Additive inverse of greatest negative integer is what
Answers
its additive inverse will be 1.
Answer:
The additive inverse of the greatest negative integer is -1.
Step-by-step explanation:
-1 exists as the greatest negative integer.
In a number line, the numbers to the right from 0 (zero) exist the positive integers. And, the numbers left to 0 (zero) exist the negative integers.
The additive inverse of a negative integer exists always as positive.
The additive inverse of an integer exists acquired by changing the sign of the integer. Thus, the additive inverse of a negative integer exists always as positive.
The easiest way to estimate the additive inverse of a real number exists to change its sign or multiply with a minus (-). If the given number exists positive, then note its related negative number. If the given number exists as negative, then write its corresponding positive number.
Therefore, the additive inverse of the greatest negative integer is -1.
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