Questions tagged [derivatives]

Questions on the evaluation of derivatives or problems involving derivatives (for example, use of the mean value theorem).

The derivative of a function of a real variable measures the sensitivity to change of the function value (output value) with respect to a change in its argument (input value)

Derivative of a function has a very natural geometric and physical interpretation: it corresponds to slope of the tangent line and to instantaneous velocity. In applications, it usually describes the rate of change of a physical variable.

Basic techniques used for computing the derivative of a given function are

It is useful to know the derivatives of elementary functions. This tag is intended for questions on the evaluation of derivatives.

Derivatives may be generalized to functions of several real variables. In this generalization, the derivative is reinterpreted as a linear transformation whose graph is (after an appropriate translation) the best linear approximation to the graph of the original function. The Jacobian matrix is the matrix that represents this linear transformation with respect to the basis given by the choice of independent and dependent variables. It can be calculated in terms of the partial derivatives with respect to the independent variables. For a real-valued function of several variables, the Jacobian matrix reduces to the gradient vector.

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Why does L'Hopital's rule give the wrong answer?

I have this function $\frac{\sin^2 x}{1-\cos x}$. $\frac{\sin^2x}{1-\cos x}=\frac{1-\cos^2x}{1-\cos x}=1+\cos x\;$. Thus the derivative of $1 + \cos x\; = -\sin x\;$. However by, L'Hopital's rule, I obtain $\frac{\sin^2x}{1-\cos x}=\frac{2\sin…
user85362
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Related rates problem - water from cone to cylinder

A water tank shaped like a cone pointing downwards is $10$ metres high. $2$ metres above the tip the radius is $1$ metre. Water is pouring from the tank into a cylindrical barrel with vertical axis and a diameter of $8$ metres. Assume that the…
ccipher
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Find the tangent to $f(x)$

Find an equation for the tangent line to the function $f(x)=(1+x^{\frac{3}{2}})^3$ through the point $(1,8)$. I really have no idea how to attack this problem.
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question if these derivative are equal

Starting fuction: $y= \sqrt{x^2-2x+1}$ derivative A: $y^{\prime} = (1/2)(2x-2)(x^2-2x+1)^{-1/2}$ derivative B: rewrote the starting function as: $\sqrt{\left(x-1\right)^2} = \vert x -1 \vert$ thus $y^{\prime} = $ either 1 if $x > 0$ or -1 if…
yiyi
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Calculate the $r$-th derivatives of $Γ(z,v), r=1,2,...$

Let us consider the the incomplete Γ-function $$Γ(z,v)=∫_{v}^{+∞}t^{z-1}e^{-t}dt$$ My question is: Calculate the $r$-th derivatives of $Γ(z,v), r=1,2,...$ with respect to $z$.
DER
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second and third (global) total derivatives

In this question I learned that the total derivative not-just-at-a-point can be thought of as: a map $Df:\mathbf R^n\to\bigsqcup_{p\in\mathbf R^n}\text{Hom}(T_p\mathbf R^n, T_{f(p)}\mathbf R^m)$ that maps each $p$ to $D_pf$ a map $Df:T\mathbf…
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Compute the directional derivative, check if the function is differentiable

I need to compute the directional derivative of the function: $$f(x,y)=|x-y|$$ at (0,0) in the direction $[\frac{1}{2}, -\frac{\sqrt{3}}{2}]$. Well, I've been thinking to check if the function is differentiable at $(0,0)$ first, as it seems to be…
khernik
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Correct approach to determining the second derivative of the power of a sum

I'm stymied as to how to determine the second derivative with respect to $x$ of the following infinite sum, $G(x)$. $$ G(x) = \bigg( \sum_{k=-\infty}^{\infty} g_k(x) \bigg)^n . $$ Both $g_k(x)$ and $G(x)$ are well behaved. If I have things right so…
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Derivative of $ y = \ln(x^2 + y^2)$? Why is $d(y^2)/dx = 0$?

The answer is $y' = 2x/(x^2+y^2-2y)$ or $y' = 2x/(x^2+y^2)$ At wolfram it says $d(y^2)/dx = 0$? http://www4c.wolframalpha.com/Calculate/MSP/MSP44041daf8be8cc1i97i900005a2dbcggic267i1c?MSPStoreType=image/png&s=32&w=560&h=716
IndyZa
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unsure of units of a derivative

Hi everyone I am confused on what the units of this derivative would be. The question is: . You are running on a treadmill, and your heart rate (R, in beats per minute) is a function of your speed (v, in km/h). Denote this relationship R = f(v). (a)…
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requesting help confirming derivative of complicated function

I have this function I wish to use in composing a Jacobian. I've simplified it as follows: $$f(x,y) =-A \sqrt{|x + y|}\ log(B + \frac{C}{\sqrt{|x + y|}})$$ So, I need to calculate the partial derivatives. After some refresher study it appears I…
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The Power Rule of Exponents as it relates to Zero to the Power of Zero

It is my first week of calculus and I am struggling with understanding something related to the power rule of exponents. First off, we are working on derivatives. The problem that came up was the following: $$\frac{(d)}{(dx)}(8)=0$$ As we work…
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Analysis: Theorem 5.2 Apostol Analysis

theorem 5.2 The theorem as I read it states if $f(x)$ is differentiable at $c$ then $f(x)-f(c)=(x-c)f'(c)$ voor $x \in (a,b)$ But of course this is only true for $x\to c$. Can someone explain how I misinterpret this theorem.
Jack
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Partial derivatives, don't know how to solve it

ok so i got this problem : $2x \dfrac{du}{dx}+ \dfrac1{ln (x)} \dfrac{du}{dt}$, where $u=e^{\dfrac{x}{t^2}}$ I'm having trouble with understanding the first part ->$2x \dfrac{du }{dx}$ $2x \dfrac{du}{dx} = 2x \dfrac{de^{\dfrac{x}{t^2}}}{dx} = 2x…
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first term in the product rule

At the moment I am studying a Calculus book. This book states that if you have a function defined like this: $ f(x)=x^3 $ Than if you expand that function according to the Power Rule with the Binomial Theorem the derivative would be $3x^2$. I do…