For question involving exponential functions and questions on exponential growth or decay.

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1answer
9 views

Conditional cdf of exponential variable

Given the rate parameter for an exp r.v, I am able to calculate conditional pdf and mean on the condition of A > c. For conditional pdf I calculate P(A>c) and divide that by the pdf of the r.v. I ...
0
votes
2answers
80 views

Find the exact length of the arc of this curve

$y = 2e^x + (1/8)e^{-x}$ ... on the interval $[0, \ln(2)]$ I know am supposed to user the Arc Length formula, but I'm not sure if I have the derivative of this function correct. I came up with: ...
0
votes
1answer
18 views

Best way to prove all 3 solutions for exponential equation?

I was given the equation; $(x-7)^a=1$ where $a=(x-4)$ The 3 solutions are: $x=4, 6, 8$ When $x=4$, $(-3)^0=1$, which can be reached by setting $(x-4)=0$ because $n^0=1$ When $x=8$, $1^4=1$, ...
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0answers
27 views

A property of exponential of operators 2

Let $X$ be a Banach space. The other day I asked if all bounded operators $A:X\to X$ satisfy the following property: (P): All bounded nonzero trajectories $t\mapsto e^{tA}x$ satisfy $$\inf_{t\in ...
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1answer
43 views

How to solve the equation 5x=0.01^x [duplicate]

Hi I recently posted a this question earlier and got some excellent answers but to take it a little further I liked k170's answer however it contained a Lambert W Function in the answer and I was ...
2
votes
3answers
184 views

How to solve 5x=0.01^x

I just want to know how to solve: $$\ 5x=0.01^x$$ I have tried to use logarithms. It would be a huge help if someone could help because no matter what I do $\ x$ always gets stuck in a logarithm. ...
9
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1answer
104 views

Are these equations known?

Hello I found two equations that lead to constant e. I wonder if they are known. I think especially first one is most likely known but I couldn't find, it is hard to search google with all these ...
1
vote
1answer
21 views

What is this equal to? : $|A+B|^2$ where $A = P e^{ia}$ and $B = Q e^{ib}$

$A$ and $B$ are two complex numbers: $A = P e^{ia}$ $B = Q e^{ib}$ I would like to know what is this equal to? : $|A+B|^2$ Please also give a small proof if possible.
2
votes
2answers
32 views

Finding the interval after substitution

Given this problem $$8\cdot 3^{\sqrt{x}+\sqrt[4]{x}}+9^{\sqrt[4]{x}+1}\geq 9^{\sqrt{x}}$$ After simplifying I get $8\cdot 3^{\sqrt[4]{x}-\sqrt{x}}+9\cdot 3^{2\sqrt[4]{x}-2\sqrt{x}}\geq 1$ now ...
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1answer
24 views

Simplify expression with lambert w-Function

I have an expression and i am almost sure what it equals: $ e^{-W_{-1}\left(-\frac{log\left(x\right)}{x}\right)} $ I only need a simplified version of this expression for $x\geq e$. I assume: ...
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0answers
15 views

Moving Logarithmic function equation plotted on log log paper up or down on the y axis

I'm hitting a stump here. I have a logarithmic function plotted on log log paper so it's a straight line. So let's say I have this entire line plotted out on the log log paper....how would I simply ...
0
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1answer
50 views

If $E(z)= \sum _{n=0 }^{\infty }\frac {z ^n } {n! } $, how is $E(0) $ defined?

If $E(z)= \sum _{n=0 }^{\infty }\frac {z ^n } {n! } $, how is $E(0) $ defined? The exponential function for complex $z $ is defined in Rudin's principles as the power series $ \sum _{n=0 }^{\infty ...
0
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2answers
75 views

Solve $2^x=13 \bmod 3^4$

Solve $2^x=13\bmod 3^4$ I know $\log13=30\bmod 3^4$ and $\log16=15 \bmod 3^4 $ I've tried subbing $\log13/\log16$ for $2$ but I am not sure what to do next.
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3answers
42 views

How to do the derivative when an exponent has an exponent

I am trying to solve an equation that is in the form of $y(x) = (c + x^2)^{x^2}$. Note $c =$ constant My initial thoughts are I need to look into using ln and e to solve this. However what I am ...
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0answers
12 views

Exponential distribution of a value over a range

If I have a value and I want to exponentially distribute it over a set of points how can I do that so that the sum of each point's value equals the original value? Example: I have a value of 5 and a ...
2
votes
2answers
48 views

Where we have used the condition that $ST=TS$, i.e, commutativity?

definition Let $A$ be an $n\times n$ matrix. Then for $t\in \mathbb R$, $$e^{At}=\sum_{k=0}^\infty \frac{A^kt^k}{k!}\tag{1}$$ Proposition If $S$ and $T$ are linear transformations on $\mathbb R^n$ ...
5
votes
3answers
257 views

