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I know that you are probably thinking that when you are doing something fun you shouldn’t have to think about math, but when there are numbers of items involved, math is a good way to figure out the probability of something. When that something is a super rare card, like Shadow Punch, then knowing the probability adds a little excitement to the mix when buying packs of Redakai cards.
So I have decided to make a topic solely dedicated to math in Redakai. Here it goes!
Chance of Finding a Super Rare
To figure out the chance that you will pick a pack with a super rare Redakai card in it, all we have to do is figure out how many Super Rare Redakai cards are available, what percentage of the rares are Super Rare and how many rares you get per pack, right? Seems pretty easy, but just for fun’s sake, let’s just take a look at those numbers in a more formatted way.
1.1 rare per pack
2.1/8th of rares are Super Rare
3.24 total Super Rare cards area available altogether
So, we take the super rare to rare ratio [1/8] and multiple that by the total available Super Rare cards [24] and we get [1/192] or 0.52083.
1/8 * 1/24 = 1/192
That is actaully a pretty rare chance!
So I have decided to make a topic solely dedicated to math in Redakai. Here it goes!
Chance of Finding a Super Rare
To figure out the chance that you will pick a pack with a super rare Redakai card in it, all we have to do is figure out how many Super Rare Redakai cards are available, what percentage of the rares are Super Rare and how many rares you get per pack, right? Seems pretty easy, but just for fun’s sake, let’s just take a look at those numbers in a more formatted way.
1.1 rare per pack
2.1/8th of rares are Super Rare
3.24 total Super Rare cards area available altogether
So, we take the super rare to rare ratio [1/8] and multiple that by the total available Super Rare cards [24] and we get [1/192] or 0.52083.
1/8 * 1/24 = 1/192
That is actaully a pretty rare chance!