State whether the statement given in the question is true or False:
Every natural number is a rational number but every rational number need not be a natural number.

True

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False

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Solution

The correct option is A True
Given the statement, “Every natural number is a rational number but every rational number need not be a natural number.”
Since Natural Numbers and Rational Numbers do not have the same properties, every Natural Number is also a Rational Number. When it comes to a rational number that might or might not be a natural number, there is no such thing as it. We are aware that $1 = \frac{1}{1}, 2 = \frac{2}{1}$ , etc.
The quotient of two integers could be expressed as a natural number, $n = \frac{n}{1}$ . As a result, any natural number is a rational number. On the other hand, $\frac{5}{2}, \frac{3}{5}, \frac{2}{7}, \frac{4}{20}$ , etc, all Rational Numbers aren’t natural numbers.
Hence, the given statement is “True”.

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