Newbetuts

Is there a more elementary way to arrive at: $\ln(m)=\lim_{n\to\infty}\sum_{k=n+1}^{mn}\frac{1}{k}$?

Number system with $e^x = 0$ for some $x$

Write the expressoin in terms of $\log x$ and $\log y \log(\frac{x^3}{10y})$

How to compare logarithms $\log_4 5$ and $\log_5 6$?

Hints on calculating the integral $\int_0^1\frac{x^{19}-1}{\ln x}\,dx$

Why is it that $ \frac{x^{\frac{1}{2^{15}}}-1}{0.000070271} \approx \log_{10}(x)$?

How to know if $\log_78 > \log_89$ without using a calculator?

Why do these "equal" logarithms give different answers

Problem with estimating a sequence with intuition

Antiderivative of $\log(x)$ without Parts

Proving $x+\sin x-2\ln{(1+x)}\geqslant0$

Show that, for $t>0$, $\log t$ is not a polynomial.

Is showing $\lim_{z \to \infty} (1+\frac{1}{z})^z$ exists the same as $\lim_{n \to \infty} (1+1/n)^n$ exists

Prove $2(x + y)\ln \frac{x + y}{2} - (x + 1)\ln x - (y + 1)\ln y \ge 0$

Which is more preferable to write $\log(x)$ or $\ln(x)$ [duplicate]

Proof of Ramanujan's identity

New posts in logarithms

Motivation for definition of logarithm in Feynman's Lectures on Physics

Is there a different approach to evaluate $\int \ln(x)\,\mathrm{d}x?$

Is the difference of the natural logarithms of two integers always irrational or 0?

The Generalisation of $\lim _{x\to \:0}\:\frac{\left(e^x-1\right)}{x}=1$

Is there a more elementary way to arrive at: $\ln(m)=\lim_{n\to\infty}\sum_{k=n+1}^{mn}\frac{1}{k}$?

Number system with $e^x = 0$ for some $x$

Write the expressoin in terms of $\log x$ and $\log y \log(\frac{x^3}{10y})$

How to compare logarithms $\log_4 5$ and $\log_5 6$?

Hints on calculating the integral $\int_0^1\frac{x^{19}-1}{\ln x}\,dx$

Why is it that $ \frac{x^{\frac{1}{2^{15}}}-1}{0.000070271} \approx \log_{10}(x)$?

How to know if $\log_78 > \log_89$ without using a calculator?

Why do these "equal" logarithms give different answers

Problem with estimating a sequence with intuition

Antiderivative of $\log(x)$ without Parts

Proving $x+\sin x-2\ln{(1+x)}\geqslant0$

Show that, for $t>0$, $\log t$ is not a polynomial.

Is showing $\lim_{z \to \infty} (1+\frac{1}{z})^z$ exists the same as $\lim_{n \to \infty} (1+1/n)^n$ exists

Prove $2(x + y)\ln \frac{x + y}{2} - (x + 1)\ln x - (y + 1)\ln y \ge 0$

Which is more preferable to write $\log(x)$ or $\ln(x)$ [duplicate]

Proof of Ramanujan's identity