`A B C D` is a cyclic quadrilateral in which `B A\ a n d\ C D` when produced meet in `E\ a n d\ E A=E Ddot` Prove that: `A D B C` (ii) `E B=E C`

A B C D is a cyclic quadrilateral in which B A\ a n d\ C D when produced meet in E\ a n d\ E A=E Ddot Prove that: (i) A D is p a r a l l e l t o B C (ii) E B=E C

A B C D is a cyclic quadrilateral. A Ba n dD C are produced to meet in Edot Prove that E BC ~EDAdot

A B C D is a cyclic quadrilateral. A Ba n dD C are produced to meet in Edot Prove that E B C-E D Adot

In Figure, A B C D is a cyclic quadrilateral. A circle passing through A\ a n d\ B meets A D\ a n d\ B C in the points E\ a n d\ F respectively. Prove that E F || D C

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, it is given that A E=A D\ a n d\ B D=C Edot Prove that A E B\ ~= A D C

In Figure, A D=A E\ a n d\ D\ a n d\ E are points on B C such that B D=E Cdot Prove that A B=A C

In Figure, A E bisects /_C A D\ a n d\ /_B=/_Cdot Prove that A E||B C

A B C D is a parallelogram. The circle through A ,Ba n dC intersects C D produced at E , prove that A E=A Ddot

A B C D is a parallelogram. The circle through A ,Ba n dC intersects C D produced at E , prove that A E=A Ddot