The derivative of vector A to vector B is C, how to find the derivative of B to A

Summary. Solution: For the derivative of CTAAB, it can be solved using the derivative of calculus.

First, write ctaab as a function: ctaab = f(x) = x 2 + 2x + 1 Second, find the derivative of the function f(x): f'(x) =2x + 2 Finally, bring the derived derivative into ctaab:

ctaab' =f'(x) =2x + 2

How to find the derivative of c*a b.

Solution: For the derivative of CTAAB, it can be solved using the derivative of calculus. First, write ctaab as a function-like ascending answer:

Ctaab = f(x) = x 2 + 2x + 1 and then find the derivative of the function f(x): f'(x) =2x + 2 Finally, bring the obtained derivative into ctaab:ctaab' =f'(x) =2x + 2

Fellow, I really didn't understand, I can be more specific.

Finding the derivative of ctaab: The derivative of ctaab can be solved by calculus, that is, finding the derivative of a function ctaab can be solved by finding derivative rules, such as chain rule, grasp rule, Taylor formula, etc. Causes of the problem:

1. Due to the lack of familiarity with the knowledge of the integral of the micro-remnant, there is a problem in finding the derivative of CTAAB. 2. There is not enough time to study calculus, which leads to problems in finding the derivative of ctaab. Workaround:

1. Study more about calculus, and master the derivative rules, such as chain rule, grasp law, Taylor's formula, etc., in order to better solve the derivative of CTAAB. 2. Practice a lot and practice a lot to better grasp the method of finding the derivative of CTAAB. Personal Tips:

1. When learning calculus in vertical sections, you should practice a lot and practice a lot in order to better grasp the method of finding the derivative of CTAAB. 2. It is necessary to study more about calculus and master the derivative rules, such as the chain rule, the grasp rule, Taylor's formula, etc., so as to better solve the derivative of CTAAB. 3. Study hard, don't take learning as a burden, and be good at discovering the fun of learning, so as to better grasp the knowledge of calculus.

Duan Shi Analysis] First, f(a-bx)=-a-bx) 3 is obtained, and then the answer is obtained according to the derivative formula

f(a-bx)=-a-bx) 3 ，f'(a-bx)=-3(a-bx) 2 •(b)=3b(a-bx) 2 .Comments] This question examines the operation of derivatives, and mastering formulas is the key to solving the problem

Here's how, please refer to:

A x-b x derivative yields a xlna-b xlnb exponential function y=a x with the derivative y'=a^xlna<>

Just remember the derivative formula, as shown in the figure above.

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