If the sides of a quadrilateral ABCD touch a circle, prove that: AB + CD = BC + AD
Answers
Answered by
8
Answer:
Hope this is helpful then mark it brainliest answer
Let the circle touch the sides AB, BC, CD and DA of quadrilateral ABCD at P, Q, R and S respectively.
Since AP and AS are tangents to the circle from external point A
AP = AS .......(i)
Similarly, we can prove that:
BP = BQ .......(ii)
CR = CQ .......(iii)
DR = DS ........(iv)
Adding,
AP + BP + CR + DR = AS + DS + BQ + CQ
AB + CD = AD + BC
Hence, AB + CD = AD + BC
Attachments:
Answered by
1
gjjggjjuuyyu
Answer:
yuiiuyytyiuyyyt
Step-by-step explanation:
ghgyuuuyyyyftthgghhtyyyhhhjj
Similar questions