Question

If
a line interects two concentric
circle with center o at A, B, C and
prove that AB=CD .​

Answer 1

Answer:

Answer is given below:-

Step-by-step explanation:

We know that, OA=OD and OB=OC.

They are radius of respective circles.

In ΔOBC, we know that OB=OC, so ∠OBC=∠OCB

∴∠OCD=∠OBA

In ΔOAD, we know that OA=OD, so ∠OAD=∠ODA

Since, ∠OCD=∠OBA and ∠OAD=∠ODA, we get ∠AOB in ΔOAB is equal to ∠COD in ΔOCD.

∴ From SAS congruency, we can say that ΔOAB and ΔOCD are congruent.

So, AB=CD.

                      Hence Proved