Found 2 items, similar to Harmonic.
English → English
adj 1: of or relating to harmony as distinct from melody and
rhythm; “subtleties of harmonic change and tonality”
Ralph Hill [ant: nonharmonic
2: of or relating to the branch of acoustics that studies the
composition of musical sounds; “the sound of the
resonating cavity cannot be the only determinant of the
3: relating to vibrations that occur as a result of vibrations
in a nearby body; “sympathetic vibration”
4: involving or characterized by harmony [syn: consonant
, in harmony
n : a tone that is a component of a complex sound
English → English
(h[aum]r*m[o^]n"[i^]k), n. (Mus.)
A musical note produced by a number of vibrations which is a
multiple of the number producing some other; an overtone. See
(-[i^]*kal), a. [L. harmonicus, Gr. "armoniko`s;
cf. F. harmonique. See Harmony
1. Concordant; musical; consonant; as, harmonic sounds.
Harmonic twang! of leather, horn, and brass. --Pope.
2. (Mus.) Relating to harmony, -- as melodic relates to
melody; harmonious; esp., relating to the accessory sounds
or overtones which accompany the predominant and apparent
single tone of any string or sonorous body.
3. (Math.) Having relations or properties bearing some
resemblance to those of musical consonances; -- said of
certain numbers, ratios, proportions, points, lines,
motions, and the like.
(Mus.), the distance between two notes of
a chord, or two consonant notes.
(Arith. & Alg.), certain relations of
numbers and quantities, which bear an analogy to musical
, the motion of the point A, of the foot of
the perpendicular PA, when P moves uniformly in the
circumference of a circle, and PA is drawn perpendicularly
upon a fixed diameter of the circle. This is simple
harmonic motion. The combinations, in any way, of two or
more simple harmonic motions, make other kinds of harmonic
motion. The motion of the pendulum bob of a clock is
approximately simple harmonic motion.
. See under Proportion
or Harmonic progression
. See under
Spherical harmonic analysis
, a mathematical method,
sometimes referred to as that of Laplace's Coefficients
which has for its object the expression of an arbitrary,
periodic function of two independent variables, in the
proper form for a large class of physical problems,
involving arbitrary data, over a spherical surface, and
the deduction of solutions for every point of space. The
functions employed in this method are called spherical
harmonic functions. --Thomson & Tait.
(Anat.), an articulation by simple
apposition of comparatively smooth surfaces or edges, as
between the two superior maxillary bones in man; -- called
, and harmony
(Mus.), the chord of a note with its third
and fifth; the common chord.