Geometry practice problems
Answer: 41
Solution: In the diagram above, if you join the centers of all the 4 big circles, they will make a square.
Why?
Proof:
Let's say the center of small circle is O. And centers of big circles are A,B,C,D.
OA = OB = OC = OD = r+1 since all are touching each other.
By the same reasoning AB = BC = CD = DA = 2r
Now we can draw a circle of radius r + 1 with center at O.
So ABCD is a cyclic quadrilateral. And it's also equilateral.
We will now prove that a cyclic equilateral quadrilateral is a sqaure.
Let's say the center of small circle is O. And centers of big circles are A,B,C,D.
OA = OB = OC = OD = r+1 since all are touching each other.
By the same reasoning AB = BC = CD = DA = 2r
Now we can draw a circle of radius r + 1 with center at O.
So ABCD is a cyclic quadrilateral. And it's also equilateral.
We will now prove that a cyclic equilateral quadrilateral is a sqaure.
Since AB = BC = CD = DA, all with subtend same angle at center and divide circle into 4 parts.
So each arc will subtend an angle of 90 degrees.
And each of them will inscribe an angle of 45 degrees.
Once you write down all the 45 degree angles you will see that all angles of this quadrilateral are right angles.
Now since we have proved that ABCD is a square, its diagonal will be 2r.sqrt(2).
And that is same as 2r + 2.
Once you equate both of them you will get r = sqrt(2) + 1 whose nearest integer is 2.
Once you equate both of them you will get r = sqrt(2) + 1 whose nearest integer is 2.
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