one vertex of the triangle of maximum area that can be inscribed in the curve `|z-2i|=2` is `2+2i,` then remaining vertices are

The triangle of maximum area that can be inscribed in a circle is

If one vertex of the triangle having maximum area that can be inscribed in the circle |z-i|=5 is 3-3i , then find the other vertices of the triangle.

If one vertex of the triangle having maximum area that can be inscribed in the circle |z-i|=5i s3-3i , then find the other vertices of the triangle.

If one vertex of the triangle having maximum area that can be inscribed in the circle |z-i|=5i s3-3i , then find the other vertices of the triangle.

If one vertices of the triangle having maximum area that can be inscribed in the circle |z-i| = 5 is 3-3i, then find the other verticles of the traingle.

A rectangle of maximum area is inscribed in the circle |z-3-4i|=1. If one vertex of the rectangle is 4+4i , then another adjacent vertex of this rectangle can be a. 2+4i b. 3+5i c. 3+3i d. 3-3i

A rectangle of maximum area is inscribed in the circle |z-3-4i|=1. If one vertex of the rectangle is 4+4i, then another adjacent vertex of this rectangle can be 2+4i b.3+5i c.3+3i d.3-3i

A rectangle of maximum area is inscribed in the circle |z-3-4i|=1. If one vertex of the rectangle is 4+4i , then another adjacent vertex of this rectangle can be a. 2+4i b. 3+5i c. 3+3i d. 3-3i

A rectangle of maximum area is inscribed in the circle |z-3-4i|=1. If one vertex of the rectangle is 4+4i , then another adjacent vertex of this rectangle can be a . 2+4i b. 3+5i c. 3+3i d. 3-3i