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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$x^p y^q=(x+y)^{p+q}$ what is the value of $y_2$

If $x^p y^q=(x+y)^{p+q}$ then how to compute ${d^2 y}\over{dx^2}$ The result is 0
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A triangle has one vertex at $(0,0)$, the other two on graph of $y=-2x^2+54$

A triangle has one vertex at $(0,0)$ and the other two on graph of $y=-2x^2+54$ at $(x,y)$,$(-x,y)$ where $0
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Directional derivative is non-linear in direction

Let us consider some function in $\mathbb{R}^2$ of the form $$u(x,y) = \begin{cases} \frac{x^a y^b}{x^c + y^d}, & (x,y)\neq(0,0)\\ 0, & (x,y)=(0,0)\end{cases}$$ for some $a,b,c,d\in\mathbb{N}$. I know there are functions of this sort that are…
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Several function conditions

It was told to me an exercise: Represent a continuous and differentiable function whose derivative is annulled in points $A(-1, 4)$ and $B(2, -3)$ and that complies these conditions: $\displaystyle\lim_{x\to-\infty} f(x) = -\infty\qquad…
JnxF
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What is meant by saying $F:\mathbb R^2\to \mathbb R$ is infinitely differentiable?

When we say $f:\mathbb R \to \mathbb R$ is infinitely differentiable at some $a\in \mathbb R$, then we mean the $n^{th}$ derivative $f^{(n)}(a)$ exists for all $n\in \mathbb N$. What is meant by saying $F:\mathbb R^2\to \mathbb R$ is infinitely…
ask
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How to find $y''_{tt}$?

Let us have function $y(x)$ and $x = \varphi(t)$. Then parametric derivative should be: $$y'_x = \dfrac{y'_t}{x'_t},$$ From where $$y'_t = y'_x \cdot x'_t = y'_x \cdot \varphi'(t).$$ The parametric derivative of the second order should…
Andrew
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Differentiation from first principles of fractional equation

Bear with me folks, I'm only learning. How do I differentiate $y=\frac{1}{x}$ from first principles? I get to: $\frac{dy}{dx}=\frac{y_2-y_1}{x_2-x_1}=\frac{\left(\frac{1}{x+h}\right)-\left(\frac{1}{x}\right)}{h}$ I then try to find a common…
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Derivative of $\frac {x\cdot\left(1 - 3x\right)}{\sqrt{x-1}}$

Problem. Find the first derivative of $$ \dfrac {x \left( 1 - 3x \right)}{\sqrt{x-1}} $$ Work. Let $u = x-1$ and $y = \dfrac {(u+1)(-3u-2)}{\sqrt{u}} $ Using the chain rule, I got$$\dfrac{(-9x^2-5x+2)}{(2(x-1)^\frac{3}{2})}$$ But the answer is…
IndyZa
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Prove $\lim_{z\to 0} \frac{d^{2n}}{dz^{2n}}(z^2-1)^{2n}=(-1)^n\left(\frac{(2n)!}{n!}\right)^2 $

Prove the formula: $$\lim_{z\to 0} \frac{d^{2n}}{dz^{2n}}(z^2-1)^{2n}=(-1)^n\left(\frac{(2n)!}{n!}\right)^2.$$ The only way I can conceive to move forward with my limited background is to try induction. Base case obviously checks out, next try to…
user34909
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Non integral degree derivatives

Could non integral degree derivative somehow be interpreted? What I mean: $f^{(1)}(x) = \frac{df(x)}{dx}$ $f^{(2)}(x) = \frac{d^{2}f(x)}{dx^2}$ How could $f^{(1.5)}(x)$ be interpreted?
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How to determine if this function is differentiable?

I want to determine if the following function is differentiable: $$y=\ln\left(\left|x^{2}-4x+3\right|\right)$$ Logically, I should find the one-sided derivatives at points that are roots of the polynomial in the modulus, but the function is…
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Differentiating the sigmoid function using limits

$$ f(x) =\dfrac{1}{1 + e^{-x}} $$ The derivative of the above function is: $$ {f}'(x) =\dfrac{e^{-x}}{(1 + e^{-x})^2} $$ But when I try to use the definition of the derivative: $$ h = \Delta x $$ $$ {f}'(x) = \lim_{h \to 0} \dfrac{f(x + h) -…
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Find $\frac {dy}{dx}$ if $y=\frac{x\sin^{-1}x}{\sqrt{1-x^2}}$

taking JDs advice i used $(fg)'=f'g+fg'$ rule $$f=\frac x{\sqrt{(1-x^2)}}$$ $$f'=\frac 1{\sqrt{(1-x)}^3}$$ $$g=sin^{-1}x$$ $$g'=\frac{1}{\sqrt{1-x^2}}$$ so anyway adding together we get $$\frac 1{(\sqrt{(1-x)}^3}*sin^-x+\frac…
Wish
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How to find the derivative of the logarithm?

For the following relation $\log (\mathrm{Q})=4.415-5.132 \times \log (\mathrm{P})+\mathrm{e}$ I need to prove that: $$\frac{\mathrm{d} \log (\mathrm{Q})}{\mathrm{d} \log…
Tim
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Find the nth Derivative of $e^{2x}\sin x\sin2x$

I need to find the $n$-th derivative of $e^{2x}\sin x\sin2x$. So anyway first we will devide the qustion into two parts u and v $$y=uv$$ $$u=e^2x$$ $$v=sinxsin2x$$ now $$sinasinb=\dfrac{1}2[cos(a−b)−cos(a+b)]$$ then…
Wish
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