In the following addition if each of the symbols represents a distinct single-digit positive integer, What is the value of D + O + G + C + A + T = ??
D O G + C A T ------- 1 0 0 0 -------
It seems like every solution of the many that it has gives us the same sum of the digits = 28 I had to use a c code to check it myself. I am unable to understand why is it that every possible solution for this particular problem has the sum of digits equal to 28.
679+321=1000 6+7+9+3+2+1=28
If symbols of alphabets (without any change in their sense and meaning) are L M V A K B N C P I D Y O S E Q R F T H G J U W Z X then How we will write "WORLDCUP".
In the following Cryptarithm, each letter represents a distinct digit. What would be the value of XYZ?
There is a four-digit number ABCD, where A, B, C, D each represents a different digit from 1 to 9.
If ABCD is divisible by 13, BCDA is divisible by 11, CDAB is divisible by 9, and DABC is divisible by 7, what is the original number ABCD?