE4CUa/KYQOlMEBLP0BR+SV2nlgwGVusw3WDadKlwQZdoF21LXBpyNvNPAyXU1QX9H97WLKIefob9XXkv4hQsAsIv+uE+5upUhm1i0CVrJIGX8IQC3HIAtB/+ZDShpf3dqEaAY+Ib4U6P7QfLB+PK7r3q94Gu5rNvrek9MFkiKdXuZF45nC8BF2xWnnfrnQTj8hC1F5zxR2sr7cESulwEnuZsv0mlZ/6L9MhhMf6v8oWDZzdxkfnAEl+hqeV5QJnn6EzyeVuV/ZeFxoK1ZMqiKRwTgBrgfyoCS2Fm+lBaaAKkrEBI111qk0uoSoLBmAgQeKL/7PtnY/nZ3PH47XsZS4Jpu0vtRxyYi0sOYP087ehCEu1n+ONcBXEm76NKb7H1DXUajUfhhDRNerrxjYPCPoZXqCr4qOUFRDOgM/CLApXJjMqRxwMYNKnJcdBKw2YQryqO2elkTfeqp7FNABpdpMqiCRwTgxS3bSw9+2UkD3/8+8c6v/H+KjiP8Z/7rOlIiNdC90iYJYbnygHnacaWVP+O3zfB3u8R96sH0KZOXQ7tmfYcSJIbD/ud1p52myRuuGIoUhNHDxdL4h8+ZLEBmUJTYu8jTXxkeeQyv91rx5m8nrPd9SxmU5bEMfmTxnHbfNqPWYiPTehO3kQBcFSjBMBg1Y0fP0t+vuxpTHiBU0emom6ZpGUam+NAmyBtYiKTutpVJkHByG3Aef6I81p30UBePOrHoELoxDxJfbO6DaI8LGfuc9g2RIciNOH/zuOt7P3Xi1YBpc/OKY8/gkYseWm/CywwsORMzgIqskbS4xXkvj4EvunIApjxKv29TMozgCmQBAJwrb5AW3K0XmGZdEvMikBa8tDwmJxzvhIGhAYDz7scr7ajvrPd/NN0XQH2kh+WJTc8Zn3uZUDwr/1CTz3biGXS8PgQs00gBKuz3f1/37CxmwsqLgnMfXfBc+RxF5MiiibaFyXxBgfg28pbFY+roC3V+a9V4nLFQUwBWgWUGAPd6vb92RIEhI0AT8kKP4a4FgIUftZvwDyViEevxp9oPfv8VnfmV/zcCKSp0uHtLr8Od2xqssqvqO7yqSnXRlIJEIvb19SLbMw95IzWfygLw1jD8gtW2MDzDS6qKqJ6CAGwbMjoDviLrTFVWouZ4n/TvpDGa8rFSjmlnUPKDo3C49bmaID4jf9J9NHl+0yp5QECwkhHKG6lwPygLwNR1Qv/teP453CNgRoW/82z/9u6vywCwVmUuNc07CWqgxJ7ObFag9TA3u6j5WWxV8oCHcOaTa0Yayns5ySZrzwRcVQCwMuJ4yGpH/i64VwiAhU/+X3Rl/jyaRESlx3OTj179RxYcMS0lmVWcEYtbcOZbWxS1vf1tI5Q3UtX7R1UAMP3/PqtzzK1gFdVBI6pKADC07OkEw6Mu/DeZAGwqscf9rONracBcZhmROevNmargYZHtbxuhvJEAdZrigki4MiMrmO0bRTgXn/pRDIDp+/vcBfE/6erItYDl0SQ6ikvzOWvjDV0QSIt0QSChC8LlPgTgGFj98/X19X9InCvlguDFmtRzVgCsKt5HjaahTp7yXeRvYCEtzYZI687cQ1o9ndP2Dmj46fr2S5lFm3H/l7rFzWpesDP8nq9Jny2tZCcLy6ss3QhUxTl4TEb7oizubhiuS3mBqLFz/uzzNeXWGE969D2+Iaf+7txN3YSbCXcqds4UUvsoEVKGla1WUee3WtHmGYxKhsVm3Z8pQk/Tr4WFTC1x6Bem7oP4OZ4JZzrpY+bZyGLn+Qjef1XIaK/3VMpZT1zBjojEl2Vh+A6tBUA7T28jeICn2aLOkWqw5luyPJL1Zjs511q5dHblIa8QieM3O/CaSFr5aIWX5Na6KKqHAt/I2sy2ip3Wy7ZqOu+uss4RgLOXR7zIhR8c7fS8v4HyeCz7itdElUUzkvVY2zLgefKLWNow31T6QKKFRgJZaKQEr0puQGZqI7LikMNl1EWi4IuDHly+oT8r/JHqWVmPQQb7pxWXif2Xs25FtQkGDtZEQgCG/pzkOVs8WSRRkxQWqWkbweSXvJxy4N+6LAvAaXJzPcp+mchWF2X0YPjGSaq+M57V6zGo0zG0HXoB0qdZ+zk2ZS+RVhGAtdhkCciw08PTM9pG+mm7zDKlISs5g1qF2JQAYL2KGVyiDoPgxqr5AzN1kRfqZCkrl2/kPSv9t8lJwT+GG1ICfM/SQihXXecIwI4ATKubdbuigEbUWeTBnW3tOKbkl7SEmCoAGPp92YDd2H44435Y0bDDIrpw1UPWN/QYUZdnpSHik+F9eI1XCiSn8FRl7f53WQXlkVYcgOGx29LSNR3c2Vbh2x5vXgUAi7TIx7J40cFga4DJJeV04aoHl2/YPqviUP3gexgTqw4E3dm5H/uJyRkFY9Q3ArAVyQM52ZH14Ih6GqcKT89AAM4m5QcUgGs6Qh0BuJ0ADI4OuoQ+YFF0/JJW9qK/oRKtDH5iJATgTKAJh8En1NJVBYMiAF4Gn5VxkMmU8AIAbApFkjKD1u4qb7RVqYssADbpQn0DAGDaZOjyLFsNsuyrCHBFEo2JHxn5ghMvArAVsSVzt3tEyPAv0ALo9XoPlsFPWaUPWIXtaW4FU4lRdg3dD6V1kQbAsS6S9SzE8Ug/Qx+uvKZ/w+VZNdFGFq4CYH5kfRLA8Qh5BGBnAAbgIS2SZQEPdW5dspDzrbx4ZpelL/SZU5J563QQYtxnOV0UioKw/EaR9sjzEBNgC96nuk8DcCQEYM+0dE7EADMAJsfLtHRmlko0qNRZb3TQAOte371mm2ld70k08H80FSLRiUU38ILTa3yzpvf3nt97NjjoX6/rmKZW6yK54bUGDgHNLAjj8I0TORnquk57Vnw/kRXKdbvzVD9avgOiIFh7scocArDVktCQn047ZFsTLrIojDdSEiFgcTZgMhjf5Xw+WHCFHd00HXzAfqOFWYO162Jm8ue6GEwHm656yPtGQtfAbZDWHuHPvUgUljHoM1HuEcEXARjJUUGsLGjwES4bl18XqGsEYKSGrQKYpYUbZg3SxXysyHn/PhICMBISEhISAjASEhISAjASEhISAjASEhISUr30f+wnO950+xgLAAAAAElFTkSuQmCC)
;
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAA0AAAAPCAYAAAA/I0V3AAAAAXNSR0ICQMB9xQAAAAlwSFlzAAAOxAAADsQBlSsOGwAAABl0RVh0U29mdHdhcmUATWljcm9zb2Z0IE9mZmljZX/tNXEAAAClSURBVDjLY2hsbGQgFTNQRRMQMAIxEypexYRTE0hDfaSxL5D+C8T/oPRfBln3XWkdHTxYNTVEG/swGEfN7+hI4/GQlV3pkVdvSNB5WVlZKiC6OsvFSFbWcwWy6QQDIsqYYaFxdIMP0QFRXx8racRgtDu2vl6SeE2ggDCOWggLGKI0gZwm65ZTUl4eKm1sHF1HlKY8D9kiSFAb38blRIaBS0Y00wQAoJUTcr5WjtMAAAAASUVORK5CYII=)
- напряжение кручения, МПа
![](data:image/png;base64,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)
,
![](data:image/png;base64,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)
,
![](data:image/png;base64,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)
.
Из этого условия устанавливаем, что вал подходит.
3.3.2 Промежуточный вал
Определяем реакции в подшипниках
![](data:image/png;base64,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)
,
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