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| A Reversal Problem (Posted on 2006-12-07) |
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Determine analytically a positive four digit whole number with no leading zeroes which is such that the value obtained by reversing the number is 81 less than twice the original number.
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Submitted by K Sengupta
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Rating: 4.0000 (1 votes)
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Solution:
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Let abcd be the required number.Then:
2(1000a+100b+10c+d0 - 81 = 1000d+100c+10b+a
or, 2d - a = 81 - 10U; where U = 200a+19b-8c-100d......(1)
Since, maximum of 2d-a = 2*9-1 = 17 and
minimum of 2d-a = 2*1 -9 = -7, it follows that:
Either, U = 8, whenever 2d - a =1
Or, U = 7, whenever 2d - a =11
Let us assume U = 8. then, from (1) we obtain:
8 = 200(2d-1)+19b-8c-100d
or, 300d = 208+8c-19b........(2)
Since, the maximum value of 8c-19b = 8*9 - 19 = 53, it follows that equatiion (2) does not provide any integer solution for d
Thus U must be 7. then:
7 = 200(2d-11) + 19b - 8c- 100d
or, 300d = 2207 + 8c - 19b
This will yield a solution for d only if
8c - 19b = -107, 193
However, the maximum possible positive value of 8c - 19b is 53.
Thus, 8c - 19b = - 107
or, b = 5 + (8c+12)/19
Now, (8c+12)/ 19 is an integer for c=8 (mod 19), so that:
only c = 8, is possible in the context of the given problem.
This gives (b,d,U) = (9,7,7)
so that 2*7-a = 11, giving a=3
Consequently, the required number is 3987.
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A slightly different methodology leading to the same solution is provided by Dennis in this location.
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