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humor4fun
111
Jun 16, 2016
I just did some quick amazon searching and came up with some rough estimates of how much it would cost if you bought each item individually. Multiply those by the chance that you get it and add up all the values to get your average per grouping. Then add up the groups values and here's your breakdown (included shipping).
$58.25 = 2xA 2xB => $56.24 || (96% ROI) $108.25 = 4xA 4xB 1xC => $130.98 || (120% ROI) $158.25 = 2xA 3xB 1xC 1xD => $187.95 || (118% ROI)
A: (17*.10)+(14*.10)+(12*.10)+(13*.10)+(13*.10)+(11*.10)+(11*.10)+(18*.10)+(17*.10)+(27*.02)+(29*.02)+(33*.02)+(41*.02)+(36*.02) =15.92 B: (13*.10)+(11*.10)+(13*.10)+(9*.10)+(7*.10)+(14*.10)+(13*.10)+(20*.10)+(15*.10)+(7*.10) =12.2 C: (11*.33)+(30*.33)+(14*.33) =18.5 D: (110*.33)+(89*.33)+(88*.33) =94.71
Turns out that the middle tier is the best deal.
Note: Prices came from intelligent Amazon searches with all values having their dollars portion truncated (not rounded based on cents). Shipping of those items was not included as a factor, because if you buy that many items you will get free shipping anyway, however MD makes you pay for shipping, so that gets added into the cost here.
Edit: Those 5 2% chance items in group A are (iirc) the Commander decks. I priced them all individually because there was variance among them, and the description doesn't state which one you will get.