@Tinno
But as the number of turns converges on infinity, the probability of success converges on 100%. For any given finite number of turns, there will be less than 100% probability, but if you somehow put the game into an infinite loop that could only be escaped by setting the bomb off, I would argue that you hit 100% probability right there. It cannot go against you for an infinity, there's just no upper limit on the finite number of times it can go against you.
I'm not sure how the official MTG rules would cope with that, though.
Posted By:
Cyber_Squirrel
(5/20/2013 12:48:57 PM)
Fun! Not going to win any tournaments but a fun casual/multiplayer card great outlit for Krark's Thumb or a Paradox Haze
Posted By:
JL_Weber
(5/5/2009 6:42:39 PM)
Clock-Spinning + Memory Crystal make this card very fun.
Demonic Fan is pretty fun with this card too.
And Chance Encounter.
Posted By:
kitsunewarlock
(9/7/2009 3:57:19 PM)
Who says Goblins aren't smart? They're the only race who uses modern technology!! Urza could learn a thing or two from these underestimated creatures.
Posted By:
Arachibutyrophobia
(8/8/2009 2:00:19 PM)
Doubling Season makes this a potential turn five win.
Posted By:
Joseph_Leito
(8/22/2009 2:07:08 PM)
If the ability goes off, *BOOM!* Oh my ass!
Posted By:
Duskdale_Wurm
(6/7/2010 11:57:10 PM)
@DeathDark: The card you are referring to is the G/U hybrid Gilder Bairn. If you get to 3 counters with this, use Gilder Bairn to get to 6 and activate the ability.
Posted By:
sarroth
(6/21/2010 8:23:33 PM)
Lets not forget clockspinning.
Posted By:
Kryptnyt
(7/18/2010 5:30:16 PM)
@riverwolf13
The probability of winning BY a specific turn (after playing a single goblin bomb) would follow the
pascals triangle, but your probabilities are incorrect
you can find the probability of winning ON turn X (After playing goblin bomb) by going to the 5th column of the Xth row and dividing that number by the sum of the numbers in that row. So the probability of winning on the 7th turn (5th turn after playing goblin bomb) would be 1/16 or 6.25%
To find the probability of winning BY a specific turn you can find the sum of the integers of from the 5th column and to the right of the 5th column divided by the sum of the row again
To those who do not know how to construct pascals triangle you can find it here: http://math.about.com/od/algebralessons/ss/Pascal_2.htm
If someone can come up with a elegant equation to calculate to solve for this please post it, the closest i've come needs to be extended for each new turn(whenever you add another flip)
Posted By:
combobuilder
(8/6/2010 2:53:58 PM)
Proliferate
Posted By:
Pillow676
(11/17/2010 3:26:19 PM)