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Question

Let z1 and z2 be any two non-zero complex numbers such that 3|z1|=4|z2|. If z=3z12z2+2z23z1 then :

A
Im(z)=0
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B
Re(z)=0
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C
|z|=12172
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D
|z|=52
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E
Re(z)=52cos(θ1θ2)
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Solution

The correct option is E Re(z)=52cos(θ1θ2)
z1=r1eiθ1, z2=r2eiθ2
z1z2=r1eiθ1r2eiθ2=r1r2ei(θ1θ2)
Since, 3|z1|=4|z2|
3r1=4r2r1r2=43
z1z2=43ei(θ1θ2)
Similarly,
z2z1=34ei(θ2θ1)
Now,
z=3z12z2+2z23z1 =32×43ei(θ1θ2)+23×34ei(θ2θ1)
z=2cos(θ1θ2)+2isin(θ1θ2) +12cos(θ2θ1)+12isin(θ2θ1)

z=52cos(θ1θ2)+32isin(θ1θ2)

|z|=254cos2(θ1θ2)+94sin2(θ1θ2)
Im(z)=32sin(θ1θ2)
Re(z)=52cos(θ1θ2)

No options matches with the answer,
It is bonus question.

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