Answer:
1 = 1; 2 = 3 -1; 3 = 3; 4 = 3 +1; 5 = 9 -3 -1;
6 = 9 -3; 7 = 9 -3 +1; 8 = 9 -1; 9 = 9; 10 = 9 +1
11 = 9 +3 -1; 12 = 9 +3; 13 = 9 +3 +1
Step-by-step explanation:
You want the numbers 1 – 13 expressed in terms of the digits 1, 3, 9 using operations +, -, and ×.
Base 3
The digits 1, 3, 9 represent the place values of numbers in base 3. This means we can use the base-3 representation of a number to give a clue as to how to represent it using these digits.
The digits of a base 3 number are 0, 1, 2. We don't have a 2 to work with, but we know that 2 = 3 -1, so we can use that fact. Here is an example:
5 = 12₃ = 1×3 + (3 -1)×1 = 3 +3 -1
= 20₃ -1 = (3 -1)×3 -1 = 9 -3 -1
After writing a few numbers, we notice the signs go in the progression +, -, 0 where 0 means the digit is not included. The attachment shows the sums that make the numbers 1–13.
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Additional comment
We could, of course, use the allowed "other digits" to include 2. For example, ...
5 = 3 + 2×1
6 = 2×3
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