as we know that sum of two consecutive triangular number is a square number .so we can state that square can be written as a sum of two triangular numbers so if we can define the square of any number as sum of any two number, then it's States all of the natural numbers are triangular numbers. but this is contrary to the fact that only specific number are triangular numbers !how this contradiction arises? reason your answer or explanation
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Step-by-step explanation:
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