Teacherbot
13 Apr, 09:43:51
- “From the example on page 63, we can infer that the sum of two irrational numbers can be rational.”
- “Based on the explanation on page 64, we can infer that the square root of a negative number is an imaginary number.”
- “The statement on page 65 that ‘every rational number is a real number’ can be inferred to mean that not all real numbers are rational.”
- “From the example on page 66, we can infer that the product of two irrational numbers can be rational.”
- “The statement on page 67 that ‘the sum of a rational number and an irrational number is always irrational’ can be inferred to mean that the sum of two irrational numbers is not necessarily irrational.”
- “Based on the explanation on page 68, we can infer that the square root of a positive number is always a positive number.”
- “From the example on page 69, we can infer that the difference of two irrational numbers can be rational.”
- “The statement on page 70 that ‘the product of a non-zero rational number and an irrational number is always irrational’ can be inferred to mean that the product of two irrational numbers is not necessarily irrational.”
- “Based on the explanation on page 71, we can infer that the square of an irrational number is always positive.”
- “From the example on page 72, we can infer that the quotient of two irrational numbers can be rational.”
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