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i need it within tomorrow please
Consider the following sequence of successive numbers of the 2k
-th power:
1, 2
2
k
, 3
2
k
, 4
2
k
, 5
2
k
, ...
Show that the difference between the numbers in this sequence is odd for all k ∈ N.

i need it within tomorrow pleaseConsider the following sequence of successive numbers of the 2k-th power:1, 22k, 32k, 42k, 52k, ...Show that the difference betw class=

Answer :

LammettHash

Any even number raised to any power will remain even. (e.g. 2² = 4, 2³ = 8, etc)

Any odd number raised to any power will remain odd. (e.g. 1² = 1³ = ... = 1, 3⁴ = 81, etc)

So [tex](n+1)^{2^k}-n^{2^k}[/tex] will always be even, since both

[even] - [odd] = [odd]

and

[odd] - [even] = [odd]

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