If one of the vertices of the square circumscribing the circle `|z - 1| = sqrt2` is `2+ sqrt3 iota`. Find the other vertices of square

If one of the vertices of the square circumscribing the circle |z-1|=sqrt(2) is 2+sqrt(3)t. Find the other vertices of square

Let one of the vertices of the square circumseribing the circle x^(2) + y^(2) - 6x -4y + 11 = 0 be (4, 2 + sqrt(3)) The other vertices of the square may be

If (1sqrt(3)) be one of the vertices of an equilateral triangle in circled in the circle x^(2)+y^(2)=4, then the other vertices are

The center of a square is at the origin and its one vertex is A(2,1). Find the coordinates of the other vertices of the square.

A regular hexagon is drawn circumscribing the circle with centre (1,(1)/(sqrt(3))) and radius 2. (3,sqrt(3)) is one vertex and other vertices are (x_(i),y_(i)), i = 1,2,3,4,5 . Then, sum_(i=1)^(5)(x_(i)+y_(i)) is

The diameter of a circle circumscribing a square is 15 sqrt2 cm What is the length of the side of the square

Let z1,z2,z3 be three vertices of an equilateral triangle circumscribing the circle |z|=(1)/(2)* If z1=(1)/(2)+((sqrt(3))iota)/(2) and z1,z2,z3 are in the anticlockwise sense then z2is

IF one of the vertices of a square is (3,2) and one of the diagonalls is along the line 3x+4y+8=0, then find the centre of the square and other vertices.