Adding powers of i I've been struggling with figuring out how

Answered question

2022-01-17

Adding powers of i
Ive

Answer & Explanation

nick1337

nick1337

Expert2022-01-19Added 777 answers

Step 1 Observing that i3+i4++i50 is a geometric progression with ratio i, first term i3 and 503+1=48 terms, we have i3+i4++i50=i3×1i503+11i =i3×1i481i i2i×1(i2)241i =i1(1)241i=i111i=0 Edit: arithmetic corrected to geometric
Vasquez

Vasquez

Expert2022-01-19Added 669 answers

From i2=1 you get i4n=1, i4n+1=i, i4n+2=1 and i4n+3=i Then you just count your positive and negative multiples of 1 and i. In particular, i3+i4++i50=0
alenahelenash

alenahelenash

Expert2022-01-24Added 556 answers

Hint i3+i4++ik=0k2 (mod 4) Generally, suppose that z has order m>1. Therefore zn=1m|n hence: Lemma zj+zj+1++zk=0kj1 (mod m) Proof: zj(1+z++zkj)=zj1zkj+11z=0m|kj+1

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