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.

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

Two vertices of a triangle are (3,1) (-6,5) and the centroid is at the origin. Find the third vertex of the triangle.

If the centroide of a triangle is at (4,-2) and two of its vertices are (3,-2) and ( 5,2) then find the thrid vertex of the triangle .

If two vertices of a triangle are (1,3) and (4,-1) and the area of triangle is 5 sq. units, then the angle at the third vertex lies in :

If the centroid of a triangle is at (4,-2) and two of its vertices are (3,-2) an (5,2) then find the third vertex of the triangle .

If the area of the triangle whose one vertex is at the vertex of the parabola, y^(2) + 4 (x - a^(2)) = 0 and the other two vertices are the points of intersection of the parabola and Y-axis, is 250 sq units, then a value of 'a' is

Find the area of the greatest isosceles triangle that can be inscribed in the ellipse ((x^2)/(a^2))+((y^2)/(b^2))=1 having its vertex coincident with one extremity of the major axis.

If the maximum value of |3z +9 - 7i | if |z+2-i|=5 is 5K, then find k

Find the area of the triangle formed by joining the mid-points of the sides of the triangle whose vertices are (0, -1), (2, 1) and (0, 3). Find the ratio of this area to the area of the given triangle.