Got it! Will continue to type more and more characters in future replies
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Hi, can I ask for a card, please? Thanks.
Here you go @HadesLi !
Appreciate it! @curt.kennedy
Hope I can solve it. 
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Exited to be here 
This isn’t like playing with grandma. I am in! May I have a card? I have been on a massive countdown in our group. Ai Salon. Nightly on TikTok Kyle Shannon goes over all of OpenAi cool tools 
Thanks for what you do!
Here you go @SheriDee !
Thank you I appreciate you
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Ooh, exciting! Yes please!
I’ve been so enthused with this stuff this year that I’m running out of time to use up my paid time off allocation. So I’ve taken the week off to play with whatever is announced without the distraction of actual work
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Very exiting, can I have my card too ?
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In fact, could you provide me with 5 cards at once ?
The developer conference is the highlight of my year 
, but I can’t watch it live because of my busy schedule 
. I have to settle for the replay and the news articles, but I’m still super excited about what they will announce.
I’m especially looking forward to GPT5!!! 
I wonder how OpenAI will shape the future of AI and humanity! And I wish I had a bingo card to mark this special occasion~~~ 
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Here is yours @nik99
Here’s one for you @TimelessTraveler
Here’s your card @sdo771058290
what I see!!! GPT-5, omg! I can’t wait 
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you already got one @TimelessTraveler , heres the rest!
I’m happy to see so many new people here. Thank y’all for playing!
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can i have some cards too? 
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A part of me wants to set up a Whisper app and automatically fill in the cards, but then I’m lazy ahaha
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you can all have boards!
@miky97it here’s yours:
and heres yours @Fusseldieb!
I definitely encourage anyone who wants to get more Bingo cards.
There’s ~25 quintillion possible board combinations, so we won’t run out of boards any time soon 
click here to see the calculation
Since there are 75 unique words or phrases to choose from, and each bingo card has 24 spaces (assuming the center space is free as it is in traditional bingo), we can calculate the number of unique configurations by using the combination formula which is used to determine how many ways we can choose 24 unique items from a set of 75.
The formula for combinations is given as:
Number of combinations = \frac{n!}{k! (n - k)!}
where:
- n is the total number of items to choose from (75 in our case),
- k is the number of items to choose (24 in our case),
- n! denotes the factorial of n, which is the product of all positive integers up to n
- k! is the factorial of k
- (n - k)! is the factorial of (n - k)
The number of possible configurations for a bingo card with 24 spaces and 75 unique words to choose from is therefore 25,778,699,578,994,555,700 .
We’ve already done that, and I will be posting live updates throughout the keynote. 
And don’t forget,
Join the fun—reply for your Bingo card and get ready to play along during the keynote!
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