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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Creating an n-order Derivative

I'm trying to find the n-order derivative of a function. Function: $f(x) = x^3.lnx$ 1.Derivative: $f'(x) = x^2.(3lnx+1)$ 2.Derivative: $f''(x) = x.(6lnx+5)$ 3.Derivative: $f'''(x) = (6lnx+11)$ 4.Derivative: $f^{(4)}(x) = 6x^{-1}$ 5.Derivative:…
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Derivative of hyperbolic decline equation

I have the following equation: $$ y = q_0\left(1+\frac{bx}{a}\right)^{-\dfrac 1b}$$ where $q_0$, $a$ and $b$ are constants. I am trying to get the first derivative with respect to $x$. Here's what I have so far. $$ \frac{dy}{dx} =…
rdemyan
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Derivative of $x^n$ for $n < 0$

I know that you can prove the derivative of $x^n$ where $n > 0$ using the bionomial theorem etc. Now I have looked online and couldn't find out but I'd like to ask here, is the a proof for the derivative of $x^n$ where $n<0$?
Nav Bhatthal
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Use Lagrange multipliers to find minimum and maximum

$$f(x,y,z) = x^{2}y^{2}z^{2}$$ If: $$g(x,y,z)=x^{2}+y^{2}+z^{2}+1 = 0$$ The method I know is to create the following function: $F(x,y,z,\lambda)=f(x,y,z)-\lambda g(x,y,z)$ Then create system of…
khernik
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If the derivative of x^2 is 2x, how is the derivative of a^x a^x ln a?

I'm just starting to learn about derivatives. I've seen the derivative of x^2 given as 2x. (1) But I've also seen the derivative of a^x given as a ^ x ln a. (2) Suppose we use 3 as the base. From (1), we get that the derivative of 3^2 is 6. But if I…
Bruce
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Evaluate derivative of a bijective function in a point

Let $s:I\to\mathbb{R}$ a bijective function. Assuming that $h$ is inverse of function $s$ and $c = c(s)$, show that $\frac{dc}{ds}\small{(h(s))} = \frac{dc}{dt}\small{(h(s))}\frac{dh(s)}{ds}$. I don't understand very good the Leibniz notation. From…
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If function and its derivative are zero at a point, then is the second and third derivative also zero [fourth order differential]?

The example I am working on is that of a string attached and deflected by a force along its length. Edit: There is something supporting it in the middle. We can say that the deflection, $f(x)$, must be zero at the frontier $f(0)=f(L)=0$ along with…
Mooder
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Differentiability of a function that is undefined over an interval

$$f(x) = \begin{cases} x^2 & x \leq 0 \\ \text{undefined} & x > 0\end{cases}$$ Will this function be differentiable at $x = 0$? Because the left side limit is 0 and the right side limit doesn't exists, can one conclude that its derivative doesn't…
Hanzel
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Applications of differentiation: $P=RI^2$ functions of $t$

The power $P$ (watts) of an electric circuit is related to the circuit's resistance $R$ (ohms) and current $I$ (amperes) by equation $P=RI^2$. How is $\frac{dR}{dt}$ related to $\frac{dI}{dt}$ if $P=P_0$ is constant? First, I relate the equation…
user307640
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Can't find the extremum Coordinate

I have a Math problem which I did not manage to explain to my IB student boy. $ g(x)= x^3+3x-6 $ admits a single zero at $\alpha \in [1.2, 1.3]$ $f(x)=\frac{x^3+x^2+4}{x^2+1}$ has a derivative which can be written in function of the previous…
SAM.Am
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First and Second derivative test for local extrema to find dimensions of rectangle with maximum area

Given just this diagram, I am trying to find the dimensions which gives the maximum area. I understand that I have to apply the first derivative test for local extrema, which involves setting the first derivative of a function equal to $0$ to…
user307640
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solve $f' = \alpha\beta f^2-\beta f$

solve for f: $f' = \alpha\beta f^2-\beta f, 0<\alpha<1, 0
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Is (1,1) a local maximum of $f$?

For a function $$ f(x)=x-6\sqrt{x-1}, $$ can $x=1$ be considered a critical number, and is $f(1)$ a local maximum? The definition my textbook gives me of a critical number is a number that is an interior point of the domain of $f$ where $f'$ is…
rayank97
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Differentiability of $x \mapsto \dfrac{x}{\| x \|}$

Let $(E, \| \, \|)$ be a normed vector space, and let $\Phi: E \, \backslash \{ 0_E \} \to E, \, x \mapsto \dfrac{x}{\| x \|}$. Is $\Phi$ differentiable ? I did try to look at $\Phi(x + h) - \Phi(x)$, but I do not see what to do ... Thank you for…
JackEight
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Is it possible to Differentiate without respect to a variable

I came upon a question where the solution shows that $\alpha$d$\theta$ = ($\theta$ + 1)d($\theta$ +1) becomes ad$\theta$ = ($\theta$ + 1)d$\theta$. I am a little lost as to how this occurs. Was the part of d($\theta$ + 1) differentiated without…