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tbrugere
  • Member for 5 years, 1 month
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4 votes

A Probability Question of Infinite situation

2 votes

What is the $L^p_\text{loc}(\mathbb{R})$ topology?

2 votes
Accepted

Are there any symbolic solvers that can use matrices and vectors directly?

2 votes
Accepted

Why replacing $\cos(x)$ by $e^{ix}$ in an integral and taking the real part doesn't always work? When does it work?

2 votes
Accepted

Interior of linear subspace

1 vote

Evaluate the integral $\int_{\gamma} e^{1/z}dz$

1 vote
Accepted

Find range of the function $f(x)=\sqrt {2\{x\}-\{x\}^2}-\frac 34$

1 vote

Find the largest subset of $\mathbb{C}$ where $g(z)$ is holomorphic

1 vote

How to find the modulus of vectors in this question (as seen in the image):

1 vote

Take a desired factor out of a polynomial expression

0 votes

Given a vector normal to a plane, how to find two vectors parallel to the plane?

0 votes

Proof regarding the square root of a natural number $m>1$ and a prime number $p$, when $p \nmid m$

0 votes
Accepted

Let $L:V \to W$ and $V$ is finite-dimensional. Show that if $\dim\ker(L)={0}$, then $V\cong L(V)$

0 votes

is the approach shown below in $\lim_{n \to \infty} [\frac{1}{\sqrt{n^2+1}}+\frac{1}{\sqrt{n^2+2}}+\cdots+\frac{1}{\sqrt{n^2+n}} ]=1$ correct?

0 votes

If $f(t)$ is continuous for $t$ $\in [0,1]$, $f' > 0$ and $f''(t) > 0$ for $t \in (0,1)$, do we have that $f'(t)$ is strictly increasing on $[0,1]$.