Having a great time watching these Narz Concentration episodes on Buzzr. A very minor bit of a "spoiler" up ahead if you are not quite caught up yet.
On the Really Wild gimmick game, Jack says that contestants will win $250 if they match two wild cards, and if they match all four, they get $500 (win or lose).
Every time Jack has said that, I made an assumption and thought to myself: the odds of matching all four wild cards in one go is nearly impossible! They might as well offer a contestant a hundred thousand dollars for matching four wilds. On a board with no matches, if I have the math right, the chances of matching four wilds in one go would be (1/30) * (1/29) * (1/28) * (1/27), which is a very small chance indeed.
Now, the other day, I caught the first episode I've seen where a contestant matched two wild cards and won the $250. If you haven't seen this yet - upon turning over the second Wild card, a fanfare portion of the theme plays, applause applause, and a $250 prize card slides into the board. The important part here is that both wild cards are turned around at that point, the contestant has a guess at the puzzle, and play proceeds with two new calls, at which time they could call the other pair of Wilds and win another $250, totaling $500.
Perhaps I was alone on my incorrect assumption about needing to turn over all four wild cards in one go to earn the $500, but either way, it made me think - were any other shows out there that offered a too-small prize for a rare event, or vice versa?
An example might be the Natural Triple jackpot on Joker. I'm not sure how many slides were on those reels, but perhaps a Natural Triple was more worthy of a more expensive (or cheaper) prize.
(As a quick aside - if the person behind the Game Show Flashback channel on YouTube is on our board, thank you for taking the time to upload the new stuff from Buzzr for us Buzzr-challenged individuals!)
