Find answers to your questions about Mathematics or help others by answering their Mathematics questions.
Let$B = { mathbb{R} } cup { (a,b) capmathbb {Q} , alt b , a,b inmathbb{Q}}$ Thus, a set $V in B$...
Asked on 01/07/2022 by roslavets
1 answerI have a differential equation $X'=AX$ where $Ainmathcal M_n(Bbb R)$. The question is to prove that if all the solutions have a constant norm then $A$ is skew-symmetric matrix. What...
Asked on 01/07/2022 by As soon as possible
3 answerLet $sigma(x)$ denote the sum of divisors of the positive integer $x$. A number $y$ is said to be perfect if $sigma(y)=2y$. Denote the abundancy index...
Asked on 01/07/2022
1 answerQuestion: Given Lebesgue integrable $f: mathbb{R}rightarrow [0,infty)$, prove the following series converges almost everywhere on $mathbb{R}$:$$varphi(x) = lim_{krightarrow infty} sum_{t=-k}^k f(t+x)$$ Attempt: Towards a contradiction suppose...
Asked on 01/07/2022 by Christopher Rose
1 answerLet $Omega subset mathbb{R}^n$ be an arbitrary open set and $(x_n)_{n inmathbb{N}} subset Omega$ a sequence. Let $(a_n)_{n inmathbb{N}} subset mathbb{C}$ be a sequence such that...
Asked on 01/07/2022
1 answerI'm supposed to evaluate the following limit using the cosine of a sum and one of the "special limits" which are ${lim_{xto 0}frac{sin(x)}{x}=1}$ and ${lim_{xto 0}frac{1-cos(x)}{x}=0}$. The limit...
Asked on 01/07/2022 by DCdaKING
4 answerI am using Taylor Expansion for the following problem, but for some reason I am getting wrong solutions from a program I am running it on. Can someone please help...
Asked on 01/07/2022 by brucemcmc
1 answerThis is 11-4(a) in Lee's "Introduction to Smooth Manifolds": Let $M$ be a smooth manifold with or without boundary and $p$ be a point of $M$. Let...
Asked on 01/07/2022 by Fred Akalin
1 answer$$ sum_{n=1}^infty csc^2(omegapi n)= frac{A}{pi} +B $$ if $omega =-frac{1}{2}+frac{sqrt{3}}{2}i$ find $frac{A^2}{B^2}$My Attempt$$ sum_{n=1}^infty csc^2(omegapi n)= sum_{n=1}^infty csch^2(iomegapi n)= 4sum_{n=1}^infty big(e^{pi n big( frac{i}{2} +...
Asked on 01/07/2022 by hwood87
2 answerLet $f: [a,b] to R$ be a differentiable function of one variable such that $|f'(x)| le 1$ for all $xin [a,b]$. Prove that $f$ is a...
Asked on 01/07/2022
2 answerGet help from others!
Recent Questions
Recent Answers
© 2024 TransWikia.com. All rights reserved. Sites we Love: PCI Database, UKBizDB, Menu Kuliner, Sharing RPP