Questions tagged [logarithms]

Questions related to real and complex logarithms.

The logarithm is generally defined to be an inverse function for the exponential. If $x > 0$ is a real number and $b > 0$, $b \ne 1$, then the base-$b$ logarithm is defined by

$$\log_b(x) = y \iff b^y = x$$

The most commonly used bases are base $10$ and $2$ (which frequently arises in computer science), and particularly base $e$. The natural logarithm $\ln$ is defined to be $\log_e$.

Alternatively, the natural logarithm can be defined to be a primitive of the function $$f(t) = \frac{1}{t}$$ subject to the condition that $\ln{1} = 0$.

In the study of complex numbers, the solutions $a$ of $e^{a} = z$ are called complex logarithms. This uniquely specifies the modulus of $a$, but not its argument; as such, we define the principal logarithm $\operatorname{Log}(re^{i\theta}) = \ln{r} + i \theta$, with the restriction $-\pi < \theta \le \pi$ (or alternatively, $0 \le \theta < 2\pi$). This leads to a branch cut, or discontinuity - alternatively, the complex logarithm can be viewed as a multi-valued function.

Reference: Logarithm.

This tag often goes along with .

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Solve for x: $4\log_{x/2}(\sqrt{x}) + 2 \log_{4x} (x^2) = 3 \log_{2x} (x^3)$

$$4\log_{x/2}(\sqrt{x}) + 2 \log_{4x} (x^2) = 3 \log_{2x} (x^3)$$ This is a different type of equation. Our school has not taught this type yet. But this came in our exams. Can someone please help? I don't understand the bases are all different.…
Ritwika
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Find the possible values of $x$ if $2^{2x+1} = 3(2^x) -1$

Find the possible values of $x$ if $2^{2x+1} = 3(2^x) -1$ I know that $x=0$ and $x=-1$ are possible values of $x$ by looking at the equation. I need help understanding how to use logarithms to solve questions of this type. Here is what I'm doing,…
mikoyan
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How to solve the equation $x \log \log x = n$

I would like to solve the equation $x \log\log x = n$. I've seen a lot of post about the equation $x \log x$ but here I have a composition of $\log$. How can I solve it ? Thank you very much.
Dingo13
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Solving Weird Logarithms without a Calculator

Given "$x = \log 8$", it is very easy to rewrite the expression as "$10^x = 8$", which cannot easily be solved for by hand. However, if I plug "$x = \log 8$" into my calculator, I get "$x = 0.903089986992$". So How Does It Know? Is there some sort…
user303830
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What is $\log(0/x)$?

$\log(a/b) = \log(a) - \log(b)$; Is $\log(0/x) = -\log(x)$? I watched a video claiming $\log(1/x) = -\log(x)$, which I get because $1/x = x^{-1}$ and $\log(x^y) = y(\log(x))$ but $\log(1)$... I get it, $\log(1) = 0$. Back to my question…
Tobi
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Approximation $\log_2(x)$

Can anyone share an easy way to approximate $\log_2(x)$, given $x$ is between $0$ and 1? I'm trying to solve this using an old fashioned calculator (i.e. no logs) Thanks! EDIT: I realize that I stepped a bit ahead. The x comes in the form of a…
Dimebag
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Intutively, why does $x^{\frac{1}{\ln x}} = e$?

For any $x \gt 0$, we have this identity: $$x^{\frac{1}{\ln x}} = e\text.$$ You can see this by using the fact that $x = e^{\ln x}$. I'm wondering if there's a good intuitive explanation for this one, given that $x^{\frac{1}{k}}$ is the operation…
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$\ln^2(x)\overset{?}=2\ln(x)$

Is it the same as $\ln(x)^2$? And if so, is it equal to $2\ln(x)$? Thanks in advance.
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What is the value of $\log_b m^{\log_b n}$?

What is the value of the following expression? $$\log_b \left( m^{\log_b n} \right)$$ As far as I know it should be: $$\log_bn\;\times\;\log_bm$$ Can it be simplified further? If so how? Also, I read somewhere that it is equal to: $$\log_b m$$ If…
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Solve for $x\quad \log_2(2^n) = \log_2(1+x)$

I am out of practice with logs, but this is derived from the channel capacity theorem. $$B\log_2\left(1 + \frac SN\right)$$ Solve for $x $ $$\log_2(2^n) = \log_2(1+x)$$ I need this equation manipulated so that $x$ is the answer. thanks!!!
MoMan
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Approximate log of the sum

Suppose I want to approximate the following sum: $\log( \sum_{n=1}^\infty s_n e^{X_{n}})$, where $(X_n)$ is linear. Is there any smart way to approximate the first sum non-numerically?
phdstudent
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Rejecting a solution.

Why does it for $x^2=9$ we get two solutions, while if we use the "log both sides" property the negative solution is rejected? which method is true and why?
Michael
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How many times do these curves intersect?

When the curves $y=\log_{10}x$ and $y=x-1$ are drawn in the $xy$ plane, how many times do they intersect? To find intersection points eq.1 = eq. 2 $$\begin{align*} \log_{10}x &= x-1\\ 10^{x - 1} &= x \tag{a} \end{align*}$$ Answer would be no. of…
noi.m
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$c= (a^{x}-b^{x})$ where $a$,$b$ and $c$ are known real constants. Solve for $x$.

I tried taking $\log$ on both side but i ended with $\log(a^{x}-b^{x})$ which is difficult to solve. Does anybody has idea how to solve the above equation for $x$.
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Is $0 \times \ln(0) =\ln(1) $ true?

Can we affirm that: $0 \times \ln(0) = \ln(0^0) = \ln(1) = 0$? The problem is $\ln(0)$ is supposed to be undefined but it works
aqww
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