The diagonals of a rectangle `A B C D` intersect in `Odot` If `/_B O C=68^0,` find `/_O D Adot`

The diagonals of a rectangle ABCD intersect in O. If /_BOC=68^(@), find /_ODA

The diagonals of a rectangle A B C D meet at Odot If /_B O C=44^0, find /_O A Ddot

The diagonals of a rectangle A B C D meet at Odot If /_B O C=44^0, find /_O A Ddot

The diagonals of a rectangle A B C D\ meet at O . If /_B O C=44^0, find /_O A D

The diagonals of a rectangle A B C D\ meet at O . If /_B O C=44^0, find /_O A D

The diagonals of a parallelogram A B C D intersect at O . If /_B O C=90^0\ a n d\ /_B D C=50^0, then /_O A B= (a) 40^0 (b) 50^0 (c) 10^0 (d) 90^0

The diagonals of a parallelogram A B C D intersect at O . If /_B O C=90^0\ a n d\ /_B D C=50^0, then /_O A B= 40^0 (b) 50^0 (c) 10^0 (d) 90^0

The diagonals of quadrilateral A B C D ,A C and B D intersect in Odot Prove that if B O=O D , the triangles A B C and A D C are equal in area. GIVEN : A quadrilateral A B C D in which its diagonals A C and B D intersect at O such that B O = O Ddot TO PROVE : a r( A B C)=a r( A D C)

The diagonals of quadrilateral A B C D ,A C and B D intersect in Odot Prove that if B O=O D , the triangles A B C and A D C are equal in area. GIVEN : A quadrilateral A B C E in which its diagonals A C and B D intersect at O such that B O = O Ddot TO PROVE : a r( A B C)=a r( A D C)

The diagonals of a parallelogram A B C D intersect at a point Odot Through O , a line is drawn to intersect A D\ at P and B C at Qdot Show that P Q divides the parallelogram into two parts of equal area.