Composers

Clark Kimberling

Piano
Recorder
Flute
Mixed chorus
Organ
Violin
Oboe
Guitar
Dance
Piece
Prelude
Marche
Song
Anthem
Religious music
Melody
Duet
Secular choruses
by popularity

#

400 Solos for C Instrument

A

A Walk in the WoodsAlla MarciaAmerican Melodies

B

Brother Sun, Sister Moon

C

CarolinaCharming NameChilipeppers

D

Dance 1Dance 10Dance 11Dance 12Dance 13Dance 14Dance 15Dance 16Dance 17Dance 18Dance 19Dance 2Dance 20Dance 21Dance 22Dance 23Dance 24Dance 25Dance 26Dance 27Dance 28Dance 29Dance 3Dance 30Dance 4Dance 5Dance 6Dance 7Dance 8Dance 9Dorian Dance

E

Expeggio

F

Fritillaries

G

Gherius

H

Haslemere

I

Invocation

J

Joyful Joyful

K

Knightsbridge

L

Lake Ontario

M

March 1Minuet for Anna

N

Night Shades

O

Otters

P

Pentecost IIPeveril CastlePrelude No.1Prelude No.2Prelude No.3

Q

Quartets for RecordersQuickly Go

R

River Avon

S

Solos for Soprano RecorderSolos for Treble Instrument, Especially Soprano RecorderSusato

T

T RexTanglewoodTrios for Recorders or Flutes

V

Verity Unseen

X

Xenon

Z

ZettlZipporah
Wikipedia
Clark Kimberling (born November 7, 1942 in Hinsdale, Illinois) is a mathematician, musician, and composer. He has been a mathematics professor since 1970 at the University of Evansville. His research interests include triangle centers, integer sequences, and hymnology.
Kimberling received his PhD in mathematics in 1970 from the Illinois Institute of Technology, under the supervision of Abe Sklar. Since at least 1994, he has maintained a list of triangle centers and their properties. In its current on-line form, the Encyclopedia of Triangle Centers, this list comprises tens of thousands of entries.
He has contributed to The Hymn, the journal of the Hymn Society in the United States and Canada; and in the Canterbury Dictionary of Hymnology.
Robert C. Schoen has defined "golden triangle" as a triangle with two of its sides in the golden ratio. Kimberling has proposed that Schoen's definition of golden triangle be extended to include triangles which have angles that are in the golden ratio. Kimberling has described a "doubly golden triangle" which has two sides that are in golden ratio and which also has two angles that are in golden ratio.