Белгілі үйкеліс бұрыш , f – үйкеліс коэффициенті.
Өздігінен тежелу шартты эксцентриктің құрылымы параметрлерімен сипаттауға болады
. (3.11)
Эксцентриктің қысу күшінің орташа шамасын мынадай формуламен есептеуге болады
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) , (3.12)
мұндағы Q – тұтқадағы күш,
L - тұтқаның ұзындығы,
rср- эксцентриктің О айналу центрден бекітілетін тетікпен жанасу А нүктеге дейінгі радиустың орта шамасы
, (3.13)
, (3.14)
. (3.15)
Яғни эксцентриктің параметрлері тұтқаның бұрылу бұрышына байланысты өзгереді, сондықтан W күште өзгереді.
Эксцентриктер төмен көміртегілі 20Х болаттан жасалады, ол 0,8–1,2 мм тереңдікке көміртектендіруден өткесін, HRC 55-60 қаттылыққа дейн шынықтырудан өтеді.
Қысатын эксцентриктің артық жерлері:
- құрылымдарының жабайылығы;
- бұрама қыспақтармен салыстырса тетікті бекіту уақыты тез.
Бірақ кемістік жерлері бар:
- бұрма қыспақтармен салыстырса тетікті бекітетін күштің мөлшері кемдеу;
- вибрациялар болғанда өздігінен тежелу қасиеттің жоғалту;
- қысатын күш мөлшері өзгермелі.
Достарыңызбен бөлісу: |