Piña here- I had the best time, thank you so much to everyone at Check, please! It was an experience I'll never forget 💜 this episode was so fun and funny! Francis and Sonya, what a treat to share a table with you two! And to Leslie- you are truly amazing and kind! Getting to sit next to you was a dream come true for little Piña that grew up watching Check, please! 🍽️

Another great show! I love Piña’s colorful enthusiasm and look forward to trying the hot pot restaurant in Oakland.

Someone didn’t tie down the giant parade balloon. It got loose.

The total number of combinations for 𝑛 n options (in this case, 𝑛 = 40 n=40) is the sum of the binomial coefficients from choosing 1 item up to choosing all 40: Total combinations = ∑ 𝑘 = 1 40 ( 40 𝑘 ) Total combinations= k=1 ∑ 40 ​ ( k 40 ​ ) Using the binomial theorem, this is equal to: 2 40 − 1 2 40 −1 We subtract 1 because choosing 0 soups (an empty combination) isn’t counted in our scenario. Calculation 2 40 − 1 = 1 , 099 , 511 , 627 , 775 2 40 −1=1,099,511,627,775 So, there are 1,099,511,627,775 different combinations of soups you could make with 40 options.