To find the opposite of an integer, simply change its sign. For example, the opposite of 5 is -5, and the opposite of -3 is 3. This means that the opposite of any integer ( n ) can be expressed as ( -n ). The opposite of an integer is located at the same distance from zero on the number line but in the opposite direction.
Opposite integers are pairs of integers that are equidistant from zero on a number line but lie on opposite sides of zero. For example, -3 and 3 are opposite integers because they have the same absolute value but differ in sign. Essentially, the opposite of any integer ( n ) is ( -n ). Thus, opposite integers always sum to zero.
The (not th) definition (not defition) of opposite integers are integers that are equal in their [absolute] value but have different signs. So, for example, the opposite of +4 is -4, and the opposite of -5 is +5.
Opposite integers have the same magnitudes, but different signs. Examples of an opposite integers: 10 and -10, -298 and 298.
Because that is how the opposite of a number is defined.
To subtract integers in algebra, you can use the rule of adding the opposite. This means that when you subtract an integer, you add its opposite. For example, to solve ( a - b ), you can rewrite it as ( a + (-b) ). This approach helps simplify the operation and makes it easier to find the result.
There are no such integers.
Integers are the "counting numbers" and their negative counterparts, and zero. Opposite integers are the pairs of integers that have the same absolute value, or, in other words, are the same distance from zero. 10 and -10 are opposite integers. 43 and -43 are opposite integers. It's just that simple.
Positive and negative integers are opposite each other.
The (not th) definition (not defition) of opposite integers are integers that are equal in their [absolute] value but have different signs. So, for example, the opposite of +4 is -4, and the opposite of -5 is +5.
Opposite integers have the same magnitudes, but different signs. Examples of an opposite integers: 10 and -10, -298 and 298.
They have opposite signs.
Because that is how the opposite of a number is defined.
10
To subtract integers in algebra, you can use the rule of adding the opposite. This means that when you subtract an integer, you add its opposite. For example, to solve ( a - b ), you can rewrite it as ( a + (-b) ). This approach helps simplify the operation and makes it easier to find the result.
0
will always be zero
There does not exist a number that is divisible by all integers. The opposite is true. The number one can divided into all integers.