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 .

10168 questions
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Solving $\left(1/3\right)^k n = 1$ for $k$

The goal is to show that $$\left(\frac{1}{3}\right)^kn=1 \Rightarrow k = \log_3 n\,.$$ So I started with $\left(\frac{1}{3}\right)^kn=1 \Leftrightarrow \left(\frac{1}{3}\right)^k=\frac{1}{n}$ in order to use the identity $y=a^x \Leftrightarrow…
user500664
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Solve for x when $(\log_x (5x))(\log_7 x)=2$

I've been trying to use the change of base property but I'm not having much luck. Can anyone give me any ideas on how I should approach this problem? The answer is 49/5 Thanks.
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simplify $3n - 3 * 2^{\log _{3}(n)}$

How can I simplify this so I don't have a log in the exponent ? $3n - 3 * 2^{\log _{3}(n)}$
Shanks
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Solving logarithmic equation $2\log _{2}(x-6)-\log _{2}(x)=3$

This is the question: $$2\log_{2} (x-6)-\log_{2} (x)=3$$ I think I would combine the two on the left to make $2\log_{2}\big({x-6\over x}\big) = 3$ but I'm stuck at what to do with the $2$ in front of the log. Would I divide it out to get…
Grimestock
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Isolating for x in $\log_x(3\sqrt{x}) = k$

I'm having trouble isolating for $x$ in $\log_x(3\sqrt{x}) = k$ I've tried various things. Here is what I ended up with: $x^{k - \frac{1}{2}} = 3$ I don't know how to proceed. I keep getting stuck. Can anyone help?
898989
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What's wrong with this short change of base proof?

Okay so I think I have a very trivial and short proof for the change of base rule but I'm worried it might be circular or wrong since I see it nowhere. To prove $$\log_bx = \frac{\log_ax}{\log_ab}$$ Proving that $\log_ax = \log_ab*\log_bx$ will…
Tim
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$(x*(\log_{2}(x))^2)/2 = x^{3/2}$ how to solve it?

Is there a manual solution for this equation? Or I should use Wolfram: result from Wolfram.
Hmmman
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Solving $\log_5 (2x+1)=\log_3 (3x-3)$.

I am trying to resolve the equation $$\log_5 (2x+1) = \log_3 (3x-3)$$ and then of sketch the functions $y=\log_5 (2x+1)$ and $y=\log_3 (3x-3)$ get the solution $x=2$. There is an method that do not use the graphic method? Thanks for your…
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Find $n$ in a log equation

I am having trouble solving this problem. Suppose we are comparing implementations of insertion sort and merge sort on the same machine. For inputs of size $n$, insertion sort runs in $8n^2$ steps, while merge sort runs in $64 n\log n$ steps. For…
Evan Kim
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Calculate the factor increase for y=ln x

Question: Suppose $x >1$ and $x$ increases by a factor of $5$. By what factor will $y$ increase given $y = \ln(x)$? My answer: So the increase would be $$\frac{(\ln(5x) - \ln x)}{\ln x} \times 100\%$$ And then $$\frac{( \ln 5 + \ln x -\ln x )}{\ln…
LJacob
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The product of the two roots of $\sqrt{2014}x^{\log_{2014} x}=x^{2014}$ is an integer. Find its units digit

The product of the two roots of $\sqrt{2014}x^{\log_{2014} x}=x^{2014}$ is an integer. Find its units digit. I'm quite unable to solve the problem given. I have no idea how to deal with that $\sqrt{2014}$ term nor the logarithms in the exponent.…
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Inverse of natural log

I have a problem: Let $f(x)=\ln(x)$ solve each of the following equations for $x$. the question is in three parts $(f(x))^{-1}=5$ $f^{-1}(x)=5$ $f(x^{-1})=5$ My understanding is that $\ln(x)$ is the same as $\log_e X=\text{exponent}$ So in item…
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Comparing two numbers without using a calculator

I need to compare $\frac{3}{2}$ and $\ln 3$ (which is the same as $\log_e{3}$). But I need to do it without any computer etc. Thanks in advance!
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Lograthmic equation $ \frac {1}{\log_2(x-2)^2} + \frac{1}{\log_2(x+2) ^2} =\frac5{12}$ solutions

$$ \frac {1}{\log_2(x-2)^2} + \frac{1}{\log_2(x+2) ^2} =\frac5{12}.$$ I made the graph using wolfram alpha it is giving answer as 6. But how to solve it algebraically? base of logarithm is 2. Tried using taking Lcm but then two different log terms…
maveric
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How am I supposed to simplify this logarithm?

Given is $$\log_6(a)=6$$ Simplify - $$\log_6 (1/a^7)$$ and the answer is supposed to be $-42$. I don't understand what I'm supposed to do here?