1. Construction

2. Properties
    Centers of the circles  Ellipse  Coordinates  Radii of the circles  Circle inversion  Steiner chain 

3. References

4. Bibliography

5. External links

In geometry, the Pappus chain is a ring of circles between two tangent circles investigated by Pappus of Alexandria in the 3rd century AD.

Construction

The arbelos is defined by two circles, C_U and C_V, which are tangent at the point A and where C_U is enclosed by C_V. Let the radii of these two circles be denoted as r_U and r_V, respectively, and let their respective centers be the points U and V. The Pappus chain consists of the circles in the shaded grey region, which are externally tangent to C_U (the inner circle) and internally tangent to C_V (the outer circle). Let the radius, diameter and center point of the n^th circle of the Pappus chain be denoted as r_n, d_n and P_n, respectively.

Properties

Centers of the circles

Ellipse

All the centers of the circles in the Pappus chain are located on a common ellipse, for the following reason. The sum of the distances from the n^th circle of the Pappus chain to the two centers U and V of the arbelos circles equals a constant

Thus, the foci of this ellipse are U and V, the centers of the two circles that define the arbelos; these points correspond to the midpoints of the line segments AB and AC, respectively.

Coordinates

If r = AC/AB, then the center of the nth circle in the chain is:

Radii of the circles

If r = AC/AB, then the radius of the nth circle in the chain is:

Circle inversion

The height h_n of the center of the n^th circle above the base diameter ACB equals n times d_n.^[1] This may be shown by inverting in a circle centered on the tangent point A. The circle of inversion is chosen to intersect the n^th circle perpendicularly, so that the n^th circle is transformed into itself. The two arbelos circles, C_U and C_V, are transformed into parallel lines tangent to and sandwiching the n^th circle; hence, the other circles of the Pappus chain are transformed into similarly sandwiched circles of the same diameter. The initial circle C₀ and the final circle C_n each contribute ½d_n to the height h_n, whereas the circles C₁–C_n−1 each contribute d_n. Adding these contributions together yields the equation h_n = n d_n.

The same inversion can be used to show that the points where the circles of the Pappus chain are tangent to one another lie on a common circle. As noted above, the inversion centered at point A transforms the arbelos circles C_U and C_V into two parallel lines, and the circles of the Pappus chain into a stack of equally sized circles sandwiched between the two parallel lines. Hence, the points of tangency between the transformed circles lie on a line midway between the two parallel lines. Undoing the inversion in the circle, this line of tangent points is transformed back into a circle.

Steiner chain

In these properties of having centers on an ellipse and tangencies on a circle, the Pappus chain is analogous to the Steiner chain, in which finitely many circles are tangent to two circles.

References

Bibliography

• {{Cite book | last = Ogilvy |first = C. S. | authorlink = C. Stanley Ogilvy | year = 1990 | title = Excursions in Geometry | publisher = Dover | isbn = 0-486-26530-7| pages = 54–55}}
• {{Cite book | authorlink = Leon Bankoff | last = Bankoff | first = L. | contribution = How did Pappus do it? | title = The Mathematical Gardner | editor-first = D. A. | editor-last = Klarner | publisher = Prindle, Weber, & Schmidt | location = Boston | year = 1981 | pages = 112–118}}
• {{cite book | last = Johnson | first = R. A. | year = 1960 | title = Advanced Euclidean Geometry: An elementary treatise on the geometry of the triangle and the circle | edition = reprint of 1929 edition by Houghton Miflin | publisher = Dover Publications | location = New York | isbn = 978-0-486-46237-0 | pages = 116–117}}
• {{cite book | last = Wells | first = D. | year = 1991 | title = The Penguin Dictionary of Curious and Interesting Geometry | publisher = Penguin Books | location = New York | isbn = 0-14-011813-6 | pages = 5–6}}

External links

• {{mathworld|title=Pappus Chain|urlname=PappusChain|author=Floer van Lamoen and Eric W. Weisstein}}
• {{citeweb|last=Tan|first=Stephen|title=Arbelos|url=http://www.math.ubc.ca/~cass/courses/m308/projects/tan/html/home.html}}

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