Question 474973: In a secret code, each letter stands for a single digit- 0,1,2,3,4,5,6,7,8,9. Different letters stand for different digits. Using the code, a certain addition problem works out correctly as follows:
S E V E N
+ E I G H T
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T W E L V E Assume that neither S nor E equals the digit 0, since no numbers begin with a 0.
S=___, E=___, V=__, N=___, I=__, G=___, H=___, T=___, W=___, L=___
Answer by Edwin McCravy(20056) (Show Source):
You can put this solution on YOUR website! There are 6 different solutions:
SEVEN + EIGHT = TWELVE
1. 36465 + 69781 = 106246
2. 38487 + 89561 = 128048
3. 58287 + 80641 = 138928
4. 63732 + 39841 = 103573
5. 69298 + 90431 = 159729
6. 85254 + 50671 = 135925
Edwin
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