In a circle of radius 6 cm semi circles are drawn inside the circle as shown in the figure.
Where AB is diameter with center as O. All circles having integral radii (use S = 3.141). Area of shaded region is. (The area within lines is shaded area.)
Answers
Since, Length of AB, BC and CD are equal.
Radius of circle =6cm
Now, AD=2×6=12cm
⇒AB+BC+CD=12
⇒3AB=12
⇒AB=312
⇒AB=4cm
⇒AB=BC=CD=4cm
Radius of semicircle AB=2cm
Radius of semicircle BC=4cm
Radius of semicircle AD=6cm
Area of the shaded region = Area of semicircle (AB+AD) − Area of semicircle (BD)
⇒ Area of shaded region =0.5π(22+62)−0.5π(4)2
⇒ Area of shaded region =0.6π(4+36)−0.5π×16
⇒ Area of shaded region =20π−8π
⇒ Area of shaded region =12πcm2.
Answer:
Since, Length of AB, BC and CD are equal.
Radius of circle =6cm
Now, AD=2×6=12cm
⇒AB+BC+CD=12
⇒3AB=12
⇒AB=
3
12
⇒AB=4cm
⇒AB=BC=CD=4cm
Radius of semicircle AB=2cm
Radius of semicircle BC=4cm
Radius of semicircle AD=6cm
Area of the shaded region = Area of semicircle (AB+AD) − Area of semicircle (BD)
⇒ Area of shaded region =0.5π(2
2
+6
2
)−0.5π(4)
2
⇒ Area of shaded region =0.6π(4+36)−0.5π×16
⇒ Area of shaded region =20π−8π
⇒ Area of shaded region =12πcm
2
.
Step-by-step explanation:
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