SOLUTION: Circle A and B lie inside the biggest circle. The two small circles are tangent to the largest circle and to each other. The radius of circle A is and the radius of circle B is 4.
Algebra.Com
Question 1082204: Circle A and B lie inside the biggest circle. The two small circles are tangent to the largest circle and to each other. The radius of circle A is and the radius of circle B is 4. Find the sum of the circumferences of the three circles.
Answer by Fombitz(32388) (Show Source): You can put this solution on YOUR website!
You haven't provided enough information to solve.
.
.
.
.
.
.
.
As shown, both circles can be tangent to the larger circle and to each other for an infinite range of larger circle diameters.
You need additional information to solve.
Please repost.
RELATED QUESTIONS
Circle A and B lie inside the biggest circle. The two small circles are tangent to the... (answered by ikleyn)
four circles of radius 1 are inscribed in a larger circle. The large circle is tangent to (answered by Fombitz)
Two circles each with radius of 1 are inscribed so that their centers lie along the... (answered by Fombitz,edjones)
The center of three circle that are tangent to each other are connected to form a... (answered by ikleyn)
The radius of the orange circle is 10 cm. The white circles are congruent and tangent to... (answered by Alan3354)
In a larger shaded circle, there are two smaller circles. The large circle has a diameter (answered by ikleyn)
Two circles with center A and B are tangent to each other and both tangent to the x axis... (answered by ikleyn)
Inside a circle, with centre O and radius r, two circles with centres A and B are drawn,... (answered by ikleyn)
A circle with a 4-inch radius is centered at A, and a circle with a 9-inch radius is... (answered by mananth)