The equation bar(z)=bar(z0)+A(z-z0) whe...

The equation `bar(z)=bar(z_0)+A(z-z_0)` where A is a constant, and if m is the slope of the straight line then A is

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If z=z_(0)+A(bar(z)-(bar(z)_(0))), whereA is a constant,then prove that locus of z is a straight line.

If z=z_0+A( bar z -( bar z _0)), w h e r eA is a constant, then prove that locus of z is a straight line.

If z=z_0+A( bar z -( bar z _0)), w h e r eA is a constant, then prove that locus of z is a straight line.

If z=z_0+A( bar z -( bar z _0)), w h e r eA is a constant, then prove that locus of z is a straight line.

Solve the equation, z^(2) = bar(z) , where z is a complex number.

Solve the equation z^(2)=bar(z) where z=x+iy

The equation zbar(z)+abar(z)+bar(a)z+b=0,b in R represents circle,if

The equation z bar z+a bar z+bar a z+b=0, b in R represents a circle if :

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