In ` A B C ,A D` is the median through `A` and `E` is the mid-point of `A D` . `B E` produced meets `A C` in `F` (Figure). Prove that `A F=1/3A Cdot`

In ABC,AD is the median through A and E is the mid-point of AD.BE produced meets AC in F (Figure).Prove that AF=(1)/(3)AC .

In triangleABC, AD is the median through A and E is the mid point of AD. BE is produced so as to meet AC in F. prove that AF=1/3AC

A B C D is a parallelogram and E is the mid-point of B C ,\ D E\ a n d\ A B when produced meet at F . Then A F=

In Figure, A D , and B E are medians of A B C and B E || D Fdot Prove that C F=1/4A Cdot

In Figure, A B C\ a n d\ B D E are two equilateral triangls such that D is the mid-point of B C. If A E intersects B C in F , Prove that: a r( B D E)=1/4a r\ (\ A B C) .

In Figure, A D is the median and D E||A B . Prove that B E is the median.

In Figure, A D is the median and D E||A B . Prove that B E is the median.

A B C D is a parallelogram. A D is a produced to E so that D E=D C and E C produced meets A B produced in Fdot Prove that B F=B Cdot

A B C D is a parallelogram. A D is a produced to E so that D E=D C and E C produced meets A B produced in Fdot Prove that B F=B Cdot

A B C D is a parallelogram. A D is a produced to E so that D E=D C and E C produced meets A B produced in Fdot Prove that B F=B Cdot