The median AD to `DeltaABC` is bisected at E and BE is produced to meet the side AC in F. Show that `bar(AF)=1/3bar(AC) `

The median AD of the triangle ABC is bisected at E. BE meets AC in F then AF : AC is

In DeltaABC , the bisector AD of A is perpendicular to side BC Show that AB = AC and DeltaABC is isosceles.

In the figure, ABCD is a quadrilateral. AC is the diagonal and DE || AC and also DE meets BC produced at E. Show that ar(ABCD) = ar (DeltaABE).

In the adjacent figure ABCD is a parallelogram and E is the midpoint of the side BC. If DE and AB are produced to meet at F, show that AF=2AB .

In the adjacent figure ABCD is a parallelogram and E is the midpoint of the side BC. If DE and AB are produced to meet at F, show that AF = 2AB .

If D is the midpoint of the side BC of a triangle ABC then bar(AB)^(2)+bar(AC)^(2)=

In DeltaABC , if D is the midpoint of BC then prove that bar(AD)=(bar(AB)+bar(AC))/2

In DeltaABC , if D, E, F are the midpoints of the sides BC, CA and AB respectively, then what is the magnitude of the vector bar(AD)+bar(BE)+bar(CF) ?

In the adjacent figure triangle ABC is isosceles as bar (AB) =bar(AC), bar(BA) and bar(CA) are produced to Q and P such that bar(AQ)= bar(AP) .. Show that bar(PB) =bar(QC)