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Question

Let z=32i2. Then the smallest positive integer n such that (z95+i67)94=zn is

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Solution

From the hypothesis, we have
z=32i2=i(12i32)=iω
where ω=12i32, which is a cube root of unity.

Now, z95=(iω)95=iω2
and i67=i3=i
Therefore, z95+i67=i(1+ω2)=(i)(ω)=iω
(z95+i67)94=(iω)94=i2ω=ω

Now, ω=zn=(iω)n
inωn1=1
n=2,6,10,14,
and n1=3,6,9,
Hence, n=10 is the required least positive integer.


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