AIR MATH

Math Question

If \( \mathrm{U}=\{ \) all positive integers \( \} \) and \( \mathrm{A}=\{x \mid x \in \mathrm{U} \) and \( x \) is an odd positive integer \( \} \), which describes \( \mathrm{A}^{c} \) ? \( \mathrm{A}^{\mathrm{c}}=\{x \mid x \in \mathrm{U} \) and is a negative integer \( \} \) \( \mathrm{A}^{\mathrm{c}}=\{x \mid x \in \mathrm{U} \) and is zero \( \} \) \( \mathrm{A}^{c}=\{x \mid x \in U \) and is not an integer \( \} \) \( \mathrm{A}^{c}=\{x \mid x \in U \) and is an even positive integer \( \} \)

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