ABCD a parallelogram, and `A_1 and B_1` are the midpoints of sides BC and CD, respectively. If `vec(AA)_1 + vec(AB)_1 = lamda vec(AC)`, then `lamda` is equal to `

If ABCD is quadrilateral and E and F are the mid-points of AC and BD respectively, prove that vec AB+vec AD+vec CB+vec CD=4vec EF

ABCD is a parallelogram.If L and M are the mid-points of BC and DC respectively,then express vec AL and vec AM in terms of vec AB and vec AD Also,prove that vec AL+vec AM=(3)/(2)vec AC .

In /_ABC if D.E.F are the midpoints of sides BC,CA, AB respectively and vec AD+(2)/(3)vec BE+(1)/(3)vec CF=kvec AC then k=

ABCD is a parallelogram with AC and BD as diagonals. Then, A vec C - B vec D =

If D and E are the mid-points of sides AB and AC of a triangle ABC respectively, show that vec BE+vec DC=(3)/(2)vec BC

ABC is any triangle and D,E, F are mid-poin of sides BC, CA and AB respectively. Let vec AB= vec b and vec AC = vec c Express the third side and the three mdeians in therms of vecb and vec c

ABCD is a parallelogram . If vec(AB)=vec(a), vec(BC)=vec(b) , then what vec(BD) equal to ?

If M and N are the mid-points of the diagonals AC and BD respectively of a quadrilateral ABCD,then the of vec AB+vec AD+vec CB+vec CD equals

If ABCD is a parallelogram, then vec(AC) - vec(BD) =