Reflection of the complex number 2−i3+i in the straight line z(1+i) = ¯z(i−1) is
Let z1 = 2−i3+i = (2−i)(3−i)(3+i)(3−i)
= 6−3i−2i+i2
= 5−5i10
= 12(1−i)
The equation of the straight line is
Z(1 + i) = ¯¯¯z(i−1)
(z + ¯z) + i(z - ¯z) = 0
2x+2iyi = 0
⇒2x−2y=0
⇒x−y = 0
Let the reflection of z1 be z2 (z1 + iy1)
To find the reflection about y = x, interchange the x and y co-ordinates
⇒The reflection of 12 + −12i is
−12 + 12i = −1+i2