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Explain Bot To determine the sets to which the number 602 belongs, we need to consider different properties and characteristics of sets. Here are some common sets that we can analyze:
1. Natural numbers (N): The set of positive whole numbers. Since 602 is a positive whole number, it belongs to this set.
Answer: 602 ∈ N
2. Integers (Z): The set of positive and negative whole numbers, including zero. Again, since 602 is a whole number, it is an integer.
Answer: 602 ∈ Z
3. Rational numbers (Q): The set of numbers that can be expressed as a fraction of two integers. 602 can be written as 602/1, which is a fraction of two integers.
Answer: 602 ∈ Q
4. Real numbers (R): The set of all possible numbers, including fractions and irrational numbers. 602 is a real number because it can be expressed as a fraction and falls under this comprehensive set.
Answer: 602 ∈ R
Additionally, we could consider other sets such as:
5. Prime numbers: Prime numbers are integers greater than 1 that have no positive divisors other than 1 and themselves. Since 602 is not a prime number (it is divisible by 2 and 7), it does not belong to this set.
6. Even numbers: Even numbers are integers that are divisible by 2. Since 602 is divisible by 2, it is considered an even number.
Answer: 602 is an even number.
7. Odd numbers: Odd numbers are integers that are not divisible by 2. Since 602 is divisible by 2, it is not considered an odd number.
Answer: 602 is not an odd number.
These are some of the sets to which the number 602 belongs based on various characteristics and properties.