Let barz+bbarz=c,b!=0 be a line the comp...

Let `barz+bbarz=c,b!=0` be a line the complex plane, where `bar b` is the complex conjugaste of b. If a point `z_1` i the reflection of the point `z_2` through the line then show that `c=barz_1b+z_2barb`

Text Solution

Verified by Experts

The correct Answer is:

` (z barz_(1) - barz_(2) barz_(2))/(lambda) = c `

Similar Questions

Explore conceptually related problems

Let barbz+b(barz)=c,b!=0 be a line the complex plane, where bar b is the complex conjugate of b. If a point z_1 i the reflection of the point z_2 through the line then show that c=barz_1b+z_2barb

If a point z_(1) is the reflection of a point z_(2) through the line b barz+barbz=c, b in 0 , in the Argand plane, then b barz_(2)+ barb z_(1)=

Find the complex number z if z^2+barz =0

If a point z_(1) is a reflection of a point z_(2) through the line bbar(z)+bar(b)z+c=0,b!=0 in the argand plane.Then bbar(z_(1))+bar(b)z_(2)

Find the complex number z if zbarz = 2 and z + barz=2

If a & b are complex numbers then find the complex numbers z_1 & z_2 so that the points z_1 , z_2 and a , b be the corners of the diagonals of a square.

If z_1=7+3i and z_2=-7+3i then find the following: barz_1barz_2

If z(bar(z+alpha))+barz(z+alpha)=0 , where alpha is a complex constant, then z is represented by a point on

Let A(2,0) and B(z) are two points on the circle |z|=2 . M(z') is the point on AB . If the point barz' lies on the median of the triangle OAB where O is origin, then arg(z') is

Let `barz+bbarz=c,b!=0` be a line the complex plane, where `bar b` is the complex conjugaste of b. If a point `z_1` i the reflection of the point `z_2` through the line then show that `c=barz_1b+z_2barb`

Text Solution

Similar Questions

Recommended Questions