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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Each natural number x greater than 1 has log x digits?

So I'm trying to come up with a solution to this task: Each natural number x greater than 1 has log x digits. Is this true? And if it isn't, what would be the correct answer? After plugging several numbers as "x" I'm assuming there is in fact a…
khand
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Find range of the following function.

Find the range of $$f(x)=\log_2(\log_{\frac12} (x^2+4x+4))$$
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Is $\frac1{\log x}$ defined at $x = 0$?

Since $\log (x)$ is only defined for $x \gt 0$, then $1/\log (x)$ should only be defined for $x \gt 0$. However, my graphing calculator says otherwise. Similarly, would $x\log(x)$, $x/\log (x)$ and $x + \log (x)$ be defined at $x = 0$?
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Solve equation like $f(x) = \log_2(g(x))$

I've tried to solve two equations, and they look similar to me. $$f(x) = \log_2(g(x))$$ In the original task, I should compare them, but I wanna solve them as equations. Is it possible using analytical method? $$f(x) = \log_2(g(x))$$ Equations:…
Kamushek
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how to simplify a quadratic logarithmic equation?

So the problem started off as the following $99n = \log(n)^2 - log(n)$ And I want to solve for n. My thought is to raise both sides to the 10 but I don't think that would work... Expanded the equation looks like this $99n = \log(n)\log(n) -…
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How to answer a logarithm question

Can anyone please show me how to solve this question step by step? $x$ should equal 60. $$\log_2 x - \log_2 5 = 2 + \log_2 3$$ Thanks in advance
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Solve for logarithmic equation. Log on one side.

How do I solve for $k$ in the following equation? $$\log _{10}4 = 2k$$ I expect that the solution will be pretty simple, yet I can't seem to figure it out.
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If $a=1+\log_xyz, b=1+\log_yzx, c=1+\log_zyx$, then $ab+bc+ac=$

MY SOLUTION Let’s take a. So $1=\log_xx$ Therefore $$a=\log_xxyz$$ Similarly $$b=\log_yxyz$$ and $$c=\log_zxyz$$ In the original question, the expression becomes $$(\log_xxyz)(\log_yxyz)+(\log_yxyz)(\log_zxyz)+(\log_zxyz)(\log_xxyz)$$ I could not…
Aditya
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If $\log_27=x$ is $x$ irrational or rational?

$x$ will definitely be between $2$ and $3$, but why does it have to irrational? Let’s assume that you don’t have the log table and no calculator, then how do you determine if it’s rational or irrational? It’s probably an obvious answer like $x$ will…
Aditya
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Using integers $a$ and $x$ in $a^x$, why does the # of digits of the exponentiated power multiplied by the $\log_{10}(a)$ equal $\pm1$ the exponent x?

There have been multiple questions surrounding the determination of the number of digits in an integer power when given the base and exponent, here and here and here. My question isn't how to determine how many digits are in the power produced by…
JohnGalt
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$\int\log(x+1)$ = something containing $\log(x+1)$?

For $\int\log(x+1)$, http://calculus-calculator.com/integral/ returns $$-x+(x+1)\log(x+1)-1+c$$ The output contains the input. Does that mean the function is recursive?
mjc
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Differential identity involving logarithm

Studying effective string theory I found the following identity: $$ \ln x = \lim_{s \rightarrow0}\frac{d x^{s}}{ds} . $$ I am however puzzled about its derivation. Naively I would say that $$ \lim_{s \rightarrow0}\frac{d x^{s}}{ds} = \lim_{s…
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Let $a = \log 2, b = \log 3,$ and $c = \log 7$. Find $\log \frac{147}{36}$ in terms of $a, b,$ and $c.$

I know what the function $\log$ means, but I dont' know how to apply to a problem like this: Let $a = \log 2, b = log 3,$ and $c = \log 7$. Find $\log \frac{147}{36}$ in terms of $a, b,$ and $c.$ Source: Rickards Invitational (Algebra II…
NJC
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Solving $\ln\left(\frac{\ x-2}{x-3}\right)=2$

Question: $$\ln\left(\frac{\ x-2}{x-3}\right)=2$$ Workings: $\log_{x-3}(x-2)=2$ $(x-2)=(x-3)^2$ $(x-2)=(x^2-6x+9)$ $x^2-7x+11=0$ Use -b formula and arrive at $x=\frac{7+\sqrt 5}{2}$ and $x=\frac{7-\sqrt 5}{2}$ how's my workings holding up…
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Logarithmic/linear scale formula for 0.2:5mil to 10:1mil

I'm still trying to wrap my head around logs and figuring out how to derive formulas from given value pairs. In this example, at a value of 0.2:5mil should be derived, and at 1:1mil (so it's an inverse scale?). How can I find out the output for a…
Microsis
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