derivative of sin(x) by using the definition of derivative| 通过使用衍生物的定义sinx的衍生物大凶猩 立即播放 打开App,流畅又高清100+个相关视频 更多12 -- 7:29 App (Q14.) Quadratic Inequality| Q14二次不平等 12 -- 14:02 App Level Up! Interview with zakUak 17 -- 1:17:36 App ...
百度试题 结果1 题目The derivative of y = sin(x) is ___. A. cos(x) B. -cos(x) C. sin(x) D. -sin(x) 相关知识点: 试题来源: 解析 A。根据求导公式,sin(x)的导数是 cos(x)。选项 B、C、D 都不符合。反馈 收藏
What is the derivative of (sin(x)^x) ? The derivative of (sin(x)^x) is sin^x(x)(ln(sin(x))+xcot(x)) What is the first derivative of (sin(x)^x) ? The first derivative of (sin(x)^x) is sin^x(x)(ln(sin(x))+xcot(x))...
sin(x)’ = cos(x) Power Rule Example: What isddxx3? The question is asking "what is the derivative of x3?" We can use thePower Rule, where n=3: ddxxn= nxn−1 ddxx3= 3x3−1=3x2 (In other words the derivative of x3is 3x2) ...
dydu=−sin(sin(x2)) Step 3: Differentiate the inner functionNow we differentiate the inner function g(x)=sin(x2). The derivative of sin(v) where v=x2 is:g′(x)=cos(x2)⋅ddx(x2)=cos(x2)⋅2x Step 4: Combine the derivativesUsing the chain rule, we combine the derivatives...
Derivative of sin x Derivativef′of the functionf(x)=sinxis:∀x∈]−∞,+∞[,f′(x)=cosx Proof/Demonstration sin(x+h)−sinxh=sin(x)cos(h)+cos(x)sin(h)−sinxhsin(x+h)−sinxh=sinhh×cosx+sinx×coshh−sin...
THE DERIVATIVE of sin x is cos x. To prove that, we will use the following identity:sin A − sin B = 2 cos ½(A + B) sin ½(A − B).(Topic 20 of Trigonometry.)Problem 1. Use that identity to show:sin (x + h) − sin x = ...
Derivative of (tan(x))^2. Simple step by step solution, to learn. Simple, and easy to understand, so don`t hesitate to use it as a solution of your homework. Below you can find the full step by step solution for you problem. We hope it will be very helpful for you and it will...
Derivative off(x)=x2is View Solution The derivative off(x)=x2atx=1is View Solution The derivative off(x)=sin2xis View Solution The derivative off(x)=(x−4)2is Find the derivative off(x)=x2 View Solution Find the derivative off(x)=1x ...
The derivative is \(2x\sin x - x^{2}\cos x\) 相关知识点: 试题来源: 解析 A。解析:对于函数\(y = uv\)(这里\(u = x^{2}\),\(v=\sin x\)),根据乘积法则\((uv)^\prime = u^\prime v+uv^\prime\)。\(u = x^{2}\)的导数\(u^\prime = 2x\),\(v=\sin x\)的导数\...