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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Logaritmic equation $\log_2 \log_x(x-3y)=-1$

Solve system of equations $\log_2 \log_x(x-3y)=-1$ $x\times y^{\log_x y}=y^{\frac{5}{2}}$ I managed to reduce second equation to $\frac{1}{\log_x y} +\log_x y =\frac{5}{2}$ But I dont know what to do with first one.
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Log question: Is there any way to manipulate the following equation to get a specific outcome?

I've been working at this for hours. I want to know if it's even possible for the equation $n=(\frac{3}2)^k$ to be manipulated to become $n^{log_23}$. Edit: What about $(3/2)^{log_2n}$ to become $n^{log_23}$?
dunlop
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Given that $x, y, a$ are real numbers that satisfy $(\log_ax)^2+(\log_ay)^2 - \log_a(xy)^2 \le 2 $ and $\log_ay\ge 1$, find the range of $\log_ax^2y$

Given that $x, y, a$ are real numbers that satisfy $$(\log_ax)^2+(\log_ay)^2 - \log_a(xy)^2 \leq 2 \text{ and } \log_ay\geq1$$ Find the range of $\log_ax^2y$ My try: Let $b= \log_ax, c= \log_yx, 2b+c = \log_ax^2y$ $$b^2 + c^2 - 2b - 2c -2…
SuperMage1
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Let $\log_{10}⁡2 = x$ and $\log_{10}⁡3 = y$. Express the $\log_{10}5$ in terms of $x$ and/or $y$.

Let $\log_{10}⁡2 = x$ and $\log_{10}⁡3 = y$. Express the $\log_{10}5$ in terms of $x$ and/or $y$. I am stuck on finding a way to express $5$ as a product or quotient of $x$ and $y$. Any help, comment, or suggestions on how to solve this problem will…
AYA
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How to make a variable in a log equation the subject?

I have been trying to rearrange an equation involving a log function, as shown below: $$ log(a(b-1)N/s^{-b} + 1) = y. $$ I am trying to make the N term the subject of this equation, but am having some trouble in doing this. From using a Symbolab…
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Solving the Logarithmic Equations

$$5(\log_x y+\log_y x)=26 \tag1$$ $$xy=64 \tag2$$ From $(1)$, we have $$5\left(\log_x y + \frac{1}{(\log_x y)}\right)=26 \tag3$$ For the next step however, my book shows the following and proceeds to solving it: $$(\log_x y-5)\left(\log_y…
Cheng
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Finding modulus of two numbers using logarithms!

Just want to know if is there a way to find remainder of a division using logarithms. To clarify the subject: if we calculate $\log_{10}{3125}$ it is like: $3.494850021$. I know if I subtract $3$ from the result and do the $10^\text{result}$ I'll…
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Logarithm of sum

I have an equation of the form: $Y = A + A*e^{-b_1}+A*e^{-b_2}+A*e^{-b_3}+...+A*e^{-b_n}$. I want to get rid of the exponential term. So, I am thinking of using a logarithm on both sides. It will help me to use geometric/arithmetic series for the…
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If you have a $-\log$ of a fraction, why does taking the reciprocal change the sign at the front?

For example,$$-\ln\left(\frac{\ln\sqrt{...\sqrt{\pi}}}{\ln\pi}\right)$$ becomes $$\ln\left(\frac{\ln\pi}{\ln\sqrt{...\sqrt{\pi}}}\right)$$ if you take the reciprocal of the inside function. Is this just a rule to memorise?
user71207
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Logarithmic function

Solve for x; $\log_{12}x=\frac{1}{2}\log_{12}9+\frac{1}{3}\log_{12}27$ The only thing throwing me off is the one third and one half, which my book does not say how to fix.
Gᴇᴏᴍᴇᴛᴇʀ
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Upper bound on logarithm, of a binomial quotient.

What is the tighest upper and lower bounds for $\log{ (\binom{n}{n/2})}$? I know that a naive upper bound would be $n \log{n}$ but is there any tighter bound? If so, how do I approach to solve this?
am_rf24
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Solve for $x$ in $3^x=5^2$ by logarithm.

Was solving using properties of logarithm but got stuck at the equation $x\log 3=\log5+\log5$
Maths
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Need help converting log to linear

This is my first post to stackexchange. I have a set of base-ten log values in the range 0 to 1. I want to linearize these into values which are also in the range 0 to 1. Is it possible? If so, how? If not, am I thinking about the problem the…
jisner
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ln(x) in real and ln(x) in complex.

Given $$e^{e^x}=1$$ Wolfram gave me the answer $$x=\ln{(2i\pi n_1)}+2i\pi n_2\quad n_1,\,n_2 \in \Bbb N$$ doesn't that mean if i have $e^x=1$, The answer is $x=\ln(1)+2i\pi n, n\in \Bbb N$. But honestly, it bothers me. Why we add an extra $2i\pi…
user516076
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Mathematics (Logarithm): Solution to question $h = \text{lg}(n) + 1$

If we are given the following equation: $h = \text{lg}(n) + 1$ What is the value of $n$ in terms of $h$? $n = ?$ Explain how you got to that conclusion.