If z is a complex number having least ab...

If z is a complex number having least absolute value and `|z-2+2i|=|,` then `z=`

A

`(2-1//sqrt(2))(1-i)`

B

`(2-1//sqrt(2))(1+i)`

C

`(2+1//sqrt(2)(1-i)`

D

`(2+1//sqrt(2))(1+i)`

Text Solution

Verified by Experts

The correct Answer is:

A

We have,
`|z-2+ 2i|= 1`
`rArr |z- (2-2i)|=1`

Hence, z lies on a circle having centre at (2,-2) and radius 1.
It is evident form the figure that the required complex number z is given by the point P.
We find the OP makes an angle `pi//4` with OX and
`OP = OC- CP`
` = sqrt(2^(2) + 2^(2)) - 1 = 2sqrt(2)-1`
So, coordinates of P are `[(2sqrt(2)-1)cos (pi//4),-(2sqrt(2)-1)sin(pi//4)]`i.e.,`((2-1//sqrt(2)), -(2-1//sqrt(2)))`
Hence,
`z = (2-(1)/(sqrt(2)))+{(2-(1)/(sqrt(2)))}i = (2-(1)/(sqrt(2)))(1-i)`

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