In `Delta ABC , A(z_1) B(z_2) C(z_3)` is inscribed in a circle |z| = 5. If `H(z_H)` be the orthocentre of triangle ABC `z_H`

In A B C ,A(z_1),B(z_2),a n dC(z_3) are inscribed in the circle |z|=5. If H(z_H) be the orthocenrter of triangle A B C , then find z_H

In A B C ,A(z_1),B(z_2),a n dC(z_3) are inscribed in the circle |z|=5. If H(z_n) be the orthocenrter of triangle A B C , then find z_ndot

In A B C ,A(z_1),B(z_2),a n dC(z_3) are inscribed in the circle |z|=5. If H(z_n) be the orthocenrter of triangle A B C , then find z_ndot

In hat harr ABC,A(z_(1)),B(z_(2)), and C(z_(3)) are inscribed in the circle |z|=5. If H(z_(n)) be the orthocenrter of triangle ABC, then find z_(n) .

The center of a square is at z=0. A is z_(1) , then the centroid of the triangle ABC is

A(z_1),B(z_2),C(z_3) are the vertices a triangle ABC inscribed in the circle abs(z)=2 internal angle bosector of the angle A meet the circumference again at D(z_4) then prove z_4^2=z_2z_3

Let vertices of an acute-angled triangle are A(z_1),B(z_2),a n dC(z_3)dot If the origin O is the orthocentre of the triangle, then prove that z_1 bar z _2+ bar z _1z_2=z_2 bar z _3+ bar z _2z_3=z_3 bar z _1+ bar z _3z_1

A(z_1) , B(z_2) and C(z_3) are the vertices of triangle ABC inscribed in the circle |z|=2,internal angle bisector of angle A meets the circumcircle again at D(z_4) .Point D is: