238
16. Calculate the area of the designed region in
Fig. 12.34 common between the two quadrants
of circles of radius 8 cm each.
8c
Answers
Answer: 256/7 cm^2
Step-by-step explanation:
area of designed region
= area of 1st quadrant + area of 2nd quardant
- area of square .
Area of 1st quardant= Thita÷360×πr^2
Area of 1st quardant= Thita÷360×πr^2 =90÷360×22÷7×8^2
= 1÷4×22÷7×8×8
= 22÷7×2×8
= 352÷7cm^2
For 2nd quardant,
As radius and angle are same
Area of 2nd quardant = area of 1st quardant
=352÷7 cm^2
Now,
Area of square= side× side
= 8 × 8
= 64
Area of designed region= area of 1st quardant +
area of 2nd quardant -
area of square.
= { 352÷7 + 352÷7 + 64}
= { 352 + 352+ 64×7 ÷ 7}
= { 700 - 448 ÷ 7}
= 256÷7 cm^2 ( Answer)
Hope it helps you.
Thank you.
☺️
Answer:
here is your answer
see the attached picture
