Which statement is true about relationships between the number sets?
I took a sacrifice
]1.Whole numbers include all natural numbers and 0.
2.It is an integer but not a whole number.
3. 3.399
4.integers'
5.7m
6. 6 and 6.5
7. <
8.1 3/4
9. 14.12
10. 6 x 1000 + 7 x100 + 3x10 +9 x1
11. 0.72 (line over 72)
12.8/11
13. 5 1/7
14. 19/7
I got 9/18 so unless I get the 4 points at the end im doomed but these are all right
Without any specific number sets provided, it is not possible to determine which statement is true about the relationships between the number sets.
To provide a step-by-step answer, please provide more details or options for me to choose from regarding the relationships between the number sets.
To determine which statement is true about the relationships between number sets, we need to evaluate each statement one by one and determine if it is true or false.
1. The set of natural numbers is a subset of the set of whole numbers.
The statement is true. To understand this, it's important to know the definitions of natural numbers and whole numbers. Natural numbers are the counting numbers starting from 1 (1, 2, 3, 4, ...), whereas whole numbers include zero as well (0, 1, 2, 3, ...). Since all natural numbers are also included in the set of whole numbers, the set of natural numbers is indeed a subset of the set of whole numbers.
2. The set of real numbers is a subset of the set of rational numbers.
The statement is false. Real numbers include all numbers on the number line, including all rational numbers (numbers that can be expressed as a fraction). However, real numbers also contain irrational numbers (numbers that cannot be expressed as a fraction), such as π (pi), √2 (square root of 2), etc. Therefore, the set of real numbers is not a subset of the set of rational numbers.
3. The set of integers is a superset of the set of whole numbers.
The statement is true. Again, let's define the two sets. Integers include zero, positive whole numbers, and negative whole numbers (..., -3, -2, -1, 0, 1, 2, 3, ...). Whole numbers include zero and all positive numbers (0, 1, 2, 3, ...). Since the set of integers includes all the numbers in the set of whole numbers, as well as additional negative numbers, the set of integers is indeed a superset of the set of whole numbers.
Based on the explanations above, statement 1 and statement 3 are both true about the relationships between the number sets.