Given a circle of radius 3 cm, how will you construct a square inside the circle so that the circle passes through all the four vertices of the square?
Answers
Step-by-step explanation:
ANSWER
Let the area of Larger circle be 'r' and the area of smaller circle by 'r1'
In triangle ACR,
CR=r=AR (radius of the circle)
AC=CD+BD+AB
Now, CD=r
DB=r1
To find AB, we need to apply pythagoras theorem in triangle ABQ.
In triangle ABQ,
AQ=BQ=r1 (radius of the circle)
and AB=
(2)
r1
⇒AC=r+r1(1+
(2)
)
Applying pythagoras theorem in triangle ACR,
2r
2
=(r+r1(1+
(2)
))
2
solving, we get r=r1(3+2
(2)
)------(1)
Sum of areas of all small circles = 4π(r1)
2
Area of larger circle = π(r)
2
Ratio of areas =
4π(r1)
2
πr
2
Using equation (1), we get ratio of areas =
4
17+2
(2)
solution
Answered By
toppr
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girl
Answer:
diagram please
Step-by-step explanation:
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