1 Answer

Jean Costa · Answer 1 · 2023-07-14T13:58:45+0000

1) We need to find out a pattern for the powers that have a base 2:

$\begin{gathered} 2^(1)=2 \\ 2^2=4 \\ 2^3=8 \\ 2^4=16 \\ 2^5=32 \\ 2^6=64 \\ 2^7=128 \\ 2^8=256 \\ (\ldots) \end{gathered}$

Note that from 4 to 4 powers the last digit starts to repeat itself.

2) So, let's proceed with this dividing the exponent 2058 by 4:

Now, note that the remainder is 2, therefore we can state that:

$2^(2058)=same\: ones\: digit\: as\colon2^2=4$

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