Question

In a figure d e f are the midpoints of sides ab bc and ac respectively P is a foot of the perpendicular from A to side BC show that point D, F,Eand P are concyclic

Answer 1

Answer:

D, F, E and P are con cyclic is proved.  

Step-by-step explanation:

In a given ΔABC d,e,f are the mid points of the sides AB, BC and AC.

And AD ⊥ BC

To prove: D, F, E AND P are con cyclic.

In right angle ΔADP , R is the mid point of AB.

RB=RD

SO,∠2=∠1

SO THE EQUATION GOES LIKE,

∠2+∠4=180°

∠3+∠4= 180°

SO IT IS PROVED.