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seen Nov 18 at 23:40

Just a student getting by


Nov
10
awarded  Popular Question
Sep
24
awarded  Autobiographer
Jul
2
awarded  Curious
Nov
28
accepted Is it possible to do a Hasse Diagram for divisibility on the following set
Nov
27
revised Is it possible to do a Hasse Diagram for divisibility on the following set
edited body
Nov
27
asked Is it possible to do a Hasse Diagram for divisibility on the following set
Nov
17
accepted Is it possible to simplify the following combination?
Nov
4
asked Is it possible to simplify the following combination?
Oct
2
accepted Find a counterexample for the following statement (explanation please, I already have the solution)
Oct
2
asked Find a counterexample for the following statement (explanation please, I already have the solution)
Oct
2
comment Use mathematical induction to prove that 9 divides $n^3 + (n + 1)^3 + (n + 2)^3$; Looking for explanation, I already have the solution.
@labbhattacharjee the problem asks for that procedure
Oct
2
accepted Use mathematical induction to prove that 9 divides $n^3 + (n + 1)^3 + (n + 2)^3$; Looking for explanation, I already have the solution.
Oct
2
asked Use mathematical induction to prove that 9 divides $n^3 + (n + 1)^3 + (n + 2)^3$; Looking for explanation, I already have the solution.
Sep
18
accepted Is $\{1, 2, 3\}\times \Bbb Z$ uncountable?
Sep
18
comment Is $\{1, 2, 3\}\times \Bbb Z$ uncountable?
That was perfect, thank you!
Sep
18
revised Is $\{1, 2, 3\}\times \Bbb Z$ uncountable?
edited title
Sep
18
comment Is $\{1, 2, 3\}\times \Bbb Z$ uncountable?
I'm really new to Discrete Mathematics (first week) so I'm having a bit of trouble understanding what you mean by (a, b) -> 3b + a - 1, could you possibly give me a brief explanation?
Sep
18
comment Is $\{1, 2, 3\}\times \Bbb Z$ uncountable?
no, unfortunately it was as I wrote it.
Sep
18
asked Is $\{1, 2, 3\}\times \Bbb Z$ uncountable?
Jun
18
accepted Yet another balls and boxes problem; minimum number of throws so that we have no empty boxes.