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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Intersection of two functions, logarithms

I have to calculate the intersections of the two following functions: (i) f(x) = $3^x$ and $g(x) = 2^{-x}$ (ii) f(x) = $e^{-x}$ and $g(x) = 2e^x$ and I must do a mistake somewhere but I don't know where. For (i) I simply get $x \log3 = -x \log2$ and…
user66280
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Rules for natural logging both sides of an equation?

I just had a question about the rules for natural logs and I'm not too sure how to word my question into google to get the answers I'm seeking so here it goes I guess. Specifically problems like this. $1.006^{\left(60-x\right)}+\left(2\cdot…
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Prove $\log_{a} c + \log_{b} c = \log_{a+b} c$ if and only if $1 + \log_{b} a = \log_{a+b} a$

If a, b and c are positive numbers, than equality $$\log_{a} c + \log_{b} c = \log_{a+b} c$$ is true if and only if $$1 + \log_{b} a = \log_{a+b} a$$ Prove it! I have looked at the solution but it is not clear for me. We will prove that if…
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How can I compose the proof?

Prove that $$\Big(\frac{21}{20}\Big)^{100}>100.$$ I have tried proving that $$100\log\Big(\frac{21}{20}\Big)>2$$ but I was not able to evaluate it properly.
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Resolve Logarithmic inequation

$\sqrt{log_a(\frac{3-2x}{1-x})}<1$ wolfram's solution: $1 < a < 2, 2 \leq x < \frac{a-3}{a-2}\\ a=2, x \geq 2\\ a >2, x < \frac{a-3}{a-2}\\ a > 2, x \geq 2\\ 0 < a < 1, \frac{a-3}{a-2}< x \leq2 $\ I try $ D:\boxed{ \frac{3-2x}{1-x} > 0 \rightarrow…
peta arantes
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If $\log_8 3 = P$ and $\log_3 5 = Q$, express $\log_{10} 5$ in terms of $P$ and $Q$.

If $\log_8 3 = P$ and $\log_3 5 = Q$, express $\log_{10} 5$ in terms of $P$ and $Q$. Your answer should no longer include any logarithms. I noted that $\log_5 10=\frac{1}{\log_{10} 5}.$ I also noted that $\log_{5} 10=\log_5 2+\log_5 5=\log_5 2+1.$ I…
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How $\sum_{i=2}^{\sqrt n}\log_{i}(n)$ increases

I need to know in which way this sum increases: $\sum_{i=2}^{\sqrt n}\log_{i}(n)$ I believe it increases like $\sqrt n$ but I don't know how to demonstrate it.
Niser93
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Simple log equation

I have a really simple logarithm equation, but I can't for the life of me figure out why it's true. I found it in an algorithms text. $$3^{\log_4 n} = n^{\log_4 3}$$ Thank you.
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How do you simplify variables which are powers?

I have just started learning logarithms and I am struggling to solve the following $$ \begin{equation} 2^a3^b = 6 \\ 3^a4^b = 6 \end{equation} $$ How can we solve for a and b in this case? EDIT 1: Cleared up the two equations to increase…
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Getting stuck on simple logarithmic equation: $x \times \ln (x) = 1$

$$x \times \ln (x) = 1$$ I am trying to solve that equation. I used the theory $\ln(a) = \ln(b)$ being equivalent to $a = b$ and got stuck at $$x = e^{\frac{1}{x}}$$ That's as far as I went and I know there's a solution (around 1.8 or 1.9), since I…
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How to start solving this Logarithmic problem?

If $abc= 2^6$, $a, b, c \ge 0$, $\log_2 (a)\log_2 (bc)+\log_2 (b)\log_2 (c)= 10$, find $\sqrt{((\log_2 (a))^2 + (\log_2 (b))^2 + (\log_2 (c))^2}$
David HM
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logarithm manipulation

I understand that $\log n^{(\log_{\log n}n^{-1})} = n^{-1} = \frac{1}{n}$ because $x = \log n$ and $x^{\log_a x} = a$, but how does $(\log(\log n))^{(\log_{\log n}n^{-1})} = 1?$ It's assumed that log is base $2$.
dalton atwood
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Solving logarithm leaving in terms of $p$ and $q$

I would like to check the steps if Part a) is done correctly. For Part b), how do I continue from below? I seem to stuck for $\log_{10}(5)$… Here is the problem: Given that $p = \log_{10} 2$ and $q = \log_{10} 7$, express the following in terms of…
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What does $\frac12({\ln b}^2-{\ln a}^2) $ equal to

How can $$\frac12({(\ln b)}^2-({\ln a})^2) $$ be equal to $$\frac12{\ln{(\frac ba)}{\ln (ab)}} $$ I know all the logarithmic properties, but I have no idea where to start
Anttarm
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What can you raise $x$ to in order for it to be equivalent to $\ln(x)$?

Take, for example, $\frac{\ln(x)}{x^5}$. Can this be simplified into $x^n$? If there exists an answer, can it be generified to work for $\log_n x$ where $n$ is $(0, \infty]$? If it can't be, why not?
Alec
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