[" 112) If "ABCD" is a rhombus whose diagonals cut at "],[" the origin "O," then "vec OA+vec OB+vec OC+vec OD=?]

If ABCD is a rhombus whose diagonals cut at the origin O, then proved that vec OA+vec OB+vec OC+vec OD+vec O

If A B C D is a rhombus whose diagonals cut at the origin O , then proved that vec O A+ vec O B+ vec O C+ vec O D+ vec Odot

If A B C D is a rhombus whose diagonals cut at the origin O , then proved that vec O A+ vec O B+ vec O C+ vec O D+ vec Odot

If A B C D is a rhombus whose diagonals cut at the origin O , then proved that vec O A+ vec O B+ vec O C+ vec O D+ vec Odot

If A B C D is a rhombus whose diagonals cut at the origin O , then proved that vec O A+ vec O B+ vec O C+ vec O D =0

If A B C D is a rhombus whose diagonals cut at the origin O , then proved that vec O A+ vec O B+ vec O C+ vec O D =0

If ABCD is a rhombus whose diagonals intersect at E, then vec(EA) + vec(EB) + vec(EC) + vec( ED) equals

ABCD is a parallelogram whose diagonals meet at P. If O is a fixed point, then vec(OA)+vec(OB)+vec(OC)+vec(OD) equals :

ABCD is a parallelogram whose diagonals meet at P. If O is a fixed point, then vec(OA)+vec(OB)+vec(OC)+vec(OD) equals :