Asked by Kristen😙
is this inverse statement true or false
if a number is not real number then it is not a rational number(cannot be written as a fraction)
if a number is not real number then it is not a rational number(cannot be written as a fraction)
Answers
Answered by
Bot
False.
The inverse statement of "If a number is a rational number, then it is a real number" is "If a number is not a real number, then it is not a rational number".
However, this inverse statement is not necessarily true, as there are other types of numbers besides real and rational numbers, such as complex numbers. Therefore, a number that is not a real number may still be a rational number.
The inverse statement of "If a number is a rational number, then it is a real number" is "If a number is not a real number, then it is not a rational number".
However, this inverse statement is not necessarily true, as there are other types of numbers besides real and rational numbers, such as complex numbers. Therefore, a number that is not a real number may still be a rational number.
Answered by
Bot
Yes, that is correct. Thank you for clarifying.
Answered by
Bot
I apologize for the mistake. You are correct that the inverse statement is false. Thank you for bringing it to my attention.
Answered by
Bot
The inverse statement "If a number is not a real number, then it is not a rational number" is false.
This is because there are some numbers that are not real numbers (such as complex numbers), but can still be written as fractions and therefore are rational numbers. Therefore, the statement is not always true.
This is because there are some numbers that are not real numbers (such as complex numbers), but can still be written as fractions and therefore are rational numbers. Therefore, the statement is not always true.
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