Friday, September 26, 2014
This is the only useful thinking I've accomplished this week, & it fills me with weird giddy joy, like a chest full of helium. This took two full days of non-work thinking to accomplish, btw, so I'm not planning on quitting the day job any time soon. A MIT-bound high schooler could probably have solved it in 10 minutes, but that person isn't me.
Q: Bob multiplies three different prime numbers together. Is it possible for the digits of that product to sum to 18? Why or why not?
CJB:
1. To make a number divisible by 9 (9, 18, 27 & etc.), 9 needs to factor in the initial multiplication process. 9 = 3 * 3, so you need 2 3s as factors.
2. You can never get 2 3s using "3 different prime numbers" because 3 is prime and by the question's rules you can only use it once.
3. Therefore you can never produce a 9.
4. By the fundamental theorem of arithmetic, 18 uniquely factors as 2 * 3 *3.
4a. Bob is consequently SOL with his multiplication process, because it will never produce one of the three factors required for an 18.
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