Need help on the question below.
Which number belongs to the set of rational numbers but does not belong to the set of whole numbers?
a. -1
b. 0
c. 1
d. 2
Thanks...
Really i need help with all the answer!!π‘π€
Wth bro WE NEED ANSWERS (Levi make him scream)
To determine which number belongs to the set of rational numbers but does not belong to the set of whole numbers, let's first understand what each set represents.
The set of whole numbers (W) includes all the positive integers (1, 2, 3, ...) and zero (0).
The set of rational numbers (Q) includes all numbers that can be written as a fraction, where the numerator and denominator are both integers, and the denominator is not zero.
Now, let's go through the options to determine the correct answer:
a. -1: This number belongs to both the set of rational numbers and the set of whole numbers since it can be written as the fraction -1/1.
b. 0: This number belongs to both the set of rational numbers and the set of whole numbers since it can be written as the fraction 0/1.
c. 1: This number belongs to both the set of rational numbers and the set of whole numbers since it can be written as the fraction 1/1.
d. 2: This number belongs to both the set of rational numbers and the set of whole numbers since it can be written as the fraction 2/1.
From the options provided, all of them belong to both the set of rational numbers and the set of whole numbers. Therefore, there is no number that belongs to the set of rational numbers but does not belong to the set of whole numbers in this given set of options.
I hope this explanation helps! Let me know if you have any further questions.
Hint:
whole numbers are positive integers including the zero