The product of two numbers is 1512 if each of the number is halved , what is the sum of the two new number?
well, 1512 has a number of factors.
So, if you pick 21 and 72, then dividing by 2 and adding gives you 46.5
If you pick 84 and 18, then the sum is 51.
Maybe you meant the new product, not sum. I'm sure you can figure out what happens then.
tnx
To find the sum of the two new numbers, we need to determine the original numbers that were multiplied together.
Let's assume the two original numbers are x and y.
We know that the product of the two numbers is 1512, so we can write the equation: x * y = 1512.
Next, we are told that each of the numbers is halved. This means that we divide each number by 2.
So the new numbers would be x/2 and y/2.
To find the sum of the two new numbers, we add them together: (x/2) + (y/2).
However, we don't have enough information to directly calculate the sum of the new numbers because we don't know the values of x and y.
If you have any additional information or a specific question, please let me know and I'll be happy to help further.
To find the sum of the two new numbers after each of the original numbers is halved, we need to determine the original numbers.
Let's assume the two original numbers are x and y.
Given that the product of the two numbers is 1512, we have the equation:
x * y = 1512
To find the original numbers, we need to solve this equation. However, since there are infinite possible combinations of x and y that can give a product of 1512, we need more information.
Could you please provide any additional information or constraints related to the original numbers?