Show that the area of a rhombus is half the product of the lengths of its diagonals. GIVEN : A rhombus `A B C D` whose diagonals `A C` and `B D` intersect at `Odot` TO PROVE : `a r(r hom b u sA B C D)=1/2(A CxB D)`

Show that the area of a rhombus is half the product of the lengths of its diagonals. GIVEN : A rhombus A B C D whose diagonals A C and B D intersect at Odot TO PROVE : a r(r hom b u sA B C D)=1/2(A C*B D)

Show that the area of a rhombus is half the product of the lengths of its diagonals.GIVEN : A rhombus ABCD whose diagonals AC and BD intersect at O. TO PROVE : ar (rhombus ABCD)=(1)/(2)(ACxBD)

Show that the area of a rhombus is half the product of the lengths of its diagonals.Given: A rhombus ABCD whose diagonals.AC and BD intersect at O. To Prove: ar (rhombus ABCD)=(1)/(2)(ACxBD)

Prove that the area of a rhombus is equal to half the rectangle contained by its diagonals. Given: A rhombus A B C D such that its diagonals A C\ a n d\ B D intersect at O . To Prove: a r\ (r hom b u s\ A B C D)=1/2 (area of the rectangle contained by its diagonals =1/2(A C\ times\ B D)

Show that the diagonals of a parallelogram divide it into four triangles of equal area. GIVEN : A parallelogram A B C D . The diagonals A C and B D intersect at Odot TO PROVE : a r( O A B)=a r( O B C)=a r( O C D)=a r( A O D)

Show that the diagonals of a parallelogram divide it into four triangles of equal area. GIVEN : A parallelogram A B C D . The diagonals A C and B D intersect at Odot TO PROVE : a r( O A B)=a r( O B C)=a r( O C D)=a r( A O D)

The symbolic form of "area (A) of a rhombus is half of the product of its diagonals (d_(1),d_(2)) " is_______.

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 intersect at O . Prove that (a r( A C B))/(a r( A C D))=(B O)/(D O)

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)