1. Бөлшектің жылдамдығын оның координаталарының өзгерісі арқылы анықтаңыздар[3].
Шешімі. Бөлшекті материалдық нүкте ретінде қарастырамыз. ![](data:image/png;base64,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) проекцияларын декарттық тікбұрышты координаталар жүйесіне салу арқылы жылдамдықты анықтаймыз.
Жылдамдық векторы кордината осінің оң бағытымен ![](data:image/png;base64,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) бұрыштарын жасайды делік. Онда
![](data:image/png;base64,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) болғандықтан, ![](data:image/png;base64,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) болады.
Яғни, координаталар остері бойынша жылдамдық векторын құрушы қозғалыстағы бөлшектің аттас координаталарының уақыт бойынша табылатын бірінші ретті туындысына тең. Бұдан шығатын жылдамдық:
2. Нүктенің қозғалысының координаталық теңдеулері берілген: ![](data:image/png;base64,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) Оның жылдамдығын анықта[3].
Шешімі. Тікбұрышыты координаталар жүйесіне енгізе отырып, жылдамдық векторының проекциясын координата остері бойынша табамыз:
Бұдан нүктенің жылдамдығы: ![](data:image/png;base64,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) . Қозғалыстың траекториясы суретте көрсетілген.
Сонымен нүкте А нүктесіне қатысты В нүктесіне бағытталып 5м/с жылдамдықпен түзсызықты қозғалады.
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