Ask Question
28 January, 15:22

You have 12 coins, one of which is fake. The fake coin is indistinguishable from the rest except that it is heavier. Can you determine which is the fake coin heavier using a balance scale and only 3 weighings?

+3
Answers (2)
  1. 28 January, 16:56
    0
    Yep!

    Weighing #1: Start off by splitting the pile of 12 coins evenly into two piles, 6 in each pile. Put one pile on each side of the balance. The side that is weighed down has the fake coin it in. Ignore the other 6 coins.

    Weighing #2: Now you have 6 coins left. Split the pile evenly again, 3 in each pile. Repeat the same process and put each pile on one side of the balance. The side that is weighed down has your fake coin in it. Ignore the other 3 coins.

    Weighing #3: You have 3 coins left. Take two coins, whichever two you like, and weigh them. If they weigh the same, then the one you didn't weigh is the fake one. If one is heavier, then that heavier one is your fake coin.
  2. 28 January, 19:12
    0
    1) Divide 12 coins into 6 6

    The heavier side contain the fake coin

    2) Divide the 6 coins left by 3, you will get 2 coins per groups

    Just put TWO groups of coins on the balance and keep the third group aside

    **If two sides of the balance are balance, it means that the third group contain fake coin**

    **If one side is heavier, that 2 coins contain fake coin**

    3) Directly put the chosen 2 coins on each side and you can find out which is the fake one!
Know the Answer?
Not Sure About the Answer?
Find an answer to your question ✅ “You have 12 coins, one of which is fake. The fake coin is indistinguishable from the rest except that it is heavier. Can you determine ...” in 📘 Mathematics if you're in doubt about the correctness of the answers or there's no answer, then try to use the smart search and find answers to the similar questions.
Search for Other Answers