Nico Bellic

183 reputation

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visits	member for	1 year, 1 month
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Noob extraordinaire

	183 reputation	bio	website		visits	member for	1 year, 1 month
8 badges		location			seen	May 5 at 16:03

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May 7	awarded	Editor
May 7	revised	Series Solution Near Ordinary Points for Second Order Differential Equations deleted 1 characters in body
May 7	asked	Series Solution Near Ordinary Points for Second Order Differential Equations
May 6	comment	Please help with derivative question Deniz, once you get the answer that you were looking for, please accept the answer with the "check" sign to the left of the question. This not only gives you a higher acceptance rate, but it also gives credit to the people giving the best answer.
May 6	comment	Prove that you can form at most $n$ same sized intersections of $m$ subsets of an $n$ element set. Ah I see. Thank you. Also, can you define semi-definite and definite.
May 6	comment	Prove that you can form at most $n$ same sized intersections of $m$ subsets of an $n$ element set. Hi Austin. I'm a little confused on your terminology. Could you please elaborate from "Letting M...".
May 6	accepted	Prove that you can form at most $n$ same sized intersections of $m$ subsets of an $n$ element set.
May 6	comment	Prove that you can form at most $n$ same sized intersections of $m$ subsets of an $n$ element set. Thanks! Just one question, what does the ∪iCi at the end mean? I'm not sure I understand that notation.
May 6	asked	Prove that you can form at most $n$ same sized intersections of $m$ subsets of an $n$ element set.
May 5	accepted	A game: Fibonacci sequences and probability.
May 5	comment	A game: Fibonacci sequences and probability. That's one way to say it.
May 5	asked	A game: Fibonacci sequences and probability.
May 3	accepted	Using linear algebra, how is the Binet formula (for finding the nth Fibonacci number) derived?
Apr 22	comment	Using linear algebra, how is the Binet formula (for finding the nth Fibonacci number) derived? I'm truly, really sorry, but I'm not sure if I'm able to follow you.
Apr 22	awarded	Commentator
Apr 22	comment	Using linear algebra, how is the Binet formula (for finding the nth Fibonacci number) derived? I haven't done eigenvectors yet (I do that in about a week in my L.A. course). Is there a way to derive all that without using those concepts?
Apr 22	asked	Using linear algebra, how is the Binet formula (for finding the nth Fibonacci number) derived?
Apr 15	awarded	Supporter
Apr 15	comment	The rank of a linear transformation/matrix Oh duh. Oh my I feel very dumb now.
Apr 15	comment	The rank of a linear transformation/matrix Ah I see. Is there a proof to that?