Positions can be positive or negative.
A position and a negative number can never be the same.
If a position is positive, then the sum of the position and a negative number is always positive.
If a position is negative, then the sum of the position and a negative number can be negative.
A position and a negative number can never be the same because they are two different numbers.
No. Such a sum can be positive, negative or zero.
It isn't always negative. ... for example: -5 + 12 = 7 (a positive number) -5 + 2 = -3 (a negative number) -5 + 5 = 0 (neither negative nor positive) If the negative number has greater magnitude than the positive number, the sum will be negative If the positive number has greater magnitude than the negative number, the sum will be positive If the negative and positive numbers have the same magnitude, the sum will be zero.
The sum of two positive numbers is always positive, and the sum of two negatives is always negative. If you have a positive and a negative number, there sum can be either, so look at the absolute values to decide. For example -3+2=-1. Since all you care about is the sign, look at the absolute value. If the negative number has a greater absolute value, the sum is negative and if the positive number's absolute value, which is the number itself, is bigger, the sum is positive. If the absolute values are equal, the sum is 0.
the sum of two negative integers is ALWAYS negative
It depends, if a number with positive integers is greater than the number with the negative integer therefore the sum will be in positive integer. And if the number with positive integer is less than the number with the number with negative integer then the sum will be in negative integer.
Not always, if the smaller number is 0 or a negative number. Then their sum will be equal or less than the greater number.
Yes, the sum of two negative integers is always negative.
No. The sum of two negative numbers will always be a negative number. If, however, you multiply the numbers, their product will be positive.