Let z1=10+6i and z2=4+6i. If z is any complex number such that the argument of (z−z1)/(z−z2) is π/4, then |z−7−9i| is
A
√2
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B
2√2
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C
3√2
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D
4√2
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Solution
The correct option is C3√2
arg(z−z1z−z2)=π4 Locus of z is major arc whose centre is at z0.Applying rotation at z0, we have z0−(10+6i)z0−(4+6i)=|z0−(10+6i)||z0−(4+6i)|eiπ/2 ⇒z0−(10+6i)z0−(4+6i)=i⇒z0−10−6i=iz0−4i+6 ⇒z0=7+9i radius of arc will be r=3√2 unit Hence |z−7−9i|=|z−z0|=r=3√2 unit