534 reputation
1214
bio website
location
age
visits member for 1 year, 4 months
seen 7 hours ago

Aug
18
revised Method for computing limit of a function as $x$ tends to zero
tex changes
Aug
18
answered Method for computing limit of a function as $x$ tends to zero
Aug
18
suggested suggested edit on Method for computing limit of a function as $x$ tends to zero
Aug
18
revised How to calculate complex residues
deleted 4 characters in body
Aug
17
answered How to calculate complex residues
Aug
7
revised Does $x^2+ x^4/(3\cdot4) + x^6/(3\cdot4\cdot5\cdot6) + \cdots$ have any compact form?
tex changes
Aug
7
suggested suggested edit on Does $x^2+ x^4/(3\cdot4) + x^6/(3\cdot4\cdot5\cdot6) + \cdots$ have any compact form?
Aug
7
accepted Mandelbrot sets and radius of convergence
Aug
7
comment Mandelbrot sets and radius of convergence
could you tell me why my statement is inaccurate? If the sequence tends to infinity won't the fractal be unbounded and hence "blow up"?
Aug
7
revised Show that $I_{12}\ne-0.0189$
added 11 characters in body
Aug
7
comment Show that $I_{12}\ne-0.0189$
@DanielFischer Ah I see.. Thank you for pointing that out
Aug
7
comment Show that $I_{12}\ne-0.0189$
@DanielFischer If I'm not mistaken isn't the radius of convergence of the geometric series $\frac{1}{1-x}$ is $|x|<1$ and in this particular case $|x|< 2$? $0$ is contained in this interval so why can't $x=0$?
Aug
7
answered Show that $I_{12}\ne-0.0189$
Aug
7
revised Fermat lemma proof
syntax change
Aug
7
suggested suggested edit on Fermat lemma proof
Aug
7
asked Mandelbrot sets and radius of convergence
Aug
6
comment Real analysis question about boundedness
@user71352 I'm sorry I meant to say continuous and not bounded. As I pointed out in the question the left and right hand limits don't agree so it shouldn't be continuous there or am I missing something?
Aug
6
comment Real analysis question about boundedness
I never understood why it was bounded on $[0,1]$ since the discontinuity is at $0$
Aug
6
asked Real analysis question about boundedness
Aug
6
awarded  Disciplined