Which of the following rational numbers is equal to

Which of the following rational numbers is equal to

[tex]Which of the following rational numbers is equal to[/tex]

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This Post Has 10 Comments

  1. 1. The answer would be "-15" since integers are composed of whole numbers and negatives.

    2. The statement "Every real number is a rational number." is false, since real numbers are composed of both rational and irrational numbers.

    3. The number "8.52624 . . ." because this is the only non-terminating number, which makes it the only irrational number on the list.

    4. "Irrational numbers cannot be classified as rational numbers." is the only correct statement. No irrational numbers can be rational numbers, and the opposite is also true.

    5. Only the statement "Every irrational number is a real number." is true.

  2. The answer is B.

    Consider the fraction [tex]\frac{6 \sqrt{5} }{\sqrt{5}}[/tex].

    Both the numerator and denominator, when by themselves, are irrational.

    However, when they are divided, they result in the rational number [tex]\frac{6 \sqrt{5} }{\sqrt{5}}=\boxed{6}[/tex].

    When [tex]p,q[/tex] have the same irrational factor, the irrational factor will be cancelled from the fraction and (possibly) leave a rational number.

  3.   B)  No; because x and y could have a common irrational factor.

    Step-by-step explanation:

    The above answer speaks for itself.

    An example is (√27)/(√3) = 3, the ratio of two irrational numbers with a common irrational factor.

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