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| Divisible by 11,111 (Posted on 2008-10-02) |
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How many positive 10-digit integers of the form ABCDEFGHIJ, with non leading zeroes and each letter representing a different base 10 digit from 0 to 9, are divisible by 11,111 ?
Note : Try to solve this problem analytically, although computer program/ spreadsheet solutions are welcome.
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Submitted by K Sengupta
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Rating: 3.2500 (4 votes)
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Solution:
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The sum of the digits A to J = 0+1+2+.....+ 9 = 45, so that: the number represented by ABCDEFGHIJ is divisible by 9. Since 9 and 11,111 are relatively prime, it follows form the given conditions that ABCDEFGHIJ is divisible by 99,999.
Thus, ABCDEFGHIJ (mod 99,999) = 0
Or, (ABCDE+ FGHIJ) (mod 99,999) = 0 ......(i)
Since, each of the letters denote a distinct digit, it follows that each of ABCDE and FGHIJ is less than 99,999, and accordingly ABCDE+ FGHIJ < 199,998, and so that in terms of (i), we must have:
ABCDE + FGHIJ = 99,999 ..... (ii)
Now, each of the digits cannot exceed 9, so that there is no carryover in the lhs of (ii), and accordingly:
F = 9 - A
G = 9 - B
H = 9 – C
I = 9 - D
J = 9 - E
Since A is nonzero, there are 9 ways to choose A, whereby F will be known. This leaves 10-2 = 8 ways to choose B, whereby G will be known. C can thus be chosen in 6 ways, whereby H will be known. This leaves 4 ways to choose D, whereby I will be known. Finally, there will be 2 choices for E, whereby J will be known.
Consequently, the required number of all the positive integers ABCDEFGHIJ that satisfy the given conditions = 9*8*6*4*2 = 3456.
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