Put one digit from (1,0,3,7) in each box to get the correct long division problem
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To solve this problem, we need to find the correct digits to put in each box to create a valid long division problem. Here's a step-by-step approach to finding the solution:
1. Start by considering the divisor, the number you would divide by. In a long division problem, this number is usually comprised of multiple digits. Since we are given single digits, we need to create a two-digit number from the given digits (1, 0, 3, 7).
2. To create a two-digit number, we need to consider the most significant digit (the tens digit) and the least significant digit (the ones digit). From the given digits, the highest possible number is 37 (assuming repetition and without considering the order). However, as this would result in a long division where there's no remainder, it won't be meaningful to find a solution this way.
3. Next, let's consider the dividend, the number you would divide into. Based on the given digits, we can have a three-digit or a four-digit number. Since we haven't been given any further information, we will assume a four-digit number for this explanation.
4. Begin placing the digits from the given set (1, 0, 3, 7) into the boxes of the long division format, starting from left to right. Remember, the most significant digit is on the top line, so we will put it in the leftmost box.
Here is one possible solution for a three-digit dividend:
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37 | 710
And here is one possible solution for a four-digit dividend:
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37 | 1037
5. As there can be multiple correct answers without additional information, feel free to explore other possibilities and combinations based on your specific requirements or constraints.
Remember, this explanation assumes a three-digit or four-digit dividend based on the given digits (1, 0, 3, 7) and doesn't account for any specific remainder or quotient requirements.