Without actual calculation, write the question: When the sum of three-digit numbers 567, 675, and 756 is divided by: 1. 111, 2. 18, 3. 37. Please show the process
The Correct Answer and Explanation is:
Question:
When the sum of the three-digit numbers 567, 675, and 756 is divided by the following numbers, what are the results?
- 111
- 18
- 37
Process Explanation:
To solve this problem, you need to first add the three numbers together:
567 + 675 + 756 = 1998
Now, you are asked to divide this sum by three different divisors. The process for each division is as follows:
- Dividing by 111:
When you divide the sum (1998) by 111, the goal is to see how many times 111 can go into 1998. Since 1998 is evenly divisible by 111, you simply perform the division to get the result. - Dividing by 18:
For this step, divide the sum (1998) by 18 to find out how many times 18 fits into 1998. As with the first divisor, this will give you a whole number or a remainder depending on whether 1998 is divisible by 18. - Dividing by 37:
Similarly, dividing the sum by 37 is straightforward. You will see how many times 37 fits into 1998, and the result will be the answer for this part of the question.
Each division operation provides a quotient, and in case the division is not exact, you would note the remainder as well.
In summary, the key steps are:
- Add the three numbers (567, 675, 756) to get the sum (1998).
- Perform the division for each divisor (111, 18, and 37).
- Interpret the results to answer each part of the question.
