GO ON BOB: Difference between revisions
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I believe this is original. | |||
==Puzzle== | |||
Solve this cryptarithmetic (each letter represents a unique digit 0 to 9). GO + ON = BOB, given that BOB is divisible by G. | Solve this cryptarithmetic (each letter represents a unique digit 0 to 9). GO + ON = BOB, given that BOB is divisible by G. | ||
{{ | ==Help== | ||
{{Hint | If you can decide what B is first, then that drastically limits the possibilities for G.}} | |||
{{Answer | <m>97 + 74 = 171</m>}} | |||
{{Solution | The sum of two 2-digit numbers has to be less than 200 (because 99+99<nowiki>=</nowiki>198), so B < 2. | |||
B is not 0, because that would require the sum of two 2-digit numbers to be less than one of those 2-digit numbers (specifically, "BOB" would be "ON" rounded down to a lower multiple of ten). | B is not 0, because that would require the sum of two 2-digit numbers to be less than one of those 2-digit numbers (specifically, "BOB" would be "ON" rounded down to a lower multiple of ten). | ||
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171 - 97 <nowiki>=</nowiki> 74, which gives 97 + 74 <nowiki>=</nowiki> 171 as the equation represented by the words. }} | 171 - 97 <nowiki>=</nowiki> 74, which gives 97 + 74 <nowiki>=</nowiki> 171 as the equation represented by the words. }} | ||
==See also== | |||
[[Cryptarithmetic]] | |||
[[Lean meat]] | |||
[[Category: Cryptarithmetic puzzles]] | [[Category: Cryptarithmetic puzzles]] | ||
[[Category: Number theory]] | [[Category: Number theory]] | ||
Current revision as of 19:34, 14 July 2013
I believe this is original.
Puzzle
Solve this cryptarithmetic (each letter represents a unique digit 0 to 9). GO + ON = BOB, given that BOB is divisible by G.
Help
Hint
Answer
Solution