In the following figure, what can be concluded from the below given conditions.
Given: AB = CD and AC = DE.
In the following figure, what can be concluded from the below given conditions.
Given: AB = CD and AC = DE.
The correct option is D All of the above.
Given that chords AB and CD are equal.
Therefore, the angles subtended by them at the centre are also equal.
∠AOB=∠COD
We can write ∠AOB=∠AOC+∠COB------ (1)
Similarly we can write ∠COD=∠COB+∠BOD ------(2)
From (1) and (2)
Equating ∠AOB=∠COD
∠AOC + ∠COB = ∠COB + ∠BOD
Therefore, ∠AOC = ∠BOD
Therefore using converse of theorem, we get AC = BD.
Also it is given that AC = DE
Therefore, AC = DE = BD
Hence the angle subtended by these chords will be equal.
∠AOC = ∠DOE
It is given that AB = CD
If we add equal quantities on both sides then it does not makes any difference.
Therefore if we add BD to AB and add DE to CD (BD = DE)
AB + BD = CD + DE
AD = CE
Consequently, ∠AOD = ∠COE.
All of the above.
Given that chords AB and CD are equal.
Therefore, the angles subtended by them at the centre are also equal.
∠AOB=∠COD
We can write ∠AOB=∠AOC+∠COB------ (1)
Similarly we can write ∠COD=∠COB+∠BOD ------(2)
From (1) and (2)
Equating ∠AOB=∠COD
∠AOC + ∠COB = ∠COB + ∠BOD
Therefore, ∠AOC = ∠BOD
Therefore using converse of theorem, we get AC = BD.
Also it is given that AC = DE
Therefore, AC = DE = BD
Hence the angle subtended by these chords will be equal.
∠AOC = ∠DOE
It is given that AB = CD
If we add equal quantities on both sides then it does not makes any difference.
Therefore if we add BD to AB and add DE to CD (BD = DE)
AB + BD = CD + DE
AD = CE
Consequently, ∠AOD = ∠COE.
