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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What should actually be demonstrated in this exercise about left and right derivatives?

I am redoing my math education after 35 years in order to be up to date with my children's curriculum (I usually have a nanosecond to give an answer because of magical dad knowledge). My older son is in high school and they are going through…
WoJ
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Mathematical interpretation of differentials

As an engineer, I am a bit confused about the interpretation of differential. Sometimes, they are used as infinitesimal quantities that can be treated as factors, e. g. $$\frac{dy}{dx}=1\space\vert\cdot dx$$ $$dy=dx\space\vert\int$$ $$y=x+C$$…
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Let $f: [1,7]→ \mathbb R$ be a twice differentiable function such that $f(7) = 3f(3)−2f(1)$. Prove that there is $c∈(1,7)$ such that $f{′′}(c) = 0$

Let $f: [1,7]→ \mathbb R$ be a twice differentiable function such that $f(7) = 3f(3)−2f(1)$. Prove that there is $c∈(1,7)$ such that $f{′′}(c) = 0$ Not certain what to do with this question. Am I supposed to come up with a function that holds this…
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Directional derivative in the direction of $u(t)=(t+,1+2t)$

I have to evaluate the directional derivative of the function $$f(x,y)=\frac{xy}{x^{2}+y^{2}+1}$$ in the direction of the vector $$u(t)=(t,1+2t)$$ at the point $$P(1,-1)$$ I know $$\nabla f(1,-1)=\left(-\frac{1}{9},\frac{1}{9}\right)$$ but my…
mvfs314
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Differentiate $\frac13\tan^3x-\tan x+x$

$\frac13\tan^3x-\tan x+x$ I solved it and got $\frac13\cdot3\tan x-\sec^2x+1$ by using chain rule. I got $\tan x+\tan^3x-\tan^2x$. The answer is $\tan^4x$. I am not able to get this.
Srijan
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Finding the moment a thrown object is the closest to a point

The arc of a thrown object with the initial horizontal speed $v_x$, the initial vertical speed $v_y$ and a gravity of $\frac{625}{64}$ can be described with $$ x(t) = v_x * t \\ y(t) = v_y * t - \frac{625}{128} * t^2 $$ The difference of the point I…
Urben
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Simple question on differentiation of cdf

Suppose we have $n$ $i.i.d$ random variables $X_{1},\ldots,X_{n}$ all distributed uniformly, $X_{i} \sim \mathrm{Uniform}\left(0,1\right)$ . We want to find the expected value of $\mathbb{E}[Y_{n}]$ where $Y_{n}…
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maximum and minimum of the function $x^n\ln^k x$ in the interval $\bigl[\frac{1}{e},e\bigr]$

I have to find maximum and minimum of the function $x^n\ln^k x$ in the interval $\bigl[\frac{1}{e},e\bigr]$ with $k$ and $n \in N$ and I'm lost in the calculus. $y'= x^{n-1} \ln^{k-1}x (n\ln x+k)$ $y'=0 \Leftrightarrow x=1 \lor x=…
Anne
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existence of a derivative $x\cdot f(x)$

Lets say we have a function $f(x)$ that has a derivative at point $a$. Can we prove that the function $x\cdot f(x)$ has also a derivative at point $a$? If this is not true, can anybody give an example that shows this ...
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Finding $\frac{d^2y}{dx^2}$ for a curve given by $(x,y)=(t^2+2t,3t^4+4t^3)$. Why does my method yield the incorrect answer?

The other day I saw what was, seemingly, a fairly simple question. A curve in the $xy$-plane is given parametrically by the equations: $$\begin{align} x &=\phantom{3}t^2+2t \\ y &=3t^4+4t^3 \end{align}$$ for all $t>0$. Find the value of…
Lkryat
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Is this a correct way to show that $f''(c)=0$?

I am not sure if my solution is correct, so any feedback would be appreciated. Suppose: $f$ is twice differentiable in $(a,b)$ $a
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What are the higher order derivatives of the logistic function?

What are the higher order derivatives of the logistic function $$\sigma(x) = \frac{1}{1+e^{-x}}$$ and is there a general formula for them?
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Taking the derivative of an expression containing multivariate functions

I'd like to take the derivative of $$ \cfrac{x_1(p,w)/ x_2(p,w)}{p_1/p_2} = (p_1/p_2)^{\delta-2} $$ I'm supposed to see that $$ \cfrac{\text d [x_1(p,w)/ x_2(p,w)]}{\text d [p_1/p_2]} = (\delta-1)(p_1/p_2)^{\delta-2} $$ Note that $p = (p_1,…
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Can i differentiate both sides of an equation and solve for $y$?

Can I differentiate both sides of an equation like the one below and solve for $y$? Considering $y=f(x)$, or do I need to use implicit differentiation for something like that? $x\cos(2x+3y)=y\sin(x)$ EDIT: answering some questions, the question is…
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Proof $f(x)>x$ for $x>0$

I'm a little stuck at proving that for these function: $$\ f(x) = \frac{x}{\sqrt{1+x^2}} + \sqrt{1+x^2}\cdot\ln(1+x^2) $$ $f(x)>x$ for every $x>0$. Another question: is there any $a$ that $f(x)>x^2$ for every $x>a$? My steps I have computed the…
Funny
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