If you draw a triangle and draw two circles, one circumscribing the polygon with radius R
and one inscribing the polygon. What is the ratio of the radii of the two circles? (Inscribed to
Circumscribed)
O 1/3
O 1/2
O O
wn with its centre (5. +) whose widch and height are so and 8 respectively. It
Answers
Given : draw a triangle and draw two circles, one circumscribing the polygon with radius R and one inscribing the polygon.
To Find : ratio of the radii of the two circles (Inscribed to Circumscribed )
O 3
O 1/3
O 1/2
O 1
Solution:
ratio of the radii of the two circles (Inscribed to Circumscribed ) is not fixed and depends upon triangle
But if Triangle is Equilateral Triangle with side a
Then
Radius of Inscribed circle = a/2√3
Radius of Circumscribed circle = a/√3
ratio of the radii of the two circles (Inscribed to Circumscribed ) = ( a/2√3)/( a/√3)
= 1/2
ratio of the radii of the two circles (Inscribed to Circumscribed ) = 1/2 if Triangle is regular polygon ( means Equilateral triangle)
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Step-by-step explanation:
✰ Question ⤵
If you draw a triangle and draw two circles, one circumscribing the polygon with radius R and one inscribing the polygon. What is the ratio of the radii of the two circles?
✰ To Find ⤵
What is the ratio of the radii of the two circles? (Inscribed to Circumscribed)
- 1/3
- 1/2
- O
✰ Required Solution ⤵
Ratio of the radii of the two circles (Inscribed to Circumscribed) is not fixed and depends upon triangle.
But if triangle is equilateral triangle with side A
Then, Radius of Inscribed circle = a/2 √3
Radius of Circumscribed circle = a /√3
ratio of the radii of the two circles (Inscribed to Circumscribed)
= a/2√3 ÷ (a /√3)
= 1/2
Ratio of the radii of the two circles (Inscribed to Circumscribed) = 1/2 if Triangle is regular polygon (Means equilateral triangle)
Hope it helpful ✨