Constant chord theorem

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The constant chord theorem is a statement in elementary geometry about a property of certain chords in two intersecting circles.

The circles ${\displaystyle k_1}$ and ${\displaystyle k_2}$ intersect in the points ${\displaystyle P}$ and ${\displaystyle Q}$. ${\displaystyle Z_1}$ is an arbitrary point on ${\displaystyle k_1}$ being different from ${\displaystyle P}$ and ${\displaystyle Q}$. The lines ${\displaystyle Z_{1}P}$ and ${\displaystyle Z_{1}Q}$ intersect the circle ${\displaystyle k_2}$ in ${\displaystyle P_1}$ and ${\displaystyle Q_1}$. The constant chord theorem then states that the length of the chord ${\displaystyle P_1{Q}_1}$ in ${\displaystyle k_2}$ does not depend on the location of ${\displaystyle Z_1}$ on ${\displaystyle k_1}$, in other words the length is constant.

The theorem stays valid when ${\displaystyle Z_1}$ coincides with ${\displaystyle P}$ or ${\displaystyle Q}$, provided one replaces the then undefined line ${\displaystyle Z_{1}P}$ or ${\displaystyle Z_{1}Q}$ by the tangent on ${\displaystyle k_1}$ at ${\displaystyle Z_1}$.

A similar theorem exists in three dimensions for the intersection of two spheres. The spheres ${\displaystyle k_1}$ and ${\displaystyle k_2}$ intersect in the circle ${\displaystyle k_s}$. ${\displaystyle Z_1}$ is arbitrary point on the surface of the first sphere ${\displaystyle k_1}$, that is not on the intersection circle ${\displaystyle k_s}$. The extended cone created by ${\displaystyle k_s}$ and ${\displaystyle Z_1}$ intersects the second sphere ${\displaystyle k_2}$ in a circle. The length of the diameter of this circle is constant, that is it does not depend on the location of ${\displaystyle Z_1}$ on ${\displaystyle k_1}$.

Nathan Altshiller Court described the constant chord theorem 1925 in the article sur deux cercles secants for the Belgian math journal Mathesis. Eight years later he published On Two Intersecting Spheres in the American Mathematical Monthly, which contained the 3-dimensional version. Later it was included in several textbooks, such as Ross Honsberger's Mathematical Morsels and Roger B. Nelsen's Proof Without Words II, where it was given as a problem, or the German geometry textbook Mit harmonischen Verhältnissen zu Kegelschnitten by Halbeisen, Hungerbühler and Läuchli, where it was given as a theorem.

• Lorenz Halbeisen, Norbert Hungerbühler, Juan Läuchli: Mit harmonischen Verhältnissen zu Kegelschnitten: Perlen der klassischen Geometrie. Springer 2016, Template:ISBN, p. 16 (German)
• Roger B. Nelsen: Proof Without Words II. MAA, 2000, p. 29
• Ross Honsberger: Mathematical Morsels. MAA, 1979, Template:ISBN, pp. 126–127
• Nathan Altshiller Court: On Two Intersecting Spheres. The American Mathematical Monthly, Band 40, Nr. 5, 1933, pp. 265–269 (JSTOR)
• Nathan Altshiller-Court: sur deux cercles secants. Mathesis, Band 39, 1925, p. 453 (French)

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• constant chord theorem as problem at cut-the-knot.org