Let’s do the math! If you assume there are 300 kernels, the popcorn will be finished within two minutes, and all kernels popping within 100 ms of each other is sufficient for a big bada boom…
There are 2×60×10 epochs where the bang could occur. Each of the 300 kernels needs to pop in the same epoch, so 1/(2×60×10) is the probability of the second kernel popping in the same epoch as the first kernel. The probability of all 299 popping in the same epoch as the first kernel is (1/(2×60×10))^299 = (2×60×10)^(-299).
Crunching the numbers in the Google search calculator… the probability is zero. That was anticlimactic.
That math assumes a flat distribution of popping times, which I suspect is incorrect.
Listening to a bag of microwave popcorn, it starts off slow, gets more rapid, and then tapers off again, implying that kernels are more likely to pop near the average time, which makes it somewhat more likely for two kernels to pop simultaneously.
But yeah, whole bag at once is probably still basically zero. Unless you use one of these, of course.
The exact probability is something more like 2*10^-921. Given that it would take around 9 gogol (9*10^926) years of constantly popping popcorns until that happens. Should we try?
Except Kerbal popping is rate limited by energy input, there’s not an instant of energy flow, there’s 150 seconds of energy input, each second increasing the energy, popped kernals absorb less energy allowing the unpopped ones to absorb the incoming energy to each the same state.
If you wanted them to all pop at once you’d need to put that amount of energy in all at once. Not impossible, but not going to happen with your home microwave oven
I can’t imagine it would be equally distributed? Probably normal distribution applies over the span, most of the kernels would probably pop within say 20s of each other, and none in the beginning.
Let’s do the math! If you assume there are 300 kernels, the popcorn will be finished within two minutes, and all kernels popping within 100 ms of each other is sufficient for a big bada boom…
There are 2×60×10 epochs where the bang could occur. Each of the 300 kernels needs to pop in the same epoch, so 1/(2×60×10) is the probability of the second kernel popping in the same epoch as the first kernel. The probability of all 299 popping in the same epoch as the first kernel is (1/(2×60×10))^299 = (2×60×10)^(-299).
Crunching the numbers in the Google search calculator… the probability is zero. That was anticlimactic.
That math assumes a flat distribution of popping times, which I suspect is incorrect.
Listening to a bag of microwave popcorn, it starts off slow, gets more rapid, and then tapers off again, implying that kernels are more likely to pop near the average time, which makes it somewhat more likely for two kernels to pop simultaneously.
But yeah, whole bag at once is probably still basically zero. Unless you use one of these, of course.
Agreed! I admit I made a few sweeping simplifications to shoehorn this into a discrete math problem.
Assume a frictionless spherical microwave.
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Here is an alternative Piped link(s):
one of these
Piped is a privacy-respecting open-source alternative frontend to YouTube.
I’m open-source; check me out at GitHub.
The exact probability is something more like 2*10^-921. Given that it would take around 9 gogol (9*10^926) years of constantly popping popcorns until that happens. Should we try?
Yeah lets try, hasnt been done before
https://youtu.be/5LM3uh6PyHU?si=sP9-t4OCmA52Nmwn
Absolutely. You can feed all the unsuccessful attempts to the Shakespeare-typing monkeys.
Except Kerbal popping is rate limited by energy input, there’s not an instant of energy flow, there’s 150 seconds of energy input, each second increasing the energy, popped kernals absorb less energy allowing the unpopped ones to absorb the incoming energy to each the same state.
If you wanted them to all pop at once you’d need to put that amount of energy in all at once. Not impossible, but not going to happen with your home microwave oven
I can’t imagine it would be equally distributed? Probably normal distribution applies over the span, most of the kernels would probably pop within say 20s of each other, and none in the beginning.