Area of circle inscribed with 3 smaller circles

In summary, the problem involves finding the area of the largest circle that is inscribed with three smaller circles, each of which is tangent to the other three. The radius of each smaller circle is given as a, and the goal is to find the area of the largest circle. The solution involves finding the length of the sides of an equilateral triangle formed by the centers of the smaller circles, and then using this to find the radius of the largest circle. Ultimately, the area of the largest circle can be calculated as 1/3π(7+4√3)a².
  • #1
rayrenz
3
0

Homework Statement


A large circle is inscribed with 3 smaller circles, eachhttps://www.physicsforums.com/newthread.php?do=newthread&f=156 of the four circles is tangent to the other three. If the radius of each of the smaller circles is a, find the area of the largest circle.

Homework Equations





The Attempt at a Solution


_
the answer must be 1/3pi(7+4√3)a²
 
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  • #2
Hi rayrenz - is there a question here ?

if its just to check you work, then you need to show how you got to the answer
 
  • #3
ok, so what ideas do you have?
 
  • #4
that's the problem to this, to show the solution on how to arrive the answer with r=a
 
  • #5
maybe find the area of the triangle that connects the center of the three circles
 
  • #6
not the area, but that triangle is a good place to start... at the end of the day, you want to find the radius R of the large circle

now back to that triangle... it will be an equilateral triangle - what is the length of one side?
 
  • #7
then find the distance form the point of a triangle to both the large circle centre and edge, thus giving R
 

1. What is the formula for finding the area of a circle inscribed with 3 smaller circles?

The formula for finding the area of a circle inscribed with 3 smaller circles is π(r^2 - 3r^2/4), where r is the radius of the larger circle.

2. How do you determine the radius of the smaller circles?

The radius of the smaller circles can be found by dividing the radius of the larger circle by 2.

3. What is the relationship between the radius of the larger circle and the radius of the smaller circles?

The radius of the larger circle is twice the radius of the smaller circles.

4. Can the area of a circle inscribed with 3 smaller circles be found using the Pythagorean theorem?

No, the Pythagorean theorem is used to find the sides of a right triangle and cannot be applied to finding the area of a circle inscribed with 3 smaller circles.

5. How is the area of a circle inscribed with 3 smaller circles related to the number π?

The area of a circle inscribed with 3 smaller circles is related to π because it is used in the formula for finding the area, and it represents the ratio of the circumference of a circle to its diameter.

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