Act of Allah?

60 reportedly killed as crane collapses on the Grand Mosque in #Mecca. Some claime the crane was struck by lightning! pic.twitter.com/sXXuGKQEr4

— Jake Turx (@JakeTurx) September 11, 2015

"Math Explains Likely Long Shots, Miracles and Winning the Lottery [Excerpt]"

I'm only including the birthday problem here. For the seemingly long shot, like the lotteries, click here.

The birthday problem poses the following question: How many people must be in a room to make it more likely than not that two of them share the same birthday?

The answer is just 23. If there are 23 or more people in the room, then it's more likely than not that two will have the same birthday.

Now, if you haven't encountered the birthday problem before, this might strike you as surprising. Twenty-three might sound far too small a number. Perhaps you reasoned as follows: There's only a one-in-365 chance that any particular other person will have the same birthday as me. So there's a 364/365 chance that any particular person will have a different birthday from me. If there are n people in the room, with each of the other n − 1 having a probability of 364/365 of having a different birthday from me, then the probability that all n − 1 have a different birthday from me is 364/365 × 364/365 × 364/365 × 364/365 … × 364/365, with 364/365 multiplied together n − 1 times. If n is 23, this is 0.94.

Because that's the probability that none of them share my birthday, the probability that at least one of them has the same birthday as me is just 1 − 0.94. (This follows by reasoning that either someone has the same birthday as me or that no one has the same birthday as me, so the probabilities of these two events must add up to 1.) Now, 1 − 0.94 = 0.06. That's very small.

Yet this is the wrong calculation to consider because that probability—the probability that someone has the same birthday as you—is not what the question asked. It asked about the probability that any two people in the same room have the same birthday as each other. This includes the probability that one of the others has the same birthday as you, which is what I calculated above, but it also includes the probability that two or more of the other people share the same birthday, different from yours.

This is where the combinations kick in. Whereas there are only n − 1 people who might share the same birthday as you, there are a total of n × (n − 1)/2 pairs of people in the room. This number of pairs grows rapidly as n gets larger. When n equals 23, it's 253, which is more than 10 times as large as n − 1 = 22. That is, if there are 23 people in the room, there are 253 possible pairs of people but only 22 pairs that include you.

So let's look at the probability that none of the 23 people in the room share the same birthday. For two people, the probability that the second person doesn't have the same birthday as the first is 364/365. Then the probability that those two are different and that a third doesn't share the same birthday as either of them is 364/365 × 363/365. Likewise, the probability that those three have different birthdays and that the fourth does not share the same birthday as any of those first three is 364/365 × 363/365 × 362/365. Continuing like this, the probability that none of the 23 people share the same birthday is 364/365 × 363/365 × 362/365 × 361/365 … × 343/365.

This equals 0.49. Because the probability that none of the 23 people share the same birthday is 0.49, the probability that some of them share the same birthday is just 1 − 0.49, or 0.51, which is greater than half.

Scientific American via Instapundit 

"The 2020 Tokyo Olympics Were Predicted 30 Years Ago by Akira"

"Cyberpunk manga Akira debuted in 1982—over thirty years ago. The manga, and subsequent anime, are set in 2019, against the backdrop of the forthcoming 2020 Tokyo Olympics."

Er, I mean the 2020 Neo-Tokyo Olympics. The impending games and Neo-Tokyo Olympic Stadium do factor into the plot (for example, Akira is housed in a cryogenic chamber below the stadium, and the Olympic grounds house a military base.)

The sign for the Olympic site that appears in the film reads: "147 Days Until the Tokyo Olympics." Under that, it reads, "With everyone's effort, let's make this a success." The sign says this is the 30th modern Olympic games (it will actually be a the thirty-second).

The Kotaiku post goes on to make somewhat amusing Olympics/Akira Manga related observations.

Kotaiku"