The question seems to ask for examples or definitions of various mathematical properties. Here’s a brief description of each property mentioned:
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Additive Identity Property: This states that a number plus zero equals the number itself. For example, \( a + 0 = a \).
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Multiplicative Identity Property: This states that a number multiplied by one equals the number itself. For example, \( a \times 1 = a \).
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Additive Inverse Property: This states that a number plus its negative equals zero. For example, \( a + (-a) = 0 \).
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Multiplicative Inverse Property: This states that a number multiplied by its reciprocal equals one. For example, \( a \times \frac{1}{a} = 1 \) (where \( a \neq 0 \)).
If you have a specific example or expression in mind, please provide that, and I can help identify which property it exemplifies.