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.