Which simplifications of the powers of i are correct? There may be more than one correct answer.
Select all correct answers.
I^22=1
I^11=−i
I^21=i
I^12=i
I^20=1
I^26=−1
I^27=i

[tex]\bf i^2=-1\qquad\qquad i^3=-i\qquad \qquad i^4=1 \\\\[-0.35em] \rule{34em}{0.25pt}\\\\ i^{22}\implies i^{(4\cdot 5)+2}\implies i^{4\cdot 5}i^2\implies (i^4)^5 i^2\implies 1^5(-1)\implies -1~\dotfill \bigotimes \\\\\\ i^{11}\implies i^{(2\cdot 5)+1}\implies (i^2)^5 i\implies (-1)^5(i)\implies -i~\dotfill \checkmark[/tex]

[tex]\bf i^{21}\implies i^{(4\cdot 5)+1}\implies (i^4)^5 i\implies 1^5(i)\implies i~\dotfill \checkmark \\\\\\ i^{12}\implies i^{3\cdot 4}\implies i^3 i^4\implies (-i)(1)\implies -i\dotfill \bigotimes \\\\\\ i^{20}\implies i^{4\cdot 5}\implies (i^4)^5\implies 1~\dotfill \checkmark \\\\\\ i^{26}\implies i^{(4\cdot 6)+2}\implies (i^4)^6 i^2\implies 1^6(-1)\implies -1\dotfill \checkmark \\\\\\ i^{27}\implies i^{(4\cdot 6)+3}\implies (i^4)^6 i^3 \implies 1^6(-i)\implies -i\dotfill \bigotimes[/tex]

Which simplifications of the powers of i are correct? There may be more than one correct answer. Select all correct answers. I^22=1 I^11=−i I^21=i I^12=i I^20=1 I^26=−1 I^27=i

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Which simplifications of the powers of i are correct? There may be more than one correct answer.
Select all correct answers.
I^22=1
I^11=−i
I^21=i
I^12=i
I^20=1
I^26=−1
I^27=i