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ABCD is a parallelogram. The diagonals of the parallelogram intersect at O.
DO=a CO=b
find in terms of b the vector CA=
find in terms of a and b the vector DC=
find in terms of a and b the vector CB=

ABCD is a parallelogram The diagonals of the parallelogram intersect at O DOa COb find in terms of b the vector CA find in terms of a and b the vector DC find i class=

Respuesta :

The vector CA is 2b , The vector DC is b-a , The vector CB is -(a+b).

What is a parallelogram ?

A parallelogram is a polygon with four sides and opposite sides parallel.

It is given that

The diagonals of the parallelogram intersect at O , DO=a CO=b

The vector CA is equal to = vector CO + vector OA = b+b = 2b

as CO ≅ OA.

DO =a , OD = -a

BO = -a , OC = -b

The vector DC = vector CO + vector OD = b-a

The vector CB = vector BO + vector OC = -a -b = -(a+b).

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