Harmonic progression (mathematics)

For the musical term, see Chord progression.

In mathematics, a harmonic progression (or harmonic sequence) is a progression formed by taking the reciprocals of an arithmetic progression. In other words, it is a sequence of the form

1/a ,\ \frac{1}{a+d}\ , \frac{1}{a+2d}\ , \frac{1}{a+3d}\ , \cdots, \frac{1}{a+kd},

where −1/d is not a natural number and k is a natural number.

(Terms in the form $\frac{x}{y+z}\$ can be expressed as $\frac{\frac{x}{y}}{\frac{y+z}{y}}$ , we can let $\frac{x}{y}=a$ and $\frac{z}{y}=kd$ .)

Equivalently, a sequence is a harmonic progression when each term is the harmonic mean of the neighboring terms.

Examples

12, 6, 4, 3,

\tfrac{12}{5}

, 2, … ,

\tfrac{12}{1+n}

10, 30, −30, −10, −6, −

\tfrac{30}{7}

, … ,

\tfrac{10}{1-\tfrac{2n}{3}}

Use in geometry

If collinear points A, B, C, and D are such that D is the harmonic conjugate of C with respect to A and B, then the distances from any one of these points to the three remaining points form harmonic progression.^[1]^[2] Specifically, each of the sequences AC, AB, AD; BC, BA, BD; CA, CD, CB; and DA, DC, DB are harmonic progressions, where each of the distances is signed according to a fixed orientation of the line.

References

↑ Chapters on the modern geometry of the point, line, and circle, Vol. II by Richard Townsend (1865) p. 24
↑ Modern geometry of the point, straight line, and circle: an elementary treatise by John Alexander Third (1898) p. 44

Mastering Technical Mathematics by Stan Gibilisco, Norman H. Crowhurst, (2007) p. 221
Standard mathematical tables by Chemical Rubber Company (1974) p. 102
Essentials of algebra for secondary schools by Webster Wells (1897) p. 307

Harmonic progression (mathematics)

Examples

Use in geometry

See also

References