samuelclarke
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When we're solving for roots of unity and the power is odd (z^3=1) does that mean we use k = 0, +-1, +-2? and if the power is even (z^4=1) do we use k=0,1,2...?
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Roots of unity (1 Viewer)
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Carrotsticks
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Nope.
If we have something like z^3=1, then we use k=0, +-1. Each k value gives a different solution. Since we have 3 solutions, we do k=0, +-1 (3 solutions).
You has +-2 there, which would have given us repeats.
If it was z^5=1, THEN we would use k=0, +-1, +-2.
For even n, we do the usual k=0, +-1 etc etc, then we take the next positive value of k.
ie: z^4 = 1. Then we would have k=0, +-1, +2.
z^6 = 1. We would have k=0, +-1, +-2, +3.
etc etc.
If we have something like z^3=1, then we use k=0, +-1. Each k value gives a different solution. Since we have 3 solutions, we do k=0, +-1 (3 solutions).
You has +-2 there, which would have given us repeats.
If it was z^5=1, THEN we would use k=0, +-1, +-2.
For even n, we do the usual k=0, +-1 etc etc, then we take the next positive value of k.
ie: z^4 = 1. Then we would have k=0, +-1, +2.
z^6 = 1. We would have k=0, +-1, +-2, +3.
etc etc.
samuelclarke
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wait so either way the 'k' would be 0, -1, +1, -2 and so on depending upon the 'n' value in z^n?
Carrotsticks
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Yep, just keep progressing with the plus/minus until we get n solutions.
samuelclarke
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ok thanks!