Begin with a flagrantly erroneous summation and a woefully vacant substitution table.
234
+ 5 Digit 2 3 4 5 6 7 8
------- Substitute digit _ _ _ _ _ _ _
5678
How can the substitution table be filled out to correct this summation?
This is almost too easy if you just follow these guidelines.
Assign 7 unique substitute digits from
0through9for digits2through8in the table (one digit per digit)Replace digits in the summation by their substitutes in the table (no other kinds of edits, as the summation and table should be taken at face value)
All numbers and digits are decimal (no notation tricks are involved)
No leading zeros in the total or either summand
The summation has a unique solution
Added: Regular arithmetic pretty much forces the resultant summation. lateral-thinking allows the guidelines to attain it.
Answer
Making an assumption:-
That if a substitute digit is itself in the lookup table, it will be replaced again.
Digit 2 3 4 5 6 7 8
Substitute digit 3 4 9 1 7 8 0
The Summation becomes:
999 + 1 = 1000 because:
2->3->4->9,
3->4->9,
4->9,
5->1,
5->1,
6->7->8->0,
7->8->0,
8->0
Process:
As the question states, if you follow the guidelines, it should lead you towards the answer
First, as mentioned in the question, there is one possible summation. It must be 999 + 1 = 1000 as a 3 digit number plus a 1 digit number must equal a 4 digit number, and the first digit of the 4 digit number has to be the same as the 1 digit number.
Then, knowing that 6,7,8 must equal 0 we can first assign any one of those digits the substitute digit of zero, lets choose 8.
Since 0 is now used (and the question states the substitute digits must be unique) in order for 6 or 7 to equal 0, the only substitute digit we can assign is 8 (since 8 = 0).
This same logic is then applied to 2,3,4 since they all need to equal 9
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