大学高数导数与微分的重要公式（好学高数十三）

分享兴趣，传播快乐，增长见闻，留下美好！亲爱的您，这里是LearningYard新学苑。今天小编为大家带来的是好学高数（十三）：微分中值定理与导数的应用。

Share interest, spread happiness,

increase knowledge, and leave a beautiful place!

Dear you, this is LearningYard.

Today's small edition is about learning advanced numbers (13): the application of differentia

l mean value theorem and derivative.

01

微分中值定理及其应用

1、微分中值定理的主要应用

(1)研究函数或导数的性态

(2)证明恒等式或不等式

(3)证明有关中值问题的结论

2、有关中值问题的解题方法

利用逆向思维,设辅助函数，一般解题方法:

(1)证明含一个中值的等式或根的存在，多用罗尔定理，可用原函数法找辅助函数。

(2)若结论中涉及含中值的两个不同函数,可考虑用柯西中值定理。

(3)若结论中含两个或两个以上的中值,必须多次应用中值定理。

(4)若已知条件中含高阶导数,多考虑用泰勒公式,有时也可考虑对导数用中值定理。

(5)若结论为不等式,要注意适当放大或缩小的技巧。

01 Differential mean value theorem and its application

1. Main application of differential mean value theorem

(1) Research the behavior of function or derivative (2) Prove identity or inequality

(3) Prove the conclusion of median problem

2. The solution method of median problem uses reverse thinking to set auxiliary functions. General solution method:

(1) Prove the existence of an equation or root containing a median. Use Rolle's theorem more often, and use the original function method to find auxiliary functions.

(2) If the conclusion involves two different functions with median value, Cauchy mean value theorem can be considered.

(3) If the conclusion contains two or more median values, the mean value theorem must be applied many times.

(4) If the known conditions contain high-order derivatives, consider using Taylor formula, and sometimes consider using the mean value theorem for derivatives.

(5) If the conclusion is inequality, pay attention to the technique of appropriately enlarging or shrinking.

02

导数应用

1、研究函数的性态:

增减，极值，凹凸，拐点，渐近线，曲率

2、解决最值问题

·目标函数的建立与简化

·最值的判别问题

3、其他应用：求不定式极限；几何应用;

相关变化率；证明不等式；研究方程实根等

4、补充定理

02 Derivative application

1. Study the properties of functions: increase and decrease, extreme value, concavity and convex, inflection point, asymptote, curvature

2. Solve the problem of maximum value

· Establishment and simplification of objective function

· Determination of maximum value

3. Other applications: Solve the limit of infinitives; Geometric applications; Relevant change rate; Prove inequality; Study the real roots of equations, etc.

4. Supplementary theorems

END

今天的分享就到这里了。如果您对今天的文章有独特的想法，欢迎给我们留言，让我们相约明天，祝您今天过得开心快乐！

That's all for today's sharing.

If you have unique ideas about today's article,

please leave us a message.

Let's meet tomorrow and wish you a happy day!

翻译：百度翻译参考：《高等数学 第七版》同济大学数学系编声明：本文由LearningYard新学苑原创，若有侵权请联系删除！

文案&排版：易春秀

审核：闫庆红

,