Sunday, March 22, 2009

Problem 272. Tangent Circles, the Cube of the Common external tangent

Proposed Problem

Problem 272. Tangent Circles, the Cube of the Common external tangent.

See complete Problem 272 at:
gogeometry.com/problem/p272_tangent_circles_cube_common_external_tangent.htm

Level: High School, SAT Prep, College geometry

Posted by Antonio Gutierrez at 10:41 AM
Labels: , , , , ,

3 comments:

  1. AjitMarch 31, 2009 at 1:40 AM

    In problem 271, we proved that x^3 = c*FD*GE (based upon problem 269).
    Now it's easy to see that triangles FDC & CEG are similar; hence, FD/b =a/GE or FD*GE=a*b.
    Thus, x^3 = c*a*b
    Ajit: ajitathle@gmail.com

    ReplyDelete
  2. AnonymousJune 8, 2016 at 11:34 AM

    Join FD and GE.
    Let FC + CG = c = x(a/b+b/a)
    => abc = x(a2+b2)
    => abc = x.(x2)
    Hence x3 = abc

    ReplyDelete
  3. ArifFebruary 12, 2018 at 8:51 AM

    Let

    AC =r
    BC =R

    Then c=2(r+R)

    From problem 277 we have

    x^2=4rR

    And from problem 278 we have

    a^2=4r^2R/(r+R)
    b^2=4R^2r(r+R)

    Multiplying a^2 , b^2 and c^2 we have

    (abc)^2=(4rR)^3(r+R)^2/(r+R)^2
    (abc)^2=(4rR)^3

    With x^2=4rR

    (abc)^2=x^6

    Taking the square root in the equation above gives the desired result.

    ReplyDelete

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