vshenoy
Reputation
308
Top tag
Next privilege 500 Rep.
Access review queues
Badges
1 3 5
Newest
Impact
~18k people reached

• 0 posts edited
• 0 helpful flags
• 0 votes cast

# 16 Actions

 Jul 6 awarded Yearling Jul 14 awarded Good Question Jun 27 awarded Famous Question May 9 awarded Nice Question Apr 27 awarded Notable Question Feb 14 awarded Popular Question Jan 13 answered In what version of Python was set initialisation syntax added Dec 10 awarded Scholar Dec 10 comment Is it possible to iterate over arguments in variadic macros? That's a nice trick Gregory. I had stumbled upon the VA_NARG post when googling, but didn't know (or was ignorant) that you could use it to build a dispatcher macro based on number of arguments. GMan, yours was the approach I had originally taken. phillipe, X-Macros is an interesting approach. Thanks to all of you guys for your responses. Dec 10 accepted Is it possible to iterate over arguments in variadic macros? Dec 9 awarded Student Dec 9 asked Is it possible to iterate over arguments in variadic macros? Oct 5 comment About an exercise appearing in TAOCP volume one's “Notes on the Exercises” Hi garethm, I doubt it. If the above problem required using Peano axioms, it would have the rating of at least M30 or HM30, where as i think that this particular question has the rating of less than 15. Is it possible that, the expectation is something like this (for e.g.): Prove that 1 + 2 + 3 + ... + 10 = 55. Generalize your answer. And the answer would be something like: (1+10) + (2+9) + ... + (5+6) = 5 x 11 = (10 x 11) / 2 and the generalization would obviously be (at least to Gauss :-) 1 + 2 + 3 + ... + n = (n x (n+1))/2. If so, what such identity is hidden in 13^3 = 1397 ? Oct 5 awarded Editor Oct 5 revised About an exercise appearing in TAOCP volume one's “Notes on the Exercises” Remove the homework tag. Oct 5 asked About an exercise appearing in TAOCP volume one's “Notes on the Exercises”