swair
Reputation
217
Next privilege 250 Rep.
 Dec18 comment Does $p_{1}^x + p_{2}^y = n$ have uniqe solution for $x$ and $y$ ($p_{1}, p_{2}$ are primes). any better idea to find $n$? Dec18 revised Does $p_{1}^x + p_{2}^y = n$ have uniqe solution for $x$ and $y$ ($p_{1}, p_{2}$ are primes). added 23 characters in body Dec18 accepted Does $p_{1}^x + p_{2}^y = n$ have uniqe solution for $x$ and $y$ ($p_{1}, p_{2}$ are primes). Dec18 asked Does $p_{1}^x + p_{2}^y = n$ have uniqe solution for $x$ and $y$ ($p_{1}, p_{2}$ are primes). Jul2 awarded Curious Feb3 awarded Yearling May13 awarded Caucus Dec12 accepted Physical (Quantum Mechanical) Significance of completeness of Hilbert Spaces. Dec12 accepted Evaluate expressions in lambda calculus Dec12 asked Evaluate expressions in lambda calculus Oct31 awarded Critic Oct31 comment As shown in the figure: Prove that $a^2+b^2=c^2$ @none, can you tell me what software did you use to make that diagram? Oct28 awarded Editor Oct28 revised How many 10-digit numbers grammar fix Oct28 suggested approved edit on How many 10-digit numbers Oct25 accepted Can _any_ NFA be converted to a DFA? Oct25 asked Can _any_ NFA be converted to a DFA? Aug21 awarded Commentator Apr25 accepted Dimension of a set and its closure are equal in an Inner-product space? Apr25 comment Dimension of a set and its closure are equal in an Inner-product space? Right. Any Good way to prove the Lemma then? Namely, if M is total then $M^\perp =\{0\}$