AB = AC
[Angles opposite to equal sides of isosceles
]
[
CE and BD are the bisectors of
and
, respectively]

BP = PC .....(i) [Side oppoite to equal angles of
]
In
BPE and
CPD,
BP = CP [proved above]
[Proved above]
[Vertically opposite angles]
[ASA axiom]
PE = PD [CPCT]
PD = PE ....(iii)
Adding (i) and (ii), we get
BP + PD = PC + PE
BD = CE
Draw the angle
and no. 10
page no. 3