Maximilian Janisch
Hello!
I am a 17 years old student of Mathematics at the University of Zurich / ETH Zurich. (Currently pursuing my Master). This makes me the youngest student of Switzerland. For more information, see for instance my Homepage or this Wikipedia-Article about me (both german).
Greetings, Maximilian
Also, here are some boxes:
$$\bbox[5px,border:2px solid #C0A000]{ \sum_{n=1}^\infty \frac1{n^2}=\frac{\pi^2}6}$$ and $$\bbox[10px,#ffd]{\int_{-\infty}^\infty \exp(-x^2)\,\mathrm dx=\sqrt\pi}$$ and $$\bbox[15px,border:1px groove navy]{\zeta(-1)=-\frac1{12}}$$
Note: Here are some previous versions of my SE profile: https://web.archive.org/web/20200317200320/https://math.stackexchange.com/users/631742/maximilian-janisch
$$\displaystyle\large ^{@}\left(\bullet \qquad\bullet \atop \smile\right)^{\! @}$$
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Switzerland
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Member for 2 years, 3 months
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22 profile views
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Last seen Apr 13 at 21:07
Communities (22)
Top network posts
- 22 Find $\int_1^a \sqrt[5]{x^5-1}\ dx + \int_0^b \sqrt[5]{x^5+1}\ dx$, where $a^5-b^5 = 1$
- 22 Does removing finitely many points from an open set yield an open set?
- 20 Are there two functions $f, g$ such that $f(g(x)) = x^3$ and $g(f(x)) = x^5$?
- 20 How to prove $e^x\left|\int_x^{x+1}\sin(e^t) \,\mathrm d t\right|\le 1.4$?
- 19 How to prove that there exist no functions $f,g:\Bbb{R}\to\Bbb{R}$ such that $f(g(x))=x^{2018}$ and $g(f(x))=x^{2019}$?
- 17 Proof that the ratio between the logs of the product and LCM of the Fibonacci numbers converges to $\frac{\pi^2}{6}$
- 15 When is the number of areas obtained by cutting a circle with $n$ chords a power of $2$?
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May 29 '19
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Jan 15 '19