what three four-digit numbers equal to 17,491?
There are an abundance of answers for this question. I can tell you of one such as 6,000 + 7,000 + 4,491 because this is one of the easiest.
There are an abundance of answers for this question. I can tell you of one such as 6,000 + 7,000 + 4,491 because this is one of the easiest.
To find three four-digit numbers that equal 17,491, we can use algebraic equations. Let's represent the three numbers as A, B, and C.
The sum of the three numbers is equal to 17,491, so we can write the equation as:
A + B + C = 17,491
Since we are looking for four-digit numbers, we know that each number must be between 1000 and 9999.
To simplify the problem, we can assume one of the numbers, let's say A, and then find the values of B and C accordingly.
Let's assume A = 1000. Then the equation becomes:
1000 + B + C = 17,491
By rearranging this equation, we get:
B + C = 16,491
Now we have a simpler problem. We need to find two numbers, B and C, whose sum is 16,491. To narrow down the options, we know that B and C must also be four-digit numbers.
We can check if any combination of two four-digit numbers adds up to 16,491 by using a calculator or a computer program. Here are some possible combinations:
B = 6491 and C = 9300 (6491 + 9300 = 16,791)
B = 4000 and C = 12,491 (4000 + 12,491 = 16,491)
B = 8000 and C = 8,491 (8000 + 8,491 = 16,491)
These are just a few examples. There may be other combinations that satisfy the equation.
So, three four-digit numbers that equal 17,491 could be:
A = 1000, B = 6491, C = 9300 (1000 + 6491 + 9300 = 17,491)
A = 1000, B = 4000, C = 12,491 (1000 + 4000 + 12,491 = 17,491)
A = 1000, B = 8000, C = 8,491 (1000 + 8000 + 8,491 = 17,491)