In a sequence the nth term is given by the expression n^+n, explain why none of the terms of this sequence can be an odd number?

1 Answer
Monzur R.
May 8, 2018

The assertion is false as the first term of the sequence is odd.

Explanation:

Assuming the sequence is #{n^n}_(n in NN^+)#, then the first term is #1^1=1.# This is enough to prove the assertion that the sequence has no odd terms is false.

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