The other day I was in the bus and there was a digital
12-hour clock in the middle, it was 3:21. I noticed all of the digits were
different, when it changed into 3:22 I wondered: how many times a day are the digits in this type of clock different?
It is a really simple calculation to do:
For hours with 1 digit in the hour space (1–9): there are 9
possible values for the hour. It has 2 spaces for the minutes; in the first one
there are 6 possibilities (0-5) in which one is repeated in the hour space.
Then, in the second space, there are 10 possibilities (0-9) that can occur, but
2 cannot be used because they are repeated in the other two numbers.
So: 9*5*8 = 360
For hours with 2 digits in the hour space (10-12): 11 cannot
be used. There are 2 possible hours (10 and 12) and in the first value of the
minutes there are 2 values that cannot be used, and in the second minutes value
there are 3 values that were used before.
So: 2*4*7 = 56
360 +56 = 416 à
every 12 hours
There are 2 12 hour periods every day, 2*416 = 832
There you go: a digital 12-hour clock has all different
digits 832 times a day.
Paula, I love this post. However, I think there is a flaw in your calculation, though I am not convinced I still have the correct answer.
ReplyDeleteFor hours with one digit in the hour space you can't treat 1-9 all the same, it has to be broken up into 1-5 and 6-9. If that digit is 6-9 then there are still 6 possibilities in the first minutes digit (0-5) as they none of them can possibly repeat the hour digit.
I think this pushes up the final answer to 896.
I read this post a couple of days ago and all I could think about was all the different questions that come after that: what happens if we include seconds, or use 24hour time; what about the date; etc.