ABC is an isosceles triangle in which `A B =A C`. AD bisects exterior angle PAC and `C D ||A B`. Show that(i) `/_D A C =/_B C A ` and (ii) ABCD is a parallelogram.

ABC is an isosceles triangle in which AB = AC . AP bisects exterior angle DAC and CP II AB . Show that angle PAC = Angle BCA (ii) ABCP is a Parallelogram

In Figure, A B C is an isosceles triangle in which A B=A Cdot and C P||A B and A P is the bisector of exterior /_C A D of A B C . Prove that /_P A C=/_B C A and (ii) A B C P is a parallelogram.

A B C is an isosceles triangle in which A B=A C,B E\ a n d\ C F are its two medians. Show that B E=C Fdot

In figure A B=A C\ a n d\ C P||B A and A P is the bisector of exterior /_C A D of A B C . Prove that (i) /_P A C=/_B C A (ii) A B C P is a parallelogram

ABC is an isosceles triangle with A B =\ A C . Draw A P_|_B C to show that /_B =/_C.

A B C is a triangle in which /_B=/_C and ray A X bisects the exterior angle D A C . If /_D A X=70^0 find /_A C Bdot

A B C is an isosceles triangle with A B=A C and D is a point on A C such that B C^2=A CXC D . Prove that B D=B C .

If A B C is an isosceles triangle such that A B=A C and A D is an altitude from A on B C . Prove that (i) /_B=/_C (ii) A D bisects B C (iii) A D bisects /_A

If A B C is an isosceles triangle such that A B=A C and A D is an altitude from A on B C . Prove that (i) /_B=/_C (ii) A D bisects B C (iii) A D bisects /_A

ABC is an isosceles triangle in which A B""=" "A C . Side BA is produced to D such that A D" "=" "A B (see Fig. 7.34). Show that /_B C D is a right angle.