`A B CA N DA D C` are two right triangles with common hypotenuse `A Cdot` Prove that `/_C A D=/_C B Ddot`

A B C and A D C are two right triangles with common hypotenuse A Cdot Prove that /_C A D=/_C B Ddot

A B C and A D C are two right triangles with common hypotenuse A Cdot Prove that /_C A D=/_C B Ddot

A B C and A D C are two right triangles with common hypotenuse A Cdot Prove that /_C A D=/_C B Ddot

Two circle with centres A and B intersect at C and Ddot Prove that /_A C B=/_A D Bdot

In a rectangle A B C D , prove that A C B~= C A Ddot

In Figure A B D C\ a n d\ A D B Cdot Prove that /_D A B=\ /_D C B

A B C is a right triangle right-angled at Ca n dA C=sqrt(3)B C . Prove that /_A B C=60^0dot

In Figure, A B C\ a n d\ D B C are two isosceles triangles on the same base B C such that A B=A C\ a n d\ D B=C Ddot Prove that /_A B D=\ /_A C D

In Figure, A B=A C\ a n d\ D B=D Cdot\ Prove that /_A B D=/_A C D

In Figure, A B C\ a n d\ D B C are two triangles on the same base B C such that A B=A C\ a n d\ D B=D Cdot Prove that /_A B D=/_A C D