5 Must Know Facts For Your Next Test

1. Zero pairs can be used to rewrite expressions involving subtraction of integers, making the calculations easier to perform.
2. Adding a zero pair to an expression does not change the value of the expression, as the positive and negative integers in the pair cancel each other out.
3. Subtracting a negative integer is equivalent to adding the additive inverse of that integer, which can be represented as a zero pair.
4. Zero pairs can be used to convert a subtraction problem into an addition problem, which is generally easier to solve.
5. The use of zero pairs is a key strategy in the subtraction of integers, as it allows for the manipulation of expressions and the simplification of calculations.

Review Questions

• Explain how a zero pair can be used to simplify the subtraction of integers.
  • A zero pair can be used to simplify the subtraction of integers by adding the pair to the original expression. Since the positive and negative integers in the zero pair cancel each other out, the value of the expression remains the same. However, the addition of the zero pair can make the subtraction problem easier to solve, as it can be converted into an addition problem. For example, to subtract 8 from 12, you can add the zero pair of +8 and -8 to the expression, resulting in 12 + (-8) = 4, which is simpler to calculate than the original subtraction problem.
• Describe the relationship between zero pairs and the additive inverse of a number.
  • The concept of a zero pair is closely related to the idea of the additive inverse of a number. The additive inverse of a number is the number with the same absolute value but the opposite sign. In a zero pair, one of the integers is the additive inverse of the other. For example, the zero pair of 5 and -5 can be used to represent the additive inverse of 5, which is -5. The use of zero pairs allows for the manipulation of expressions involving subtraction by converting the subtraction problem into an addition problem using the additive inverse of the subtrahend.
• Analyze how the use of zero pairs can help in the process of subtracting integers.
  • The use of zero pairs is a crucial strategy in the subtraction of integers, as it allows for the simplification and manipulation of expressions. By adding a zero pair to an expression, the value of the expression remains unchanged, but the subtraction problem can be converted into a more straightforward addition problem. This is particularly useful when subtracting a negative integer, as the subtraction can be rewritten as the addition of the additive inverse of the subtrahend. Additionally, zero pairs can be used to 'cancel out' certain integers within the expression, making the calculation easier to perform. Overall, the strategic use of zero pairs is a powerful tool in the context of subtracting integers, as it enables students to simplify complex expressions and arrive at the correct solution more efficiently.

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