If ABCD is a square. X is a point on CD, such that DX = DO. Find `(angleDOX)/(angleXOC)`. O is the intersection point of diagonals.

ABCD is a square L and K are two point on AB s.t. BO = BK , AO= AL , O is the intersection point of diagonal .If angle LOK= Q find tan Q

If ABCD is a quadrilateral whose diagonals AC and BD intersect at O, then

Two lines AB and CD intersect at a point O such that angleBOC+angleAOD = 280^(@) , as shown in the figure. Find all the four angles.

Let ABCD be a square and let P be point on segment CD such that DP : PC = 1 : 2. Let Q be a point on segment AP such that angleBQP = 90^@ . Then the ratio of the area of quadrilateral PQBC to the area of the square ABCD is

The point of intersection of diagonals of a square ABCD is at the origin and one of its vertices is at a(4,2). What is the equation of the diagonal BD?

AB is a diameter of the circle. Two points C and D are such point that CD = BD. AB and CD intersect at O. If angle angleAOD=45^(@) . Find angleADC

There are two circular flower beds on two sides of a square lawn ABCD of side 56m .If the centre of each circular flower bed is the point of intersection of the diagonals of the square lawn,find the sum of the areas of the lawn and the flower beds.

Two lines AB and CD intersect each other at a point O such that angleAOC : angleAOD=5 : 7 . Find all the angles.