In ΔABC, we draw a line l||BF which intersect AC at G. In ΔADG and ΔAEF given that EA is the mid point of AD and DL||EF. So, concept of similar triangle. F is also mid point of AG. AF=FG ...(i) ΔADG and ΔAEF are similar. Again ΔFBC and ΔDCL BF||DG given that AD is median so that CD the mid point of BC. G will be The mid point of CF CG=GF ...(ii) From equations (i) and (ii), we get AF=FG=CG ...(iii) From figure, AC=AF+FG+CG =AF+AF+AF+3AF ⇒ AF=