1
Question
In the given figures, O is the centre of the circles. Find the respective values of x.
In the given figures, O is the centre of the circles. Find the respective values of x.
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Solution
In the first image,
we see that AB=CD.
We know that equal chords subtend equal angles at the centre.
⟹∠AOC=∠BOD=60∘
In the second image,
AB=CD and ∠AOB=40∘.
Since equal chords subtend equal angles at the centre, we have
∠AOB=∠COD=40∘.
Note that △ AOB and △COD are isosceles.
Thus, using angle sum property in △COD, we have
∠COD+∠OCD+∠ODC=180∘.
⟹40+x+x=180∘
⟹x=70∘
In the third image,
∠OCA+∠OCB=180°
∠OCB=105°
Now, using angle sum property in △OCB, we have
30∘+105∘+∠BOC=180∘⟹∠BOC=40∘.
Now, in ΔACO
∠OAC+∠OCA+∠AOC=180°
30°+75°+∠AOC=180°
∠AOC=75∘.
Thus, x=∠AOC+∠BOC=75°+40°=115°
we see that AB=CD.We know that equal chords subtend equal angles at the centre.
⟹∠AOC=∠BOD=60∘
In the second image,
AB=CD and ∠AOB=40∘.Since equal chords subtend equal angles at the centre, we have
∠AOB=∠COD=40∘.
Note that △ AOB and △COD are isosceles.
Thus, using angle sum property in △COD, we have
∠COD+∠OCD+∠ODC=180∘.
⟹40+x+x=180∘
⟹x=70∘
In the third image,
∠OCA+∠OCB=180°
∠OCB=105°
Now, using angle sum property in △OCB, we have
30∘+105∘+∠BOC=180∘⟹∠BOC=40∘.
Now, in ΔACO
∠OAC+∠OCA+∠AOC=180°
30°+75°+∠AOC=180°
∠AOC=75∘.
Thus, x=∠AOC+∠BOC=75°+40°=115°
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