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I am puzzled by the below exercise:

Step 1: Select any number having 3 digits (all different from one another). Ex. $125$.

Step 2: Now, write all possible combination of two digit number forming from selected digits. Here it is $12$,$21$,$15$,$51$,$25$,$52$. Add all of them.

here, $ 12+21+15+51+25+52=176$

Step 3: Divide the addition, (here $176$) by sum of all 3 digits selected. i.e.

$ \dfrac{176}{1+2+5} = 22$.

Always. Why, so?

I have tried many combination, it works. Can anyone give proof and explain the reason behind this?

  • 2
    Now try to see if you can prove it... Seeing the proofs below should help you ;)2011-10-30

2 Answers 2

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If your original digits are $x, y, $ and $z$, then among your two-digit numbers are:
two with $x$ in the ones place,
two with $y$ in the ones place,
two with $z$ in the ones place,
two with $x$ in the tens place,
two with $y$ in the tens place, and
two with $z$ in the tens place.

Therefore they sum to

$2\cdot 10(x+y+z)+2\cdot(x+y+z)=22(x+y+z)$.

So when you divide you are left with $22$.

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You can trace it backwards via $ 22(a+b+c) = (10a+ b) + (10a + c) + (10b +a) + (10b + c) + (10c + a) + (10c + b) $

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    Simplifying the right hand side gives identity. Bravo!2011-10-30