![]() The continuum hypothesis states that "there is no set whose cardinality is strictly between that of the natural numbers and that of the real numbers" which essentially means real numbers form the second "smallest" infinity. So what this essentially says is that "there are more real numbers (which include rational and irrational numbers) than there are integers" in some sense. In fact, this cardinality is the first transfinite number denoted by $\aleph_0$ i.e. Can you explain this answer? tests, examples and also practice Class 7 tests.The cardinality of the natural number set is the same as the cardinality of the rational number set. ![]() c)Both p and q are true.d)Both p and q are false.Correct answer is option 'B'. ![]() Can you explain this answer? theory, EduRev gives you anĪmple number of questions to practice p: All integers are rational numbers.q: Every rational number is an integer.Which of the following statements is correct?a)p is false and q is true.b)p is true and q is false. Consider the statement All integers are rational numbers but some rational numbers are not integers. Can you explain this answer? has been provided alongside types of p: All integers are rational numbers.q: Every rational number is an integer.Which of the following statements is correct?a)p is false and q is true.b)p is true and q is false. ![]() Can you explain this answer?, a detailed solution for p: All integers are rational numbers.q: Every rational number is an integer.Which of the following statements is correct?a)p is false and q is true.b)p is true and q is false. In a similar manner, the set of algebraic numbers is. Theorem (the set of all integers) and (the set of all rational numbers) are countable. If a pair is treated as the numerator and denominator of a. P: All integers are rational numbers.q: Every rational number is an integer.Which of the following statements is correct?a)p is false and q is true.b)p is true and q is false. The set of all integers and the set of all rational numbers may intuitively seem much bigger than. Can you explain this answer? defined & explained in the simplest way possible. Here you can find the meaning of p: All integers are rational numbers.q: Every rational number is an integer.Which of the following statements is correct?a)p is false and q is true.b)p is true and q is false. Can you explain this answer? covers all topics & solutions for ClExam.įind important definitions, questions, meanings, examples, exercises and tests below for p: All integers are rational numbers.q: Every rational number is an integer.Which of the following statements is correct?a)p is false and q is true.b)p is true and q is false. Information about p: All integers are rational numbers.q: Every rational number is an integer.Which of the following statements is correct?a)p is false and q is true.b)p is true and q is false. The Question and answers have been prepared Can you explain this answer? for Clis part of Class 7 preparation. P: All integers are rational numbers.q: Every rational number is an integer.Which of the following statements is correct?a)p is false and q is true.b)p is true and q is false.
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