-
effects created by
distinct pitches or
tones coinciding with one another;
harmonic objects such as chords,
textures and
tonalities are identified, defined...
- or
harmonically in the same way
other instruments can.
Building on of
Sethares (2004),
dynamic tonality introduces the
notion of pseudo-
harmonic partials...
-
Harmonic analysis is a
branch of
mathematics concerned with
investigating the
connections between a
function and its
representation in frequency. The frequency...
- fields. The
table of
spherical harmonics contains a list of
common spherical harmonics.
Since the
spherical harmonics form a
complete set of orthogonal...
-
functions known as
harmonic motion . The
motion of a
Harmonic oscillator (in physics),
which can be:
Simple harmonic motion Complex harmonic motion Keplers...
- In mathematics, the
harmonic mean is a kind of average, one of the
Pythagorean means. It is the most
appropriate average for
ratios and
rates such as speeds...
- mathematics,
mathematical physics and the
theory of
stochastic processes, a
harmonic function is a
twice continuously differentiable function f : U → R , {\displaystyle...
- In
classical mechanics, a
harmonic oscillator is a
system that, when
displaced from its
equilibrium position,
experiences a
restoring force F proportional...
- In mathematics, the n-th
harmonic number is the sum of the
reciprocals of the
first n
natural numbers: H n = 1 + 1 2 + 1 3 + ⋯ + 1 n = ∑ k = 1 n 1 k ....
-
Playing a
string harmonic (a flageolet) is a
string instrument technique that uses the
nodes of
natural harmonics of a
musical string to
isolate overtones...
