Question

14
Q4.
(a) In the given figure, O is the centre of
the given circle. AB is a side of a square,
BC is a side of regular pentagon and
CD is a side of regular hexagon,
Find: (i) ZAOB
(ii) ZAOC (iii) ZAOD
B
[3]​

Answer 1

Answer:

As given that AB is the side of pentagon the angle subtended by each arm of the pentagon at the centre of the circle is =

5

360

o

=72

o

Thus angle ∠AOB=72

o

Similarly as BC is the side of a hexagon hence the angle subtended by BC at the centre is =

6

360

o

i.e., 60

o

∠BOC=60

o

Now ∠AOC=∠AOB+∠BOC=72

o

+60

o

=132

o

The triangle thus formed, △AOB is an isosceles triangle with OA=OB as they are radii of the same circle.

Thus ∠OBA=∠BAO as they are opposite angles of equal sides of an isosceles triangle.

The sum of all the angles of a triangle is 180

o

so, ∠AOB+∠OBA+∠BAO=180

o

2∠OBA+72

o

=180

o

as, ∠OBA=∠BAO

2∠OBA=180

o

−72

o

2∠OBA=108

o

∠CBA=54

o

as ∠OBA=∠BAO So,

∠OBA=∠BAO=54

o

The triangle thus formed, △BOC is an isosceles triangle with OB=OC as they are radii of the same circle.

Thus ∠OBC=∠OCB as they are opposite angles of equal sides of an isosceles triangles.

The sum of all the angles of a triangles is 180

o

so, ∠BOC+∠OBC+∠OCB=180

o

2∠OBC+60

o

=180

o

as, ∠OBC=∠OCB

2∠OBC=180

o

−60

o

2∠OBC=120

o

∠OBC=60

o

as ∠OBC=∠OCB

So, ∠OBC=∠OCB=60

o

∠ABC=∠OBA+∠OBC=54

o

+60

o

=114

o

Step-by-step explanation:

As given that AB is the side of pentagon the angle subtended by each arm of the pentagon at the centre of the circle is =

5

360

o

=72

o

Thus angle ∠AOB=72

o

Similarly as BC is the side of a hexagon hence the angle subtended by BC at the centre is =

6

360

o

i.e., 60

o

∠BOC=60

o

Now ∠AOC=∠AOB+∠BOC=72

o

+60

o

=132

o

The triangle thus formed, △AOB is an isosceles triangle with OA=OB as they are radii of the same circle.

Thus ∠OBA=∠BAO as they are opposite angles of equal sides of an isosceles triangle.

The sum of all the angles of a triangle is 180

o

so, ∠AOB+∠OBA+∠BAO=180

o

2∠OBA+72

o

=180

o

as, ∠OBA=∠BAO

2∠OBA=180

o

−72

o

2∠OBA=108

o

∠CBA=54

o

as ∠OBA=∠BAO So,

∠OBA=∠BAO=54

o

The triangle thus formed, △BOC is an isosceles triangle with OB=OC as they are radii of the same circle.

Thus ∠OBC=∠OCB as they are opposite angles of equal sides of an isosceles triangles.

The sum of all the angles of a triangles is 180

o

so, ∠BOC+∠OBC+∠OCB=180

o

2∠OBC+60

o

=180

o

as, ∠OBC=∠OCB

2∠OBC=180

o

−60

o

2∠OBC=120

o

∠OBC=60

o

as ∠OBC=∠OCB

So, ∠OBC=∠OCB=60

o

∠ABC=∠OBA+∠OBC=54

o

+60

o

=114

o