Doubt in the defn of exponential operator.

definition Let $A$ be an $n\times n$ matrix. Then for $t\in \mathbb R$, $$e^{At}=\sum_{k=0}^\infty \frac{A^kt^k}{k!}\tag{1}$$ But in this definition, What they are meaning by the term $A^kt^k$, If I ...
1
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3answers
50 views

Integral $\int_0^∞ x^2 \exp(-2kx)$ not defined when putting limits

I have this integral : $\displaystyle\int_0^∞ x^2 \exp(-2kx)\,dx$ now, integrating by parts ($x^2$ as first function and $\exp(-2kx)$ as second), \begin{align} I & = \int_0^∞ x^2 \exp(-2kx)\,dx ...
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2answers
51 views

Determining how long a body has been dead using the number e

I have recently seen a quote about determining how long a body has been dead: “Dead bodies lose heat exponentially, and therefore e can be used in an appropriate equation to determine how long ...
2
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1answer
41 views

Find fundamental matrix of a 2x2 matrix with rank 1

$$ x'(t) = \left[\begin{array}{cccc}0&1\\0&t\end{array}\right]x(t)$$ I am having trouble computing the fundamental matrix. I get: $$ x1(t) = x2(0)*exp(0.5t^2) $$ $$ x2(t) = x2(0)*exp(0.5t^2) ...
4
votes
6answers
113 views

Find $\lim_{x \to \infty} \left(\frac{x^2+1}{x^2-1}\right)^{x^2}$

How to calculate the following limit? $$\lim\limits_{x \to \infty} \left(\frac{x^2+1}{x^2-1}\right)^{x^2}$$
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2answers
58 views

Complicated Exponential Equation

So I was trying to solve the following equation. I'm fairly good at mathematics so the fact that I have no idea what to do in order to solve this question kind of annoys me. I thought I'd see if ...
0
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1answer
13 views

Algorithm for smooth exponential curves

I want to plot an exponential curve between 256 and 0. Using the following equasion, I get the resulting data set. (Please note that I am rounding any decimals down to nearest whole number throughout ...
-1
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3answers
69 views

How to demonstrate the inequality $ x^e \leq e^x $? [closed]

How can you show that $$ x^e \leq e^x $$ for any $x > 0$?
0
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1answer
26 views

Equation for exponential deceleration so the objects “stops” at destination

Let's say my ship's velocity during deceleration phase is given by: v(t) = v0 * exp(-k * t) where v0 is the speed at the time ...
1
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2answers
31 views

How to take this exponentials

Given an expansion of a cumulant function as follows: $$ \kappa(t) = \frac{t^2}{2} + \frac{\rho_3 t^3}{6\sqrt{n}} + \frac{\rho_4t^4}{24n} +O\left(\frac{1}{n\sqrt{n}}\right), (*) $$ where ...
2
votes
1answer
74 views

How to calculate the sum $ x + x^2 +…+ x^n$ [closed]

How can I get the result of this sum: $$ x + x^2 +...+ x^n $$
2
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4answers
74 views

How do you solve $e^x=ex$?

I mean the answer is really simple. It's one but how do you solve this equation?
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0answers
23 views

Measuring the spread of epidemics

Imagine you were tasked with spreading an epidemic (or the cure to one, if it makes it easier, same math). This spread happens in one-on-one meetings happening every ten minutes. Each person in the ...
2
votes
1answer
30 views

What is the name of this function, $f(x) = \frac{1}{\exp(-kx)+1}$?

What is this function, $f(x) = \frac{1}{\exp(-kx)+1}$, where $k$ is a constant, called?
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0answers
48 views

Discretization of continuous system dynamics

Assume a system $$ \dot x = A x + Bu, \qquad x\in\mathbb R^n, u\in\mathbb R^m. $$ Now I want to calculate the matrices $A_d$ and $B_d$ such that the discrete system with sampling interval $T$ $$ ...
0
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1answer
36 views

Intervals of Convex and Concave function

Find the intervals where the function is convex and concave. $$f (x) = e^{2x} - 2e^x$$ I tried differentiating twice, and my answer is: concave when $x < \ln (1/2)$ and convex when $x > ...
0
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1answer
36 views

Is it possible to estimate $e$ based on $N$?

