Предмет: Математика, автор: rkia978

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Приложения:

Ответы

Автор ответа: NNNLLL54

1

Ответ:

Вычислить предел функции . Применим правило Лопиталя .для неопределённости вида 0/0 .

$\bf \lim\limits _{x \to \frac{\pi }{2}}\, \dfrac{5\, cosx}{4x-2\pi }=\Big[\ \dfrac{0}{0}\ \Big]=\lim\limits _{x \to \frac{\pi }{2}}\, \dfrac{(5\, cosx)'}{(4x-2\pi )'}=\lim\limits _{x \to \frac{\pi }{2}}\, \dfrac{-5\, sinx}{4}=\dfrac{-5\cdot 1}{4}=-1,25\\\\\\Otvet:\ D)\ .$

2 способ . Замена эквивалентных бесконечно малых величин :

$\bf sin\alpha (x)\sim \alpha (x)\ ,\ esli\ \ \alpha (x)\to 0$ .

И ещё надо знать формулу тригонометрии : $\bf cosx=sin\Big(\dfrac{\pi }{2}-x\Big)$ .

$\bf \lim\limits _{x \to \frac{\pi }{2}}\, \dfrac{5\, cosx}{4x-2\pi }=\Big[\ \dfrac{0}{0}\ \Big]=\lim\limits _{x \to \frac{\pi }{2}}\, \dfrac{5\, sin\Big(\dfrac{\pi }{2}-x\Big)}{4(x-\dfrac{\pi }{2})}=\lim\limits _{x \to \frac{\pi }{2}}\, \dfrac{5\, \Big(\dfrac{\pi }{2}-x\Big)}{-4\, \Big(\dfrac{\pi}{2}-x\Big)}=\dfrac{5}{-4}=\\\\\\=-1,25\\\\\\Otvet:\ D)\ .$

Приложения:

rkia978: Благодарю. А нельзя ли решить другим способом? мы правило Лопиталя не прошли

NNNLLL54: можно, но тогда эквивалентные бесконечно малые величины нужно знать .

rkia978: ясно

rkia978: ещё раз спасибо

NNNLLL54: lдобавила 2 способ решения

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