Which of the following statements is false?
A. All real numbers are rational numbers.
B. Every integer is a rational number.
C. All natural numbers are integers.
D. Every whole number is a real nur

A is false. Not all reals numbers are rational numbers. Some real numbers can contain irrational numbers, like [tex]\sqrt{2}[/tex]. This is a real number, but isn't rational since it cannot be represented as a ratio.

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Heather Heather · Answer 2 · 2022-08-08T06:44:51+02:00

Answer: A. All real numbers are rational numbers.

Step-by-step explanation:

[✗] A. All real numbers are rational numbers.

➜ False! Real numbers include numbers such as π or [tex]\sqrt{2}[/tex], which are not rational numbers.

[✓] B. Every integer is a rational number.

➜ True! Rational numbers include all integers.

[✓] C. All natural numbers are integers.

➜ Also true! Integers include all natural numbers.

[✓] D. Every whole number is a real number.

➜ Yes, real numbers include whole numbers. This is true!

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Which of the following statements is false? A. All real numbers are rational numbers. B. Every integer is a rational number. C. All natural numbers are integers. D. Every whole number is a real nur

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Which of the following statements is false?
A. All real numbers are rational numbers.
B. Every integer is a rational number.
C. All natural numbers are integers.
D. Every whole number is a real nur