Баяндаманы құрастыру. Жұмыс бойынша баяндама мынадан тұру керек:
1) Жұмыс мақсаты.
2) Тістер саны z.
3) Ілінісу модулінің m негізгі шеңберіндегі Рb ілініс қадамын анықтау:
– ln және ln+1 өлшеу схемасы (11.1 - сурет);
– өлшеу қорытындылары 11.3 - кестеге енгізіледі;
11.3 - кесте
– негізгі шеңбердегі ілініс қадамы;
– есептеуші модуль;
– ГОСТ 9563-60 бойынша модуль;
– негізгі шеңбердегі дәл қадам.
4) Білдекті төрткілдештің жылжу коэффициентін анықтау.
– негізгі шеңбердегі тіс қалыңдығы Sb;
– нөлдік доңғалақ үшін негізгі шеңбердегі тіс қалыңдығы Sb;
– білдекті төрткілдештің жылжу коэффициенті х.
5) т - ді анықтаудың дұрыстығын тексеру:
– дөңгелек басы шеңберінің диаметрінің өлшем қорытындыларын 11.4 - кестесіне еңгізу;
11.4 - кесте
№ измерений
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2
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3
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Среднее
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da
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– бөлгіш шеңбер
хордасы бойынша тіс қалыңдығы![](data:image/png;base64,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)
;
–
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)
өлшемі;
– тіс хордасындағы бөлгіш қалыңдықты өлшеу схемасы (сурет 11.2);
– бөлгіш шеңбер хордасындағы тіс қалыңдығын өлшеу 11.5 -кестесіне кіреді;
11.5 - кесте
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Қауіпсіздік ережесі.
Берілген зертханалық жұмысты орындау барысында ережелердің ортақ шарттары орындалу керек.
Бақылау сұрақтары.
1 Цилиндрлік түзу тісті дөңгелектің негізгі есептеуші параметрлері мен геометриялық мінездемелерін ата.
2 Есептеуші қадам, тіс ойымының қалыңдығы мен ені деген не?
3 Білдекті төрткілдештің ығысуын қалай анықтауға болады?
4 Бұрыштық және шеңберлік қадам деген не?
Пайдаланылған әдебиеттер
1 Жолдаспеков Ө.А. Машиналар механизмдерінің териясы. – Алматы: Мектеп, 1979. - 424 б.
2 Қазақша-орысша, орысша-қазақша терминологиялық сөздік: 7 том, Машинажасау/жалпы редакциясын басқарған п.ғ.д., профессор А.Қ. Құсайынов. – Алматы: Рауан, 2000. – 288 б.
3 Қазақша-орысша, орысша-қазақша терминологиялық сөздік: 4 том, Механика және машинатану/жалпы редакциясын басқарған п.ғ.д., профессор А.Қ. Құсайынов. – Алматы: Рауан, 2000. – 328 б.
4 Мустафин Ә.Х. Жазық иінді механизмдердің қозғалысын зерттеу. – Алматы: Республикалық баспа кабинеті, 1997. - 41б.
5 Мустафин Ә.Х., Жүмәділов С.Қ. Иінді механизмдердің кинематикасы мен динамикасы. – Павлодар: ТОО НПФ «ЭКО», 2006. – 70 б.
6 Серикбаев Д., Джолдасбеков У.А., Тажибаев С.Д., Абдрахманов А. Русско-казахский терминологический словарь по машиностроению. – Алматы: Мектеп, 1974. - 192 с.
7 Тажибаев С.Д. Қолданбалы механика: Жоғарғы оқу орындары студенттеріне арналған оқулық. – Алматы: Білім, 1994. - 336 б.
8 Артоболевский И.И. Теория механизмов и машин. - М.: Наука, 1988. – 640с.
9 Болотовский И.А., Безруков В.И., Васильева О. и др. Справочник по геометрическому расчету эвольвентных зубчатых и червячных передач. - М.: Машиностроение, 1986.
10 Гавриленко Г.С. Теория механизмов. - М.:Высшая школа, 1988.
11 Косилова А.Г., Мещерякова Р.К. Справочник технолога-машиностроителя. Т.2. М.: Машиностроение, 1986.
12 Кудрявцев В.Н, Кирдяшев Ю.Н, Гинзбург Е.Г и др. – Л.: Машиностроение, 1977. - 536 с.
13 Левитский Н.И. Курс теории механизмов и машин. - М.: Наука, 1990.
14 Марголин Ш.Ф. Теория механизмов и машин. - Минск, Высшая школа, 1968.
15 Попов С.А. Курсовое проектирование по теории механизмов и механике машин. - М.: Высшая школа, 1986.
16 Решетов Л.Н. Самоустанавливающиеся механизмы. - М.: Машиностроение, 1985.
17 Теория механизмов и машин /Под ред. К. В. Фролова. - М.: Высшая школа, 1988.
18 Фролов К.В, Попов С.А, Мусатов А.К. и др. Теория механизмов и машин. - М.: Высшая школа, 1987. – 496с.
19 Юдин В.А., Петрокас Л.В. Лабораторный практикум по ТММ. - М.: Физмашгиз, 1962.
Мазмұны
1 Жазық иінтіректі механизмдердің құрылымдық талдауы
|
3
|
2 Белгілі орналасқан теңестірілмеген массамен айналып тұрған
роторды теңестіру
|
13
|
3 Бұлғақтың инерция моментін анықтау
|
24
|
4 Тісқашауышпен өңдеу тәсілімен тісті дөңгелектерді дайындау
|
32
|
5 Роторларды динамикалық теңгеру
|
44
|
6 Қос бұранданың пайдалы әсер коэффициентін анықтау
|
51
|
7 Тісті дөңгелектерді орапоту тәсілімен қиып дайындау
|
58
|
8 Цилиндрлік тісті берілістің параметрлерін
шартбелгісіздендіру
|
66
|
9 Көп звеноларлық тісті механизмдердің беріліс
қатынасын анықтау
|
74
|
10 Жұдырықшалы механизмнің параметрлерін анықтау
|
81
|
11 Өлшеу әдісімен тістің эвольвентті пішінді түзутісті
цилиндрлік дөңгелектің негізгі параметрлерін анықтау
|
90
|
Пайдаланылған әдебиеттер
|
100
|