Question 617581
Best way is to brute force. However, there are several constraints:


*5 can only go in A, D, G, or H (otherwise we'd be dealing with multiples of 5, contradiction).

*1 can only go in G or H (if B = 1, AB*C would have last digit C, I = C, contradiction). If A = 1, the maximum value of AB*C is 18*9 = 162 --> G = 1, contradiction. If I = 1, B,C,E,F would all be odd. This means one of them must be 5, another contradiction.


*I is even (If I were odd, A,C,E,F would all be odd. G or H is 1.


*GHI is not a multiple of 11.


With some Wolfram-Alpha quick-factoring, I obtained the following solution:


29*6 = 58*3 = 174 --> GHI = 174