Identify all the sets to which the number belongs. Choose from rational number, irrational number, whole number, and integer.
0.62478916532…
AAAaannndd the bot gets it wrong yet again!
can't be both of those, dumbo!
The number 0.62478916532… is an example of an irrational number.
To identify the sets to which a number belongs, let's go through the options: rational number, irrational number, whole number, and integer.
1. Rational number: A rational number can be expressed as a fraction of two integers p/q, where q is not zero. Rational numbers can be terminating (where the decimal representation ends) or repeating (where the decimal digits repeat indefinitely).
2. Irrational number: An irrational number cannot be expressed as a simple fraction of two integers. Irrational numbers have decimal representations that neither terminate nor repeat.
3. Whole number: A whole number is a non-negative integer, including zero. In other words, it is a positive number without any fractional or decimal part.
4. Integer: An integer includes zero, as well as both positive and negative whole numbers.
Now, let's analyze the given number, 0.62478916532….
The given number is a decimal that shows no indication of terminating or repeating. Since it cannot be written as a fraction of two integers, it is not a rational number. Therefore, we can classify it as an irrational number.
In summary, the number 0.62478916532… belongs to the set of irrational numbers.