• TwilightKiddy@programming.devEnglish
    57·
    11 hours ago

    The divisability rule for 7 is that the difference of doubled last digit of a number and the remaining part of that number is divisible by 7.

    E.g. 299’999 → 29’999 - 18 = 29’981 → 2’998 - 2 = 2’996 → 299 - 12 = 287 → 28 - 14 = 14 → 14 mod 7 = 0.

    It’s a very nasty divisibility rule. The one for 13 works in the same way, but instead of multiplying by 2, you multiply by 4. There are actually a couple of well-known rules for that, but these are the easiest to remember IMO.

    • darkpanda@lemmy.caEnglish
      10·
      11 hours ago

      If all of the digits summed recursively reduce to a 9, then the number is divisible by 9 and also by 3.

      If the difference between the sums of alternating sets digits in a number is divisible by 11, then the number itself is divisible by 11.

      That’s all I can remember, but yay for math right?

      • levzzz@lemmy.worldEnglish
        1·
        7 minutes ago

        The 9 rule works for 3 too The 6 rule is if (divisible by 3 and divisible by 2)

      • TwilightKiddy@programming.devEnglish
        5·
        11 hours ago

        Well, on the side of easy ones there is “if the last digit is divisible by 2, whole number is divisible by 2”. Also works for 5. And if you take last 2 digits, it works for 4. And the legendary “if it ends with 0, it’s divisible by 10”.