6.6 Қозғалатын орнықтардың санын анықтау
Егер тетіктің қатаңдығы жеткілікті болмаса, онда ол кесу күштердің әсерінен деформацияға ұшырайды. Сондықтан осындай тетіктердің қатаңдығын көтеру үшін қозғалатын орнықтар қолданылады. Әдетте олар қөмекші орнықтар деп аталады, олардың саны есептеледі. Яғни мұндай есепте деформацияның шамасы, тетікке қойылатын техникалық талапқа сәйкес, тетіктің пішінінің қателігі (у) қойылған талап мөлшерінен аспауы тиіс
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)
6.16-сурет – Көмекші орнықты қолдану
Осында, деформация мөлшері
y = .
Негізгі орнық пен қөмекші орнықтың ара қашықтығы
lқ = ,
Қозғалатын орнықтардың саны
m = ,
мұндағы l – негізгі орнықтар арасындағы қашықтық,
Е – өңделетін тетіктің материалының серпімділік модулі,
I – тетіктің қима инерция моменті,
Р – кесу күш,
- тетік пішінің шақтамасы,
m - қозғалатын орнықтардың саны,
Достарыңызбен бөлісу: |