Consider a sequence of random numbers $u_1,\dots,u_n$ obtained from a continuous distribution $F$. Let $N$ be the first one that is greater than its immediate predecessor. In othe words, ...
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2answers
60 views

What is the inverse of $f(x) = a⋅e^{bx} + cx + d$

Does an inverse function for $f(x) = a⋅e^{bx} + cx + d$ exist where a, b, c, d are constants? If so, what is it? I've tried lots of methods, but they've all failed. What I ended up doing to ...
0
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1answer
31 views

Use given identity to computer exponent of 4x4 matrix

I've been given an identity (that I don't know how to prove unfortunately), and been asked to use it to compute exp$(xM)$, where $$ M = \begin{bmatrix} 1 & 1 & 1 & 1 \\ ...
0
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0answers
26 views

Why does this derivation of exponential growth give a different, but apparently not wrong, answer?

Here's a fairly standard derivation of the exponential growth equation. $\frac{\text{d}x}{\text{d}t} = kx$ $\int\frac{1}{x}\text{d}x = \int k\text{d}t$ $ln(x)=kt+C$ $x=C'\text{e}^{kt}$ Right? ...
0
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0answers
40 views

Proof of a generator for coprime integers

Take the integers coprime to $p$ (all but multiples of $p$). Does there always exist an integer (generator) $a$ coprime to $p$ that generates the entire group of coprime integers under powers of $a$? ...
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2answers
39 views

Integer solutions to an exponential equation

Are there any integer solutions for the equation $$2^x+2=5^y$$ Similarly, are there any solutions to $$2^x-2=5^y$$ I ask the second because I'm not sure if they are answered similarly. Put ...
1
vote
1answer
51 views

Keeping an exponentially decaying system steady.

To give a bit of background: I am trying to figure out what amount of substance X to continuously add over a time interval in order to keep it constant in a system where substance X has the half-life ...
1
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0answers
30 views

Does Euler's recurrence relation for partitions imply that the partition function grows exponentially

Can one, just by manipulating the series, demonstrate that the partition function must be growing exponentially or at least that it is unbounded by any polynomial? If so, then how would it be done. ...
0
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0answers
12 views

General equation for specific rotated and translated exponential function through two points

Given the exponential function yα(x) = AeB(x-x0)+y0 that passes through points P0=(x0,y0) and P1=(x1,y1), I'm trying to find a function yβ(x), which passes through the same two points and ...
2
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1answer
36 views

For every $z\in \Bbb C$, the exponetial series converges uniformly on every bounded subset of the complex plane

$$\operatorname{exp}(z)=\sum_{n=0}^\infty \frac{z^n}{n!}$$ This series converges uniformly on every bounded subset of the complex plane. What does this mean in simple terms?
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1answer
23 views

Exponential of a complex number converges absolutely

$$\operatorname{exp}(z)=\sum_{n=0}^\infty \frac{z^n}{n!}$$ This converges absolutely for every $z\in \Bbb C$. What does this mean to a layman?
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1answer
19 views

Calculating limits using the definition of number e

I have some examples in Demidovič using this technique and there seems to be no reliable source for them online, so I'll make a small tutorial. Example 1: ...
0
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2answers
41 views

What equation has the form f(x) = n exp(m x)?

I'm a programmer working on a calculation with a curve trend. I'm using OpenOffice Calc (like MS Excel) and it's given me a formula for a graph that I don't understand. I can't find this form ...
8
votes
6answers
175 views

Why is $\ln(x^x)=x\ln(x)$ valid?

I know that $\ln(x^k)=k\ln(x)$ for any constant $k$, but why is $\ln(x^x)=x\ln(x)$. The exponent $x$ is not constant.
3
votes
1answer
71 views

Is there a number $x\neq0$ whose products with $\pi$ and with $e$ are both rational?

Does there exist a number $x\neq0$, such that $[x\cdot\pi\in\mathbb{Q}]\wedge[x\cdot{e}\in\mathbb{Q}]$? I thought this question would be easy to answer, but it turns out otherwise. Obviously ...
1
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1answer
49 views

Prove that $ exp_{a}(\frac{p}{q}) = \sqrt[q]{a^{p}} \space \forall \space p,q \in \mathbb{Z} $

Prove that $ exp_{a}(\frac{p}{q}) = \sqrt[q]{a^{p}} \space \forall \space p,q \in \mathbb{Z} $ with $ q \geq 2 $ I'm not sure how to approach this question. I was thinking through in induction with ...
1
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2answers
26 views

Is the exponential function continuous for complex numbers?

Hey this might be a dumb question so here it goes: Is $e^{(x)}$ continuous for $x\in \mathbb{C}$? Specifically this question arose while solving the differential equation in the form of ...
2
votes
1answer
55 views

Find all real solutions for $x$ in $2(2^x- 1) x^2 + (2^{x^2}-2)x = 2^{x+1} -2 .$

Find all real solutions for $x$ in $2(2^x- 1) x^2 + (2^{x^2}-2)x = 2^{x+1} -2 .$ I have found out that the answers were 0,1, and -1. But I used sort of a guess-and check way. ...