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visits member for 2 years, 11 months
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11h
comment I need to identify $G/H$ upto isomorphism.
$G/H\cong\mathbb{C}^*$ ..................
11h
accepted I need to identify $G/H$ upto isomorphism.
12h
asked I need to identify $G/H$ upto isomorphism.
19h
awarded  Socratic
1d
awarded  Notable Question
1d
accepted $T$ is bijective and homeomorphism.
1d
revised $T$ is bijective and homeomorphism.
added 3 characters in body
1d
asked $T$ is bijective and homeomorphism.
1d
asked which of the following sequences $\{f_n\}\in C[0,1]$ must contain a uniformly convergent subsequence?
1d
accepted set of all $2\times 2$ matrcies having neither eigen value is real
1d
comment Example of of sequence of continous functions
great examples .......................
1d
answered Which of the following sets are compact?
Jan
26
comment set of all $2\times 2$ matrcies having neither eigen value is real
I must say i have not understood a bit
Jan
26
comment how to conclude a subset of $M_n(\mathbb{C})$ is compact from spectral radius?
to all dudes, what is the general set up to tackle this kind of questions?
Jan
26
asked how to conclude a subset of $M_n(\mathbb{C})$ is compact from spectral radius?
Jan
26
asked set of all $2\times 2$ matrcies having neither eigen value is real
Jan
19
comment $ABCD$, $P$ is any interior point, $PA=24, PB=32, PC=28, PD=45$
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Jan
19
comment $ABCD$, $P$ is any interior point, $PA=24, PB=32, PC=28, PD=45$
question editeddddddddddddddddd
Jan
19
revised $ABCD$, $P$ is any interior point, $PA=24, PB=32, PC=28, PD=45$
added 47 characters in body
Jan
19
comment Which of the following subsets of $M_n(\mathbb{R})$ are compact (NBHM)
@S.C. No, from $M_n(\mathbb{R})$