Rewrite the following statement in five different ways conveying the same meaning.
If a natural number is odd then its square is also odd.
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Solution
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The given statement can be written in five different ways as follows:
A natural number is odd implies that its square is odd.
A natural number is odd only if its square is odd.
For a natural number to be odd it is necessary that its square is odd.
For the square of a natural number to be odd it is sufficient that the number is odd.
If the square of a natural number is not odd then the natural number is not odd.
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